{"id":208,"date":"2018-02-06T15:25:40","date_gmt":"2018-02-06T15:25:40","guid":{"rendered":"https:\/\/courses.lumenlearning.com\/suny-osuniversityphysics\/?post_type=chapter&#038;p=208"},"modified":"2018-07-04T14:51:37","modified_gmt":"2018-07-04T14:51:37","slug":"2-4-products-of-vectors","status":"publish","type":"chapter","link":"https:\/\/courses.lumenlearning.com\/suny-osuniversityphysics\/chapter\/2-4-products-of-vectors\/","title":{"raw":"2.4 Products of Vectors","rendered":"2.4 Products of Vectors"},"content":{"raw":"<div class=\"textbox learning-objectives\">\r\n<h3>Learning Objectives<\/h3>\r\nBy the end of this section, you will be able to:\r\n<ul>\r\n \t<li>Explain the difference between the scalar product and the vector product of two vectors.<\/li>\r\n \t<li>Determine the scalar product of two vectors.<\/li>\r\n \t<li>Determine the vector product of two vectors.<\/li>\r\n \t<li>Describe how the products of vectors are used in physics.<\/li>\r\n<\/ul>\r\n<\/div>\r\n<p id=\"fs-id1167131249217\">A vector can be multiplied by another vector but may not be divided by another vector. There are two kinds of products of vectors used broadly in physics and engineering. One kind of multiplication is a <em>scalar multiplication of two vectors<\/em>. Taking a scalar product of two vectors results in a number (a scalar), as its name indicates. Scalar products are used to define work and energy relations. For example, the work that a force (a vector) performs on an object while causing its displacement (a vector) is defined as a scalar product of the force vector with the displacement vector. A quite different kind of multiplication is a <em>vector multiplication of vectors<\/em>. Taking a vector product of two vectors returns as a result a vector, as its name suggests. Vector products are used to define other derived vector quantities. For example, in describing rotations, a vector quantity called <em>torque<\/em> is defined as a vector product of an applied force (a vector) and its distance from pivot to force (a vector). It is important to distinguish between these two kinds of vector multiplications because the scalar product is a scalar quantity and a vector product is a vector quantity.<\/p>\r\n\r\n<div id=\"fs-id1167131099995\" class=\"bc-section section\">\r\n<h3>The Scalar Product of Two Vectors (the Dot Product)<\/h3>\r\n<p id=\"fs-id1167131534370\">Scalar multiplication of two vectors yields a scalar product.<\/p>\r\n\r\n<div id=\"fs-id1167131530991\">\r\n<div class=\"textbox key-takeaways\">\r\n<h3 style=\"text-align: center\">Scalar Product (Dot Product)<\/h3>\r\n<div><\/div>\r\n<p id=\"fs-id1167131499095\">The <strong>scalar product<\/strong> $$ \\overset{\\to }{A}\u00b7\\overset{\\to }{B} $$ of two vectors $$ \\overset{\\to }{A} $$ and $$ \\overset{\\to }{B} $$ is a number defined by the equation<\/p>\r\n\r\n<div id=\"fs-id1167129962128\">$$\\overset{\\to }{A}\u00b7\\overset{\\to }{B}=AB\\,\\text{cos}\\,\\phi ,$$<\/div>\r\n<p id=\"fs-id1167131191966\">where $$ \\phi  $$ is the angle between the vectors (shown in <a class=\"autogenerated-content\" href=\"#CNX_UPhysics_02_04_prod-S\">(Figure)<\/a>). The scalar product is also called the <strong>dot product<\/strong> because of the dot notation that indicates it.<\/p>\r\n\r\n<\/div>\r\n&nbsp;\r\n\r\n<\/div>\r\n<p id=\"fs-id1167131173040\">In the definition of the dot product, the direction of angle $$ \\phi  $$ does not matter, and $$ \\phi  $$ can be measured from either of the two vectors to the other because $$ \\text{cos}\\,\\phi =\\text{cos}\\,(\\text{\u2212}\\phi )=\\text{cos}\\,(2\\pi -\\phi )$$. The dot product is a negative number when $$ 90\\text{\u00b0}&lt;\\phi \\le 180\\text{\u00b0} $$ and is a positive number when $$ 0\\text{\u00b0}\\le \\phi &lt;90\\text{\u00b0}$$. Moreover, the dot product of two parallel vectors is $$ \\overset{\\to }{A}\u00b7\\overset{\\to }{B}=AB\\,\\text{cos}\\,0\\text{\u00b0}=AB$$, and the dot product of two antiparallel vectors is $$ \\overset{\\to }{A}\u00b7\\overset{\\to }{B}=AB\\,\\text{cos}\\,180\\text{\u00b0}=\\text{\u2212}AB$$. The scalar product of two <em>orthogonal vectors<\/em> vanishes: $$ \\overset{\\to }{A}\u00b7\\overset{\\to }{B}=AB\\,\\text{cos}\\,90\\text{\u00b0}=0$$. The scalar product of a vector with itself is the square of its magnitude:<\/p>\r\n\r\n<div id=\"fs-id1167131608447\">$${\\overset{\\to }{A}}^{2}\\equiv \\overset{\\to }{A}\u00b7\\overset{\\to }{A}=AA\\,\\text{cos}\\,0\\text{\u00b0}={A}^{2}.$$<\/div>\r\n<div id=\"CNX_UPhysics_02_04_prod-S\" class=\"wp-caption aligncenter\">[caption id=\"\" align=\"aligncenter\" width=\"965\"]<img src=\"https:\/\/s3-us-west-2.amazonaws.com\/courses-images\/wp-content\/uploads\/sites\/2952\/2018\/01\/31184031\/CNX_UPhysics_02_04_prod-S.jpg\" alt=\"Figure a: vectors A and B are shown tail to tail. A is longer than B. The angle between them is phi. Figure b: Vector B is extended using a dashed line and another dashed line is drawn from the head of A to the extension of B, perpendicular to B. A sub perpendicular is equal to A magnitude times cosine phi and is the distance from the vertex where the tails of A and B meet to the location where the perpendicular from A to B meets the extension of B. Figure c: A dashed line is drawn from the head of B to A, perpendicular to A. The distance from the tails of A and B to where the dashed line meets B is B sub perpendicular and is equal to magnitude B times cosine phi.\" width=\"965\" height=\"296\" \/> <strong>Figure 2.27<\/strong> The scalar product of two vectors. (a) The angle between the two vectors. (b) The orthogonal projection $$ {A}_{\\perp } $$ of vector $$ \\overset{\\to }{A} $$ onto the direction of vector $$ \\overset{\\to }{B}$$. (c) The orthogonal projection $$ {B}_{\\perp } $$ of vector $$ \\overset{\\to }{B} $$ onto the direction of vector $$ \\overset{\\to }{A}$$.[\/caption]<\/div>\r\n<div id=\"fs-id1167131141315\" class=\"textbox examples\">\r\n<h3>Example<\/h3>\r\n<h4>The Scalar Product<\/h4>\r\nFor the vectors shown in <a class=\"autogenerated-content\" href=\"https:\/\/courses.lumenlearning.com\/suny-osuniversityphysics\/chapter\/2-1-scalars-and-vectors#figure2.13\">(Figure)<\/a>, find the scalar product $$ \\overset{\\to }{A}\u00b7\\overset{\\to }{F}$$.\r\n<h4>Strategy<\/h4>\r\nFrom <a class=\"autogenerated-content\" href=\"https:\/\/courses.lumenlearning.com\/suny-osuniversityphysics\/chapter\/2-1-scalars-and-vectors#figure2.13\">(Figure)<\/a>, the magnitudes of vectors $$ \\overset{\\to }{A} $$ and $$ \\overset{\\to }{F} $$ are <em>A<\/em> = 10.0 and <em>F<\/em> = 20.0. Angle $$ \\theta $$, between them, is the difference: $$ \\theta =\\phi -\\alpha =110\\text{\u00b0}-35\\text{\u00b0}=75\\text{\u00b0}$$. Substituting these values into <a class=\"autogenerated-content\" href=\"#fs-id1167129962128\">(Figure)<\/a> gives the scalar product.\r\n<h4>Solution<\/h4>\r\n<p id=\"fs-id1167131604681\">[reveal-answer q=\"447394\"]Show Answer[\/reveal-answer]\r\n[hidden-answer a=\"447394\"]A straightforward calculation gives us<\/p>\r\n$$\\overset{\\to }{A}\u00b7\\overset{\\to }{F}=AF\\,\\text{cos}\\,\\theta =(10.0)(20.0)\\,\\text{cos}\\,75\\text{\u00b0}=51.76.$$[\/hidden-answer]\r\n\r\n<\/div>\r\n<div id=\"fs-id1167131599875\" class=\"textbox exercises check-understanding\">\r\n<h3>Check Your Understanding<\/h3>\r\n<div id=\"fs-id1167134912050\" class=\"problem textbox\">\r\n<div id=\"fs-id1167131567806\">\r\n<p id=\"fs-id1167131541846\">For the vectors given in <a class=\"autogenerated-content\" href=\"https:\/\/courses.lumenlearning.com\/suny-osuniversityphysics\/chapter\/2-1-scalars-and-vectors#figure2.13\">(Figure)<\/a>, find the scalar products $$ \\overset{\\to }{A}\u00b7\\overset{\\to }{B} $$ and $$ \\overset{\\to }{F}\u00b7\\overset{\\to }{C}$$.<\/p>\r\n\r\n<\/div>\r\n<div id=\"fs-id1167131172251\" class=\"solution\">\r\n\r\n[reveal-answer q=\"fs-id1167131172251\"]Show Solution[\/reveal-answer]\r\n\r\n[hidden-answer a=\"fs-id1167131172251\"]\r\n<p id=\"fs-id1167131128914\">$$\\overset{\\to }{A}\u00b7\\overset{\\to }{B}=-57.3$$, $$ \\overset{\\to }{F}\u00b7\\overset{\\to }{C}=27.8$$<\/p>\r\n[\/hidden-answer]\r\n\r\n<\/div>\r\n<\/div>\r\n<\/div>\r\n<p id=\"fs-id1167134541337\">In the Cartesian coordinate system, scalar products of the unit vector of an axis with other unit vectors of axes always vanish because these unit vectors are orthogonal:<\/p>\r\n\r\n<div id=\"fs-id1167131488937\">$$\\begin{array}{c}\\hat{i}\u00b7\\hat{j}=|\\hat{i}||\\hat{j}|\\,\\text{cos}\\,90\\text{\u00b0}=(1)(1)(0)=0,\\hfill \\\\ \\hat{i}\u00b7\\hat{k}=|\\hat{i}||\\hat{k}|\\,\\text{cos}\\,90\\text{\u00b0}=(1)(1)(0)=0,\\hfill \\\\ \\hat{k}\u00b7\\hat{j}=|\\hat{k}||\\hat{j}|\\,\\text{cos}\\,90\\text{\u00b0}=(1)(1)(0)=0.\\hfill \\end{array}$$<\/div>\r\n<p id=\"fs-id1167131113195\">In these equations, we use the fact that the magnitudes of all unit vectors are one: $$ |\\hat{i}|=|\\hat{j}|=|\\hat{k}|=1$$. For unit vectors of the axes, <a class=\"autogenerated-content\" href=\"#fs-id1167131608447\">(Figure)<\/a> gives the following identities:<\/p>\r\n\r\n<div id=\"fs-id1167134625856\">$$\\hat{i}\u00b7\\hat{i}={i}^{2}=\\hat{j}\u00b7\\hat{j}={j}^{2}=\\hat{k}\u00b7\\hat{k}={k}^{2}=1.$$<\/div>\r\n<p id=\"fs-id1167131223969\">The scalar product $$ \\overset{\\to }{A}\u00b7\\overset{\\to }{B} $$ can also be interpreted as either the product of <em>B<\/em> with the orthogonal projection $$ {A}_{\\perp } $$ of vector $$ \\overset{\\to }{A} $$ onto the direction of vector $$ \\overset{\\to }{B} $$ (<a class=\"autogenerated-content\" href=\"#CNX_UPhysics_02_04_prod-S\">(Figure)<\/a>(b)) or the product of <em>A<\/em> with the orthogonal projection $$ {B}_{\\perp } $$ of vector $$ \\overset{\\to }{B} $$ onto the direction of vector $$ \\overset{\\to }{A} $$ (<a class=\"autogenerated-content\" href=\"#CNX_UPhysics_02_04_prod-S\">(Figure)<\/a>(c)):<\/p>\r\n\r\n<div id=\"fs-id1167134451842\" class=\"unnumbered\">$$\\begin{array}{ll}\\hfill \\overset{\\to }{A}\u00b7\\overset{\\to }{B}&amp; =AB\\,\\text{cos}\\,\\phi \\hfill \\\\ &amp; =B(A\\,\\text{cos}\\,\\phi )=B{A}_{\\perp }\\hfill \\\\ &amp; =A(B\\,\\text{cos}\\,\\phi )=A{B}_{\\perp }.\\hfill \\end{array}$$<\/div>\r\n<p id=\"fs-id1167131403688\">For example, in the rectangular coordinate system in a plane, the scalar <em>x<\/em>-component of a vector is its dot product with the unit vector $$ \\hat{i}$$, and the scalar <em>y<\/em>-component of a vector is its dot product with the unit vector $$ \\hat{j}$$:<\/p>\r\n\r\n<div id=\"fs-id1167134686592\" class=\"unnumbered\">$$\\{\\begin{array}{l}\\overset{\\to }{A}\u00b7\\hat{i}=|\\overset{\\to }{A}||\\hat{i}|\\,\\text{cos}\\,{\\theta }_{A}=A\\,\\text{cos}\\,{\\theta }_{A}={A}_{x}\\\\ \\overset{\\to }{A}\u00b7\\hat{j}=|\\overset{\\to }{A}||\\hat{j}|\\,\\text{cos}\\,(90\\text{\u00b0}-{\\theta }_{A})=A\\,\\text{sin}\\,{\\theta }_{A}={A}_{y}\\end{array}.$$<\/div>\r\n<p id=\"fs-id1167131502091\">Scalar multiplication of vectors is commutative,<\/p>\r\n\r\n<div id=\"fs-id1167131500766\" class=\"equation-callout\">\r\n<div id=\"fs-id1167134952226\">$$\\overset{\\to }{A}\u00b7\\overset{\\to }{B}=\\overset{\\to }{B}\u00b7\\overset{\\to }{A},$$<\/div>\r\n<\/div>\r\n<p id=\"fs-id1167131331705\">and obeys the distributive law:<\/p>\r\n\r\n<div id=\"fs-id1167131618794\" class=\"equation-callout\">\r\n<div id=\"fs-id1167129968054\">$$\\overset{\\to }{A}\u00b7(\\overset{\\to }{B}+\\overset{\\to }{C})=\\overset{\\to }{A}\u00b7\\overset{\\to }{B}+\\overset{\\to }{A}\u00b7\\overset{\\to }{C}.$$<\/div>\r\n<\/div>\r\n<p id=\"fs-id1167131435344\">We can use the commutative and distributive laws to derive various relations for vectors, such as expressing the dot product of two vectors in terms of their scalar components.<\/p>\r\n\r\n<div id=\"fs-id1167131387446\" class=\"textbox exercises check-understanding\">\r\n<h3>Check Your Understanding<\/h3>\r\n<div id=\"fs-id1167131635553\" class=\"problem textbox\">\r\n<div id=\"fs-id1167131412797\">\r\n<p id=\"fs-id1167131389882\">For vector $$ \\overset{\\to }{A}={A}_{x}\\hat{i}+{A}_{y}\\hat{j}+{A}_{z}\\hat{k} $$ in a rectangular coordinate system, use <a class=\"autogenerated-content\" href=\"#fs-id1167131488937\">(Figure)<\/a> through <a class=\"autogenerated-content\" href=\"#fs-id1167129968054\">(Figure)<\/a> to show that $$ \\overset{\\to }{A}\u00b7\\hat{i}={A}_{x} $$ $$\\overset{\\to }{A}\u00b7\\hat{j}={A}_{y} $$ and $$ \\overset{\\to }{A}\u00b7\\hat{k}={A}_{z}$$.<\/p>\r\n\r\n<\/div>\r\n<\/div>\r\n<\/div>\r\n<p id=\"fs-id1167131121374\">When the vectors in <a class=\"autogenerated-content\" href=\"#fs-id1167129962128\">(Figure)<\/a> are given in their vector component forms,<\/p>\r\n\r\n<div id=\"fs-id1167131586768\" class=\"unnumbered\">$$\\overset{\\to }{A}={A}_{x}\\hat{i}+{A}_{y}\\hat{j}+{A}_{z}\\hat{k}\\,\\text{and}\\,\\overset{\\to }{B}={B}_{x}\\hat{i}+{B}_{y}\\hat{j}+{B}_{z}\\hat{k},$$<\/div>\r\n<p id=\"fs-id1167134888648\">we can compute their scalar product as follows:<\/p>\r\n\r\n<div id=\"fs-id1167134452024\" class=\"unnumbered\">$$\\begin{array}{lll}\\hfill \\overset{\\to }{A}\u00b7\\overset{\\to }{B}&amp; =\\hfill &amp; ({A}_{x}\\hat{i}+{A}_{y}\\hat{j}+{A}_{z}\\hat{k})\u00b7({B}_{x}\\hat{i}+{B}_{y}\\hat{j}+{B}_{z}\\hat{k})\\hfill \\\\ &amp; =\\hfill &amp; \\enspace{A}_{x}{B}_{x}\\hat{i}\u00b7\\hat{i}+{A}_{x}{B}_{y}\\hat{i}\u00b7\\hat{j}+{A}_{x}{B}_{z}\\hat{i}\u00b7\\hat{k}\\hfill \\\\ &amp; &amp; +{A}_{y}{B}_{x}\\hat{j}\u00b7\\hat{i}+{A}_{y}{B}_{y}\\hat{j}\u00b7\\hat{j}+{A}_{y}{B}_{z}\\hat{j}\u00b7\\hat{k}\\hfill \\\\ &amp; &amp; +{A}_{z}{B}_{x}\\,\\hat{k}\u00b7\\hat{i}+{A}_{z}{B}_{y}\\hat{k}\u00b7\\hat{j}+{A}_{z}{B}_{z}\\,\\hat{k}\u00b7\\hat{k}.\\hfill \\end{array}$$<\/div>\r\n<p id=\"fs-id1167134942868\">Since scalar products of two different unit vectors of axes give zero, and scalar products of unit vectors with themselves give one (see <a class=\"autogenerated-content\" href=\"#fs-id1167131488937\">(Figure)<\/a> and <a class=\"autogenerated-content\" href=\"#fs-id1167134625856\">(Figure)<\/a>), there are only three nonzero terms in this expression. Thus, the scalar product simplifies to<\/p>\r\n\r\n<div id=\"fs-id1167131444689\" class=\"equation-callout\">\r\n<div id=\"fs-id1167131115362\">$$\\overset{\\to }{A}\u00b7\\overset{\\to }{B}={A}_{x}{B}_{x}+{A}_{y}{B}_{y}+{A}_{z}{B}_{z}.$$<\/div>\r\n<\/div>\r\n<p id=\"fs-id1167134944381\">We can use <a class=\"autogenerated-content\" href=\"#fs-id1167131115362\">(Figure)<\/a> for the scalar product in terms of scalar components of vectors to find the <strong><span class=\"no-emphasis\">angle between two vectors<\/span><\/strong>. When we divide <a class=\"autogenerated-content\" href=\"#fs-id1167129962128\">(Figure)<\/a> by <em>AB<\/em>, we obtain the equation for $$ \\text{cos}\\,\\phi $$, into which we substitute <a class=\"autogenerated-content\" href=\"#fs-id1167131115362\">(Figure)<\/a>:<\/p>\r\n\r\n<div id=\"fs-id1167131167094\" class=\"equation-callout\">\r\n<div id=\"fs-id1167134723856\">$$\\text{cos}\\,\\phi =\\frac{\\overset{\\to }{A}\u00b7\\overset{\\to }{B}}{AB}=\\frac{{A}_{x}{B}_{x}+{A}_{y}{B}_{y}+{A}_{z}{B}_{z}}{AB}.$$<\/div>\r\n<\/div>\r\n<p id=\"fs-id1167131315724\">Angle $$ \\phi  $$ between vectors $$ \\overset{\\to }{A} $$ and $$ \\overset{\\to }{B} $$ is obtained by taking the inverse cosine of the expression in <a class=\"autogenerated-content\" href=\"#fs-id1167134723856\">(Figure)<\/a>.<\/p>\r\n\r\n<div id=\"fs-id1167131510883\" class=\"textbox examples\">\r\n<h3>Example<\/h3>\r\n<h4>Angle between Two Forces<\/h4>\r\nThree dogs are pulling on a stick in different directions, as shown in <a class=\"autogenerated-content\" href=\"#CNX_UPhysics_02_04_dogs\">(Figure)<\/a>. The first dog pulls with force $$ {\\overset{\\to }{F}}_{1}=(10.0\\hat{i}-20.4\\hat{j}+2.0\\hat{k})\\text{N}$$, the second dog pulls with force $$ {\\overset{\\to }{F}}_{2}=(-15.0\\hat{i}-6.2\\hat{k})\\text{N}$$, and the third dog pulls with force $$ {\\overset{\\to }{F}}_{3}=(5.0\\hat{i}+12.5\\hat{j})\\text{N}$$. What is the angle between forces $$ {\\overset{\\to }{F}}_{1} $$ and $$ {\\overset{\\to }{F}}_{2}$$?\r\n<div id=\"CNX_UPhysics_02_04_dogs\" class=\"wp-caption aligncenter\">\r\n\r\n[caption id=\"\" align=\"aligncenter\" width=\"418\"]<img src=\"https:\/\/s3-us-west-2.amazonaws.com\/courses-images\/wp-content\/uploads\/sites\/2952\/2018\/01\/31184035\/CNX_UPhysics_02_04_dogs.jpg\" alt=\"Three dogs pull on a stick.\" width=\"418\" height=\"353\" \/> <strong>Figure 2.28<\/strong>\u00a0Three dogs are playing with a stick.[\/caption]\r\n\r\n<\/div>\r\n<h4>Strategy<\/h4>\r\nThe components of force vector $$ {\\overset{\\to }{F}}_{1} $$ are $$ {F}_{1x}=10.0\\,\\text{N}$$, $$ {F}_{1y}=-20.4\\,\\text{N}$$, and $$ {F}_{1z}=2.0\\,\\text{N}$$, whereas those of force vector $$ {\\overset{\\to }{F}}_{2} $$ are $$ {F}_{2x}=-15.0\\,\\text{N}$$, $$ {F}_{2y}=0.0\\,\\text{N}$$, and $$ {F}_{2z}=-6.2\\,\\text{N}$$. Computing the scalar product of these vectors and their magnitudes, and substituting into <a class=\"autogenerated-content\" href=\"#fs-id1167134723856\">(Figure)<\/a> gives the angle of interest.\r\n<h4>Solution<\/h4>\r\n<p id=\"fs-id1167131406095\">[reveal-answer q=\"653304\"]Show Answer[\/reveal-answer]\r\n[hidden-answer a=\"653304\"]The magnitudes of forces $$ {\\overset{\\to }{F}}_{1} $$ and $$ {\\overset{\\to }{F}}_{2} $$ are<\/p>\r\n$${F}_{1}=\\sqrt{{F}_{1x}^{2}+{F}_{1y}^{2}+{F}_{1z}^{2}}=\\sqrt{{10.0}^{2}+{20.4}^{2}+{2.0}^{2}}\\,\\text{N}=22.8\\,\\text{N} $$ and\r\n\r\n$${F}_{2}=\\sqrt{{F}_{2x}^{2}+{F}_{2y}^{2}+{F}_{2z}^{2}}=\\sqrt{{15.0}^{2}+{6.2}^{2}}\\,\\text{N}=16.2\\,\\text{N}. $$ Substituting the scalar components into (Figure) yields the scalar product\r\n\r\n$$\\begin{array}{cc}\\hfill {\\overset{\\to }{F}}_{1}\u00b7{\\overset{\\to }{F}}_{2}&amp; ={F}_{1x}{F}_{2x}+{F}_{1y}{F}_{2y}+{F}_{1z}{F}_{2z}\\hfill \\\\ &amp; =(10.0\\,\\text{N})(-15.0\\,\\text{N})+(-20.4\\,\\text{N})(0.0\\,\\text{N})+(2.0\\,\\text{N})(-6.2\\,\\text{N})\\hfill \\\\ &amp; =-162.4\\,{\\text{N}}^{2}.\\hfill \\end{array} $$ Finally, substituting everything into (Figure) gives the angle\r\n\r\n$$\\text{cos}\\,\\phi =\\frac{{\\overset{\\to }{F}}_{1}\u00b7{\\overset{\\to }{F}}_{2}}{{F}_{1}{F}_{2}}=\\frac{-162.4\\,{\\text{N}}^{2}}{(22.8\\,\\text{N})(16.2\\,\\text{N})}=-0.439\u21d2\\enspace\\phi ={\\text{cos}}^{-1}(-0.439)=116.0\\text{\u00b0}.$$[\/hidden-answer]\r\n<h4>Significance<\/h4>\r\nNotice that when vectors are given in terms of the unit vectors of axes, we can find the angle between them without knowing the specifics about the geographic directions the unit vectors represent. Here, for example, the +<em>x<\/em>-direction might be to the east and the +<em>y<\/em>-direction might be to the north. But, the angle between the forces in the problem is the same if the +<em>x<\/em>-direction is to the west and the +<em>y<\/em>-direction is to the south.\r\n\r\n<\/div>\r\n<div id=\"fs-id1167131425839\" class=\"textbox exercises check-understanding\">\r\n<h3>Check Your Understanding<\/h3>\r\n<div id=\"fs-id1167131113534\" class=\"problem textbox\">\r\n<div id=\"fs-id1167131605141\">\r\n<p id=\"fs-id1167134835075\">Find the angle between forces $$ {\\overset{\\to }{F}}_{1} $$ and $$ {\\overset{\\to }{F}}_{3} $$ in <a class=\"autogenerated-content\" href=\"#fs-id1167131510883\">(Figure)<\/a>.<\/p>\r\n\r\n<\/div>\r\n<div id=\"fs-id1167131496552\" class=\"solution\">\r\n\r\n[reveal-answer q=\"fs-id1167131496552\"]Show Solution[\/reveal-answer]\r\n\r\n[hidden-answer a=\"fs-id1167131496552\"]\r\n<p id=\"fs-id1167134674656\">$$131.9\\text{\u00b0}$$<\/p>\r\n[\/hidden-answer]\r\n\r\n<\/div>\r\n<\/div>\r\n<\/div>\r\n<div id=\"fs-id1167134592890\" class=\"textbox examples\">\r\n<h3>Example<\/h3>\r\n<h4>The Work of a Force<\/h4>\r\nWhen force $$ \\overset{\\to }{F} $$ pulls on an object and when it causes its displacement $$ \\overset{\\to }{D}$$, we say the force performs work. The amount of work the force does is the scalar product $$ \\overset{\\to }{F}\u00b7\\overset{\\to }{D}$$. If the stick in <a class=\"autogenerated-content\" href=\"#fs-id1167131510883\">(Figure)<\/a> moves momentarily and gets displaced by vector $$ \\overset{\\to }{D}=(-7.9\\hat{j}-4.2\\hat{k})\\,\\text{cm}$$, how much work is done by the third dog in <a class=\"autogenerated-content\" href=\"#fs-id1167131510883\">(Figure)<\/a>?\r\n<h4>Strategy<\/h4>\r\nWe compute the scalar product of displacement vector $$ \\overset{\\to }{D} $$ with force vector $$ {\\overset{\\to }{F}}_{3}=(5.0\\hat{i}+12.5\\hat{j})\\text{N}$$, which is the pull from the third dog. Let\u2019s use $$ {W}_{3} $$ to denote the work done by force $$ {\\overset{\\to }{F}}_{3} $$ on displacement $$ \\overset{\\to }{D}$$.\r\n<h4>Solution<\/h4>\r\n<p id=\"fs-id1167130017393\">[reveal-answer q=\"560347\"]Show Answer[\/reveal-answer]\r\n[hidden-answer a=\"560347\"]Calculating the work is a straightforward application of the dot product:<\/p>\r\n$$\\begin{array}{cc}\\hfill {W}_{3}&amp; ={\\overset{\\to }{F}}_{3}\u00b7\\overset{\\to }{D}={F}_{3x}{D}_{x}+{F}_{3y}{D}_{y}+{F}_{3z}{D}_{z}\\hfill \\\\ &amp; =(5.0\\,\\text{N})(0.0\\,\\text{cm})+(12.5\\,\\text{N})(-7.9\\,\\text{cm})+(0.0\\,\\text{N})(-4.2\\,\\text{cm})\\hfill \\\\ &amp; =-98.7\\,\\text{N}\u00b7\\text{cm}.\\hfill \\end{array}$$[\/hidden-answer]\r\n<h4>Significance<\/h4>\r\nThe SI unit of work is called the joule $$ (\\text{J})$$, where 1 J = 1 $$ \\text{N}\u00b7\\text{m}$$. The unit $$ \\text{cm}\u00b7\\text{N} $$ can be written as $$ {10}^{-2}\\text{m}\u00b7\\text{N}={10}^{-2}\\text{J}$$, so the answer can be expressed as $$ {W}_{3}=-0.9875\\,\\text{J}\\approx -1.0\\,\\text{J}$$.\r\n\r\n<\/div>\r\n<div id=\"fs-id1167131341544\" class=\"textbox exercises check-understanding\">\r\n<h3>Check Your Understanding<\/h3>\r\n<div id=\"fs-id1167134863960\" class=\"problem textbox\">\r\n<div id=\"fs-id1167134940532\">\r\n<p id=\"fs-id1167131541164\">How much work is done by the first dog and by the second dog in <a class=\"autogenerated-content\" href=\"#fs-id1167131510883\">(Figure)<\/a> on the displacement in <a class=\"autogenerated-content\" href=\"#fs-id1167134592890\">(Figure)<\/a>?<\/p>\r\n\r\n<\/div>\r\n<div id=\"fs-id1167130006416\" class=\"solution\">\r\n\r\n[reveal-answer q=\"fs-id1167130006416\"]Show Solution[\/reveal-answer]\r\n\r\n[hidden-answer a=\"fs-id1167130006416\"]\r\n<p id=\"fs-id1167130157098\">$${W}_{1}=1.5\\,\\text{J}$$, $$ {W}_{2}=0.3\\,\\text{J}$$<\/p>\r\n[\/hidden-answer]\r\n\r\n<\/div>\r\n<\/div>\r\n<\/div>\r\n<\/div>\r\n<div id=\"fs-id1167131477358\" class=\"bc-section section\">\r\n<h3>The Vector Product of Two Vectors (the Cross Product)<\/h3>\r\n<p id=\"fs-id1167129966341\">Vector multiplication of two vectors yields a vector product.<\/p>\r\n\r\n<div id=\"fs-id1167131503527\">\r\n<h4>Vector Product (Cross Product)<\/h4>\r\n<p id=\"fs-id1167131078780\">The <strong>vector product<\/strong> of two vectors $$ \\overset{\\to }{A} $$ and $$ \\overset{\\to }{B} $$ is denoted by $$ \\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B} $$ and is often referred to as a <strong>cross product<\/strong>. The vector product is a vector that has its direction perpendicular to both vectors $$ \\overset{\\to }{A} $$ and $$ \\overset{\\to }{B}$$. In other words, vector $$ \\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B} $$ is perpendicular to the plane that contains vectors $$ \\overset{\\to }{A} $$ and $$ \\overset{\\to }{B}$$, as shown in <a class=\"autogenerated-content\" href=\"#CNX_UPhysics_02_04_prod-V\">(Figure)<\/a>. The magnitude of the vector product is defined as<\/p>\r\n\r\n<div id=\"fs-id1167131455204\">$$|\\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B}|=\\,AB\\,\\text{sin}\\,\\phi ,$$<\/div>\r\n<p id=\"fs-id1167131392214\">where angle $$ \\phi $$, between the two vectors, is measured from vector $$ \\overset{\\to }{A} $$ (first vector in the product) to vector $$ \\overset{\\to }{B} $$ (second vector in the product), as indicated in <a class=\"autogenerated-content\" href=\"#CNX_UPhysics_02_04_prod-V\">(Figure)<\/a>, and is between $$ 0\\text{\u00b0} $$ and $$ 180\\text{\u00b0}$$.<\/p>\r\n\r\n<\/div>\r\n<p id=\"fs-id1167131267151\">According to <a class=\"autogenerated-content\" href=\"#fs-id1167131455204\">(Figure)<\/a>, the vector product vanishes for pairs of vectors that are either parallel $$ (\\phi =0\\text{\u00b0}) $$ or antiparallel $$ (\\phi =180\\text{\u00b0}) $$ because $$ \\text{sin}\\,0\\text{\u00b0}=\\text{sin}\\,180\\text{\u00b0}=0$$.<\/p>\r\n\r\n<div id=\"CNX_UPhysics_02_04_prod-V\" class=\"wp-caption aligncenter\">[caption id=\"\" align=\"aligncenter\" width=\"552\"]<img src=\"https:\/\/s3-us-west-2.amazonaws.com\/courses-images\/wp-content\/uploads\/sites\/2952\/2018\/01\/31184038\/CNX_UPhysics_02_04_prod-V.jpg\" alt=\"Vector A points out and to the left, and vector B points out and to the right. The angle between them is phi. In figure a we are shown vector C which is the cross product of A cross B. Vector C points up and is perpendicular to both A and B. In figure b we are shown vector minus C which is the cross product of B cross A. Vector minus C points down and is perpendicular to both A and B.\" width=\"552\" height=\"381\" \/> <strong>Figure 2.29<\/strong> The vector product of two vectors is drawn in three-dimensional space. (a) The vector product $$ \\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B} $$ is a vector perpendicular to the plane that contains vectors $$ \\overset{\\to }{A} $$ and $$ \\overset{\\to }{B}$$. Small squares drawn in perspective mark right angles between $$ \\overset{\\to }{A} $$ and $$ \\overset{\\to }{C}$$, and between $$ \\overset{\\to }{B} $$ and $$ \\overset{\\to }{C} $$ so that if $$ \\overset{\\to }{A} $$ and $$ \\overset{\\to }{B} $$ lie on the floor, vector $$ \\overset{\\to }{C} $$ points vertically upward to the ceiling. (b) The vector product $$ \\overset{\\to }{B}\\,\u00d7\\,\\overset{\\to }{A} $$ is a vector antiparallel to vector $$ \\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B}$$.[\/caption]<\/div>\r\n<p id=\"fs-id1167134723544\">On the line perpendicular to the plane that contains vectors $$ \\overset{\\to }{A} $$ and $$ \\overset{\\to }{B} $$ there are two alternative directions\u2014either up or down, as shown in <a class=\"autogenerated-content\" href=\"#CNX_UPhysics_02_04_prod-V\">(Figure)<\/a>\u2014and the direction of the vector product may be either one of them. In the standard right-handed orientation, where the angle between vectors is measured counterclockwise from the first vector, vector $$ \\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B} $$ points <em>upward<\/em>, as seen in <a class=\"autogenerated-content\" href=\"#CNX_UPhysics_02_04_prod-V\">(Figure)<\/a>(a). If we reverse the order of multiplication, so that now $$ \\overset{\\to }{B} $$ comes first in the product, then vector $$ \\overset{\\to }{B}\\,\u00d7\\,\\overset{\\to }{A} $$ must point <em>downward<\/em>, as seen in <a class=\"autogenerated-content\" href=\"#CNX_UPhysics_02_04_prod-V\">(Figure)<\/a>(b). This means that vectors $$ \\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B} $$ and $$ \\overset{\\to }{B}\\,\u00d7\\,\\overset{\\to }{A} $$ are <em>antiparallel<\/em> to each other and that vector multiplication is <em>not<\/em> commutative but <em>anticommutative<\/em>. The <strong>anticommutative property<\/strong> means the vector product reverses the sign when the order of multiplication is reversed:<\/p>\r\n\r\n<div id=\"fs-id1167131635409\" class=\"equation-callout\">\r\n<div id=\"fs-id1167130202099\">$$\\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B}=\\text{\u2212}\\overset{\\to }{B}\\,\u00d7\\,\\overset{\\to }{A}.$$<\/div>\r\n<\/div>\r\n<p id=\"fs-id1167134991977\">The <strong>corkscrew right-hand<\/strong> <strong>rule<\/strong> is a common mnemonic used to determine the direction of the vector product. As shown in <a class=\"autogenerated-content\" href=\"#CNX_UPhysics_02_04_corkscrew\">(Figure)<\/a>, a corkscrew is placed in a direction perpendicular to the plane that contains vectors $$ \\overset{\\to }{A} $$ and $$ \\overset{\\to }{B}$$, and its handle is turned in the direction from the first to the second vector in the product. The direction of the cross product is given by the progression of the corkscrew.<\/p>\r\n\r\n<div id=\"CNX_UPhysics_02_04_corkscrew\" class=\"wp-caption aligncenter\">[caption id=\"\" align=\"aligncenter\" width=\"548\"]<img src=\"https:\/\/s3-us-west-2.amazonaws.com\/courses-images\/wp-content\/uploads\/sites\/2952\/2018\/01\/31184041\/CNX_UPhysics_02_04_corkscrew.jpg\" alt=\"Vector A points out and to the left, and vector B points out and to the right. In figure a we are shown the cross product of A cross B pointing up, perpendicular to both A and B. A screw turning an angle phi from A to B would move up. In figure b we are shown the cross product of B cross A pointing down, perpendicular to both A and B. A screw turning an angle phi from B to A would move down.\" width=\"548\" height=\"374\" \/> <strong>Figure 2.30<\/strong> The corkscrew right-hand rule can be used to determine the direction of the cross product $$ \\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B}$$. Place a corkscrew in the direction perpendicular to the plane that contains vectors $$ \\overset{\\to }{A} $$ and $$ \\overset{\\to }{B}$$, and turn it in the direction from the first to the second vector in the product. The direction of the cross product is given by the progression of the corkscrew. (a) Upward movement means the cross-product vector points up. (b) Downward movement means the cross-product vector points downward.[\/caption]<\/div>\r\n<div id=\"fs-id1167131452799\" class=\"textbox examples\">\r\n<h3>Example<\/h3>\r\n<h4 id=\"fs-id1167134435037\"><strong>The Torque of a Force<\/strong><\/h4>\r\nThe mechanical advantage that a familiar tool called a <em>wrench<\/em> provides (<a class=\"autogenerated-content\" href=\"#CNX_UPhysics_02_04_wrench\">(Figure)<\/a>) depends on magnitude <em>F<\/em> of the applied force, on its direction with respect to the wrench handle, and on how far from the nut this force is applied. The distance <em>R<\/em> from the nut to the point where force vector $$ \\overset{\\to }{F} $$ is attached and is represented by the radial vector $$ \\overset{\\to }{R}$$. The physical vector quantity that makes the nut turn is called <em>torque<\/em> (denoted by $$ \\overset{\\to }{\\tau })$$, and it is the vector product of the distance between the pivot to force with the force: $$ \\overset{\\to }{\\tau }=\\overset{\\to }{R}\\,\u00d7\\,\\overset{\\to }{F}$$.\r\n<p id=\"fs-id1167131550119\">To loosen a rusty nut, a 20.00-N force is applied to the wrench handle at angle $$ \\phi =40\\text{\u00b0} $$ and at a distance of 0.25 m from the nut, as shown in <a class=\"autogenerated-content\" href=\"#CNX_UPhysics_02_04_wrench\">(Figure)<\/a>(a). Find the magnitude and direction of the torque applied to the nut. What would the magnitude and direction of the torque be if the force were applied at angle $$ \\phi =45\\text{\u00b0}$$, as shown in <a class=\"autogenerated-content\" href=\"#CNX_UPhysics_02_04_wrench\">(Figure)<\/a>(b)? For what value of angle $$ \\phi  $$ does the torque have the largest magnitude?<\/p>\r\n\r\n<div id=\"CNX_UPhysics_02_04_wrench\" class=\"wp-caption aligncenter\">\r\n\r\n[caption id=\"\" align=\"aligncenter\" width=\"878\"]<img src=\"https:\/\/s3-us-west-2.amazonaws.com\/courses-images\/wp-content\/uploads\/sites\/2952\/2018\/01\/31184044\/CNX_UPhysics_02_04_wrench.jpg\" alt=\"Figure a: a wrench grips a nut. A force F is applied to the wrench at a distance R from the center of the nut. The vector R is the vector from the center of the nut to the location where the force is being applied. The force direction is at an angle phi, measured counterclockwise from the direction of the vector R. Figure b: a wrench grips a nut. A force F is applied to the wrench at a distance R from the center of the nut. The vector R is the vector from the center of the nut to the location where the force is being applied. The force direction is at an angle phi, measured clockwise from the direction of the vector R.\" width=\"878\" height=\"482\" \/> <strong>Figure 2.31<\/strong> A wrench provides grip and mechanical advantage in applying torque to turn a nut. (a) Turn counterclockwise to loosen the nut. (b) Turn clockwise to tighten the nut.[\/caption]\r\n\r\n<\/div>\r\n<h4>Strategy<\/h4>\r\nWe adopt the frame of reference shown in <a class=\"autogenerated-content\" href=\"#CNX_UPhysics_02_04_wrench\">(Figure)<\/a>, where vectors $$ \\overset{\\to }{R} $$ and $$ \\overset{\\to }{F} $$ lie in the <em>xy<\/em>-plane and the origin is at the position of the nut. The radial direction along vector $$ \\overset{\\to }{R} $$ (pointing away from the origin) is the reference direction for measuring the angle $$ \\phi  $$ because $$ \\overset{\\to }{R} $$ is the first vector in the vector product $$ \\overset{\\to }{\\tau }=\\overset{\\to }{R}\\,\u00d7\\,\\overset{\\to }{F}$$. Vector $$ \\overset{\\to }{\\tau } $$ must lie along the <em>z<\/em>-axis because this is the axis that is perpendicular to the <em>xy<\/em>-plane, where both $$ \\overset{\\to }{R} $$ and $$ \\overset{\\to }{F} $$ lie. To compute the magnitude $$ \\tau $$, we use <a class=\"autogenerated-content\" href=\"#fs-id1167131455204\">(Figure)<\/a>. To find the direction of $$ \\overset{\\to }{\\tau }$$, we use the corkscrew right-hand rule (<a class=\"autogenerated-content\" href=\"#CNX_UPhysics_02_04_corkscrew\">(Figure)<\/a>).\r\n<h4>Solution<\/h4>\r\n<p id=\"fs-id1167134664986\">[reveal-answer q=\"915163\"]Show Answer[\/reveal-answer]\r\n[hidden-answer a=\"915163\"]For the situation in (a), the corkscrew rule gives the direction of $$ \\overset{\\to }{R}\\,\u00d7\\,\\overset{\\to }{F} $$ in the positive direction of the z-axis. Physically, it means the torque vector $$ \\overset{\\to }{\\tau } $$ points out of the page, perpendicular to the wrench handle. We identify F = 20.00 N and R = 0.25 m, and compute the magnitude using (Figure):<\/p>\r\n$$\\tau \\,=|\\overset{\\to }{R}\\,\u00d7\\,\\overset{\\to }{F}|=\\,RF\\,\\text{sin}\\,\\phi =(0.25\\,\\text{m})(20.00\\,\\text{N})\\,\\text{sin}\\,40\\text{\u00b0}=3.21\\,\\text{N}\u00b7\\text{m}. $$ For the situation in (b), the corkscrew rule gives the direction of $$ \\overset{\\to }{R}\\,\u00d7\\,\\overset{\\to }{F} $$ in the negative direction of the z-axis. Physically, it means the vector $$ \\overset{\\to }{\\tau } $$ points into the page, perpendicular to the wrench handle. The magnitude of this torque is\r\n\r\n$$\\tau \\,=|\\overset{\\to }{R}\\,\u00d7\\,\\overset{\\to }{F}|=\\,RF\\,\\text{sin}\\,\\phi =(0.25\\,\\text{m})(20.00\\,\\text{N})\\,\\text{sin}\\,45\\text{\u00b0}=3.53\\,\\text{N}\u00b7\\text{m}. $$ The torque has the largest value when $$ \\text{sin}\\,\\phi =1$$, which happens when $$ \\phi =90\\text{\u00b0}$$. Physically, it means the wrench is most effective\u2014giving us the best mechanical advantage\u2014when we apply the force perpendicular to the wrench handle. For the situation in this example, this best-torque value is $$ {\\tau }_{\\text{best}}=RF=(0.25\\,\\text{m})(20.00\\,\\text{N})=5.00\\,\\text{N}\u00b7\\text{m}$$.[\/hidden-answer]\r\n<h4>Significance<\/h4>\r\nWhen solving mechanics problems, we often do not need to use the corkscrew rule at all, as we\u2019ll see now in the following equivalent solution. Notice that once we have identified that vector $$ \\overset{\\to }{R}\\,\u00d7\\,\\overset{\\to }{F} $$ lies along the <em>z<\/em>-axis, we can write this vector in terms of the unit vector $$ \\hat{k} $$ of the <em>z<\/em>-axis:\r\n<div id=\"fs-id1167134633324\" class=\"unnumbered\">$$\\overset{\\to }{R}\\,\u00d7\\,\\overset{\\to }{F}=RF\\,\\text{sin}\\,\\phi \\hat{k}.$$<\/div>\r\n<p id=\"fs-id1167134966050\">In this equation, the number that multiplies $$ \\hat{k} $$ is the scalar <em>z<\/em>-component of the vector $$ \\overset{\\to }{R}\\,\u00d7\\,\\overset{\\to }{F}$$. In the computation of this component, care must be taken that the angle $$ \\phi  $$ is measured <em>counterclockwise<\/em> from $$ \\overset{\\to }{R} $$ (first vector) to $$ \\overset{\\to }{F} $$ (second vector). Following this principle for the angles, we obtain $$ RF\\,\\text{sin}\\,(+40\\text{\u00b0})=+3.2\\,\\text{N}\u00b7\\text{m} $$ for the situation in (a), and we obtain $$ RF\\,\\text{sin}\\,(-45\\text{\u00b0})=-3.5\\,\\text{N}\u00b7\\text{m} $$ for the situation in (b). In the latter case, the angle is negative because the graph in <a class=\"autogenerated-content\" href=\"#CNX_UPhysics_02_04_wrench\">(Figure)<\/a> indicates the angle is measured clockwise; but, the same result is obtained when this angle is measured counterclockwise because $$ +(360\\text{\u00b0}-45\\text{\u00b0})=+315\\text{\u00b0} $$ and $$ \\text{sin}\\,(+315\\text{\u00b0})=\\text{sin}\\,(-45\\text{\u00b0})$$. In this way, we obtain the solution without reference to the corkscrew rule. For the situation in (a), the solution is $$ \\overset{\\to }{R}\\,\u00d7\\,\\overset{\\to }{F}=+3.2\\,\\text{N}\u00b7\\text{m}\\hat{k}$$; for the situation in (b), the solution is $$ \\overset{\\to }{R}\\,\u00d7\\,\\overset{\\to }{F}=-3.5\\,\\text{N}\u00b7\\text{m}\\hat{k}$$.<\/p>\r\n\r\n<\/div>\r\n<div id=\"fs-id1167131119324\" class=\"textbox exercises check-understanding\">\r\n<h3>Check Your Understanding<\/h3>\r\n<div id=\"fs-id1167131331227\" class=\"problem textbox\">\r\n<div id=\"fs-id1167131553044\">\r\n<p id=\"fs-id1167131553046\">For the vectors given in <a class=\"autogenerated-content\" href=\"\/contents\/7df36d4f-6930-46a0-a6a0-61eb183b9e97#CNX_UPhysics_02_01_vector07\">(Figure)<\/a>, find the vector products $$ \\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B} $$ and $$ \\overset{\\to }{C}\\,\u00d7\\,\\overset{\\to }{F}$$.<\/p>\r\n\r\n<\/div>\r\n<div id=\"fs-id1167131635182\" class=\"solution\">\r\n\r\n[reveal-answer q=\"fs-id1167131635182\"]Show Solution[\/reveal-answer]\r\n\r\n[hidden-answer a=\"fs-id1167131635182\"]\r\n<p id=\"fs-id1167131609127\">$$\\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B}=-40.1\\hat{k} $$ or, equivalently, $$ |\\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B}|=40.1$$, and the direction is into the page; $$ \\overset{\\to }{C}\\,\u00d7\\,\\overset{\\to }{F}=+157.6\\hat{k} $$ or, equivalently, $$ |\\overset{\\to }{C}\\,\u00d7\\,\\overset{\\to }{F}|=157.6$$, and the direction is out of the page.<\/p>\r\n[\/hidden-answer]\r\n\r\n<\/div>\r\n<\/div>\r\n<\/div>\r\n<p id=\"fs-id1167131113511\">Similar to the dot product (<a class=\"autogenerated-content\" href=\"#fs-id1167134952226\">(Figure)<\/a>), the cross product has the following distributive property:<\/p>\r\n\r\n<div id=\"fs-id1167134886923\" class=\"equation-callout\">\r\n<div id=\"fs-id1167134990693\">$$\\overset{\\to }{A}\\,\u00d7\\,(\\overset{\\to }{B}+\\overset{\\to }{C})=\\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B}+\\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{C}.$$<\/div>\r\n<\/div>\r\n<p id=\"fs-id1167130034626\">The distributive property is applied frequently when vectors are expressed in their component forms, in terms of unit vectors of Cartesian axes.<\/p>\r\n<p id=\"fs-id1167131111221\">When we apply the definition of the cross product, <a class=\"autogenerated-content\" href=\"#fs-id1167131455204\">(Figure)<\/a>, to unit vectors $$ \\hat{i}$$, $$ \\hat{j}$$, and $$ \\hat{k} $$ that define the positive <em>x<\/em>-, <em>y<\/em>-, and <em>z<\/em>-directions in space, we find that<\/p>\r\n\r\n<div id=\"fs-id1167131180024\">$$\\hat{i}\\,\u00d7\\,\\hat{i}=\\hat{j}\\,\u00d7\\,\\hat{j}=\\hat{k}\\,\u00d7\\,\\hat{k}=0.$$<\/div>\r\n<p id=\"fs-id1167131315889\">All other cross products of these three unit vectors must be vectors of unit magnitudes because $$ \\hat{i}$$, $$ \\hat{j}$$, and $$ \\hat{k} $$ are orthogonal. For example, for the pair $$ \\hat{i} $$ and $$ \\hat{j}$$, the magnitude is $$ |\\hat{i}\\,\u00d7\\,\\hat{j}|=ij\\,\\text{sin}\\,90\\text{\u00b0}=(1)(1)(1)=1$$. The direction of the vector product $$ \\hat{i}\\,\u00d7\\,\\hat{j} $$ must be orthogonal to the <em>xy<\/em>-plane, which means it must be along the <em>z<\/em>-axis. The only unit vectors along the <em>z<\/em>-axis are $$ \\text{\u2212}\\hat{k} $$ or $$ +\\hat{k}$$. By the corkscrew rule, the direction of vector $$ \\hat{i}\\,\u00d7\\,\\hat{j} $$ must be parallel to the positive <em>z<\/em>-axis. Therefore, the result of the multiplication $$ \\hat{i}\\,\u00d7\\,\\hat{j} $$ is identical to $$ +\\hat{k}$$. We can repeat similar reasoning for the remaining pairs of unit vectors. The results of these multiplications are<\/p>\r\n\r\n<div id=\"fs-id1167131615664\" class=\"equation-callout\">\r\n<div id=\"fs-id1167131615668\">$$\\{\\begin{array}{l}\\hat{i}\\,\u00d7\\,\\hat{j}=+\\hat{k},\\\\ \\hat{j}\\,\u00d7\\,\\hat{k}=+\\hat{i},\\\\ \\hat{k}\\,\u00d7\\,\\hat{i}=+\\hat{j}.\\end{array}$$<\/div>\r\n<\/div>\r\n<p id=\"fs-id1167131394505\">Notice that in <a class=\"autogenerated-content\" href=\"#fs-id1167131615668\">(Figure)<\/a>, the three unit vectors $$ \\hat{i}$$, $$ \\hat{j}$$, and $$ \\hat{k} $$ appear in the <em>cyclic order<\/em> shown in a diagram in <a class=\"autogenerated-content\" href=\"#CNX_UPhysics_02_04_uniprod\">(Figure)<\/a>(a). The cyclic order means that in the product formula, $$ \\hat{i} $$ follows $$ \\hat{k} $$ and comes before $$ \\hat{j}$$, or $$ \\hat{k} $$ follows $$ \\hat{j} $$ and comes before $$ \\hat{i}$$, or $$ \\hat{j} $$ follows $$ \\hat{i} $$ and comes before $$ \\hat{k}$$. The cross product of two different unit vectors is always a third unit vector. When two unit vectors in the cross product appear in the cyclic order, the result of such a multiplication is the remaining unit vector, as illustrated in <a class=\"autogenerated-content\" href=\"#CNX_UPhysics_02_04_uniprod\">(Figure)<\/a>(b). When unit vectors in the cross product appear in a different order, the result is a unit vector that is antiparallel to the remaining unit vector (i.e., the result is with the minus sign, as shown by the examples in <a class=\"autogenerated-content\" href=\"#CNX_UPhysics_02_04_uniprod\">(Figure)<\/a>(c) and <a class=\"autogenerated-content\" href=\"#CNX_UPhysics_02_04_uniprod\">(Figure)<\/a>(d). In practice, when the task is to find cross products of vectors that are given in vector component form, this rule for the cross-multiplication of unit vectors is very useful.<\/p>\r\n\r\n<div id=\"CNX_UPhysics_02_04_uniprod\" class=\"wp-caption aligncenter\">\r\n\r\n[caption id=\"\" align=\"aligncenter\" width=\"596\"]<img src=\"https:\/\/s3-us-west-2.amazonaws.com\/courses-images\/wp-content\/uploads\/sites\/2952\/2018\/01\/31184048\/CNX_UPhysics_02_04_uniprod.jpg\" alt=\"Figure a: The unit vectors, I hat, j hat and k hat of the x y z coordinate system are shown. Arrows indicate the sequence from I hat to j hat to k hat and back to I hat. Figure b: The unit vectors, I hat, j hat and k hat of the x y z coordinate system are shown. I hat equals j hat cross k hat. j hat equals k hat cross i hat. k hat equals i hat cross j hat. Figure c: The unit vectors, I hat and j hat are shown along with minus k hat pointing down. Minus k hat equals j hat cross i hat. Figure d: The unit vectors, I hat and k hat are shown along with minus j hat pointing to the left. Minus j hat equals i hat cross k hat.\" width=\"596\" height=\"566\" \/> <strong>Figure 2.32<\/strong> (a) The diagram of the cyclic order of the unit vectors of the axes. (b) The only cross products where the unit vectors appear in the cyclic order. These products have the positive sign. (c, d) Two examples of cross products where the unit vectors do not appear in the cyclic order. These products have the negative sign.[\/caption]\r\n\r\n<\/div>\r\n<p id=\"fs-id1167131362435\">Suppose we want to find the cross product $$ \\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B} $$ for vectors $$ \\overset{\\to }{A}={A}_{x}\\hat{i}+{A}_{y}\\hat{j}+{A}_{z}\\hat{k} $$ and $$ \\overset{\\to }{B}={B}_{x}\\hat{i}+{B}_{y}\\hat{j}+{B}_{z}\\hat{k}$$. We can use the distributive property (<a class=\"autogenerated-content\" href=\"#fs-id1167134990693\">(Figure)<\/a>), the anticommutative property (<a class=\"autogenerated-content\" href=\"#fs-id1167130202099\">(Figure)<\/a>), and the results in <a class=\"autogenerated-content\" href=\"#fs-id1167131180024\">(Figure)<\/a> and <a class=\"autogenerated-content\" href=\"#fs-id1167131615668\">(Figure)<\/a> for unit vectors to perform the following algebra:<\/p>\r\n\r\n<div id=\"fs-id1167131281752\" class=\"unnumbered\">$$\\begin{array}{ccc}\\hfill \\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B}&amp; =\\hfill &amp; ({A}_{x}\\hat{i}+{A}_{y}\\hat{j}+{A}_{z}\\hat{k})\\,\u00d7\\,({B}_{x}\\hat{i}+{B}_{y}\\hat{j}+{B}_{z}\\hat{k})\\hfill \\\\ &amp; =\\hfill &amp; {A}_{x}\\hat{i}\\,\u00d7\\,({B}_{x}\\hat{i}+{B}_{y}\\hat{j}+{B}_{z}\\hat{k})+{A}_{y}\\hat{j}\\,\u00d7\\,({B}_{x}\\hat{i}+{B}_{y}\\hat{j}+{B}_{z}\\hat{k})+{A}_{z}\\hat{k}\\,\u00d7\\,({B}_{x}\\hat{i}+{B}_{y}\\hat{j}+{B}_{z}\\hat{k})\\hfill \\\\ &amp; =\\hfill &amp; \\enspace{A}_{x}{B}_{x}\\hat{i}\\,\u00d7\\,\\hat{i}+{A}_{x}{B}_{y}\\hat{i}\\,\u00d7\\,\\hat{j}+{A}_{x}{B}_{z}\\hat{i}\\,\u00d7\\,\\hat{k}\\hfill \\\\ &amp; &amp; +{A}_{y}{B}_{x}\\hat{j}\\,\u00d7\\,\\hat{i}+{A}_{y}{B}_{y}\\hat{j}\\,\u00d7\\,\\hat{j}+{A}_{y}{B}_{z}\\hat{j}\\,\u00d7\\,\\hat{k}\\hfill \\\\ &amp; &amp; +{A}_{z}{B}_{x}\\hat{k}\\,\u00d7\\,\\hat{i}+{A}_{z}{B}_{y}\\hat{k}\\,\u00d7\\,\\hat{j}+{A}_{z}{B}_{z}\\hat{k}\\,\u00d7\\,\\hat{k}\\hfill \\\\ &amp; =\\hfill &amp; \\enspace{A}_{x}{B}_{x}(0)+{A}_{x}{B}_{y}(+\\hat{k})+{A}_{x}{B}_{z}(\\text{\u2212}\\hat{j})\\hfill \\\\ &amp; &amp; +{A}_{y}{B}_{x}(\\text{\u2212}\\hat{k})+{A}_{y}{B}_{y}(0)+{A}_{y}{B}_{z}(+\\hat{i})\\hfill \\\\ &amp; &amp; +{A}_{z}{B}_{x}(+\\hat{j})+{A}_{z}{B}_{y}(\\text{\u2212}\\hat{i})+{A}_{z}{B}_{z}(0).\\hfill \\end{array}$$<\/div>\r\n<p id=\"fs-id1167131405683\">When performing algebraic operations involving the cross product, be very careful about keeping the correct order of multiplication because the cross product is anticommutative. The last two steps that we still have to do to complete our task are, first, grouping the terms that contain a common unit vector and, second, factoring. In this way we obtain the following very useful expression for the computation of the cross product:<\/p>\r\n\r\n<div id=\"fs-id1167131238835\" class=\"equation-callout\">\r\n<div id=\"fs-id1167131238839\">$$\\overset{\\to }{C}=\\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B}=({A}_{y}{B}_{z}-{A}_{z}{B}_{y})\\hat{i}+({A}_{z}{B}_{x}-{A}_{x}{B}_{z})\\hat{j}+({A}_{x}{B}_{y}-{A}_{y}{B}_{x})\\hat{k}.$$<\/div>\r\n<\/div>\r\n<p id=\"fs-id1167130057299\">In this expression, the scalar components of the cross-product vector are<\/p>\r\n\r\n<div id=\"fs-id1167131237590\">$$\\{\\begin{array}{c}{C}_{x}={A}_{y}{B}_{z}-{A}_{z}{B}_{y},\\\\ {C}_{y}={A}_{z}{B}_{x}-{A}_{x}{B}_{z},\\\\ {C}_{z}={A}_{x}{B}_{y}-{A}_{y}{B}_{x}.\\end{array}$$<\/div>\r\n<p id=\"fs-id1167131272392\">When finding the cross product, in practice, we can use either <a class=\"autogenerated-content\" href=\"#fs-id1167131455204\">(Figure)<\/a> or <a class=\"autogenerated-content\" href=\"#fs-id1167131238839\">(Figure)<\/a>, depending on which one of them seems to be less complex computationally. They both lead to the same final result. One way to make sure if the final result is correct is to use them both.<\/p>\r\n\r\n<div id=\"fs-id1167130051007\" class=\"textbox examples\">\r\n<h3>Example<\/h3>\r\n<h4>A Particle in a Magnetic Field<\/h4>\r\nWhen moving in a magnetic field, some particles may experience a magnetic force. Without going into details\u2014a detailed study of magnetic phenomena comes in later chapters\u2014let\u2019s acknowledge that the magnetic field $$ \\overset{\\to }{B} $$ is a vector, the magnetic force $$ \\overset{\\to }{F} $$ is a vector, and the velocity $$ \\overset{\\to }{u} $$ of the particle is a vector. The magnetic force vector is proportional to the vector product of the velocity vector with the magnetic field vector, which we express as $$ \\overset{\\to }{F}=\\zeta \\overset{\\to }{u}\\,\u00d7\\,\\overset{\\to }{B}$$. In this equation, a constant $$ \\zeta  $$ takes care of the consistency in physical units, so we can omit physical units on vectors $$ \\overset{\\to }{u} $$ and $$ \\overset{\\to }{B}$$. In this example, let\u2019s assume the constant $$ \\zeta  $$ is positive.\r\n<p id=\"fs-id1167134632269\">A particle moving in space with velocity vector $$ \\overset{\\to }{u}=-5.0\\hat{i}-2.0\\hat{j}+3.5\\hat{k} $$ enters a region with a magnetic field and experiences a magnetic force. Find the magnetic force $$ \\overset{\\to }{F} $$ on this particle at the entry point to the region where the magnetic field vector is (a) $$ \\overset{\\to }{B}=7.2\\hat{i}-\\hat{j}-2.4\\hat{k} $$ and (b) $$ \\overset{\\to }{B}=4.5\\hat{k}$$. In each case, find magnitude <em>F<\/em> of the magnetic force and angle $$ \\theta  $$ the force vector $$ \\overset{\\to }{F} $$ makes with the given magnetic field vector $$ \\overset{\\to }{B}$$.<\/p>\r\n\r\n<h4>Strategy<\/h4>\r\nFirst, we want to find the vector product $$ \\overset{\\to }{u}\\,\u00d7\\,\\overset{\\to }{B}$$, because then we can determine the magnetic force using $$ \\overset{\\to }{F}=\\zeta \\overset{\\to }{u}\\,\u00d7\\,\\overset{\\to }{B}$$. Magnitude <em>F<\/em> can be found either by using components, $$ F=\\sqrt{{F}_{x}^{2}+{F}_{y}^{2}+{F}_{z}^{2}}$$, or by computing the magnitude $$ |\\overset{\\to }{u}\\,\u00d7\\,\\overset{\\to }{B}| $$ directly using <a class=\"autogenerated-content\" href=\"#fs-id1167131455204\">(Figure)<\/a>. In the latter approach, we would have to find the angle between vectors $$ \\overset{\\to }{u} $$ and $$ \\overset{\\to }{B}$$. When we have $$ \\overset{\\to }{F}$$, the general method for finding the direction angle $$ \\theta  $$ involves the computation of the scalar product $$ \\overset{\\to }{F}\u00b7\\overset{\\to }{B} $$ and substitution into <a class=\"autogenerated-content\" href=\"#fs-id1167134723856\">(Figure)<\/a>. To compute the vector product we can either use <a class=\"autogenerated-content\" href=\"#fs-id1167131238839\">(Figure)<\/a> or compute the product directly, whichever way is simpler.\r\n<h4>Solution<\/h4>\r\n<p id=\"fs-id1167131541788\">[reveal-answer q=\"230259\"]Show Answer[\/reveal-answer]\r\n[hidden-answer a=\"230259\"]The components of the velocity vector are $$ {u}_{x}=-5.0$$, $$ {u}_{y}=-2.0$$, and $$ {u}_{z}=3.5$$.<\/p>\r\n(a) The components of the magnetic field vector are $$ {B}_{x}=7.2$$, $$ {B}_{y}=-1.0$$, and $$ {B}_{z}=-2.4$$. Substituting them into (Figure) gives the scalar components of vector $$ \\overset{\\to }{F}=\\zeta \\overset{\\to }{u}\\,\u00d7\\,\\overset{\\to }{B}$$:\r\n\r\n$$\\{\\begin{array}{l}{F}_{x}=\\zeta ({u}_{y}{B}_{z}-{u}_{z}{B}_{y})=\\zeta [(-2.0)(-2.4)-(3.5)(-1.0)]=8.3\\zeta \\\\ {F}_{y}=\\zeta ({u}_{z}{B}_{x}-{u}_{x}{B}_{z})=\\zeta [(3.5)(7.2)-(-5.0)(-2.4)]=13.2\\zeta \\\\ {F}_{z}=\\zeta ({u}_{x}{B}_{y}-{u}_{y}{B}_{x})=\\zeta [(-5.0)(-1.0)-(-2.0)(7.2)]=19.4\\zeta \\end{array}.$$\r\n\r\nThus, the magnetic force is $$ \\overset{\\to }{F}=\\zeta (8.3\\hat{i}+13.2\\hat{j}+19.4\\hat{k}) $$ and its magnitude is\r\n\r\n$$F=\\sqrt{{F}_{x}^{2}+{F}_{y}^{2}+{F}_{z}^{2}}=\\zeta \\sqrt{{(8.3)}^{2}+{(13.2)}^{2}+{(19.4)}^{2}}=24.9\\zeta . $$ To compute angle $$ \\theta $$, we may need to find the magnitude of the magnetic field vector,\r\n\r\n$$B=\\sqrt{{B}_{x}^{2}+{B}_{y}^{2}+{B}_{z}^{2}}=\\sqrt{{(7.2)}^{2}+{(-1.0)}^{2}+{(-2.4)}^{2}}=7.6, $$ and the scalar product $$ \\overset{\\to }{F}\u00b7\\overset{\\to }{B}$$:\r\n\r\n$$\\overset{\\to }{F}\u00b7\\overset{\\to }{B}={F}_{x}{B}_{x}+{F}_{y}{B}_{y}+{F}_{z}{B}_{z}=(8.3\\zeta )(7.2)+(13.2\\zeta )(-1.0)+(19.4\\zeta )(-2.4)=0. $$ Now, substituting into (Figure) gives angle $$ \\theta $$:\r\n\r\n$$\\text{cos}\\,\\theta =\\frac{\\overset{\\to }{F}\u00b7\\overset{\\to }{B}}{FB}=\\frac{0}{(18.2\\zeta )(7.6)}=0\\,\u21d2\\enspace\\theta =90\\text{\u00b0}.$$\r\n\r\nHence, the magnetic force vector is perpendicular to the magnetic field vector. (We could have saved some time if we had computed the scalar product earlier.)\r\n\r\n(b) Because vector $$ \\overset{\\to }{B}=4.5\\hat{k} $$ has only one component, we can perform the algebra quickly and find the vector product directly:\r\n\r\n$$\\begin{array}{ll}\\hfill \\overset{\\to }{F}&amp; =\\zeta \\overset{\\to }{u}\\,\u00d7\\,\\overset{\\to }{B}=\\zeta (-5.0\\hat{i}-2.0\\hat{j}+3.5\\hat{k})\\,\u00d7\\,(4.5\\hat{k})\\hfill \\\\ &amp; =\\zeta [(-5.0)(4.5)\\hat{i}\\,\u00d7\\,\\hat{k}+(-2.0)(4.5)\\hat{j}\\,\u00d7\\,\\hat{k}+(3.5)(4.5)\\hat{k}\\,\u00d7\\,\\hat{k}]\\hfill \\\\ &amp; =\\zeta [-22.5(\\text{\u2212}\\hat{j})-9.0(+\\hat{i})+0]=\\zeta (-9.0\\hat{i}+22.5\\hat{j}).\\hfill \\end{array} $$ The magnitude of the magnetic force is\r\n\r\n$$F=\\sqrt{{F}_{x}^{2}+{F}_{y}^{2}+{F}_{z}^{2}}=\\zeta \\sqrt{{(-9.0)}^{2}+{(22.5)}^{2}+{(0.0)}^{2}}=24.2\\zeta . $$ Because the scalar product is\r\n\r\n$$\\overset{\\to }{F}\u00b7\\overset{\\to }{B}={F}_{x}{B}_{x}+{F}_{y}{B}_{y}+{F}_{z}{B}_{z}=(-9.0\\zeta )(0)+(22.5\\zeta )(0)+(0)(4.5)=0, $$ the magnetic force vector $$ \\overset{\\to }{F} $$ is perpendicular to the magnetic field vector $$ \\overset{\\to }{B}$$.[\/hidden-answer]\r\n<h4>Significance<\/h4>\r\nEven without actually computing the scalar product, we can predict that the magnetic force vector must always be perpendicular to the magnetic field vector because of the way this vector is constructed. Namely, the magnetic force vector is the vector product $$ \\overset{\\to }{F}=\\zeta \\overset{\\to }{u}\\,\u00d7\\,\\overset{\\to }{B} $$ and, by the definition of the vector product (see <a class=\"autogenerated-content\" href=\"#CNX_UPhysics_02_04_prod-V\">(Figure)<\/a>), vector $$ \\overset{\\to }{F} $$ must be perpendicular to both vectors $$ \\overset{\\to }{u} $$ and $$ \\overset{\\to }{B}$$.\r\n\r\n<\/div>\r\n<div id=\"fs-id1167134821180\" class=\"textbox exercises check-understanding\">\r\n<h3>Check Your Understanding<\/h3>\r\n<div id=\"fs-id1167131613173\" class=\"problem textbox\">\r\n<div id=\"fs-id1167131613175\">\r\n<p id=\"fs-id1167131613177\">Given two vectors $$ \\overset{\\to }{A}=\\text{\u2212}\\hat{i}+\\hat{j} $$ and $$ \\overset{\\to }{B}=3\\hat{i}-\\hat{j}$$, find (a) $$ \\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B}$$, (b) $$ |\\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B}|$$, (c) the angle between $$ \\overset{\\to }{A} $$ and $$ \\overset{\\to }{B}$$, and (d) the angle between $$ \\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B} $$ and vector $$ \\overset{\\to }{C}=\\hat{i}+\\hat{k}$$.<\/p>\r\n\r\n<\/div>\r\n<div id=\"fs-id1167134946260\" class=\"solution\">\r\n\r\n[reveal-answer q=\"fs-id1167134946260\"]Show Solution[\/reveal-answer]\r\n\r\n[hidden-answer a=\"fs-id1167134946260\"]\r\n<p id=\"fs-id1167134946262\">a. $$ -2\\hat{k}$$, b. 2, c. $$ 153.4\\text{\u00b0}$$, d. $$ 135\\text{\u00b0}$$<\/p>\r\n[\/hidden-answer]\r\n\r\n<\/div>\r\n<\/div>\r\n<\/div>\r\n<p id=\"fs-id1167134912214\">In conclusion to this section, we want to stress that \u201cdot product\u201d and \u201ccross product\u201d are entirely different mathematical objects that have different meanings. The dot product is a scalar; the cross product is a vector. Later chapters use the terms <em>dot product<\/em> and <em>scalar product<\/em> interchangeably. Similarly, the terms <em>cross product<\/em> and <em>vector product<\/em> are used interchangeably.<\/p>\r\n\r\n<\/div>\r\n<div id=\"fs-id1167131161835\" class=\"textbox key-takeaways\">\r\n<h3>Summary<\/h3>\r\n<ul id=\"fs-id1167131547520\">\r\n \t<li>There are two kinds of multiplication for vectors. One kind of multiplication is the scalar product, also known as the dot product. The other kind of multiplication is the vector product, also known as the cross product. The scalar product of vectors is a number (scalar). The vector product of vectors is a vector.<\/li>\r\n \t<li>Both kinds of multiplication have the distributive property, but only the scalar product has the commutative property. The vector product has the anticommutative property, which means that when we change the order in which two vectors are multiplied, the result acquires a minus sign.<\/li>\r\n \t<li>The scalar product of two vectors is obtained by multiplying their magnitudes with the cosine of the angle between them. The scalar product of orthogonal vectors vanishes; the scalar product of antiparallel vectors is negative.<\/li>\r\n \t<li>The vector product of two vectors is a vector perpendicular to both of them. Its magnitude is obtained by multiplying their magnitudes by the sine of the angle between them. The direction of the vector product can be determined by the corkscrew right-hand rule. The vector product of two either parallel or antiparallel vectors vanishes. The magnitude of the vector product is largest for orthogonal vectors.<\/li>\r\n \t<li>The scalar product of vectors is used to find angles between vectors and in the definitions of derived scalar physical quantities such as work or energy.<\/li>\r\n \t<li>The cross product of vectors is used in definitions of derived vector physical quantities such as torque or magnetic force, and in describing rotations.<\/li>\r\n<\/ul>\r\n<\/div>\r\n<div id=\"fs-id1167131588273\" class=\"key-equations\">\r\n<h3>Key Equations<\/h3>\r\n<table id=\"fs-id1170904052814\" class=\"unnumbered unstyled\" summary=\"This table gives the following formulae: Multiplication by a scalar, vector equation, vector B equal to alpha vector A, Multiplication by a scalar, scalar equation for magnitudes, B equal to modulus of alpha, multiplied by A; Resultant of two vectors, Vector D subscript AD equal to vector D subscript AC plus vector D subscript CD; Commutative law, Vector A plus vector B equal to vector B plus vector A; Associative law, open parentheses vector A plus vector B close parentheses plus vector C equal to vector A plus open parentheses vector B plus vector C close parentheses; Distributive law, alpha 1 vector A plus alpha 2 vector A equal to open parentheses alpha 1 plus alpha 2 close parentheses vector A; The component form of a vector in two dimensions, vector A equal to Ax i hat plus Ay j hat; Scalar components of a vector in two dimensions, Ax equal to xe minus xb and Ay equal to ye minus yb; Magnitude of a vector in a plane, A equal to square root of Ax squared plus Ay squared end of root; The direction angle of a vector in a plane, theta A equal to tan inverse of open parentheses Ay upon Ax close parentheses; Scalar components of a vector in a plane, Ax equal to A cos theta A and Ay equal to A sine theta A; Polar coordinates in a plane, x equal to r cos phi and y equal to r sine phi; The component form of a vector in three dimensions, vector A equal to Ax i hat plus Ay j hat plus Az k hat; The scalar z-component of a vector in three dimensions, Az equal to ze minus zb; Magnitude of a vector in three dimensions, A equal to square root of Ax squared plus Ay squared plus Az squared end of root; Distributive property, alpha open parentheses vector A plus vector B close parentheses equal to alpha vector A plus alpha vector B; Antiparallel vector to vector A, minus vector A equal to minus Ax i hat minus Ay j hat minus Az k hat; Equal vectors, vector A equal to vector B corresponds to Ax equal to Bx, Ay equal to By, Az equal to Bz; Components of the resultant of vectors, F subscript Rx equal to summation k from 1 to N of Fx equal to F subscript 1x plus F subscript 2x plus plus till F subscript Nx, F subscript Ry equal to summation k from 1 to N of Fy equal to F subscript 1y plus F subscript 2y plus plus till F subscript Ny, F subscript Rz equal to summation k from 1 to N of Fz equal to F subscript 1z plus F subscript 2z plus plus till F subscript Nz; General unit vector, V hat equal to V vector upon V; Definition of the scalar product, vector A dot vector B equal to AB cos phi; Commutative property of the scalar product, vector A dot vector B equal to vector B dot vector A; Distributive property of the scalar product, vector A dot vector B plus vector C equal to vector A dot vector B plus vector A dot vector C; Scalar product in terms of scalar components of vectors, vector A dot vector B equal to Ax Bx plus Ay By plus Az Bz; Cosine of the angle between two vectors, cos phi equal to vector A dot vector B upon AB; Dot products of unit vectors, i hat dot j hat equal to j hat k hat equal to k hat i hat equal to zero; Magnitude of the vector product (definition), mod of vector A cross vector B end of modulus equal to AB sine phi; Anticommutative property of the vector product; vector A cross vector B equal to minus vector B cross vector A; Distributive property of the vector product, vector A cross open parentheses vector B plus vector C close parentheses equal to vector A cross vector B plus vector A cross vector C; Cross products of unit vectors, i hat cross j hat equal to plus k hat, j hat cross k hat equal to plus i hat, k hat cross i hat equal to plus j hat; The cross product in terms of scalar components of vectors, vector A cross vector B equal to open parentheses Ay Bz minus Az By close parentheses i hat plus open parentheses Az Bx minus Ax Bz close parentheses j hat plus open parentheses Ax By minus Ay Bx close parentheses k hat.\">\r\n<tbody>\r\n<tr>\r\n<td>Multiplication by a scalar (vector equation)<\/td>\r\n<td>$$\\overset{\\to }{B}=\\alpha \\overset{\\to }{A}$$<\/td>\r\n<\/tr>\r\n<tr>\r\n<td>Multiplication by a scalar (scalar equation for magnitudes)<\/td>\r\n<td>$$B=|\\alpha |A$$<\/td>\r\n<\/tr>\r\n<tr>\r\n<td>Resultant of two vectors<\/td>\r\n<td>$${\\overset{\\to }{D}}_{AD}={\\overset{\\to }{D}}_{AC}+{\\overset{\\to }{D}}_{CD}$$<\/td>\r\n<\/tr>\r\n<tr>\r\n<td>Commutative law<\/td>\r\n<td>$$\\overset{\\to }{A}+\\overset{\\to }{B}=\\overset{\\to }{B}+\\overset{\\to }{A}$$<\/td>\r\n<\/tr>\r\n<tr>\r\n<td>Associative law<\/td>\r\n<td>$$(\\overset{\\to }{A}+\\overset{\\to }{B})+\\overset{\\to }{C}=\\overset{\\to }{A}+(\\overset{\\to }{B}+\\overset{\\to }{C})$$<\/td>\r\n<\/tr>\r\n<tr>\r\n<td>Distributive law<\/td>\r\n<td>$${\\alpha }_{1}\\overset{\\to }{A}+{\\alpha }_{2}\\overset{\\to }{A}=({\\alpha }_{1}+{\\alpha }_{2})\\overset{\\to }{A}$$<\/td>\r\n<\/tr>\r\n<tr>\r\n<td>The component form of a vector in two dimensions<\/td>\r\n<td>$$\\overset{\\to }{A}={A}_{x}\\hat{i}+{A}_{y}\\hat{j}$$<\/td>\r\n<\/tr>\r\n<tr>\r\n<td>Scalar components of a vector in two dimensions<\/td>\r\n<td>$$\\{\\begin{array}{c}{A}_{x}={x}_{e}-{x}_{b}\\hfill \\\\ {A}_{y}={y}_{e}-{y}_{b}\\hfill \\end{array}$$<\/td>\r\n<\/tr>\r\n<tr>\r\n<td>Magnitude of a vector in a plane<\/td>\r\n<td>$$A=\\sqrt{{A}_{x}^{2}+{A}_{y}^{2}}$$<\/td>\r\n<\/tr>\r\n<tr>\r\n<td>The direction angle of a vector in a plane<\/td>\r\n<td>$${\\theta }_{A}={\\text{tan}}^{-1}(\\frac{{A}_{y}}{{A}_{x}})$$<\/td>\r\n<\/tr>\r\n<tr>\r\n<td>Scalar components of a vector in a plane<\/td>\r\n<td>$$\\{\\begin{array}{c}{A}_{x}=A\\,\\text{cos}\\,{\\theta }_{A}\\hfill \\\\ {A}_{y}=A\\,\\text{sin}\\,{\\theta }_{A}\\hfill \\end{array}$$<\/td>\r\n<\/tr>\r\n<tr>\r\n<td>Polar coordinates in a plane<\/td>\r\n<td>$$\\{\\begin{array}{c}x=r\\,\\text{cos}\\,\\phi \\hfill \\\\ y=r\\,\\text{sin}\\,\\phi \\hfill \\end{array}$$<\/td>\r\n<\/tr>\r\n<tr>\r\n<td>The component form of a vector in three dimensions<\/td>\r\n<td>$$\\overset{\\to }{A}={A}_{x}\\hat{i}+{A}_{y}\\hat{j}+{A}_{z}\\hat{k}$$<\/td>\r\n<\/tr>\r\n<tr>\r\n<td>The scalar <em>z<\/em>-component of a vector in three dimensions<\/td>\r\n<td>$${A}_{z}={z}_{e}-{z}_{b}$$<\/td>\r\n<\/tr>\r\n<tr>\r\n<td>Magnitude of a vector in three dimensions<\/td>\r\n<td>$$A=\\sqrt{{A}_{x}^{2}+{A}_{y}^{2}+{A}_{z}^{2}}$$<\/td>\r\n<\/tr>\r\n<tr>\r\n<td>Distributive property<\/td>\r\n<td>$$\\alpha (\\overset{\\to }{A}+\\overset{\\to }{B})=\\alpha \\overset{\\to }{A}+\\alpha \\overset{\\to }{B}$$<\/td>\r\n<\/tr>\r\n<tr>\r\n<td>Antiparallel vector to $$ \\overset{\\to }{A}$$<\/td>\r\n<td>$$\\text{\u2212}\\overset{\\to }{A}=\\text{\u2212}{A}_{x}\\hat{i}-{A}_{y}\\hat{j}-{A}_{z}\\hat{k}$$<\/td>\r\n<\/tr>\r\n<tr>\r\n<td>Equal vectors<\/td>\r\n<td>$$\\overset{\\to }{A}=\\overset{\\to }{B}\\enspace\u21d4\\enspace\\{\\begin{array}{c}{A}_{x}={B}_{x}\\hfill \\\\ {A}_{y}={B}_{y}\\hfill \\\\ {A}_{z}={B}_{z}\\hfill \\end{array}$$<\/td>\r\n<\/tr>\r\n<tr>\r\n<td>Components of the resultant of <em>N<\/em> vectors<\/td>\r\n<td>$$\\{\\begin{array}{c}{F}_{Rx}=\\sum _{k=1}^{N}{F}_{kx}={F}_{1x}+{F}_{2x}+\\text{\u2026}+{F}_{Nx}\\hfill \\\\ {F}_{Ry}=\\sum _{k=1}^{N}{F}_{ky}={F}_{1y}+{F}_{2y}+\\text{\u2026}+{F}_{Ny}\\hfill \\\\ {F}_{Rz}=\\sum _{k=1}^{N}{F}_{kz}={F}_{1z}+{F}_{2z}+\\text{\u2026}+{F}_{Nz}\\hfill \\end{array}$$<\/td>\r\n<\/tr>\r\n<tr>\r\n<td>General unit vector<\/td>\r\n<td>$$\\hat{V}=\\frac{\\overset{\\to }{V}}{V}$$<\/td>\r\n<\/tr>\r\n<tr>\r\n<td>Definition of the scalar product<\/td>\r\n<td>$$\\overset{\\to }{A}\u00b7\\overset{\\to }{B}=AB\\,\\text{cos}\\,\\phi $$<\/td>\r\n<\/tr>\r\n<tr>\r\n<td>Commutative property of the scalar product<\/td>\r\n<td>$$\\overset{\\to }{A}\u00b7\\overset{\\to }{B}=\\overset{\\to }{B}\u00b7\\overset{\\to }{A}$$<\/td>\r\n<\/tr>\r\n<tr>\r\n<td>Distributive property of the scalar product<\/td>\r\n<td>$$\\overset{\\to }{A}\u00b7(\\overset{\\to }{B}+\\overset{\\to }{C})=\\overset{\\to }{A}\u00b7\\overset{\\to }{B}+\\overset{\\to }{A}\u00b7\\overset{\\to }{C}$$<\/td>\r\n<\/tr>\r\n<tr>\r\n<td>Scalar product in terms of scalar components of vectors<\/td>\r\n<td>$$\\overset{\\to }{A}\u00b7\\overset{\\to }{B}={A}_{x}{B}_{x}+{A}_{y}{B}_{y}+{A}_{z}{B}_{z}$$<\/td>\r\n<\/tr>\r\n<tr>\r\n<td>Cosine of the angle between two vectors<\/td>\r\n<td>$$\\text{cos}\\,\\phi =\\frac{\\overset{\\to }{A}\u00b7\\overset{\\to }{B}}{AB}$$<\/td>\r\n<\/tr>\r\n<tr>\r\n<td>Dot products of unit vectors<\/td>\r\n<td>$$\\hat{i}\u00b7\\hat{j}=\\hat{j}\u00b7\\hat{k}=\\hat{k}\u00b7\\hat{i}=0$$<\/td>\r\n<\/tr>\r\n<tr>\r\n<td>Magnitude of the vector product (definition)<\/td>\r\n<td>$$|\\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B}|=AB\\,\\text{sin}\\,\\phi $$<\/td>\r\n<\/tr>\r\n<tr>\r\n<td>Anticommutative property of the vector product<\/td>\r\n<td>$$\\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B}=\\text{\u2212}\\overset{\\to }{B}\\,\u00d7\\,\\overset{\\to }{A}$$<\/td>\r\n<\/tr>\r\n<tr>\r\n<td>Distributive property of the vector product<\/td>\r\n<td>$$\\overset{\\to }{A}\\,\u00d7\\,(\\overset{\\to }{B}+\\overset{\\to }{C})=\\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B}+\\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{C}$$<\/td>\r\n<\/tr>\r\n<tr>\r\n<td>Cross products of unit vectors<\/td>\r\n<td>$$\\{\\begin{array}{l}\\hat{i}\\,\u00d7\\,\\hat{j}=+\\hat{k},\\hfill \\\\ \\hat{j}\\,\u00d7\\,\\hat{k}=+\\hat{i},\\hfill \\\\ \\hat{k}\\,\u00d7\\,\\hat{i}=+\\hat{j}.\\hfill \\end{array}$$<\/td>\r\n<\/tr>\r\n<tr>\r\n<td>The cross product in terms of scalar\r\n\r\ncomponents of vectors<\/td>\r\n<td>$$\\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B}=({A}_{y}{B}_{z}-{A}_{z}{B}_{y})\\hat{i}+({A}_{z}{B}_{x}-{A}_{x}{B}_{z})\\hat{j}+({A}_{x}{B}_{y}-{A}_{y}{B}_{x})\\hat{k}$$<\/td>\r\n<\/tr>\r\n<\/tbody>\r\n<\/table>\r\n<\/div>\r\n<div id=\"fs-id1167131130756\" class=\"review-conceptual-questions\">\r\n<h3>Conceptual Questions<\/h3>\r\n<div id=\"fs-id1167131432603\" class=\"problem textbox\">\r\n<div id=\"fs-id1167130161877\">\r\n<p id=\"fs-id1167130161880\">What is wrong with the following expressions? How can you correct them? (a) $$ C=\\overset{\\to }{A}\\overset{\\to }{B}$$, (b) $$ \\overset{\\to }{C}=\\overset{\\to }{A}\\overset{\\to }{B}$$, (c) $$ C=\\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B}$$, (d) $$ C=A\\overset{\\to }{B}$$, (e) $$ C+2\\overset{\\to }{A}=B$$, (f) $$ \\overset{\\to }{C}=A\\,\u00d7\\,\\overset{\\to }{B}$$, (g) $$ \\overset{\\to }{A}\u00b7\\overset{\\to }{B}=\\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B}$$, (h) $$ \\overset{\\to }{C}=2\\overset{\\to }{A}\u00b7\\overset{\\to }{B}$$, (i) $$ C=\\overset{\\to }{A}\\text{\/}\\overset{\\to }{B}$$, and (j) $$ C=\\overset{\\to }{A}\\text{\/}B$$.<\/p>\r\n\r\n<\/div>\r\n<div id=\"fs-id1167131124061\" class=\"solution\">\r\n\r\n[reveal-answer q=\"fs-id1167131124061\"]Show Solution[\/reveal-answer]\r\n\r\n[hidden-answer a=\"fs-id1167131124061\"]\r\n<p id=\"fs-id1167134888551\">a. $$ C=\\overset{\\to }{A}\u00b7\\overset{\\to }{B}$$, b. $$ \\overset{\\to }{C}=\\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B} $$ or $$ \\overset{\\to }{C}=\\overset{\\to }{A}-\\overset{\\to }{B}$$, c. $$ \\overset{\\to }{C}=\\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B}$$, d. $$ \\overset{\\to }{C}=A\\overset{\\to }{B}$$, e. $$ \\overset{\\to }{C}+2\\overset{\\to }{A}=\\overset{\\to }{B}$$, f. $$ \\overset{\\to }{C}=\\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B}$$, g. left side is a scalar and right side is a vector, h. $$ \\overset{\\to }{C}=2\\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B}$$, i. $$ \\overset{\\to }{C}=\\overset{\\to }{A}\\text{\/}B$$, j. $$ \\overset{\\to }{C}=\\overset{\\to }{A}\\text{\/}B$$<\/p>\r\n[\/hidden-answer]\r\n\r\n<\/div>\r\n<\/div>\r\n<div id=\"fs-id1167131439605\" class=\"problem textbox\">\r\n<div id=\"fs-id1167131439607\">\r\n<p id=\"fs-id1167131490469\">If the cross product of two vectors vanishes, what can you say about their directions?<\/p>\r\n\r\n<\/div>\r\n<\/div>\r\n<div id=\"fs-id1167131134362\" class=\"problem textbox\">\r\n<div id=\"fs-id1167131134364\">\r\n<p id=\"fs-id1167131134367\">If the dot product of two vectors vanishes, what can you say about their directions?<\/p>\r\n\r\n<\/div>\r\n<div id=\"fs-id1167134660510\" class=\"solution\">\r\n\r\n[reveal-answer q=\"fs-id1167134660510\"]Show Solution[\/reveal-answer]\r\n\r\n[hidden-answer a=\"fs-id1167134660510\"]\r\n<p id=\"fs-id1167134660512\">They are orthogonal.<\/p>\r\n[\/hidden-answer]\r\n\r\n<\/div>\r\n<\/div>\r\n<div id=\"fs-id1167131563595\" class=\"problem textbox\">\r\n<div id=\"fs-id1167131563597\">\r\n<p id=\"fs-id1167134943470\">What is the dot product of a vector with the cross product that this vector has with another vector?<\/p>\r\n\r\n<\/div>\r\n<\/div>\r\n<\/div>\r\n<div id=\"fs-id1167131485319\" class=\"review-problems textbox exercises\">\r\n<h3>Problems<\/h3>\r\n<div id=\"fs-id1167130205821\" class=\"problem textbox\">\r\n<div id=\"fs-id1167130205823\">\r\n<p id=\"fs-id1167131545552\">Assuming the +<em>x<\/em>-axis is horizontal to the right for the vectors in the following figure, find the following scalar products: (a) $$ \\overset{\\to }{A}\u00b7\\overset{\\to }{C}$$, (b) $$ \\overset{\\to }{A}\u00b7\\overset{\\to }{F}$$, (c) $$ \\overset{\\to }{D}\u00b7\\overset{\\to }{C}$$, (d) $$ \\overset{\\to }{A}\u00b7(\\overset{\\to }{F}+2\\overset{\\to }{C})$$, (e) $$ \\hat{i}\u00b7\\overset{\\to }{B}$$, (f) $$ \\hat{j}\u00b7\\overset{\\to }{B}$$, (g) $$ (3\\hat{i}-\\hat{j})\u00b7\\overset{\\to }{B}$$, and (h) $$ \\hat{B}\u00b7\\overset{\\to }{B}$$.<\/p>\r\n<span id=\"fs-id1167131282537\"><img src=\"https:\/\/s3-us-west-2.amazonaws.com\/courses-images\/wp-content\/uploads\/sites\/2952\/2018\/01\/31183852\/CNX_UPhysics_02_01_problems_img.jpg\" alt=\"The x y coordinate system has positive x to the right and positive y up. Vector A has magnitude 10.0 and points 30 degrees counterclockwise from the positive x direction. Vector B has magnitude 5.0 and points 53 degrees counterclockwise from the positive x direction. Vector C has magnitude 12.0 and points 60 degrees clockwise from the positive x direction. Vector D has magnitude 20.0 and points 37 degrees clockwise from the negative x direction. Vector F has magnitude 20.0 and points 30 degrees counterclockwise from the negative x direction.\" \/><\/span>\r\n\r\n<\/div>\r\n<\/div>\r\n<div id=\"fs-id1167131586956\" class=\"problem textbox\">\r\n<div id=\"fs-id1167131586959\">\r\n<p id=\"fs-id1167131270976\">Assuming the +<em>x<\/em>-axis is horizontal to the right for the vectors in the preceding figure, find (a) the component of vector $$ \\overset{\\to }{A} $$ along vector $$ \\overset{\\to }{C}$$, (b) the component of vector $$ \\overset{\\to }{C} $$ along vector $$ \\overset{\\to }{A}$$, (c) the component of vector $$ \\hat{i} $$ along vector $$ \\overset{\\to }{F}$$, and (d) the component of vector $$ \\overset{\\to }{F} $$ along vector $$ \\hat{i}$$.<\/p>\r\n\r\n<\/div>\r\n<div id=\"fs-id1167131466722\" class=\"solution\">\r\n\r\n[reveal-answer q=\"fs-id1167131466722\"]Show Solution[\/reveal-answer]\r\n\r\n[hidden-answer a=\"fs-id1167131466722\"]\r\n<p id=\"fs-id1167131466725\">a. 8.66, b. 10.39, c. 0.866, d. 17.32<\/p>\r\n[\/hidden-answer]\r\n\r\n<\/div>\r\n<\/div>\r\n<div id=\"fs-id1167134889697\" class=\"problem textbox\">\r\n<div id=\"fs-id1167134889699\">\r\n<p id=\"fs-id1167134889701\">Find the angle between vectors for (a) $$ \\overset{\\to }{D}=(-3.0\\hat{i}-4.0\\hat{j})\\text{m} $$ and $$ \\overset{\\to }{A}=(-3.0\\hat{i}+4.0\\hat{j})\\text{m} $$ and (b) $$ \\overset{\\to }{D}=(2.0\\hat{i}-4.0\\hat{j}+\\hat{k})\\text{m} $$ and $$ \\overset{\\to }{B}=(-2.0\\hat{i}+3.0\\hat{j}+2.0\\hat{k})\\text{m}$$.<\/p>\r\n\r\n<\/div>\r\n<\/div>\r\n<div id=\"fs-id1167129993856\" class=\"problem textbox\">\r\n<div id=\"fs-id1167129993858\">\r\n<p id=\"fs-id1167129993860\">Find the angles that vector $$ \\overset{\\to }{D}=(2.0\\hat{i}-4.0\\hat{j}+\\hat{k})\\text{m} $$ makes with the <em>x<\/em>-, <em>y<\/em>-, and <em>z<\/em>- axes.<\/p>\r\n\r\n<\/div>\r\n<div id=\"fs-id1167130204653\" class=\"solution\">\r\n\r\n[reveal-answer q=\"fs-id1167130204653\"]Show Solution[\/reveal-answer]\r\n\r\n[hidden-answer a=\"fs-id1167130204653\"]\r\n<p id=\"fs-id1167130204655\">$${\\theta }_{i}=64.12\\text{\u00b0},{\\theta }_{j}=150.79\\text{\u00b0},{\\theta }_{k}=77.39\\text{\u00b0}$$<\/p>\r\n[\/hidden-answer]\r\n\r\n<\/div>\r\n<\/div>\r\n<div id=\"fs-id1167131462688\" class=\"problem textbox\">\r\n<div id=\"fs-id1167131462690\">\r\n<p id=\"fs-id1167131462692\">Show that the force vector $$ \\overset{\\to }{D}=(2.0\\hat{i}-4.0\\hat{j}+\\hat{k})\\text{N} $$ is orthogonal to the force vector $$ \\overset{\\to }{G}=(3.0\\hat{i}+4.0\\hat{j}+10.0\\hat{k})\\text{N}$$.<\/p>\r\n\r\n<\/div>\r\n<\/div>\r\n<div id=\"fs-id1167130201986\" class=\"problem textbox\">\r\n<div id=\"fs-id1167130201989\">\r\n<p id=\"fs-id1167131375564\">Assuming the +<em>x<\/em>-axis is horizontal to the right for the vectors in the previous figure, find the following vector products: (a) $$ \\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{C}$$, (b) $$ \\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{F}$$, (c) $$ \\overset{\\to }{D}\\,\u00d7\\,\\overset{\\to }{C}$$, (d) $$ \\overset{\\to }{A}\\,\u00d7\\,(\\overset{\\to }{F}+2\\overset{\\to }{C})$$, (e) $$ \\hat{i}\\,\u00d7\\,\\overset{\\to }{B}$$, (f) $$ \\hat{j}\\,\u00d7\\,\\overset{\\to }{B}$$, (g) $$ (3\\hat{i}-\\hat{j})\\,\u00d7\\,\\overset{\\to }{B}$$, and (h) $$ \\hat{B}\\,\u00d7\\,\\overset{\\to }{B}$$.<\/p>\r\n\r\n<\/div>\r\n<div id=\"fs-id1167131591244\" class=\"solution\">\r\n\r\n[reveal-answer q=\"fs-id1167131591244\"]Show Solution[\/reveal-answer]\r\n\r\n[hidden-answer a=\"fs-id1167131591244\"]\r\n<p id=\"fs-id1167134923008\">a. $$ -119.98\\hat{k}$$, b. $$ -173.2\\hat{k}$$, c. $$ +93.69\\hat{k}$$, d. $$ -413.2\\hat{k}$$, e. $$ +39.93\\hat{k}$$, f. $$ -30.09\\hat{k}$$, g. $$ +149.9\\hat{k}$$, h. 0<\/p>\r\n[\/hidden-answer]\r\n\r\n<\/div>\r\n<\/div>\r\n<div id=\"fs-id1167131483573\" class=\"problem textbox\">\r\n<div id=\"fs-id1167131483575\">\r\n<p id=\"fs-id1167129980749\">Find the cross product $$ \\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{C} $$ for (a) $$ \\overset{\\to }{A}=2.0\\hat{i}-4.0\\hat{j}+\\hat{k} $$ and $$ \\overset{\\to }{C}=3.0\\hat{i}+4.0\\hat{j}+10.0\\hat{k}$$, (b) $$ \\overset{\\to }{A}=3.0\\hat{i}+4.0\\hat{j}+10.0\\hat{k} $$ and $$ \\overset{\\to }{C}=2.0\\hat{i}-4.0\\hat{j}+\\hat{k}$$, (c) $$ \\overset{\\to }{A}=-3.0\\hat{i}-4.0\\hat{j} $$ and $$ \\overset{\\to }{C}=-3.0\\hat{i}+4.0\\hat{j}$$, and (d) $$ \\overset{\\to }{C}=-2.0\\hat{i}+3.0\\hat{j}+2.0\\hat{k} $$ and $$ \\overset{\\to }{A}=-9.0\\hat{j}$$.<\/p>\r\n\r\n<\/div>\r\n<\/div>\r\n<div id=\"fs-id1167131540420\" class=\"problem textbox\">\r\n<div id=\"fs-id1167131540422\">\r\n<p id=\"fs-id1167131529010\">For the vectors in the earlier figure, find (a) $$ (\\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{F})\u00b7\\overset{\\to }{D}$$, (b) $$ (\\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{F})\u00b7(\\overset{\\to }{D}\\,\u00d7\\,\\overset{\\to }{B})$$, and (c) $$ (\\overset{\\to }{A}\u00b7\\overset{\\to }{F})(\\overset{\\to }{D}\\,\u00d7\\,\\overset{\\to }{B})$$.<\/p>\r\n\r\n<\/div>\r\n<div id=\"fs-id1167131575250\" class=\"solution\">\r\n\r\n[reveal-answer q=\"fs-id1167131575250\"]Show Solution[\/reveal-answer]\r\n\r\n[hidden-answer a=\"fs-id1167131575250\"]\r\n<p id=\"fs-id1167131421480\">a. 0, b. 173,194, c. $$ +199,993\\hat{k}$$<\/p>\r\n[\/hidden-answer]\r\n\r\n<\/div>\r\n<\/div>\r\n<div id=\"fs-id1167130224288\" class=\"problem textbox\">\r\n<div id=\"fs-id1167131526141\">\r\n<p id=\"fs-id1167131526144\">(a) If $$ \\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{F}=\\overset{\\to }{B}\\,\u00d7\\,\\overset{\\to }{F}$$, can we conclude $$ \\overset{\\to }{A}=\\overset{\\to }{B}$$? (b) If $$ \\overset{\\to }{A}\u00b7\\overset{\\to }{F}=\\overset{\\to }{B}\u00b7\\overset{\\to }{F}$$, can we conclude $$ \\overset{\\to }{A}=\\overset{\\to }{B}$$? (c) If $$ F\\overset{\\to }{A}=\\overset{\\to }{B}F$$, can we conclude $$ \\overset{\\to }{A}=\\overset{\\to }{B}$$? Why or why not?<\/p>\r\n\r\n<\/div>\r\n<\/div>\r\n<\/div>\r\n<div id=\"fs-id1167131238995\" class=\"review-additional-problems\">\r\n<h3>Additional Problems<\/h3>\r\n<div id=\"fs-id1167131397018\" class=\"problem textbox\">\r\n<div id=\"fs-id1167131397020\">\r\n<p id=\"fs-id1167131397023\">You fly $$ 32.0\\,\\text{km} $$ in a straight line in still air in the direction $$ 35.0\\text{\u00b0} $$ south of west. (a) Find the distances you would have to fly due south and then due west to arrive at the same point. (b) Find the distances you would have to fly first in a direction $$ 45.0\\text{\u00b0} $$ south of west and then in a direction $$ 45.0\\text{\u00b0} $$ west of north. Note these are the components of the displacement along a different set of axes\u2014namely, the one rotated by $$ 45\\text{\u00b0} $$ with respect to the axes in (a).<\/p>\r\n\r\n<\/div>\r\n<div id=\"fs-id1167131608214\" class=\"solution\">\r\n\r\n[reveal-answer q=\"fs-id1167131608214\"]Show Solution[\/reveal-answer]\r\n\r\n[hidden-answer a=\"fs-id1167131608214\"]\r\n<p id=\"fs-id1167131608216\">a. 18.4 km and 26.2 km, b. 31.5 km and 5.56 km<\/p>\r\n[\/hidden-answer]\r\n\r\n<\/div>\r\n<\/div>\r\n<div id=\"fs-id1167131182898\" class=\"problem textbox\">\r\n<div id=\"fs-id1167131182900\">\r\n<p id=\"fs-id1167131182902\">Rectangular coordinates of a point are given by (2, <em>y<\/em>) and its polar coordinates are given by $$ (r,\\pi \\text{\/}6)$$. Find <em>y<\/em> and <em>r<\/em>.<\/p>\r\n\r\n<\/div>\r\n<\/div>\r\n<div id=\"fs-id1167131200226\" class=\"problem textbox\">\r\n<div id=\"fs-id1167131200228\">\r\n<p id=\"fs-id1167131200230\">If the polar coordinates of a point are $$ (r,\\phi ) $$ and its rectangular coordinates are $$ (x,y)$$, determine the polar coordinates of the following points: (a) (\u2212<em>x<\/em>, <em>y<\/em>), (b) (\u22122<em>x<\/em>, \u22122<em>y<\/em>), and (c) (3<em>x<\/em>, \u22123<em>y<\/em>).<\/p>\r\n\r\n<\/div>\r\n<div id=\"fs-id1167134887251\" class=\"solution\">\r\n\r\n[reveal-answer q=\"fs-id1167134887251\"]Show Solution[\/reveal-answer]\r\n\r\n[hidden-answer a=\"fs-id1167134887251\"]\r\n<p id=\"fs-id1167134887253\">a. $$ (r,\\phi +\\pi \\text{\/}2)$$, b. $$ (2r,\\phi +2\\pi )$$, (c) $$ (3r,\\text{\u2212}\\phi )$$<\/p>\r\n[\/hidden-answer]\r\n\r\n<\/div>\r\n<\/div>\r\n<div id=\"fs-id1167131448284\" class=\"problem textbox\">\r\n<div id=\"fs-id1167131455145\">\r\n<p id=\"fs-id1167131455147\">Vectors $$ \\overset{\\to }{A} $$ and $$ \\overset{\\to }{B} $$ have identical magnitudes of 5.0 units. Find the angle between them if $$ \\overset{\\to }{A}+\\overset{\\to }{B}=5\\sqrt{2}\\hat{j}$$.<\/p>\r\n\r\n<\/div>\r\n<\/div>\r\n<div id=\"fs-id1167131376976\" class=\"problem textbox\">\r\n<div id=\"fs-id1167131376978\">\r\n<p id=\"fs-id1167131376980\">Starting at the island of Moi in an unknown archipelago, a fishing boat makes a round trip with two stops at the islands of Noi and Poi. It sails from Moi for 4.76 nautical miles (nmi) in a direction $$ 37\\text{\u00b0} $$ north of east to Noi. From Noi, it sails $$ 69\\text{\u00b0} $$ west of north to Poi. On its return leg from Poi, it sails $$ 28\\text{\u00b0} $$ east of south. What distance does the boat sail between Noi and Poi? What distance does it sail between Moi and Poi? Express your answer both in nautical miles and in kilometers. Note: 1 nmi = 1852 m.<\/p>\r\n\r\n<\/div>\r\n<div id=\"fs-id1167131436626\" class=\"solution\">\r\n\r\n[reveal-answer q=\"fs-id1167131436626\"]Show Solution[\/reveal-answer]\r\n\r\n[hidden-answer a=\"fs-id1167131436626\"]\r\n<p id=\"fs-id1167131436628\">$${d}_{\\text{PM}}=33.12\\,\\text{nmi}=61.34\\,\\text{km},\\enspace{d}_{\\text{NP}}=35.47\\,\\text{nmi}=65.69\\,\\text{km}$$<\/p>\r\n[\/hidden-answer]\r\n\r\n<\/div>\r\n<\/div>\r\n<div id=\"fs-id1167134435523\" class=\"problem textbox\">\r\n<div id=\"fs-id1167134435525\">\r\n<p id=\"fs-id1167134435527\">An air traffic controller notices two signals from two planes on the radar monitor. One plane is at altitude 800 m and in a 19.2-km horizontal distance to the tower in a direction $$ 25\\text{\u00b0} $$ south of west. The second plane is at altitude 1100 m and its horizontal distance is 17.6 km and $$ 20\\text{\u00b0} $$ south of west. What is the distance between these planes?<\/p>\r\n\r\n<\/div>\r\n<\/div>\r\n<div id=\"fs-id1167131514285\" class=\"problem textbox\">\r\n<div id=\"fs-id1167131514287\">\r\n<p id=\"fs-id1167131514289\">Show that when $$ \\overset{\\to }{A}+\\overset{\\to }{B}=\\overset{\\to }{C}$$, then $$ {C}^{2}={A}^{2}+{B}^{2}+2AB\\,\\text{cos}\\,\\phi $$, where $$ \\phi  $$ is the angle between vectors $$ \\overset{\\to }{A} $$ and $$ \\overset{\\to }{B}$$.<\/p>\r\n\r\n<\/div>\r\n<div id=\"fs-id1167131501386\" class=\"solution\">\r\n\r\n[reveal-answer q=\"fs-id1167131501386\"]Show Solution[\/reveal-answer]\r\n\r\n[hidden-answer a=\"fs-id1167131501386\"]\r\n<p id=\"fs-id1167131501389\">proof<\/p>\r\n[\/hidden-answer]\r\n\r\n<\/div>\r\n<\/div>\r\n<div id=\"fs-id1167131469964\" class=\"problem textbox\">\r\n<div id=\"fs-id1167131469966\">\r\n<p id=\"fs-id1167131469968\">Four force vectors each have the same magnitude <em>f<\/em>. What is the largest magnitude the resultant force vector may have when these forces are added? What is the smallest magnitude of the resultant? Make a graph of both situations.<\/p>\r\n\r\n<\/div>\r\n<\/div>\r\n<div id=\"fs-id1167131128625\" class=\"problem textbox\">\r\n<div id=\"fs-id1167131128628\">\r\n<p id=\"fs-id1167131128630\">A skater glides along a circular path of radius 5.00 m in clockwise direction. When he coasts around one-half of the circle, starting from the west point, find (a) the magnitude of his displacement vector and (b) how far he actually skated. (c) What is the magnitude of his displacement vector when he skates all the way around the circle and comes back to the west point?<\/p>\r\n\r\n<\/div>\r\n<div id=\"fs-id1167131128637\" class=\"solution\">\r\n\r\n[reveal-answer q=\"fs-id1167131128637\"]Show Solution[\/reveal-answer]\r\n\r\n[hidden-answer a=\"fs-id1167131128637\"]\r\n<p id=\"fs-id1167131128639\">a. 10.00 m, b. $$ 5\\pi \\,\\text{m}$$, c. 0<\/p>\r\n[\/hidden-answer]\r\n\r\n<\/div>\r\n<\/div>\r\n<div id=\"fs-id1167131127272\" class=\"problem textbox\">\r\n<div id=\"fs-id1167131127274\">\r\n<p id=\"fs-id1167131127276\">A stubborn dog is being walked on a leash by its owner. At one point, the dog encounters an interesting scent at some spot on the ground and wants to explore it in detail, but the owner gets impatient and pulls on the leash with force $$ \\overset{\\to }{F}=(98.0\\hat{i}+132.0\\hat{j}+32.0\\hat{k})\\text{N} $$ along the leash. (a) What is the magnitude of the pulling force? (b) What angle does the leash make with the vertical?<\/p>\r\n\r\n<\/div>\r\n<\/div>\r\n<div id=\"fs-id1167131515978\" class=\"problem textbox\">\r\n<div id=\"fs-id1167131515980\">\r\n<p id=\"fs-id1167131626949\">If the velocity vector of a polar bear is $$ \\overset{\\to }{u}=(-18.0\\hat{i}-13.0\\hat{j})\\text{km}\\text{\/}\\text{h}$$, how fast and in what geographic direction is it heading? Here, $$ \\hat{i} $$ and $$ \\hat{j} $$ are directions to geographic east and north, respectively.<\/p>\r\n\r\n<\/div>\r\n<div id=\"fs-id1167130010413\" class=\"solution\">\r\n\r\n[reveal-answer q=\"fs-id1167130010413\"]Show Solution[\/reveal-answer]\r\n\r\n[hidden-answer a=\"fs-id1167130010413\"]\r\n<p id=\"fs-id1167130010415\">22.2 km\/h, $$ 35.8\\text{\u00b0} $$ south of west<\/p>\r\n[\/hidden-answer]\r\n\r\n<\/div>\r\n<\/div>\r\n<div id=\"fs-id1167130010431\" class=\"problem textbox\">\r\n<div id=\"fs-id1167130010433\">\r\n<p id=\"fs-id1167130010435\">Find the scalar components of three-dimensional vectors $$ \\overset{\\to }{G} $$ and $$ \\overset{\\to }{H} $$ in the following figure and write the vectors in vector component form in terms of the unit vectors of the axes.<\/p>\r\n<span id=\"fs-id1167134965692\"><img src=\"https:\/\/s3-us-west-2.amazonaws.com\/courses-images\/wp-content\/uploads\/sites\/2952\/2018\/01\/31184052\/CNX_UPhysics_02_02_problems_img.jpg\" alt=\"Vector G has magnitude 10.0. Its projection in the x y plane is between the positive x and positive y directions, at an angle of 45 degrees from the positive x direction. The angle between vector G and the positive z direction is 60 degrees. Vector H has magnitude 15.0. Its projection in the x y plane is between the negative x and positive y directions, at an angle of 30 degrees from the positive y direction. The angle between vector H and the positive z direction is 450 degrees.\" \/><\/span>\r\n\r\n<\/div>\r\n<\/div>\r\n<div id=\"fs-id1167129967943\" class=\"problem textbox\">\r\n<div id=\"fs-id1167129967945\">\r\n<p id=\"fs-id1167129967948\">A diver explores a shallow reef off the coast of Belize. She initially swims 90.0 m north, makes a turn to the east and continues for 200.0 m, then follows a big grouper for 80.0 m in the direction $$ 30\\text{\u00b0} $$ north of east. In the meantime, a local current displaces her by 150.0 m south. Assuming the current is no longer present, in what direction and how far should she now swim to come back to the point where she started?<\/p>\r\n\r\n<\/div>\r\n<div id=\"fs-id1167130051819\" class=\"solution\">\r\n\r\n[reveal-answer q=\"fs-id1167130051819\"]Show Solution[\/reveal-answer]\r\n\r\n[hidden-answer a=\"fs-id1167130051819\"]\r\n<p id=\"fs-id1167130051821\">240.2 m, $$ 2.2\\text{\u00b0} $$ south of west<\/p>\r\n[\/hidden-answer]\r\n\r\n<\/div>\r\n<\/div>\r\n<div id=\"fs-id1167131389955\" class=\"problem textbox\">\r\n<div id=\"fs-id1167131389958\">\r\n<p id=\"fs-id1167131389960\">A force vector $$ \\overset{\\to }{A} $$ has <em>x<\/em>- and <em>y<\/em>-components, respectively, of \u22128.80 units of force and 15.00 units of force. The <em>x<\/em>- and <em>y<\/em>-components of force vector $$ \\overset{\\to }{B} $$ are, respectively, 13.20 units of force and \u22126.60 units of force. Find the components of force vector $$ \\overset{\\to }{C} $$ that satisfies the vector equation $$ \\overset{\\to }{A}-\\overset{\\to }{B}+3\\overset{\\to }{C}=0$$.<\/p>\r\n\r\n<\/div>\r\n<\/div>\r\n<div id=\"fs-id1167134724436\" class=\"problem textbox\">\r\n<div id=\"fs-id1167134724438\">\r\n<p id=\"fs-id1167134724440\">Vectors $$ \\overset{\\to }{A} $$ and $$ \\overset{\\to }{B} $$ are two orthogonal vectors in the <em>xy<\/em>-plane and they have identical magnitudes. If $$ \\overset{\\to }{A}=3.0\\hat{i}+4.0\\hat{j}$$, find $$ \\overset{\\to }{B}$$.<\/p>\r\n\r\n<\/div>\r\n<div id=\"fs-id1167131091310\" class=\"solution\">\r\n\r\n[reveal-answer q=\"fs-id1167131091310\"]Show Solution[\/reveal-answer]\r\n\r\n[hidden-answer a=\"fs-id1167131091310\"]\r\n<p id=\"fs-id1167131091313\">$$\\overset{\\to }{B}=-4.0\\hat{i}+3.0\\hat{j} $$ or $$ \\overset{\\to }{B}=4.0\\hat{i}-3.0\\hat{j}$$<\/p>\r\n[\/hidden-answer]\r\n\r\n<\/div>\r\n<\/div>\r\n<div id=\"fs-id1167134886863\" class=\"problem textbox\">\r\n<div id=\"fs-id1167134886865\">\r\n<p id=\"fs-id1167134886867\">For the three-dimensional vectors in the following figure, find (a) $$ \\overset{\\to }{G}\\,\u00d7\\,\\overset{\\to }{H}$$, (b) $$ |\\overset{\\to }{G}\\,\u00d7\\,\\overset{\\to }{H}|$$, and (c) $$ \\overset{\\to }{G}\u00b7\\overset{\\to }{H}$$.<\/p>\r\n<span id=\"fs-id1167131482624\"><img src=\"https:\/\/s3-us-west-2.amazonaws.com\/courses-images\/wp-content\/uploads\/sites\/2952\/2018\/01\/31184052\/CNX_UPhysics_02_02_problems_img.jpg\" alt=\"Vector G has magnitude 10.0. Its projection in the x y plane is between the positive x and positive y directions, at an angle of 45 degrees from the positive x direction. The angle between vector G and the positive z direction is 60 degrees. Vector H has magnitude 15.0. Its projection in the x y plane is between the negative x and positive y directions, at an angle of 30 degrees from the positive y direction. The angle between vector H and the positive z direction is 450 degrees.\" \/><\/span>\r\n\r\n<\/div>\r\n<\/div>\r\n<div id=\"fs-id1167131140153\" class=\"problem textbox\">\r\n<div id=\"fs-id1167131140155\">\r\n<p id=\"fs-id1167131140157\">Show that $$ (\\overset{\\to }{B}\\,\u00d7\\,\\overset{\\to }{C})\u00b7\\overset{\\to }{A} $$ is the volume of the parallelepiped, with edges formed by the three vectors in the following figure.<\/p>\r\n<span id=\"fs-id1167131160308\"><img src=\"https:\/\/s3-us-west-2.amazonaws.com\/courses-images\/wp-content\/uploads\/sites\/2952\/2018\/01\/31184054\/CNX_UPhysics_02_04_piped_img.jpg\" alt=\"Vector G has magnitude 10.0. Its projection in the x y plane is between the positive x and positive y directions, at an angle of 45 degrees from the positive x direction. The angle between vector G and the positive z direction is 60 degrees. Vector H has magnitude 15.0. Its projection in the x y plane is between the negative x and positive y directions, at an angle of 30 degrees from the positive y direction. The angle between vector H and the positive z direction is 450 degrees.\" \/><\/span>\r\n\r\n<\/div>\r\n<div id=\"fs-id1167131423351\">\r\n<p id=\"fs-id1167131423353\">proof<\/p>\r\n\r\n<\/div>\r\n<\/div>\r\n<\/div>\r\n<div id=\"fs-id1167131423360\" class=\"review-challenge\">\r\n<h3>Challenge Problems<\/h3>\r\n<div id=\"fs-id1167130007383\" class=\"problem textbox\">\r\n<div id=\"fs-id1167130007385\">\r\n<p id=\"fs-id1167130007388\">Vector $$ \\overset{\\to }{B} $$ is 5.0 cm long and vector $$ \\overset{\\to }{A} $$ is 4.0 cm long. Find the angle between these two vectors when $$ |\\overset{\\to }{A}+\\overset{\\to }{B}|=\\,3.0\\,\\text{cm} $$ and $$ |\\overset{\\to }{A}-\\overset{\\to }{B}|=\\,3.0\\,\\text{cm}$$.<\/p>\r\n\r\n<\/div>\r\n<\/div>\r\n<div id=\"fs-id1167131503571\" class=\"problem textbox\">\r\n<div id=\"fs-id1167131503573\">\r\n<p id=\"fs-id1167131632115\">What is the component of the force vector $$ \\overset{\\to }{G}=(3.0\\hat{i}+4.0\\hat{j}+10.0\\hat{k})\\text{N} $$ along the force vector $$ \\overset{\\to }{H}=(1.0\\hat{i}+4.0\\hat{j})\\text{N}$$?<\/p>\r\n\r\n<\/div>\r\n<div id=\"fs-id1167129963920\" class=\"solution\">\r\n\r\n[reveal-answer q=\"fs-id1167129963920\"]Show Solution[\/reveal-answer]\r\n\r\n[hidden-answer a=\"fs-id1167129963920\"]\r\n<p id=\"fs-id1167129963922\">$${G}_{\\perp }=2375\\sqrt{17}\\approx 9792$$<\/p>\r\n[\/hidden-answer]\r\n\r\n<\/div>\r\n<\/div>\r\n<div id=\"fs-id1167131518912\" class=\"problem textbox\">\r\n<div id=\"fs-id1167131518915\">\r\n<p id=\"fs-id1167131518917\">The following figure shows a triangle formed by the three vectors $$ \\overset{\\to }{A}$$, $$ \\overset{\\to }{B}$$, and $$ \\overset{\\to }{C}$$. If vector $$ {\\overset{\\to }{C}}^{\\prime } $$ is drawn between the midpoints of vectors $$ \\overset{\\to }{A} $$ and $$ \\overset{\\to }{B}$$, show that $$ {\\overset{\\to }{C}}^{\\prime }=\\overset{\\to }{C}\\text{\/}2$$.<\/p>\r\n<span id=\"fs-id1167134937953\"><img src=\"https:\/\/s3-us-west-2.amazonaws.com\/courses-images\/wp-content\/uploads\/sites\/2952\/2018\/01\/31184057\/CNX_UPhysics_02_04_triangle_img.jpg\" alt=\"Vectors A, B and C form a triangle. Vector A points up and right, vector B starts at the head of A and points down and right, and vector C starts at the head of B, ends at the tail of A and points to the left. Vector C prime is parallel to vector C and connects the midpoints of vectors A and B.\" \/><\/span>\r\n\r\n<\/div>\r\n<\/div>\r\n<div id=\"fs-id1167134883911\" class=\"problem textbox\">\r\n<div id=\"fs-id1167134883913\">\r\n<p id=\"fs-id1167131554928\">Distances between points in a plane do not change when a coordinate system is rotated. In other words, the magnitude of a vector is <em>invariant<\/em> under rotations of the coordinate system. Suppose a coordinate system S is rotated about its origin by angle $$ \\phi  $$ to become a new coordinate system $$ {\\text{S}}^{\\prime }$$, as shown in the following figure. A point in a plane has coordinates (<em>x<\/em>, <em>y<\/em>) in S and coordinates $$ ({x}^{\\prime },{y}^{\\prime }) $$ in $$ {\\text{S}}^{\\prime }$$.<\/p>\r\n<p id=\"fs-id1167129967376\">(a) Show that, during the transformation of rotation, the coordinates in $$ {\\text{S}}^{\\prime } $$ are expressed in terms of the coordinates in S by the following relations:<\/p>\r\n\r\n<div id=\"fs-id1167129967387\" class=\"unnumbered\">$$\\{\\begin{array}{c}{x}^{\\prime }=x\\,\\text{cos}\\,\\phi +y\\,\\text{sin}\\,\\phi \\\\ {y}^{\\prime }=\\text{\u2212}x\\,\\text{sin}\\,\\phi +y\\,\\text{cos}\\,\\phi \\end{array}.$$<\/div>\r\n<p id=\"fs-id1167134887327\">(b) Show that the distance of point <em>P<\/em> to the origin is invariant under rotations of the coordinate system. Here, you have to show that<\/p>\r\n\r\n<div id=\"fs-id1167134887336\" class=\"unnumbered\">$$\\sqrt{{x}^{2}+{y}^{2}}=\\sqrt{{{x}^{\\prime }}^{2}+{{y}^{\\prime }}^{2}}.$$<\/div>\r\n<p id=\"fs-id1167130002700\">(c) Show that the distance between points <em>P<\/em> and <em>Q<\/em> is invariant under rotations of the coordinate system. Here, you have to show that<\/p>\r\n\r\n<div id=\"fs-id1167131409536\" class=\"unnumbered\">$$\\sqrt{{({x}_{P}-{x}_{Q})}^{2}+{({y}_{P}-{y}_{Q})}^{2}}=\\sqrt{{({{x}^{\\prime }}_{P}-{{x}^{\\prime }}_{Q})}^{2}+{({{y}^{\\prime }}_{P}-{{y}^{\\prime }}_{Q})}^{2}}.$$<\/div>\r\n<span id=\"fs-id1167131327810\"><img src=\"https:\/\/s3-us-west-2.amazonaws.com\/courses-images\/wp-content\/uploads\/sites\/2952\/2018\/01\/31184059\/CNX_UPhysics_02_04_challenge_img.jpg\" alt=\"Two coordinate systems are shown. The x y coordinate system S, in red, has positive x to to the right and positive y up. The x prime y prime coordinate system S prime, in blue, shares the same origin as S but is rotated relative to S counterclockwise an angle phi. Two points, P and Q are shown. Point P\u2019s x coordinate in frame S is shown as a dashed line from P to the x axis, drawn parallel to the y axis. Point P\u2019s y coordinate in frame S is shown as a dashed line from P to the y axis, drawn parallel to the x axis. Point P\u2019s x prime coordinate in frame S prime is shown as a dashed line from P to the x prime axis, drawn parallel to the y prime axis. Point P\u2019s y prime coordinate in frame S prime is shown as a dashed line from P to the y prime axis, drawn parallel to the x prime axis.\" \/><\/span>\r\n\r\n<\/div>\r\n<div id=\"fs-id1167131220245\">\r\n<p id=\"fs-id1167131220247\">proof<\/p>\r\n\r\n<\/div>\r\n<\/div>\r\n<\/div>\r\n<div class=\"textbox shaded\">\r\n<h3>Glossary<\/h3>\r\n<dl id=\"fs-id1167131220257\">\r\n \t<dt><strong>anticommutative property<\/strong><\/dt>\r\n \t<dd id=\"fs-id1167131220262\">change in the order of operation introduces the minus sign<\/dd>\r\n<\/dl>\r\n<dl id=\"fs-id1167131220266\">\r\n \t<dt><strong>corkscrew right-hand rule<\/strong><\/dt>\r\n \t<dd id=\"fs-id1167134969664\">a rule used to determine the direction of the vector product<\/dd>\r\n<\/dl>\r\n<dl id=\"fs-id1167134969668\">\r\n \t<dt><strong>cross product<\/strong><\/dt>\r\n \t<dd id=\"fs-id1167134969673\">the result of the vector multiplication of vectors is a vector called a cross product; also called a vector product<\/dd>\r\n<\/dl>\r\n<dl id=\"fs-id1167134969678\">\r\n \t<dt><strong>dot product<\/strong><\/dt>\r\n \t<dd id=\"fs-id1167134969684\">the result of the scalar multiplication of two vectors is a scalar called a dot product; also called a scalar product<\/dd>\r\n<\/dl>\r\n<dl id=\"fs-id1167131606476\">\r\n \t<dt><strong>scalar product<\/strong><\/dt>\r\n \t<dd id=\"fs-id1167131606481\">the result of the scalar multiplication of two vectors is a scalar called a scalar product; also called a dot product<\/dd>\r\n<\/dl>\r\n<dl id=\"fs-id1167131606486\">\r\n \t<dt><strong>vector product<\/strong><\/dt>\r\n \t<dd id=\"fs-id1167131606492\">the result of the vector multiplication of vectors is a vector called a vector product; also called a cross product<\/dd>\r\n<\/dl>\r\n<\/div>","rendered":"<div class=\"textbox learning-objectives\">\n<h3>Learning Objectives<\/h3>\n<p>By the end of this section, you will be able to:<\/p>\n<ul>\n<li>Explain the difference between the scalar product and the vector product of two vectors.<\/li>\n<li>Determine the scalar product of two vectors.<\/li>\n<li>Determine the vector product of two vectors.<\/li>\n<li>Describe how the products of vectors are used in physics.<\/li>\n<\/ul>\n<\/div>\n<p id=\"fs-id1167131249217\">A vector can be multiplied by another vector but may not be divided by another vector. There are two kinds of products of vectors used broadly in physics and engineering. One kind of multiplication is a <em>scalar multiplication of two vectors<\/em>. Taking a scalar product of two vectors results in a number (a scalar), as its name indicates. Scalar products are used to define work and energy relations. For example, the work that a force (a vector) performs on an object while causing its displacement (a vector) is defined as a scalar product of the force vector with the displacement vector. A quite different kind of multiplication is a <em>vector multiplication of vectors<\/em>. Taking a vector product of two vectors returns as a result a vector, as its name suggests. Vector products are used to define other derived vector quantities. For example, in describing rotations, a vector quantity called <em>torque<\/em> is defined as a vector product of an applied force (a vector) and its distance from pivot to force (a vector). It is important to distinguish between these two kinds of vector multiplications because the scalar product is a scalar quantity and a vector product is a vector quantity.<\/p>\n<div id=\"fs-id1167131099995\" class=\"bc-section section\">\n<h3>The Scalar Product of Two Vectors (the Dot Product)<\/h3>\n<p id=\"fs-id1167131534370\">Scalar multiplication of two vectors yields a scalar product.<\/p>\n<div id=\"fs-id1167131530991\">\n<div class=\"textbox key-takeaways\">\n<h3 style=\"text-align: center\">Scalar Product (Dot Product)<\/h3>\n<div><\/div>\n<p id=\"fs-id1167131499095\">The <strong>scalar product<\/strong> $$ \\overset{\\to }{A}\u00b7\\overset{\\to }{B} $$ of two vectors $$ \\overset{\\to }{A} $$ and $$ \\overset{\\to }{B} $$ is a number defined by the equation<\/p>\n<div id=\"fs-id1167129962128\">$$\\overset{\\to }{A}\u00b7\\overset{\\to }{B}=AB\\,\\text{cos}\\,\\phi ,$$<\/div>\n<p id=\"fs-id1167131191966\">where $$ \\phi  $$ is the angle between the vectors (shown in <a class=\"autogenerated-content\" href=\"#CNX_UPhysics_02_04_prod-S\">(Figure)<\/a>). The scalar product is also called the <strong>dot product<\/strong> because of the dot notation that indicates it.<\/p>\n<\/div>\n<p>&nbsp;<\/p>\n<\/div>\n<p id=\"fs-id1167131173040\">In the definition of the dot product, the direction of angle $$ \\phi  $$ does not matter, and $$ \\phi  $$ can be measured from either of the two vectors to the other because $$ \\text{cos}\\,\\phi =\\text{cos}\\,(\\text{\u2212}\\phi )=\\text{cos}\\,(2\\pi -\\phi )$$. The dot product is a negative number when $$ 90\\text{\u00b0}&lt;\\phi \\le 180\\text{\u00b0} $$ and is a positive number when $$ 0\\text{\u00b0}\\le \\phi &lt;90\\text{\u00b0}$$. Moreover, the dot product of two parallel vectors is $$ \\overset{\\to }{A}\u00b7\\overset{\\to }{B}=AB\\,\\text{cos}\\,0\\text{\u00b0}=AB$$, and the dot product of two antiparallel vectors is $$ \\overset{\\to }{A}\u00b7\\overset{\\to }{B}=AB\\,\\text{cos}\\,180\\text{\u00b0}=\\text{\u2212}AB$$. The scalar product of two <em>orthogonal vectors<\/em> vanishes: $$ \\overset{\\to }{A}\u00b7\\overset{\\to }{B}=AB\\,\\text{cos}\\,90\\text{\u00b0}=0$$. The scalar product of a vector with itself is the square of its magnitude:<\/p>\n<div id=\"fs-id1167131608447\">$${\\overset{\\to }{A}}^{2}\\equiv \\overset{\\to }{A}\u00b7\\overset{\\to }{A}=AA\\,\\text{cos}\\,0\\text{\u00b0}={A}^{2}.$$<\/div>\n<div id=\"CNX_UPhysics_02_04_prod-S\" class=\"wp-caption aligncenter\">\n<div style=\"width: 975px\" class=\"wp-caption aligncenter\"><img loading=\"lazy\" decoding=\"async\" src=\"https:\/\/s3-us-west-2.amazonaws.com\/courses-images\/wp-content\/uploads\/sites\/2952\/2018\/01\/31184031\/CNX_UPhysics_02_04_prod-S.jpg\" alt=\"Figure a: vectors A and B are shown tail to tail. A is longer than B. The angle between them is phi. Figure b: Vector B is extended using a dashed line and another dashed line is drawn from the head of A to the extension of B, perpendicular to B. A sub perpendicular is equal to A magnitude times cosine phi and is the distance from the vertex where the tails of A and B meet to the location where the perpendicular from A to B meets the extension of B. Figure c: A dashed line is drawn from the head of B to A, perpendicular to A. The distance from the tails of A and B to where the dashed line meets B is B sub perpendicular and is equal to magnitude B times cosine phi.\" width=\"965\" height=\"296\" \/><\/p>\n<p class=\"wp-caption-text\"><strong>Figure 2.27<\/strong> The scalar product of two vectors. (a) The angle between the two vectors. (b) The orthogonal projection $$ {A}_{\\perp } $$ of vector $$ \\overset{\\to }{A} $$ onto the direction of vector $$ \\overset{\\to }{B}$$. (c) The orthogonal projection $$ {B}_{\\perp } $$ of vector $$ \\overset{\\to }{B} $$ onto the direction of vector $$ \\overset{\\to }{A}$$.<\/p>\n<\/div>\n<\/div>\n<div id=\"fs-id1167131141315\" class=\"textbox examples\">\n<h3>Example<\/h3>\n<h4>The Scalar Product<\/h4>\n<p>For the vectors shown in <a class=\"autogenerated-content\" href=\"https:\/\/courses.lumenlearning.com\/suny-osuniversityphysics\/chapter\/2-1-scalars-and-vectors#figure2.13\">(Figure)<\/a>, find the scalar product $$ \\overset{\\to }{A}\u00b7\\overset{\\to }{F}$$.<\/p>\n<h4>Strategy<\/h4>\n<p>From <a class=\"autogenerated-content\" href=\"https:\/\/courses.lumenlearning.com\/suny-osuniversityphysics\/chapter\/2-1-scalars-and-vectors#figure2.13\">(Figure)<\/a>, the magnitudes of vectors $$ \\overset{\\to }{A} $$ and $$ \\overset{\\to }{F} $$ are <em>A<\/em> = 10.0 and <em>F<\/em> = 20.0. Angle $$ \\theta $$, between them, is the difference: $$ \\theta =\\phi -\\alpha =110\\text{\u00b0}-35\\text{\u00b0}=75\\text{\u00b0}$$. Substituting these values into <a class=\"autogenerated-content\" href=\"#fs-id1167129962128\">(Figure)<\/a> gives the scalar product.<\/p>\n<h4>Solution<\/h4>\n<p id=\"fs-id1167131604681\">\n<div class=\"qa-wrapper\" style=\"display: block\"><span class=\"show-answer collapsed\" style=\"cursor: pointer\" data-target=\"q447394\">Show Answer<\/span><\/p>\n<div id=\"q447394\" class=\"hidden-answer\" style=\"display: none\">A straightforward calculation gives us<\/p>\n<p>$$\\overset{\\to }{A}\u00b7\\overset{\\to }{F}=AF\\,\\text{cos}\\,\\theta =(10.0)(20.0)\\,\\text{cos}\\,75\\text{\u00b0}=51.76.$$<\/p><\/div>\n<\/div>\n<\/div>\n<div id=\"fs-id1167131599875\" class=\"textbox exercises check-understanding\">\n<h3>Check Your Understanding<\/h3>\n<div id=\"fs-id1167134912050\" class=\"problem textbox\">\n<div id=\"fs-id1167131567806\">\n<p id=\"fs-id1167131541846\">For the vectors given in <a class=\"autogenerated-content\" href=\"https:\/\/courses.lumenlearning.com\/suny-osuniversityphysics\/chapter\/2-1-scalars-and-vectors#figure2.13\">(Figure)<\/a>, find the scalar products $$ \\overset{\\to }{A}\u00b7\\overset{\\to }{B} $$ and $$ \\overset{\\to }{F}\u00b7\\overset{\\to }{C}$$.<\/p>\n<\/div>\n<div id=\"fs-id1167131172251\" class=\"solution\">\n<div class=\"qa-wrapper\" style=\"display: block\"><span class=\"show-answer collapsed\" style=\"cursor: pointer\" data-target=\"qfs-id1167131172251\">Show Solution<\/span><\/p>\n<div id=\"qfs-id1167131172251\" class=\"hidden-answer\" style=\"display: none\">\n<p id=\"fs-id1167131128914\">$$\\overset{\\to }{A}\u00b7\\overset{\\to }{B}=-57.3$$, $$ \\overset{\\to }{F}\u00b7\\overset{\\to }{C}=27.8$$<\/p>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<p id=\"fs-id1167134541337\">In the Cartesian coordinate system, scalar products of the unit vector of an axis with other unit vectors of axes always vanish because these unit vectors are orthogonal:<\/p>\n<div id=\"fs-id1167131488937\">$$\\begin{array}{c}\\hat{i}\u00b7\\hat{j}=|\\hat{i}||\\hat{j}|\\,\\text{cos}\\,90\\text{\u00b0}=(1)(1)(0)=0,\\hfill \\\\ \\hat{i}\u00b7\\hat{k}=|\\hat{i}||\\hat{k}|\\,\\text{cos}\\,90\\text{\u00b0}=(1)(1)(0)=0,\\hfill \\\\ \\hat{k}\u00b7\\hat{j}=|\\hat{k}||\\hat{j}|\\,\\text{cos}\\,90\\text{\u00b0}=(1)(1)(0)=0.\\hfill \\end{array}$$<\/div>\n<p id=\"fs-id1167131113195\">In these equations, we use the fact that the magnitudes of all unit vectors are one: $$ |\\hat{i}|=|\\hat{j}|=|\\hat{k}|=1$$. For unit vectors of the axes, <a class=\"autogenerated-content\" href=\"#fs-id1167131608447\">(Figure)<\/a> gives the following identities:<\/p>\n<div id=\"fs-id1167134625856\">$$\\hat{i}\u00b7\\hat{i}={i}^{2}=\\hat{j}\u00b7\\hat{j}={j}^{2}=\\hat{k}\u00b7\\hat{k}={k}^{2}=1.$$<\/div>\n<p id=\"fs-id1167131223969\">The scalar product $$ \\overset{\\to }{A}\u00b7\\overset{\\to }{B} $$ can also be interpreted as either the product of <em>B<\/em> with the orthogonal projection $$ {A}_{\\perp } $$ of vector $$ \\overset{\\to }{A} $$ onto the direction of vector $$ \\overset{\\to }{B} $$ (<a class=\"autogenerated-content\" href=\"#CNX_UPhysics_02_04_prod-S\">(Figure)<\/a>(b)) or the product of <em>A<\/em> with the orthogonal projection $$ {B}_{\\perp } $$ of vector $$ \\overset{\\to }{B} $$ onto the direction of vector $$ \\overset{\\to }{A} $$ (<a class=\"autogenerated-content\" href=\"#CNX_UPhysics_02_04_prod-S\">(Figure)<\/a>(c)):<\/p>\n<div id=\"fs-id1167134451842\" class=\"unnumbered\">$$\\begin{array}{ll}\\hfill \\overset{\\to }{A}\u00b7\\overset{\\to }{B}&amp; =AB\\,\\text{cos}\\,\\phi \\hfill \\\\ &amp; =B(A\\,\\text{cos}\\,\\phi )=B{A}_{\\perp }\\hfill \\\\ &amp; =A(B\\,\\text{cos}\\,\\phi )=A{B}_{\\perp }.\\hfill \\end{array}$$<\/div>\n<p id=\"fs-id1167131403688\">For example, in the rectangular coordinate system in a plane, the scalar <em>x<\/em>-component of a vector is its dot product with the unit vector $$ \\hat{i}$$, and the scalar <em>y<\/em>-component of a vector is its dot product with the unit vector $$ \\hat{j}$$:<\/p>\n<div id=\"fs-id1167134686592\" class=\"unnumbered\">$$\\{\\begin{array}{l}\\overset{\\to }{A}\u00b7\\hat{i}=|\\overset{\\to }{A}||\\hat{i}|\\,\\text{cos}\\,{\\theta }_{A}=A\\,\\text{cos}\\,{\\theta }_{A}={A}_{x}\\\\ \\overset{\\to }{A}\u00b7\\hat{j}=|\\overset{\\to }{A}||\\hat{j}|\\,\\text{cos}\\,(90\\text{\u00b0}-{\\theta }_{A})=A\\,\\text{sin}\\,{\\theta }_{A}={A}_{y}\\end{array}.$$<\/div>\n<p id=\"fs-id1167131502091\">Scalar multiplication of vectors is commutative,<\/p>\n<div id=\"fs-id1167131500766\" class=\"equation-callout\">\n<div id=\"fs-id1167134952226\">$$\\overset{\\to }{A}\u00b7\\overset{\\to }{B}=\\overset{\\to }{B}\u00b7\\overset{\\to }{A},$$<\/div>\n<\/div>\n<p id=\"fs-id1167131331705\">and obeys the distributive law:<\/p>\n<div id=\"fs-id1167131618794\" class=\"equation-callout\">\n<div id=\"fs-id1167129968054\">$$\\overset{\\to }{A}\u00b7(\\overset{\\to }{B}+\\overset{\\to }{C})=\\overset{\\to }{A}\u00b7\\overset{\\to }{B}+\\overset{\\to }{A}\u00b7\\overset{\\to }{C}.$$<\/div>\n<\/div>\n<p id=\"fs-id1167131435344\">We can use the commutative and distributive laws to derive various relations for vectors, such as expressing the dot product of two vectors in terms of their scalar components.<\/p>\n<div id=\"fs-id1167131387446\" class=\"textbox exercises check-understanding\">\n<h3>Check Your Understanding<\/h3>\n<div id=\"fs-id1167131635553\" class=\"problem textbox\">\n<div id=\"fs-id1167131412797\">\n<p id=\"fs-id1167131389882\">For vector $$ \\overset{\\to }{A}={A}_{x}\\hat{i}+{A}_{y}\\hat{j}+{A}_{z}\\hat{k} $$ in a rectangular coordinate system, use <a class=\"autogenerated-content\" href=\"#fs-id1167131488937\">(Figure)<\/a> through <a class=\"autogenerated-content\" href=\"#fs-id1167129968054\">(Figure)<\/a> to show that $$ \\overset{\\to }{A}\u00b7\\hat{i}={A}_{x} $$ $$\\overset{\\to }{A}\u00b7\\hat{j}={A}_{y} $$ and $$ \\overset{\\to }{A}\u00b7\\hat{k}={A}_{z}$$.<\/p>\n<\/div>\n<\/div>\n<\/div>\n<p id=\"fs-id1167131121374\">When the vectors in <a class=\"autogenerated-content\" href=\"#fs-id1167129962128\">(Figure)<\/a> are given in their vector component forms,<\/p>\n<div id=\"fs-id1167131586768\" class=\"unnumbered\">$$\\overset{\\to }{A}={A}_{x}\\hat{i}+{A}_{y}\\hat{j}+{A}_{z}\\hat{k}\\,\\text{and}\\,\\overset{\\to }{B}={B}_{x}\\hat{i}+{B}_{y}\\hat{j}+{B}_{z}\\hat{k},$$<\/div>\n<p id=\"fs-id1167134888648\">we can compute their scalar product as follows:<\/p>\n<div id=\"fs-id1167134452024\" class=\"unnumbered\">$$\\begin{array}{lll}\\hfill \\overset{\\to }{A}\u00b7\\overset{\\to }{B}&amp; =\\hfill &amp; ({A}_{x}\\hat{i}+{A}_{y}\\hat{j}+{A}_{z}\\hat{k})\u00b7({B}_{x}\\hat{i}+{B}_{y}\\hat{j}+{B}_{z}\\hat{k})\\hfill \\\\ &amp; =\\hfill &amp; \\enspace{A}_{x}{B}_{x}\\hat{i}\u00b7\\hat{i}+{A}_{x}{B}_{y}\\hat{i}\u00b7\\hat{j}+{A}_{x}{B}_{z}\\hat{i}\u00b7\\hat{k}\\hfill \\\\ &amp; &amp; +{A}_{y}{B}_{x}\\hat{j}\u00b7\\hat{i}+{A}_{y}{B}_{y}\\hat{j}\u00b7\\hat{j}+{A}_{y}{B}_{z}\\hat{j}\u00b7\\hat{k}\\hfill \\\\ &amp; &amp; +{A}_{z}{B}_{x}\\,\\hat{k}\u00b7\\hat{i}+{A}_{z}{B}_{y}\\hat{k}\u00b7\\hat{j}+{A}_{z}{B}_{z}\\,\\hat{k}\u00b7\\hat{k}.\\hfill \\end{array}$$<\/div>\n<p id=\"fs-id1167134942868\">Since scalar products of two different unit vectors of axes give zero, and scalar products of unit vectors with themselves give one (see <a class=\"autogenerated-content\" href=\"#fs-id1167131488937\">(Figure)<\/a> and <a class=\"autogenerated-content\" href=\"#fs-id1167134625856\">(Figure)<\/a>), there are only three nonzero terms in this expression. Thus, the scalar product simplifies to<\/p>\n<div id=\"fs-id1167131444689\" class=\"equation-callout\">\n<div id=\"fs-id1167131115362\">$$\\overset{\\to }{A}\u00b7\\overset{\\to }{B}={A}_{x}{B}_{x}+{A}_{y}{B}_{y}+{A}_{z}{B}_{z}.$$<\/div>\n<\/div>\n<p id=\"fs-id1167134944381\">We can use <a class=\"autogenerated-content\" href=\"#fs-id1167131115362\">(Figure)<\/a> for the scalar product in terms of scalar components of vectors to find the <strong><span class=\"no-emphasis\">angle between two vectors<\/span><\/strong>. When we divide <a class=\"autogenerated-content\" href=\"#fs-id1167129962128\">(Figure)<\/a> by <em>AB<\/em>, we obtain the equation for $$ \\text{cos}\\,\\phi $$, into which we substitute <a class=\"autogenerated-content\" href=\"#fs-id1167131115362\">(Figure)<\/a>:<\/p>\n<div id=\"fs-id1167131167094\" class=\"equation-callout\">\n<div id=\"fs-id1167134723856\">$$\\text{cos}\\,\\phi =\\frac{\\overset{\\to }{A}\u00b7\\overset{\\to }{B}}{AB}=\\frac{{A}_{x}{B}_{x}+{A}_{y}{B}_{y}+{A}_{z}{B}_{z}}{AB}.$$<\/div>\n<\/div>\n<p id=\"fs-id1167131315724\">Angle $$ \\phi  $$ between vectors $$ \\overset{\\to }{A} $$ and $$ \\overset{\\to }{B} $$ is obtained by taking the inverse cosine of the expression in <a class=\"autogenerated-content\" href=\"#fs-id1167134723856\">(Figure)<\/a>.<\/p>\n<div id=\"fs-id1167131510883\" class=\"textbox examples\">\n<h3>Example<\/h3>\n<h4>Angle between Two Forces<\/h4>\n<p>Three dogs are pulling on a stick in different directions, as shown in <a class=\"autogenerated-content\" href=\"#CNX_UPhysics_02_04_dogs\">(Figure)<\/a>. The first dog pulls with force $$ {\\overset{\\to }{F}}_{1}=(10.0\\hat{i}-20.4\\hat{j}+2.0\\hat{k})\\text{N}$$, the second dog pulls with force $$ {\\overset{\\to }{F}}_{2}=(-15.0\\hat{i}-6.2\\hat{k})\\text{N}$$, and the third dog pulls with force $$ {\\overset{\\to }{F}}_{3}=(5.0\\hat{i}+12.5\\hat{j})\\text{N}$$. What is the angle between forces $$ {\\overset{\\to }{F}}_{1} $$ and $$ {\\overset{\\to }{F}}_{2}$$?<\/p>\n<div id=\"CNX_UPhysics_02_04_dogs\" class=\"wp-caption aligncenter\">\n<div style=\"width: 428px\" class=\"wp-caption aligncenter\"><img loading=\"lazy\" decoding=\"async\" src=\"https:\/\/s3-us-west-2.amazonaws.com\/courses-images\/wp-content\/uploads\/sites\/2952\/2018\/01\/31184035\/CNX_UPhysics_02_04_dogs.jpg\" alt=\"Three dogs pull on a stick.\" width=\"418\" height=\"353\" \/><\/p>\n<p class=\"wp-caption-text\"><strong>Figure 2.28<\/strong>\u00a0Three dogs are playing with a stick.<\/p>\n<\/div>\n<\/div>\n<h4>Strategy<\/h4>\n<p>The components of force vector $$ {\\overset{\\to }{F}}_{1} $$ are $$ {F}_{1x}=10.0\\,\\text{N}$$, $$ {F}_{1y}=-20.4\\,\\text{N}$$, and $$ {F}_{1z}=2.0\\,\\text{N}$$, whereas those of force vector $$ {\\overset{\\to }{F}}_{2} $$ are $$ {F}_{2x}=-15.0\\,\\text{N}$$, $$ {F}_{2y}=0.0\\,\\text{N}$$, and $$ {F}_{2z}=-6.2\\,\\text{N}$$. Computing the scalar product of these vectors and their magnitudes, and substituting into <a class=\"autogenerated-content\" href=\"#fs-id1167134723856\">(Figure)<\/a> gives the angle of interest.<\/p>\n<h4>Solution<\/h4>\n<p id=\"fs-id1167131406095\">\n<div class=\"qa-wrapper\" style=\"display: block\"><span class=\"show-answer collapsed\" style=\"cursor: pointer\" data-target=\"q653304\">Show Answer<\/span><\/p>\n<div id=\"q653304\" class=\"hidden-answer\" style=\"display: none\">The magnitudes of forces $$ {\\overset{\\to }{F}}_{1} $$ and $$ {\\overset{\\to }{F}}_{2} $$ are<\/p>\n<p>$${F}_{1}=\\sqrt{{F}_{1x}^{2}+{F}_{1y}^{2}+{F}_{1z}^{2}}=\\sqrt{{10.0}^{2}+{20.4}^{2}+{2.0}^{2}}\\,\\text{N}=22.8\\,\\text{N} $$ and<\/p>\n<p>$${F}_{2}=\\sqrt{{F}_{2x}^{2}+{F}_{2y}^{2}+{F}_{2z}^{2}}=\\sqrt{{15.0}^{2}+{6.2}^{2}}\\,\\text{N}=16.2\\,\\text{N}. $$ Substituting the scalar components into (Figure) yields the scalar product<\/p>\n<p>$$\\begin{array}{cc}\\hfill {\\overset{\\to }{F}}_{1}\u00b7{\\overset{\\to }{F}}_{2}&amp; ={F}_{1x}{F}_{2x}+{F}_{1y}{F}_{2y}+{F}_{1z}{F}_{2z}\\hfill \\\\ &amp; =(10.0\\,\\text{N})(-15.0\\,\\text{N})+(-20.4\\,\\text{N})(0.0\\,\\text{N})+(2.0\\,\\text{N})(-6.2\\,\\text{N})\\hfill \\\\ &amp; =-162.4\\,{\\text{N}}^{2}.\\hfill \\end{array} $$ Finally, substituting everything into (Figure) gives the angle<\/p>\n<p>$$\\text{cos}\\,\\phi =\\frac{{\\overset{\\to }{F}}_{1}\u00b7{\\overset{\\to }{F}}_{2}}{{F}_{1}{F}_{2}}=\\frac{-162.4\\,{\\text{N}}^{2}}{(22.8\\,\\text{N})(16.2\\,\\text{N})}=-0.439\u21d2\\enspace\\phi ={\\text{cos}}^{-1}(-0.439)=116.0\\text{\u00b0}.$$<\/p><\/div>\n<\/div>\n<h4>Significance<\/h4>\n<p>Notice that when vectors are given in terms of the unit vectors of axes, we can find the angle between them without knowing the specifics about the geographic directions the unit vectors represent. Here, for example, the +<em>x<\/em>-direction might be to the east and the +<em>y<\/em>-direction might be to the north. But, the angle between the forces in the problem is the same if the +<em>x<\/em>-direction is to the west and the +<em>y<\/em>-direction is to the south.<\/p>\n<\/div>\n<div id=\"fs-id1167131425839\" class=\"textbox exercises check-understanding\">\n<h3>Check Your Understanding<\/h3>\n<div id=\"fs-id1167131113534\" class=\"problem textbox\">\n<div id=\"fs-id1167131605141\">\n<p id=\"fs-id1167134835075\">Find the angle between forces $$ {\\overset{\\to }{F}}_{1} $$ and $$ {\\overset{\\to }{F}}_{3} $$ in <a class=\"autogenerated-content\" href=\"#fs-id1167131510883\">(Figure)<\/a>.<\/p>\n<\/div>\n<div id=\"fs-id1167131496552\" class=\"solution\">\n<div class=\"qa-wrapper\" style=\"display: block\"><span class=\"show-answer collapsed\" style=\"cursor: pointer\" data-target=\"qfs-id1167131496552\">Show Solution<\/span><\/p>\n<div id=\"qfs-id1167131496552\" class=\"hidden-answer\" style=\"display: none\">\n<p id=\"fs-id1167134674656\">$$131.9\\text{\u00b0}$$<\/p>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<div id=\"fs-id1167134592890\" class=\"textbox examples\">\n<h3>Example<\/h3>\n<h4>The Work of a Force<\/h4>\n<p>When force $$ \\overset{\\to }{F} $$ pulls on an object and when it causes its displacement $$ \\overset{\\to }{D}$$, we say the force performs work. The amount of work the force does is the scalar product $$ \\overset{\\to }{F}\u00b7\\overset{\\to }{D}$$. If the stick in <a class=\"autogenerated-content\" href=\"#fs-id1167131510883\">(Figure)<\/a> moves momentarily and gets displaced by vector $$ \\overset{\\to }{D}=(-7.9\\hat{j}-4.2\\hat{k})\\,\\text{cm}$$, how much work is done by the third dog in <a class=\"autogenerated-content\" href=\"#fs-id1167131510883\">(Figure)<\/a>?<\/p>\n<h4>Strategy<\/h4>\n<p>We compute the scalar product of displacement vector $$ \\overset{\\to }{D} $$ with force vector $$ {\\overset{\\to }{F}}_{3}=(5.0\\hat{i}+12.5\\hat{j})\\text{N}$$, which is the pull from the third dog. Let\u2019s use $$ {W}_{3} $$ to denote the work done by force $$ {\\overset{\\to }{F}}_{3} $$ on displacement $$ \\overset{\\to }{D}$$.<\/p>\n<h4>Solution<\/h4>\n<p id=\"fs-id1167130017393\">\n<div class=\"qa-wrapper\" style=\"display: block\"><span class=\"show-answer collapsed\" style=\"cursor: pointer\" data-target=\"q560347\">Show Answer<\/span><\/p>\n<div id=\"q560347\" class=\"hidden-answer\" style=\"display: none\">Calculating the work is a straightforward application of the dot product:<\/p>\n<p>$$\\begin{array}{cc}\\hfill {W}_{3}&amp; ={\\overset{\\to }{F}}_{3}\u00b7\\overset{\\to }{D}={F}_{3x}{D}_{x}+{F}_{3y}{D}_{y}+{F}_{3z}{D}_{z}\\hfill \\\\ &amp; =(5.0\\,\\text{N})(0.0\\,\\text{cm})+(12.5\\,\\text{N})(-7.9\\,\\text{cm})+(0.0\\,\\text{N})(-4.2\\,\\text{cm})\\hfill \\\\ &amp; =-98.7\\,\\text{N}\u00b7\\text{cm}.\\hfill \\end{array}$$<\/p><\/div>\n<\/div>\n<h4>Significance<\/h4>\n<p>The SI unit of work is called the joule $$ (\\text{J})$$, where 1 J = 1 $$ \\text{N}\u00b7\\text{m}$$. The unit $$ \\text{cm}\u00b7\\text{N} $$ can be written as $$ {10}^{-2}\\text{m}\u00b7\\text{N}={10}^{-2}\\text{J}$$, so the answer can be expressed as $$ {W}_{3}=-0.9875\\,\\text{J}\\approx -1.0\\,\\text{J}$$.<\/p>\n<\/div>\n<div id=\"fs-id1167131341544\" class=\"textbox exercises check-understanding\">\n<h3>Check Your Understanding<\/h3>\n<div id=\"fs-id1167134863960\" class=\"problem textbox\">\n<div id=\"fs-id1167134940532\">\n<p id=\"fs-id1167131541164\">How much work is done by the first dog and by the second dog in <a class=\"autogenerated-content\" href=\"#fs-id1167131510883\">(Figure)<\/a> on the displacement in <a class=\"autogenerated-content\" href=\"#fs-id1167134592890\">(Figure)<\/a>?<\/p>\n<\/div>\n<div id=\"fs-id1167130006416\" class=\"solution\">\n<div class=\"qa-wrapper\" style=\"display: block\"><span class=\"show-answer collapsed\" style=\"cursor: pointer\" data-target=\"qfs-id1167130006416\">Show Solution<\/span><\/p>\n<div id=\"qfs-id1167130006416\" class=\"hidden-answer\" style=\"display: none\">\n<p id=\"fs-id1167130157098\">$${W}_{1}=1.5\\,\\text{J}$$, $$ {W}_{2}=0.3\\,\\text{J}$$<\/p>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<div id=\"fs-id1167131477358\" class=\"bc-section section\">\n<h3>The Vector Product of Two Vectors (the Cross Product)<\/h3>\n<p id=\"fs-id1167129966341\">Vector multiplication of two vectors yields a vector product.<\/p>\n<div id=\"fs-id1167131503527\">\n<h4>Vector Product (Cross Product)<\/h4>\n<p id=\"fs-id1167131078780\">The <strong>vector product<\/strong> of two vectors $$ \\overset{\\to }{A} $$ and $$ \\overset{\\to }{B} $$ is denoted by $$ \\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B} $$ and is often referred to as a <strong>cross product<\/strong>. The vector product is a vector that has its direction perpendicular to both vectors $$ \\overset{\\to }{A} $$ and $$ \\overset{\\to }{B}$$. In other words, vector $$ \\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B} $$ is perpendicular to the plane that contains vectors $$ \\overset{\\to }{A} $$ and $$ \\overset{\\to }{B}$$, as shown in <a class=\"autogenerated-content\" href=\"#CNX_UPhysics_02_04_prod-V\">(Figure)<\/a>. The magnitude of the vector product is defined as<\/p>\n<div id=\"fs-id1167131455204\">$$|\\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B}|=\\,AB\\,\\text{sin}\\,\\phi ,$$<\/div>\n<p id=\"fs-id1167131392214\">where angle $$ \\phi $$, between the two vectors, is measured from vector $$ \\overset{\\to }{A} $$ (first vector in the product) to vector $$ \\overset{\\to }{B} $$ (second vector in the product), as indicated in <a class=\"autogenerated-content\" href=\"#CNX_UPhysics_02_04_prod-V\">(Figure)<\/a>, and is between $$ 0\\text{\u00b0} $$ and $$ 180\\text{\u00b0}$$.<\/p>\n<\/div>\n<p id=\"fs-id1167131267151\">According to <a class=\"autogenerated-content\" href=\"#fs-id1167131455204\">(Figure)<\/a>, the vector product vanishes for pairs of vectors that are either parallel $$ (\\phi =0\\text{\u00b0}) $$ or antiparallel $$ (\\phi =180\\text{\u00b0}) $$ because $$ \\text{sin}\\,0\\text{\u00b0}=\\text{sin}\\,180\\text{\u00b0}=0$$.<\/p>\n<div id=\"CNX_UPhysics_02_04_prod-V\" class=\"wp-caption aligncenter\">\n<div style=\"width: 562px\" class=\"wp-caption aligncenter\"><img loading=\"lazy\" decoding=\"async\" src=\"https:\/\/s3-us-west-2.amazonaws.com\/courses-images\/wp-content\/uploads\/sites\/2952\/2018\/01\/31184038\/CNX_UPhysics_02_04_prod-V.jpg\" alt=\"Vector A points out and to the left, and vector B points out and to the right. The angle between them is phi. In figure a we are shown vector C which is the cross product of A cross B. Vector C points up and is perpendicular to both A and B. In figure b we are shown vector minus C which is the cross product of B cross A. Vector minus C points down and is perpendicular to both A and B.\" width=\"552\" height=\"381\" \/><\/p>\n<p class=\"wp-caption-text\"><strong>Figure 2.29<\/strong> The vector product of two vectors is drawn in three-dimensional space. (a) The vector product $$ \\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B} $$ is a vector perpendicular to the plane that contains vectors $$ \\overset{\\to }{A} $$ and $$ \\overset{\\to }{B}$$. Small squares drawn in perspective mark right angles between $$ \\overset{\\to }{A} $$ and $$ \\overset{\\to }{C}$$, and between $$ \\overset{\\to }{B} $$ and $$ \\overset{\\to }{C} $$ so that if $$ \\overset{\\to }{A} $$ and $$ \\overset{\\to }{B} $$ lie on the floor, vector $$ \\overset{\\to }{C} $$ points vertically upward to the ceiling. (b) The vector product $$ \\overset{\\to }{B}\\,\u00d7\\,\\overset{\\to }{A} $$ is a vector antiparallel to vector $$ \\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B}$$.<\/p>\n<\/div>\n<\/div>\n<p id=\"fs-id1167134723544\">On the line perpendicular to the plane that contains vectors $$ \\overset{\\to }{A} $$ and $$ \\overset{\\to }{B} $$ there are two alternative directions\u2014either up or down, as shown in <a class=\"autogenerated-content\" href=\"#CNX_UPhysics_02_04_prod-V\">(Figure)<\/a>\u2014and the direction of the vector product may be either one of them. In the standard right-handed orientation, where the angle between vectors is measured counterclockwise from the first vector, vector $$ \\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B} $$ points <em>upward<\/em>, as seen in <a class=\"autogenerated-content\" href=\"#CNX_UPhysics_02_04_prod-V\">(Figure)<\/a>(a). If we reverse the order of multiplication, so that now $$ \\overset{\\to }{B} $$ comes first in the product, then vector $$ \\overset{\\to }{B}\\,\u00d7\\,\\overset{\\to }{A} $$ must point <em>downward<\/em>, as seen in <a class=\"autogenerated-content\" href=\"#CNX_UPhysics_02_04_prod-V\">(Figure)<\/a>(b). This means that vectors $$ \\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B} $$ and $$ \\overset{\\to }{B}\\,\u00d7\\,\\overset{\\to }{A} $$ are <em>antiparallel<\/em> to each other and that vector multiplication is <em>not<\/em> commutative but <em>anticommutative<\/em>. The <strong>anticommutative property<\/strong> means the vector product reverses the sign when the order of multiplication is reversed:<\/p>\n<div id=\"fs-id1167131635409\" class=\"equation-callout\">\n<div id=\"fs-id1167130202099\">$$\\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B}=\\text{\u2212}\\overset{\\to }{B}\\,\u00d7\\,\\overset{\\to }{A}.$$<\/div>\n<\/div>\n<p id=\"fs-id1167134991977\">The <strong>corkscrew right-hand<\/strong> <strong>rule<\/strong> is a common mnemonic used to determine the direction of the vector product. As shown in <a class=\"autogenerated-content\" href=\"#CNX_UPhysics_02_04_corkscrew\">(Figure)<\/a>, a corkscrew is placed in a direction perpendicular to the plane that contains vectors $$ \\overset{\\to }{A} $$ and $$ \\overset{\\to }{B}$$, and its handle is turned in the direction from the first to the second vector in the product. The direction of the cross product is given by the progression of the corkscrew.<\/p>\n<div id=\"CNX_UPhysics_02_04_corkscrew\" class=\"wp-caption aligncenter\">\n<div style=\"width: 558px\" class=\"wp-caption aligncenter\"><img loading=\"lazy\" decoding=\"async\" src=\"https:\/\/s3-us-west-2.amazonaws.com\/courses-images\/wp-content\/uploads\/sites\/2952\/2018\/01\/31184041\/CNX_UPhysics_02_04_corkscrew.jpg\" alt=\"Vector A points out and to the left, and vector B points out and to the right. In figure a we are shown the cross product of A cross B pointing up, perpendicular to both A and B. A screw turning an angle phi from A to B would move up. In figure b we are shown the cross product of B cross A pointing down, perpendicular to both A and B. A screw turning an angle phi from B to A would move down.\" width=\"548\" height=\"374\" \/><\/p>\n<p class=\"wp-caption-text\"><strong>Figure 2.30<\/strong> The corkscrew right-hand rule can be used to determine the direction of the cross product $$ \\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B}$$. Place a corkscrew in the direction perpendicular to the plane that contains vectors $$ \\overset{\\to }{A} $$ and $$ \\overset{\\to }{B}$$, and turn it in the direction from the first to the second vector in the product. The direction of the cross product is given by the progression of the corkscrew. (a) Upward movement means the cross-product vector points up. (b) Downward movement means the cross-product vector points downward.<\/p>\n<\/div>\n<\/div>\n<div id=\"fs-id1167131452799\" class=\"textbox examples\">\n<h3>Example<\/h3>\n<h4 id=\"fs-id1167134435037\"><strong>The Torque of a Force<\/strong><\/h4>\n<p>The mechanical advantage that a familiar tool called a <em>wrench<\/em> provides (<a class=\"autogenerated-content\" href=\"#CNX_UPhysics_02_04_wrench\">(Figure)<\/a>) depends on magnitude <em>F<\/em> of the applied force, on its direction with respect to the wrench handle, and on how far from the nut this force is applied. The distance <em>R<\/em> from the nut to the point where force vector $$ \\overset{\\to }{F} $$ is attached and is represented by the radial vector $$ \\overset{\\to }{R}$$. The physical vector quantity that makes the nut turn is called <em>torque<\/em> (denoted by $$ \\overset{\\to }{\\tau })$$, and it is the vector product of the distance between the pivot to force with the force: $$ \\overset{\\to }{\\tau }=\\overset{\\to }{R}\\,\u00d7\\,\\overset{\\to }{F}$$.<\/p>\n<p id=\"fs-id1167131550119\">To loosen a rusty nut, a 20.00-N force is applied to the wrench handle at angle $$ \\phi =40\\text{\u00b0} $$ and at a distance of 0.25 m from the nut, as shown in <a class=\"autogenerated-content\" href=\"#CNX_UPhysics_02_04_wrench\">(Figure)<\/a>(a). Find the magnitude and direction of the torque applied to the nut. What would the magnitude and direction of the torque be if the force were applied at angle $$ \\phi =45\\text{\u00b0}$$, as shown in <a class=\"autogenerated-content\" href=\"#CNX_UPhysics_02_04_wrench\">(Figure)<\/a>(b)? For what value of angle $$ \\phi  $$ does the torque have the largest magnitude?<\/p>\n<div id=\"CNX_UPhysics_02_04_wrench\" class=\"wp-caption aligncenter\">\n<div style=\"width: 888px\" class=\"wp-caption aligncenter\"><img loading=\"lazy\" decoding=\"async\" src=\"https:\/\/s3-us-west-2.amazonaws.com\/courses-images\/wp-content\/uploads\/sites\/2952\/2018\/01\/31184044\/CNX_UPhysics_02_04_wrench.jpg\" alt=\"Figure a: a wrench grips a nut. A force F is applied to the wrench at a distance R from the center of the nut. The vector R is the vector from the center of the nut to the location where the force is being applied. The force direction is at an angle phi, measured counterclockwise from the direction of the vector R. Figure b: a wrench grips a nut. A force F is applied to the wrench at a distance R from the center of the nut. The vector R is the vector from the center of the nut to the location where the force is being applied. The force direction is at an angle phi, measured clockwise from the direction of the vector R.\" width=\"878\" height=\"482\" \/><\/p>\n<p class=\"wp-caption-text\"><strong>Figure 2.31<\/strong> A wrench provides grip and mechanical advantage in applying torque to turn a nut. (a) Turn counterclockwise to loosen the nut. (b) Turn clockwise to tighten the nut.<\/p>\n<\/div>\n<\/div>\n<h4>Strategy<\/h4>\n<p>We adopt the frame of reference shown in <a class=\"autogenerated-content\" href=\"#CNX_UPhysics_02_04_wrench\">(Figure)<\/a>, where vectors $$ \\overset{\\to }{R} $$ and $$ \\overset{\\to }{F} $$ lie in the <em>xy<\/em>-plane and the origin is at the position of the nut. The radial direction along vector $$ \\overset{\\to }{R} $$ (pointing away from the origin) is the reference direction for measuring the angle $$ \\phi  $$ because $$ \\overset{\\to }{R} $$ is the first vector in the vector product $$ \\overset{\\to }{\\tau }=\\overset{\\to }{R}\\,\u00d7\\,\\overset{\\to }{F}$$. Vector $$ \\overset{\\to }{\\tau } $$ must lie along the <em>z<\/em>-axis because this is the axis that is perpendicular to the <em>xy<\/em>-plane, where both $$ \\overset{\\to }{R} $$ and $$ \\overset{\\to }{F} $$ lie. To compute the magnitude $$ \\tau $$, we use <a class=\"autogenerated-content\" href=\"#fs-id1167131455204\">(Figure)<\/a>. To find the direction of $$ \\overset{\\to }{\\tau }$$, we use the corkscrew right-hand rule (<a class=\"autogenerated-content\" href=\"#CNX_UPhysics_02_04_corkscrew\">(Figure)<\/a>).<\/p>\n<h4>Solution<\/h4>\n<p id=\"fs-id1167134664986\">\n<div class=\"qa-wrapper\" style=\"display: block\"><span class=\"show-answer collapsed\" style=\"cursor: pointer\" data-target=\"q915163\">Show Answer<\/span><\/p>\n<div id=\"q915163\" class=\"hidden-answer\" style=\"display: none\">For the situation in (a), the corkscrew rule gives the direction of $$ \\overset{\\to }{R}\\,\u00d7\\,\\overset{\\to }{F} $$ in the positive direction of the z-axis. Physically, it means the torque vector $$ \\overset{\\to }{\\tau } $$ points out of the page, perpendicular to the wrench handle. We identify F = 20.00 N and R = 0.25 m, and compute the magnitude using (Figure):<\/p>\n<p>$$\\tau \\,=|\\overset{\\to }{R}\\,\u00d7\\,\\overset{\\to }{F}|=\\,RF\\,\\text{sin}\\,\\phi =(0.25\\,\\text{m})(20.00\\,\\text{N})\\,\\text{sin}\\,40\\text{\u00b0}=3.21\\,\\text{N}\u00b7\\text{m}. $$ For the situation in (b), the corkscrew rule gives the direction of $$ \\overset{\\to }{R}\\,\u00d7\\,\\overset{\\to }{F} $$ in the negative direction of the z-axis. Physically, it means the vector $$ \\overset{\\to }{\\tau } $$ points into the page, perpendicular to the wrench handle. The magnitude of this torque is<\/p>\n<p>$$\\tau \\,=|\\overset{\\to }{R}\\,\u00d7\\,\\overset{\\to }{F}|=\\,RF\\,\\text{sin}\\,\\phi =(0.25\\,\\text{m})(20.00\\,\\text{N})\\,\\text{sin}\\,45\\text{\u00b0}=3.53\\,\\text{N}\u00b7\\text{m}. $$ The torque has the largest value when $$ \\text{sin}\\,\\phi =1$$, which happens when $$ \\phi =90\\text{\u00b0}$$. Physically, it means the wrench is most effective\u2014giving us the best mechanical advantage\u2014when we apply the force perpendicular to the wrench handle. For the situation in this example, this best-torque value is $$ {\\tau }_{\\text{best}}=RF=(0.25\\,\\text{m})(20.00\\,\\text{N})=5.00\\,\\text{N}\u00b7\\text{m}$$.<\/p><\/div>\n<\/div>\n<h4>Significance<\/h4>\n<p>When solving mechanics problems, we often do not need to use the corkscrew rule at all, as we\u2019ll see now in the following equivalent solution. Notice that once we have identified that vector $$ \\overset{\\to }{R}\\,\u00d7\\,\\overset{\\to }{F} $$ lies along the <em>z<\/em>-axis, we can write this vector in terms of the unit vector $$ \\hat{k} $$ of the <em>z<\/em>-axis:<\/p>\n<div id=\"fs-id1167134633324\" class=\"unnumbered\">$$\\overset{\\to }{R}\\,\u00d7\\,\\overset{\\to }{F}=RF\\,\\text{sin}\\,\\phi \\hat{k}.$$<\/div>\n<p id=\"fs-id1167134966050\">In this equation, the number that multiplies $$ \\hat{k} $$ is the scalar <em>z<\/em>-component of the vector $$ \\overset{\\to }{R}\\,\u00d7\\,\\overset{\\to }{F}$$. In the computation of this component, care must be taken that the angle $$ \\phi  $$ is measured <em>counterclockwise<\/em> from $$ \\overset{\\to }{R} $$ (first vector) to $$ \\overset{\\to }{F} $$ (second vector). Following this principle for the angles, we obtain $$ RF\\,\\text{sin}\\,(+40\\text{\u00b0})=+3.2\\,\\text{N}\u00b7\\text{m} $$ for the situation in (a), and we obtain $$ RF\\,\\text{sin}\\,(-45\\text{\u00b0})=-3.5\\,\\text{N}\u00b7\\text{m} $$ for the situation in (b). In the latter case, the angle is negative because the graph in <a class=\"autogenerated-content\" href=\"#CNX_UPhysics_02_04_wrench\">(Figure)<\/a> indicates the angle is measured clockwise; but, the same result is obtained when this angle is measured counterclockwise because $$ +(360\\text{\u00b0}-45\\text{\u00b0})=+315\\text{\u00b0} $$ and $$ \\text{sin}\\,(+315\\text{\u00b0})=\\text{sin}\\,(-45\\text{\u00b0})$$. In this way, we obtain the solution without reference to the corkscrew rule. For the situation in (a), the solution is $$ \\overset{\\to }{R}\\,\u00d7\\,\\overset{\\to }{F}=+3.2\\,\\text{N}\u00b7\\text{m}\\hat{k}$$; for the situation in (b), the solution is $$ \\overset{\\to }{R}\\,\u00d7\\,\\overset{\\to }{F}=-3.5\\,\\text{N}\u00b7\\text{m}\\hat{k}$$.<\/p>\n<\/div>\n<div id=\"fs-id1167131119324\" class=\"textbox exercises check-understanding\">\n<h3>Check Your Understanding<\/h3>\n<div id=\"fs-id1167131331227\" class=\"problem textbox\">\n<div id=\"fs-id1167131553044\">\n<p id=\"fs-id1167131553046\">For the vectors given in <a class=\"autogenerated-content\" href=\"\/contents\/7df36d4f-6930-46a0-a6a0-61eb183b9e97#CNX_UPhysics_02_01_vector07\">(Figure)<\/a>, find the vector products $$ \\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B} $$ and $$ \\overset{\\to }{C}\\,\u00d7\\,\\overset{\\to }{F}$$.<\/p>\n<\/div>\n<div id=\"fs-id1167131635182\" class=\"solution\">\n<div class=\"qa-wrapper\" style=\"display: block\"><span class=\"show-answer collapsed\" style=\"cursor: pointer\" data-target=\"qfs-id1167131635182\">Show Solution<\/span><\/p>\n<div id=\"qfs-id1167131635182\" class=\"hidden-answer\" style=\"display: none\">\n<p id=\"fs-id1167131609127\">$$\\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B}=-40.1\\hat{k} $$ or, equivalently, $$ |\\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B}|=40.1$$, and the direction is into the page; $$ \\overset{\\to }{C}\\,\u00d7\\,\\overset{\\to }{F}=+157.6\\hat{k} $$ or, equivalently, $$ |\\overset{\\to }{C}\\,\u00d7\\,\\overset{\\to }{F}|=157.6$$, and the direction is out of the page.<\/p>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<p id=\"fs-id1167131113511\">Similar to the dot product (<a class=\"autogenerated-content\" href=\"#fs-id1167134952226\">(Figure)<\/a>), the cross product has the following distributive property:<\/p>\n<div id=\"fs-id1167134886923\" class=\"equation-callout\">\n<div id=\"fs-id1167134990693\">$$\\overset{\\to }{A}\\,\u00d7\\,(\\overset{\\to }{B}+\\overset{\\to }{C})=\\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B}+\\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{C}.$$<\/div>\n<\/div>\n<p id=\"fs-id1167130034626\">The distributive property is applied frequently when vectors are expressed in their component forms, in terms of unit vectors of Cartesian axes.<\/p>\n<p id=\"fs-id1167131111221\">When we apply the definition of the cross product, <a class=\"autogenerated-content\" href=\"#fs-id1167131455204\">(Figure)<\/a>, to unit vectors $$ \\hat{i}$$, $$ \\hat{j}$$, and $$ \\hat{k} $$ that define the positive <em>x<\/em>-, <em>y<\/em>-, and <em>z<\/em>-directions in space, we find that<\/p>\n<div id=\"fs-id1167131180024\">$$\\hat{i}\\,\u00d7\\,\\hat{i}=\\hat{j}\\,\u00d7\\,\\hat{j}=\\hat{k}\\,\u00d7\\,\\hat{k}=0.$$<\/div>\n<p id=\"fs-id1167131315889\">All other cross products of these three unit vectors must be vectors of unit magnitudes because $$ \\hat{i}$$, $$ \\hat{j}$$, and $$ \\hat{k} $$ are orthogonal. For example, for the pair $$ \\hat{i} $$ and $$ \\hat{j}$$, the magnitude is $$ |\\hat{i}\\,\u00d7\\,\\hat{j}|=ij\\,\\text{sin}\\,90\\text{\u00b0}=(1)(1)(1)=1$$. The direction of the vector product $$ \\hat{i}\\,\u00d7\\,\\hat{j} $$ must be orthogonal to the <em>xy<\/em>-plane, which means it must be along the <em>z<\/em>-axis. The only unit vectors along the <em>z<\/em>-axis are $$ \\text{\u2212}\\hat{k} $$ or $$ +\\hat{k}$$. By the corkscrew rule, the direction of vector $$ \\hat{i}\\,\u00d7\\,\\hat{j} $$ must be parallel to the positive <em>z<\/em>-axis. Therefore, the result of the multiplication $$ \\hat{i}\\,\u00d7\\,\\hat{j} $$ is identical to $$ +\\hat{k}$$. We can repeat similar reasoning for the remaining pairs of unit vectors. The results of these multiplications are<\/p>\n<div id=\"fs-id1167131615664\" class=\"equation-callout\">\n<div id=\"fs-id1167131615668\">$$\\{\\begin{array}{l}\\hat{i}\\,\u00d7\\,\\hat{j}=+\\hat{k},\\\\ \\hat{j}\\,\u00d7\\,\\hat{k}=+\\hat{i},\\\\ \\hat{k}\\,\u00d7\\,\\hat{i}=+\\hat{j}.\\end{array}$$<\/div>\n<\/div>\n<p id=\"fs-id1167131394505\">Notice that in <a class=\"autogenerated-content\" href=\"#fs-id1167131615668\">(Figure)<\/a>, the three unit vectors $$ \\hat{i}$$, $$ \\hat{j}$$, and $$ \\hat{k} $$ appear in the <em>cyclic order<\/em> shown in a diagram in <a class=\"autogenerated-content\" href=\"#CNX_UPhysics_02_04_uniprod\">(Figure)<\/a>(a). The cyclic order means that in the product formula, $$ \\hat{i} $$ follows $$ \\hat{k} $$ and comes before $$ \\hat{j}$$, or $$ \\hat{k} $$ follows $$ \\hat{j} $$ and comes before $$ \\hat{i}$$, or $$ \\hat{j} $$ follows $$ \\hat{i} $$ and comes before $$ \\hat{k}$$. The cross product of two different unit vectors is always a third unit vector. When two unit vectors in the cross product appear in the cyclic order, the result of such a multiplication is the remaining unit vector, as illustrated in <a class=\"autogenerated-content\" href=\"#CNX_UPhysics_02_04_uniprod\">(Figure)<\/a>(b). When unit vectors in the cross product appear in a different order, the result is a unit vector that is antiparallel to the remaining unit vector (i.e., the result is with the minus sign, as shown by the examples in <a class=\"autogenerated-content\" href=\"#CNX_UPhysics_02_04_uniprod\">(Figure)<\/a>(c) and <a class=\"autogenerated-content\" href=\"#CNX_UPhysics_02_04_uniprod\">(Figure)<\/a>(d). In practice, when the task is to find cross products of vectors that are given in vector component form, this rule for the cross-multiplication of unit vectors is very useful.<\/p>\n<div id=\"CNX_UPhysics_02_04_uniprod\" class=\"wp-caption aligncenter\">\n<div style=\"width: 606px\" class=\"wp-caption aligncenter\"><img loading=\"lazy\" decoding=\"async\" src=\"https:\/\/s3-us-west-2.amazonaws.com\/courses-images\/wp-content\/uploads\/sites\/2952\/2018\/01\/31184048\/CNX_UPhysics_02_04_uniprod.jpg\" alt=\"Figure a: The unit vectors, I hat, j hat and k hat of the x y z coordinate system are shown. Arrows indicate the sequence from I hat to j hat to k hat and back to I hat. Figure b: The unit vectors, I hat, j hat and k hat of the x y z coordinate system are shown. I hat equals j hat cross k hat. j hat equals k hat cross i hat. k hat equals i hat cross j hat. Figure c: The unit vectors, I hat and j hat are shown along with minus k hat pointing down. Minus k hat equals j hat cross i hat. Figure d: The unit vectors, I hat and k hat are shown along with minus j hat pointing to the left. Minus j hat equals i hat cross k hat.\" width=\"596\" height=\"566\" \/><\/p>\n<p class=\"wp-caption-text\"><strong>Figure 2.32<\/strong> (a) The diagram of the cyclic order of the unit vectors of the axes. (b) The only cross products where the unit vectors appear in the cyclic order. These products have the positive sign. (c, d) Two examples of cross products where the unit vectors do not appear in the cyclic order. These products have the negative sign.<\/p>\n<\/div>\n<\/div>\n<p id=\"fs-id1167131362435\">Suppose we want to find the cross product $$ \\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B} $$ for vectors $$ \\overset{\\to }{A}={A}_{x}\\hat{i}+{A}_{y}\\hat{j}+{A}_{z}\\hat{k} $$ and $$ \\overset{\\to }{B}={B}_{x}\\hat{i}+{B}_{y}\\hat{j}+{B}_{z}\\hat{k}$$. We can use the distributive property (<a class=\"autogenerated-content\" href=\"#fs-id1167134990693\">(Figure)<\/a>), the anticommutative property (<a class=\"autogenerated-content\" href=\"#fs-id1167130202099\">(Figure)<\/a>), and the results in <a class=\"autogenerated-content\" href=\"#fs-id1167131180024\">(Figure)<\/a> and <a class=\"autogenerated-content\" href=\"#fs-id1167131615668\">(Figure)<\/a> for unit vectors to perform the following algebra:<\/p>\n<div id=\"fs-id1167131281752\" class=\"unnumbered\">$$\\begin{array}{ccc}\\hfill \\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B}&amp; =\\hfill &amp; ({A}_{x}\\hat{i}+{A}_{y}\\hat{j}+{A}_{z}\\hat{k})\\,\u00d7\\,({B}_{x}\\hat{i}+{B}_{y}\\hat{j}+{B}_{z}\\hat{k})\\hfill \\\\ &amp; =\\hfill &amp; {A}_{x}\\hat{i}\\,\u00d7\\,({B}_{x}\\hat{i}+{B}_{y}\\hat{j}+{B}_{z}\\hat{k})+{A}_{y}\\hat{j}\\,\u00d7\\,({B}_{x}\\hat{i}+{B}_{y}\\hat{j}+{B}_{z}\\hat{k})+{A}_{z}\\hat{k}\\,\u00d7\\,({B}_{x}\\hat{i}+{B}_{y}\\hat{j}+{B}_{z}\\hat{k})\\hfill \\\\ &amp; =\\hfill &amp; \\enspace{A}_{x}{B}_{x}\\hat{i}\\,\u00d7\\,\\hat{i}+{A}_{x}{B}_{y}\\hat{i}\\,\u00d7\\,\\hat{j}+{A}_{x}{B}_{z}\\hat{i}\\,\u00d7\\,\\hat{k}\\hfill \\\\ &amp; &amp; +{A}_{y}{B}_{x}\\hat{j}\\,\u00d7\\,\\hat{i}+{A}_{y}{B}_{y}\\hat{j}\\,\u00d7\\,\\hat{j}+{A}_{y}{B}_{z}\\hat{j}\\,\u00d7\\,\\hat{k}\\hfill \\\\ &amp; &amp; +{A}_{z}{B}_{x}\\hat{k}\\,\u00d7\\,\\hat{i}+{A}_{z}{B}_{y}\\hat{k}\\,\u00d7\\,\\hat{j}+{A}_{z}{B}_{z}\\hat{k}\\,\u00d7\\,\\hat{k}\\hfill \\\\ &amp; =\\hfill &amp; \\enspace{A}_{x}{B}_{x}(0)+{A}_{x}{B}_{y}(+\\hat{k})+{A}_{x}{B}_{z}(\\text{\u2212}\\hat{j})\\hfill \\\\ &amp; &amp; +{A}_{y}{B}_{x}(\\text{\u2212}\\hat{k})+{A}_{y}{B}_{y}(0)+{A}_{y}{B}_{z}(+\\hat{i})\\hfill \\\\ &amp; &amp; +{A}_{z}{B}_{x}(+\\hat{j})+{A}_{z}{B}_{y}(\\text{\u2212}\\hat{i})+{A}_{z}{B}_{z}(0).\\hfill \\end{array}$$<\/div>\n<p id=\"fs-id1167131405683\">When performing algebraic operations involving the cross product, be very careful about keeping the correct order of multiplication because the cross product is anticommutative. The last two steps that we still have to do to complete our task are, first, grouping the terms that contain a common unit vector and, second, factoring. In this way we obtain the following very useful expression for the computation of the cross product:<\/p>\n<div id=\"fs-id1167131238835\" class=\"equation-callout\">\n<div id=\"fs-id1167131238839\">$$\\overset{\\to }{C}=\\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B}=({A}_{y}{B}_{z}-{A}_{z}{B}_{y})\\hat{i}+({A}_{z}{B}_{x}-{A}_{x}{B}_{z})\\hat{j}+({A}_{x}{B}_{y}-{A}_{y}{B}_{x})\\hat{k}.$$<\/div>\n<\/div>\n<p id=\"fs-id1167130057299\">In this expression, the scalar components of the cross-product vector are<\/p>\n<div id=\"fs-id1167131237590\">$$\\{\\begin{array}{c}{C}_{x}={A}_{y}{B}_{z}-{A}_{z}{B}_{y},\\\\ {C}_{y}={A}_{z}{B}_{x}-{A}_{x}{B}_{z},\\\\ {C}_{z}={A}_{x}{B}_{y}-{A}_{y}{B}_{x}.\\end{array}$$<\/div>\n<p id=\"fs-id1167131272392\">When finding the cross product, in practice, we can use either <a class=\"autogenerated-content\" href=\"#fs-id1167131455204\">(Figure)<\/a> or <a class=\"autogenerated-content\" href=\"#fs-id1167131238839\">(Figure)<\/a>, depending on which one of them seems to be less complex computationally. They both lead to the same final result. One way to make sure if the final result is correct is to use them both.<\/p>\n<div id=\"fs-id1167130051007\" class=\"textbox examples\">\n<h3>Example<\/h3>\n<h4>A Particle in a Magnetic Field<\/h4>\n<p>When moving in a magnetic field, some particles may experience a magnetic force. Without going into details\u2014a detailed study of magnetic phenomena comes in later chapters\u2014let\u2019s acknowledge that the magnetic field $$ \\overset{\\to }{B} $$ is a vector, the magnetic force $$ \\overset{\\to }{F} $$ is a vector, and the velocity $$ \\overset{\\to }{u} $$ of the particle is a vector. The magnetic force vector is proportional to the vector product of the velocity vector with the magnetic field vector, which we express as $$ \\overset{\\to }{F}=\\zeta \\overset{\\to }{u}\\,\u00d7\\,\\overset{\\to }{B}$$. In this equation, a constant $$ \\zeta  $$ takes care of the consistency in physical units, so we can omit physical units on vectors $$ \\overset{\\to }{u} $$ and $$ \\overset{\\to }{B}$$. In this example, let\u2019s assume the constant $$ \\zeta  $$ is positive.<\/p>\n<p id=\"fs-id1167134632269\">A particle moving in space with velocity vector $$ \\overset{\\to }{u}=-5.0\\hat{i}-2.0\\hat{j}+3.5\\hat{k} $$ enters a region with a magnetic field and experiences a magnetic force. Find the magnetic force $$ \\overset{\\to }{F} $$ on this particle at the entry point to the region where the magnetic field vector is (a) $$ \\overset{\\to }{B}=7.2\\hat{i}-\\hat{j}-2.4\\hat{k} $$ and (b) $$ \\overset{\\to }{B}=4.5\\hat{k}$$. In each case, find magnitude <em>F<\/em> of the magnetic force and angle $$ \\theta  $$ the force vector $$ \\overset{\\to }{F} $$ makes with the given magnetic field vector $$ \\overset{\\to }{B}$$.<\/p>\n<h4>Strategy<\/h4>\n<p>First, we want to find the vector product $$ \\overset{\\to }{u}\\,\u00d7\\,\\overset{\\to }{B}$$, because then we can determine the magnetic force using $$ \\overset{\\to }{F}=\\zeta \\overset{\\to }{u}\\,\u00d7\\,\\overset{\\to }{B}$$. Magnitude <em>F<\/em> can be found either by using components, $$ F=\\sqrt{{F}_{x}^{2}+{F}_{y}^{2}+{F}_{z}^{2}}$$, or by computing the magnitude $$ |\\overset{\\to }{u}\\,\u00d7\\,\\overset{\\to }{B}| $$ directly using <a class=\"autogenerated-content\" href=\"#fs-id1167131455204\">(Figure)<\/a>. In the latter approach, we would have to find the angle between vectors $$ \\overset{\\to }{u} $$ and $$ \\overset{\\to }{B}$$. When we have $$ \\overset{\\to }{F}$$, the general method for finding the direction angle $$ \\theta  $$ involves the computation of the scalar product $$ \\overset{\\to }{F}\u00b7\\overset{\\to }{B} $$ and substitution into <a class=\"autogenerated-content\" href=\"#fs-id1167134723856\">(Figure)<\/a>. To compute the vector product we can either use <a class=\"autogenerated-content\" href=\"#fs-id1167131238839\">(Figure)<\/a> or compute the product directly, whichever way is simpler.<\/p>\n<h4>Solution<\/h4>\n<p id=\"fs-id1167131541788\">\n<div class=\"qa-wrapper\" style=\"display: block\"><span class=\"show-answer collapsed\" style=\"cursor: pointer\" data-target=\"q230259\">Show Answer<\/span><\/p>\n<div id=\"q230259\" class=\"hidden-answer\" style=\"display: none\">The components of the velocity vector are $$ {u}_{x}=-5.0$$, $$ {u}_{y}=-2.0$$, and $$ {u}_{z}=3.5$$.<\/p>\n<p>(a) The components of the magnetic field vector are $$ {B}_{x}=7.2$$, $$ {B}_{y}=-1.0$$, and $$ {B}_{z}=-2.4$$. Substituting them into (Figure) gives the scalar components of vector $$ \\overset{\\to }{F}=\\zeta \\overset{\\to }{u}\\,\u00d7\\,\\overset{\\to }{B}$$:<\/p>\n<p>$$\\{\\begin{array}{l}{F}_{x}=\\zeta ({u}_{y}{B}_{z}-{u}_{z}{B}_{y})=\\zeta [(-2.0)(-2.4)-(3.5)(-1.0)]=8.3\\zeta \\\\ {F}_{y}=\\zeta ({u}_{z}{B}_{x}-{u}_{x}{B}_{z})=\\zeta [(3.5)(7.2)-(-5.0)(-2.4)]=13.2\\zeta \\\\ {F}_{z}=\\zeta ({u}_{x}{B}_{y}-{u}_{y}{B}_{x})=\\zeta [(-5.0)(-1.0)-(-2.0)(7.2)]=19.4\\zeta \\end{array}.$$<\/p>\n<p>Thus, the magnetic force is $$ \\overset{\\to }{F}=\\zeta (8.3\\hat{i}+13.2\\hat{j}+19.4\\hat{k}) $$ and its magnitude is<\/p>\n<p>$$F=\\sqrt{{F}_{x}^{2}+{F}_{y}^{2}+{F}_{z}^{2}}=\\zeta \\sqrt{{(8.3)}^{2}+{(13.2)}^{2}+{(19.4)}^{2}}=24.9\\zeta . $$ To compute angle $$ \\theta $$, we may need to find the magnitude of the magnetic field vector,<\/p>\n<p>$$B=\\sqrt{{B}_{x}^{2}+{B}_{y}^{2}+{B}_{z}^{2}}=\\sqrt{{(7.2)}^{2}+{(-1.0)}^{2}+{(-2.4)}^{2}}=7.6, $$ and the scalar product $$ \\overset{\\to }{F}\u00b7\\overset{\\to }{B}$$:<\/p>\n<p>$$\\overset{\\to }{F}\u00b7\\overset{\\to }{B}={F}_{x}{B}_{x}+{F}_{y}{B}_{y}+{F}_{z}{B}_{z}=(8.3\\zeta )(7.2)+(13.2\\zeta )(-1.0)+(19.4\\zeta )(-2.4)=0. $$ Now, substituting into (Figure) gives angle $$ \\theta $$:<\/p>\n<p>$$\\text{cos}\\,\\theta =\\frac{\\overset{\\to }{F}\u00b7\\overset{\\to }{B}}{FB}=\\frac{0}{(18.2\\zeta )(7.6)}=0\\,\u21d2\\enspace\\theta =90\\text{\u00b0}.$$<\/p>\n<p>Hence, the magnetic force vector is perpendicular to the magnetic field vector. (We could have saved some time if we had computed the scalar product earlier.)<\/p>\n<p>(b) Because vector $$ \\overset{\\to }{B}=4.5\\hat{k} $$ has only one component, we can perform the algebra quickly and find the vector product directly:<\/p>\n<p>$$\\begin{array}{ll}\\hfill \\overset{\\to }{F}&amp; =\\zeta \\overset{\\to }{u}\\,\u00d7\\,\\overset{\\to }{B}=\\zeta (-5.0\\hat{i}-2.0\\hat{j}+3.5\\hat{k})\\,\u00d7\\,(4.5\\hat{k})\\hfill \\\\ &amp; =\\zeta [(-5.0)(4.5)\\hat{i}\\,\u00d7\\,\\hat{k}+(-2.0)(4.5)\\hat{j}\\,\u00d7\\,\\hat{k}+(3.5)(4.5)\\hat{k}\\,\u00d7\\,\\hat{k}]\\hfill \\\\ &amp; =\\zeta [-22.5(\\text{\u2212}\\hat{j})-9.0(+\\hat{i})+0]=\\zeta (-9.0\\hat{i}+22.5\\hat{j}).\\hfill \\end{array} $$ The magnitude of the magnetic force is<\/p>\n<p>$$F=\\sqrt{{F}_{x}^{2}+{F}_{y}^{2}+{F}_{z}^{2}}=\\zeta \\sqrt{{(-9.0)}^{2}+{(22.5)}^{2}+{(0.0)}^{2}}=24.2\\zeta . $$ Because the scalar product is<\/p>\n<p>$$\\overset{\\to }{F}\u00b7\\overset{\\to }{B}={F}_{x}{B}_{x}+{F}_{y}{B}_{y}+{F}_{z}{B}_{z}=(-9.0\\zeta )(0)+(22.5\\zeta )(0)+(0)(4.5)=0, $$ the magnetic force vector $$ \\overset{\\to }{F} $$ is perpendicular to the magnetic field vector $$ \\overset{\\to }{B}$$.<\/p><\/div>\n<\/div>\n<h4>Significance<\/h4>\n<p>Even without actually computing the scalar product, we can predict that the magnetic force vector must always be perpendicular to the magnetic field vector because of the way this vector is constructed. Namely, the magnetic force vector is the vector product $$ \\overset{\\to }{F}=\\zeta \\overset{\\to }{u}\\,\u00d7\\,\\overset{\\to }{B} $$ and, by the definition of the vector product (see <a class=\"autogenerated-content\" href=\"#CNX_UPhysics_02_04_prod-V\">(Figure)<\/a>), vector $$ \\overset{\\to }{F} $$ must be perpendicular to both vectors $$ \\overset{\\to }{u} $$ and $$ \\overset{\\to }{B}$$.<\/p>\n<\/div>\n<div id=\"fs-id1167134821180\" class=\"textbox exercises check-understanding\">\n<h3>Check Your Understanding<\/h3>\n<div id=\"fs-id1167131613173\" class=\"problem textbox\">\n<div id=\"fs-id1167131613175\">\n<p id=\"fs-id1167131613177\">Given two vectors $$ \\overset{\\to }{A}=\\text{\u2212}\\hat{i}+\\hat{j} $$ and $$ \\overset{\\to }{B}=3\\hat{i}-\\hat{j}$$, find (a) $$ \\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B}$$, (b) $$ |\\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B}|$$, (c) the angle between $$ \\overset{\\to }{A} $$ and $$ \\overset{\\to }{B}$$, and (d) the angle between $$ \\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B} $$ and vector $$ \\overset{\\to }{C}=\\hat{i}+\\hat{k}$$.<\/p>\n<\/div>\n<div id=\"fs-id1167134946260\" class=\"solution\">\n<div class=\"qa-wrapper\" style=\"display: block\"><span class=\"show-answer collapsed\" style=\"cursor: pointer\" data-target=\"qfs-id1167134946260\">Show Solution<\/span><\/p>\n<div id=\"qfs-id1167134946260\" class=\"hidden-answer\" style=\"display: none\">\n<p id=\"fs-id1167134946262\">a. $$ -2\\hat{k}$$, b. 2, c. $$ 153.4\\text{\u00b0}$$, d. $$ 135\\text{\u00b0}$$<\/p>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<p id=\"fs-id1167134912214\">In conclusion to this section, we want to stress that \u201cdot product\u201d and \u201ccross product\u201d are entirely different mathematical objects that have different meanings. The dot product is a scalar; the cross product is a vector. Later chapters use the terms <em>dot product<\/em> and <em>scalar product<\/em> interchangeably. Similarly, the terms <em>cross product<\/em> and <em>vector product<\/em> are used interchangeably.<\/p>\n<\/div>\n<div id=\"fs-id1167131161835\" class=\"textbox key-takeaways\">\n<h3>Summary<\/h3>\n<ul id=\"fs-id1167131547520\">\n<li>There are two kinds of multiplication for vectors. One kind of multiplication is the scalar product, also known as the dot product. The other kind of multiplication is the vector product, also known as the cross product. The scalar product of vectors is a number (scalar). The vector product of vectors is a vector.<\/li>\n<li>Both kinds of multiplication have the distributive property, but only the scalar product has the commutative property. The vector product has the anticommutative property, which means that when we change the order in which two vectors are multiplied, the result acquires a minus sign.<\/li>\n<li>The scalar product of two vectors is obtained by multiplying their magnitudes with the cosine of the angle between them. The scalar product of orthogonal vectors vanishes; the scalar product of antiparallel vectors is negative.<\/li>\n<li>The vector product of two vectors is a vector perpendicular to both of them. Its magnitude is obtained by multiplying their magnitudes by the sine of the angle between them. The direction of the vector product can be determined by the corkscrew right-hand rule. The vector product of two either parallel or antiparallel vectors vanishes. The magnitude of the vector product is largest for orthogonal vectors.<\/li>\n<li>The scalar product of vectors is used to find angles between vectors and in the definitions of derived scalar physical quantities such as work or energy.<\/li>\n<li>The cross product of vectors is used in definitions of derived vector physical quantities such as torque or magnetic force, and in describing rotations.<\/li>\n<\/ul>\n<\/div>\n<div id=\"fs-id1167131588273\" class=\"key-equations\">\n<h3>Key Equations<\/h3>\n<table id=\"fs-id1170904052814\" class=\"unnumbered unstyled\" summary=\"This table gives the following formulae: Multiplication by a scalar, vector equation, vector B equal to alpha vector A, Multiplication by a scalar, scalar equation for magnitudes, B equal to modulus of alpha, multiplied by A; Resultant of two vectors, Vector D subscript AD equal to vector D subscript AC plus vector D subscript CD; Commutative law, Vector A plus vector B equal to vector B plus vector A; Associative law, open parentheses vector A plus vector B close parentheses plus vector C equal to vector A plus open parentheses vector B plus vector C close parentheses; Distributive law, alpha 1 vector A plus alpha 2 vector A equal to open parentheses alpha 1 plus alpha 2 close parentheses vector A; The component form of a vector in two dimensions, vector A equal to Ax i hat plus Ay j hat; Scalar components of a vector in two dimensions, Ax equal to xe minus xb and Ay equal to ye minus yb; Magnitude of a vector in a plane, A equal to square root of Ax squared plus Ay squared end of root; The direction angle of a vector in a plane, theta A equal to tan inverse of open parentheses Ay upon Ax close parentheses; Scalar components of a vector in a plane, Ax equal to A cos theta A and Ay equal to A sine theta A; Polar coordinates in a plane, x equal to r cos phi and y equal to r sine phi; The component form of a vector in three dimensions, vector A equal to Ax i hat plus Ay j hat plus Az k hat; The scalar z-component of a vector in three dimensions, Az equal to ze minus zb; Magnitude of a vector in three dimensions, A equal to square root of Ax squared plus Ay squared plus Az squared end of root; Distributive property, alpha open parentheses vector A plus vector B close parentheses equal to alpha vector A plus alpha vector B; Antiparallel vector to vector A, minus vector A equal to minus Ax i hat minus Ay j hat minus Az k hat; Equal vectors, vector A equal to vector B corresponds to Ax equal to Bx, Ay equal to By, Az equal to Bz; Components of the resultant of vectors, F subscript Rx equal to summation k from 1 to N of Fx equal to F subscript 1x plus F subscript 2x plus plus till F subscript Nx, F subscript Ry equal to summation k from 1 to N of Fy equal to F subscript 1y plus F subscript 2y plus plus till F subscript Ny, F subscript Rz equal to summation k from 1 to N of Fz equal to F subscript 1z plus F subscript 2z plus plus till F subscript Nz; General unit vector, V hat equal to V vector upon V; Definition of the scalar product, vector A dot vector B equal to AB cos phi; Commutative property of the scalar product, vector A dot vector B equal to vector B dot vector A; Distributive property of the scalar product, vector A dot vector B plus vector C equal to vector A dot vector B plus vector A dot vector C; Scalar product in terms of scalar components of vectors, vector A dot vector B equal to Ax Bx plus Ay By plus Az Bz; Cosine of the angle between two vectors, cos phi equal to vector A dot vector B upon AB; Dot products of unit vectors, i hat dot j hat equal to j hat k hat equal to k hat i hat equal to zero; Magnitude of the vector product (definition), mod of vector A cross vector B end of modulus equal to AB sine phi; Anticommutative property of the vector product; vector A cross vector B equal to minus vector B cross vector A; Distributive property of the vector product, vector A cross open parentheses vector B plus vector C close parentheses equal to vector A cross vector B plus vector A cross vector C; Cross products of unit vectors, i hat cross j hat equal to plus k hat, j hat cross k hat equal to plus i hat, k hat cross i hat equal to plus j hat; The cross product in terms of scalar components of vectors, vector A cross vector B equal to open parentheses Ay Bz minus Az By close parentheses i hat plus open parentheses Az Bx minus Ax Bz close parentheses j hat plus open parentheses Ax By minus Ay Bx close parentheses k hat.\">\n<tbody>\n<tr>\n<td>Multiplication by a scalar (vector equation)<\/td>\n<td>$$\\overset{\\to }{B}=\\alpha \\overset{\\to }{A}$$<\/td>\n<\/tr>\n<tr>\n<td>Multiplication by a scalar (scalar equation for magnitudes)<\/td>\n<td>$$B=|\\alpha |A$$<\/td>\n<\/tr>\n<tr>\n<td>Resultant of two vectors<\/td>\n<td>$${\\overset{\\to }{D}}_{AD}={\\overset{\\to }{D}}_{AC}+{\\overset{\\to }{D}}_{CD}$$<\/td>\n<\/tr>\n<tr>\n<td>Commutative law<\/td>\n<td>$$\\overset{\\to }{A}+\\overset{\\to }{B}=\\overset{\\to }{B}+\\overset{\\to }{A}$$<\/td>\n<\/tr>\n<tr>\n<td>Associative law<\/td>\n<td>$$(\\overset{\\to }{A}+\\overset{\\to }{B})+\\overset{\\to }{C}=\\overset{\\to }{A}+(\\overset{\\to }{B}+\\overset{\\to }{C})$$<\/td>\n<\/tr>\n<tr>\n<td>Distributive law<\/td>\n<td>$${\\alpha }_{1}\\overset{\\to }{A}+{\\alpha }_{2}\\overset{\\to }{A}=({\\alpha }_{1}+{\\alpha }_{2})\\overset{\\to }{A}$$<\/td>\n<\/tr>\n<tr>\n<td>The component form of a vector in two dimensions<\/td>\n<td>$$\\overset{\\to }{A}={A}_{x}\\hat{i}+{A}_{y}\\hat{j}$$<\/td>\n<\/tr>\n<tr>\n<td>Scalar components of a vector in two dimensions<\/td>\n<td>$$\\{\\begin{array}{c}{A}_{x}={x}_{e}-{x}_{b}\\hfill \\\\ {A}_{y}={y}_{e}-{y}_{b}\\hfill \\end{array}$$<\/td>\n<\/tr>\n<tr>\n<td>Magnitude of a vector in a plane<\/td>\n<td>$$A=\\sqrt{{A}_{x}^{2}+{A}_{y}^{2}}$$<\/td>\n<\/tr>\n<tr>\n<td>The direction angle of a vector in a plane<\/td>\n<td>$${\\theta }_{A}={\\text{tan}}^{-1}(\\frac{{A}_{y}}{{A}_{x}})$$<\/td>\n<\/tr>\n<tr>\n<td>Scalar components of a vector in a plane<\/td>\n<td>$$\\{\\begin{array}{c}{A}_{x}=A\\,\\text{cos}\\,{\\theta }_{A}\\hfill \\\\ {A}_{y}=A\\,\\text{sin}\\,{\\theta }_{A}\\hfill \\end{array}$$<\/td>\n<\/tr>\n<tr>\n<td>Polar coordinates in a plane<\/td>\n<td>$$\\{\\begin{array}{c}x=r\\,\\text{cos}\\,\\phi \\hfill \\\\ y=r\\,\\text{sin}\\,\\phi \\hfill \\end{array}$$<\/td>\n<\/tr>\n<tr>\n<td>The component form of a vector in three dimensions<\/td>\n<td>$$\\overset{\\to }{A}={A}_{x}\\hat{i}+{A}_{y}\\hat{j}+{A}_{z}\\hat{k}$$<\/td>\n<\/tr>\n<tr>\n<td>The scalar <em>z<\/em>-component of a vector in three dimensions<\/td>\n<td>$${A}_{z}={z}_{e}-{z}_{b}$$<\/td>\n<\/tr>\n<tr>\n<td>Magnitude of a vector in three dimensions<\/td>\n<td>$$A=\\sqrt{{A}_{x}^{2}+{A}_{y}^{2}+{A}_{z}^{2}}$$<\/td>\n<\/tr>\n<tr>\n<td>Distributive property<\/td>\n<td>$$\\alpha (\\overset{\\to }{A}+\\overset{\\to }{B})=\\alpha \\overset{\\to }{A}+\\alpha \\overset{\\to }{B}$$<\/td>\n<\/tr>\n<tr>\n<td>Antiparallel vector to $$ \\overset{\\to }{A}$$<\/td>\n<td>$$\\text{\u2212}\\overset{\\to }{A}=\\text{\u2212}{A}_{x}\\hat{i}-{A}_{y}\\hat{j}-{A}_{z}\\hat{k}$$<\/td>\n<\/tr>\n<tr>\n<td>Equal vectors<\/td>\n<td>$$\\overset{\\to }{A}=\\overset{\\to }{B}\\enspace\u21d4\\enspace\\{\\begin{array}{c}{A}_{x}={B}_{x}\\hfill \\\\ {A}_{y}={B}_{y}\\hfill \\\\ {A}_{z}={B}_{z}\\hfill \\end{array}$$<\/td>\n<\/tr>\n<tr>\n<td>Components of the resultant of <em>N<\/em> vectors<\/td>\n<td>$$\\{\\begin{array}{c}{F}_{Rx}=\\sum _{k=1}^{N}{F}_{kx}={F}_{1x}+{F}_{2x}+\\text{\u2026}+{F}_{Nx}\\hfill \\\\ {F}_{Ry}=\\sum _{k=1}^{N}{F}_{ky}={F}_{1y}+{F}_{2y}+\\text{\u2026}+{F}_{Ny}\\hfill \\\\ {F}_{Rz}=\\sum _{k=1}^{N}{F}_{kz}={F}_{1z}+{F}_{2z}+\\text{\u2026}+{F}_{Nz}\\hfill \\end{array}$$<\/td>\n<\/tr>\n<tr>\n<td>General unit vector<\/td>\n<td>$$\\hat{V}=\\frac{\\overset{\\to }{V}}{V}$$<\/td>\n<\/tr>\n<tr>\n<td>Definition of the scalar product<\/td>\n<td>$$\\overset{\\to }{A}\u00b7\\overset{\\to }{B}=AB\\,\\text{cos}\\,\\phi $$<\/td>\n<\/tr>\n<tr>\n<td>Commutative property of the scalar product<\/td>\n<td>$$\\overset{\\to }{A}\u00b7\\overset{\\to }{B}=\\overset{\\to }{B}\u00b7\\overset{\\to }{A}$$<\/td>\n<\/tr>\n<tr>\n<td>Distributive property of the scalar product<\/td>\n<td>$$\\overset{\\to }{A}\u00b7(\\overset{\\to }{B}+\\overset{\\to }{C})=\\overset{\\to }{A}\u00b7\\overset{\\to }{B}+\\overset{\\to }{A}\u00b7\\overset{\\to }{C}$$<\/td>\n<\/tr>\n<tr>\n<td>Scalar product in terms of scalar components of vectors<\/td>\n<td>$$\\overset{\\to }{A}\u00b7\\overset{\\to }{B}={A}_{x}{B}_{x}+{A}_{y}{B}_{y}+{A}_{z}{B}_{z}$$<\/td>\n<\/tr>\n<tr>\n<td>Cosine of the angle between two vectors<\/td>\n<td>$$\\text{cos}\\,\\phi =\\frac{\\overset{\\to }{A}\u00b7\\overset{\\to }{B}}{AB}$$<\/td>\n<\/tr>\n<tr>\n<td>Dot products of unit vectors<\/td>\n<td>$$\\hat{i}\u00b7\\hat{j}=\\hat{j}\u00b7\\hat{k}=\\hat{k}\u00b7\\hat{i}=0$$<\/td>\n<\/tr>\n<tr>\n<td>Magnitude of the vector product (definition)<\/td>\n<td>$$|\\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B}|=AB\\,\\text{sin}\\,\\phi $$<\/td>\n<\/tr>\n<tr>\n<td>Anticommutative property of the vector product<\/td>\n<td>$$\\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B}=\\text{\u2212}\\overset{\\to }{B}\\,\u00d7\\,\\overset{\\to }{A}$$<\/td>\n<\/tr>\n<tr>\n<td>Distributive property of the vector product<\/td>\n<td>$$\\overset{\\to }{A}\\,\u00d7\\,(\\overset{\\to }{B}+\\overset{\\to }{C})=\\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B}+\\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{C}$$<\/td>\n<\/tr>\n<tr>\n<td>Cross products of unit vectors<\/td>\n<td>$$\\{\\begin{array}{l}\\hat{i}\\,\u00d7\\,\\hat{j}=+\\hat{k},\\hfill \\\\ \\hat{j}\\,\u00d7\\,\\hat{k}=+\\hat{i},\\hfill \\\\ \\hat{k}\\,\u00d7\\,\\hat{i}=+\\hat{j}.\\hfill \\end{array}$$<\/td>\n<\/tr>\n<tr>\n<td>The cross product in terms of scalar<\/p>\n<p>components of vectors<\/td>\n<td>$$\\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B}=({A}_{y}{B}_{z}-{A}_{z}{B}_{y})\\hat{i}+({A}_{z}{B}_{x}-{A}_{x}{B}_{z})\\hat{j}+({A}_{x}{B}_{y}-{A}_{y}{B}_{x})\\hat{k}$$<\/td>\n<\/tr>\n<\/tbody>\n<\/table>\n<\/div>\n<div id=\"fs-id1167131130756\" class=\"review-conceptual-questions\">\n<h3>Conceptual Questions<\/h3>\n<div id=\"fs-id1167131432603\" class=\"problem textbox\">\n<div id=\"fs-id1167130161877\">\n<p id=\"fs-id1167130161880\">What is wrong with the following expressions? How can you correct them? (a) $$ C=\\overset{\\to }{A}\\overset{\\to }{B}$$, (b) $$ \\overset{\\to }{C}=\\overset{\\to }{A}\\overset{\\to }{B}$$, (c) $$ C=\\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B}$$, (d) $$ C=A\\overset{\\to }{B}$$, (e) $$ C+2\\overset{\\to }{A}=B$$, (f) $$ \\overset{\\to }{C}=A\\,\u00d7\\,\\overset{\\to }{B}$$, (g) $$ \\overset{\\to }{A}\u00b7\\overset{\\to }{B}=\\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B}$$, (h) $$ \\overset{\\to }{C}=2\\overset{\\to }{A}\u00b7\\overset{\\to }{B}$$, (i) $$ C=\\overset{\\to }{A}\\text{\/}\\overset{\\to }{B}$$, and (j) $$ C=\\overset{\\to }{A}\\text{\/}B$$.<\/p>\n<\/div>\n<div id=\"fs-id1167131124061\" class=\"solution\">\n<div class=\"qa-wrapper\" style=\"display: block\"><span class=\"show-answer collapsed\" style=\"cursor: pointer\" data-target=\"qfs-id1167131124061\">Show Solution<\/span><\/p>\n<div id=\"qfs-id1167131124061\" class=\"hidden-answer\" style=\"display: none\">\n<p id=\"fs-id1167134888551\">a. $$ C=\\overset{\\to }{A}\u00b7\\overset{\\to }{B}$$, b. $$ \\overset{\\to }{C}=\\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B} $$ or $$ \\overset{\\to }{C}=\\overset{\\to }{A}-\\overset{\\to }{B}$$, c. $$ \\overset{\\to }{C}=\\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B}$$, d. $$ \\overset{\\to }{C}=A\\overset{\\to }{B}$$, e. $$ \\overset{\\to }{C}+2\\overset{\\to }{A}=\\overset{\\to }{B}$$, f. $$ \\overset{\\to }{C}=\\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B}$$, g. left side is a scalar and right side is a vector, h. $$ \\overset{\\to }{C}=2\\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{B}$$, i. $$ \\overset{\\to }{C}=\\overset{\\to }{A}\\text{\/}B$$, j. $$ \\overset{\\to }{C}=\\overset{\\to }{A}\\text{\/}B$$<\/p>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<div id=\"fs-id1167131439605\" class=\"problem textbox\">\n<div id=\"fs-id1167131439607\">\n<p id=\"fs-id1167131490469\">If the cross product of two vectors vanishes, what can you say about their directions?<\/p>\n<\/div>\n<\/div>\n<div id=\"fs-id1167131134362\" class=\"problem textbox\">\n<div id=\"fs-id1167131134364\">\n<p id=\"fs-id1167131134367\">If the dot product of two vectors vanishes, what can you say about their directions?<\/p>\n<\/div>\n<div id=\"fs-id1167134660510\" class=\"solution\">\n<div class=\"qa-wrapper\" style=\"display: block\"><span class=\"show-answer collapsed\" style=\"cursor: pointer\" data-target=\"qfs-id1167134660510\">Show Solution<\/span><\/p>\n<div id=\"qfs-id1167134660510\" class=\"hidden-answer\" style=\"display: none\">\n<p id=\"fs-id1167134660512\">They are orthogonal.<\/p>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<div id=\"fs-id1167131563595\" class=\"problem textbox\">\n<div id=\"fs-id1167131563597\">\n<p id=\"fs-id1167134943470\">What is the dot product of a vector with the cross product that this vector has with another vector?<\/p>\n<\/div>\n<\/div>\n<\/div>\n<div id=\"fs-id1167131485319\" class=\"review-problems textbox exercises\">\n<h3>Problems<\/h3>\n<div id=\"fs-id1167130205821\" class=\"problem textbox\">\n<div id=\"fs-id1167130205823\">\n<p id=\"fs-id1167131545552\">Assuming the +<em>x<\/em>-axis is horizontal to the right for the vectors in the following figure, find the following scalar products: (a) $$ \\overset{\\to }{A}\u00b7\\overset{\\to }{C}$$, (b) $$ \\overset{\\to }{A}\u00b7\\overset{\\to }{F}$$, (c) $$ \\overset{\\to }{D}\u00b7\\overset{\\to }{C}$$, (d) $$ \\overset{\\to }{A}\u00b7(\\overset{\\to }{F}+2\\overset{\\to }{C})$$, (e) $$ \\hat{i}\u00b7\\overset{\\to }{B}$$, (f) $$ \\hat{j}\u00b7\\overset{\\to }{B}$$, (g) $$ (3\\hat{i}-\\hat{j})\u00b7\\overset{\\to }{B}$$, and (h) $$ \\hat{B}\u00b7\\overset{\\to }{B}$$.<\/p>\n<p><span id=\"fs-id1167131282537\"><img decoding=\"async\" src=\"https:\/\/s3-us-west-2.amazonaws.com\/courses-images\/wp-content\/uploads\/sites\/2952\/2018\/01\/31183852\/CNX_UPhysics_02_01_problems_img.jpg\" alt=\"The x y coordinate system has positive x to the right and positive y up. Vector A has magnitude 10.0 and points 30 degrees counterclockwise from the positive x direction. Vector B has magnitude 5.0 and points 53 degrees counterclockwise from the positive x direction. Vector C has magnitude 12.0 and points 60 degrees clockwise from the positive x direction. Vector D has magnitude 20.0 and points 37 degrees clockwise from the negative x direction. Vector F has magnitude 20.0 and points 30 degrees counterclockwise from the negative x direction.\" \/><\/span><\/p>\n<\/div>\n<\/div>\n<div id=\"fs-id1167131586956\" class=\"problem textbox\">\n<div id=\"fs-id1167131586959\">\n<p id=\"fs-id1167131270976\">Assuming the +<em>x<\/em>-axis is horizontal to the right for the vectors in the preceding figure, find (a) the component of vector $$ \\overset{\\to }{A} $$ along vector $$ \\overset{\\to }{C}$$, (b) the component of vector $$ \\overset{\\to }{C} $$ along vector $$ \\overset{\\to }{A}$$, (c) the component of vector $$ \\hat{i} $$ along vector $$ \\overset{\\to }{F}$$, and (d) the component of vector $$ \\overset{\\to }{F} $$ along vector $$ \\hat{i}$$.<\/p>\n<\/div>\n<div id=\"fs-id1167131466722\" class=\"solution\">\n<div class=\"qa-wrapper\" style=\"display: block\"><span class=\"show-answer collapsed\" style=\"cursor: pointer\" data-target=\"qfs-id1167131466722\">Show Solution<\/span><\/p>\n<div id=\"qfs-id1167131466722\" class=\"hidden-answer\" style=\"display: none\">\n<p id=\"fs-id1167131466725\">a. 8.66, b. 10.39, c. 0.866, d. 17.32<\/p>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<div id=\"fs-id1167134889697\" class=\"problem textbox\">\n<div id=\"fs-id1167134889699\">\n<p id=\"fs-id1167134889701\">Find the angle between vectors for (a) $$ \\overset{\\to }{D}=(-3.0\\hat{i}-4.0\\hat{j})\\text{m} $$ and $$ \\overset{\\to }{A}=(-3.0\\hat{i}+4.0\\hat{j})\\text{m} $$ and (b) $$ \\overset{\\to }{D}=(2.0\\hat{i}-4.0\\hat{j}+\\hat{k})\\text{m} $$ and $$ \\overset{\\to }{B}=(-2.0\\hat{i}+3.0\\hat{j}+2.0\\hat{k})\\text{m}$$.<\/p>\n<\/div>\n<\/div>\n<div id=\"fs-id1167129993856\" class=\"problem textbox\">\n<div id=\"fs-id1167129993858\">\n<p id=\"fs-id1167129993860\">Find the angles that vector $$ \\overset{\\to }{D}=(2.0\\hat{i}-4.0\\hat{j}+\\hat{k})\\text{m} $$ makes with the <em>x<\/em>-, <em>y<\/em>-, and <em>z<\/em>&#8211; axes.<\/p>\n<\/div>\n<div id=\"fs-id1167130204653\" class=\"solution\">\n<div class=\"qa-wrapper\" style=\"display: block\"><span class=\"show-answer collapsed\" style=\"cursor: pointer\" data-target=\"qfs-id1167130204653\">Show Solution<\/span><\/p>\n<div id=\"qfs-id1167130204653\" class=\"hidden-answer\" style=\"display: none\">\n<p id=\"fs-id1167130204655\">$${\\theta }_{i}=64.12\\text{\u00b0},{\\theta }_{j}=150.79\\text{\u00b0},{\\theta }_{k}=77.39\\text{\u00b0}$$<\/p>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<div id=\"fs-id1167131462688\" class=\"problem textbox\">\n<div id=\"fs-id1167131462690\">\n<p id=\"fs-id1167131462692\">Show that the force vector $$ \\overset{\\to }{D}=(2.0\\hat{i}-4.0\\hat{j}+\\hat{k})\\text{N} $$ is orthogonal to the force vector $$ \\overset{\\to }{G}=(3.0\\hat{i}+4.0\\hat{j}+10.0\\hat{k})\\text{N}$$.<\/p>\n<\/div>\n<\/div>\n<div id=\"fs-id1167130201986\" class=\"problem textbox\">\n<div id=\"fs-id1167130201989\">\n<p id=\"fs-id1167131375564\">Assuming the +<em>x<\/em>-axis is horizontal to the right for the vectors in the previous figure, find the following vector products: (a) $$ \\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{C}$$, (b) $$ \\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{F}$$, (c) $$ \\overset{\\to }{D}\\,\u00d7\\,\\overset{\\to }{C}$$, (d) $$ \\overset{\\to }{A}\\,\u00d7\\,(\\overset{\\to }{F}+2\\overset{\\to }{C})$$, (e) $$ \\hat{i}\\,\u00d7\\,\\overset{\\to }{B}$$, (f) $$ \\hat{j}\\,\u00d7\\,\\overset{\\to }{B}$$, (g) $$ (3\\hat{i}-\\hat{j})\\,\u00d7\\,\\overset{\\to }{B}$$, and (h) $$ \\hat{B}\\,\u00d7\\,\\overset{\\to }{B}$$.<\/p>\n<\/div>\n<div id=\"fs-id1167131591244\" class=\"solution\">\n<div class=\"qa-wrapper\" style=\"display: block\"><span class=\"show-answer collapsed\" style=\"cursor: pointer\" data-target=\"qfs-id1167131591244\">Show Solution<\/span><\/p>\n<div id=\"qfs-id1167131591244\" class=\"hidden-answer\" style=\"display: none\">\n<p id=\"fs-id1167134923008\">a. $$ -119.98\\hat{k}$$, b. $$ -173.2\\hat{k}$$, c. $$ +93.69\\hat{k}$$, d. $$ -413.2\\hat{k}$$, e. $$ +39.93\\hat{k}$$, f. $$ -30.09\\hat{k}$$, g. $$ +149.9\\hat{k}$$, h. 0<\/p>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<div id=\"fs-id1167131483573\" class=\"problem textbox\">\n<div id=\"fs-id1167131483575\">\n<p id=\"fs-id1167129980749\">Find the cross product $$ \\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{C} $$ for (a) $$ \\overset{\\to }{A}=2.0\\hat{i}-4.0\\hat{j}+\\hat{k} $$ and $$ \\overset{\\to }{C}=3.0\\hat{i}+4.0\\hat{j}+10.0\\hat{k}$$, (b) $$ \\overset{\\to }{A}=3.0\\hat{i}+4.0\\hat{j}+10.0\\hat{k} $$ and $$ \\overset{\\to }{C}=2.0\\hat{i}-4.0\\hat{j}+\\hat{k}$$, (c) $$ \\overset{\\to }{A}=-3.0\\hat{i}-4.0\\hat{j} $$ and $$ \\overset{\\to }{C}=-3.0\\hat{i}+4.0\\hat{j}$$, and (d) $$ \\overset{\\to }{C}=-2.0\\hat{i}+3.0\\hat{j}+2.0\\hat{k} $$ and $$ \\overset{\\to }{A}=-9.0\\hat{j}$$.<\/p>\n<\/div>\n<\/div>\n<div id=\"fs-id1167131540420\" class=\"problem textbox\">\n<div id=\"fs-id1167131540422\">\n<p id=\"fs-id1167131529010\">For the vectors in the earlier figure, find (a) $$ (\\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{F})\u00b7\\overset{\\to }{D}$$, (b) $$ (\\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{F})\u00b7(\\overset{\\to }{D}\\,\u00d7\\,\\overset{\\to }{B})$$, and (c) $$ (\\overset{\\to }{A}\u00b7\\overset{\\to }{F})(\\overset{\\to }{D}\\,\u00d7\\,\\overset{\\to }{B})$$.<\/p>\n<\/div>\n<div id=\"fs-id1167131575250\" class=\"solution\">\n<div class=\"qa-wrapper\" style=\"display: block\"><span class=\"show-answer collapsed\" style=\"cursor: pointer\" data-target=\"qfs-id1167131575250\">Show Solution<\/span><\/p>\n<div id=\"qfs-id1167131575250\" class=\"hidden-answer\" style=\"display: none\">\n<p id=\"fs-id1167131421480\">a. 0, b. 173,194, c. $$ +199,993\\hat{k}$$<\/p>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<div id=\"fs-id1167130224288\" class=\"problem textbox\">\n<div id=\"fs-id1167131526141\">\n<p id=\"fs-id1167131526144\">(a) If $$ \\overset{\\to }{A}\\,\u00d7\\,\\overset{\\to }{F}=\\overset{\\to }{B}\\,\u00d7\\,\\overset{\\to }{F}$$, can we conclude $$ \\overset{\\to }{A}=\\overset{\\to }{B}$$? (b) If $$ \\overset{\\to }{A}\u00b7\\overset{\\to }{F}=\\overset{\\to }{B}\u00b7\\overset{\\to }{F}$$, can we conclude $$ \\overset{\\to }{A}=\\overset{\\to }{B}$$? (c) If $$ F\\overset{\\to }{A}=\\overset{\\to }{B}F$$, can we conclude $$ \\overset{\\to }{A}=\\overset{\\to }{B}$$? Why or why not?<\/p>\n<\/div>\n<\/div>\n<\/div>\n<div id=\"fs-id1167131238995\" class=\"review-additional-problems\">\n<h3>Additional Problems<\/h3>\n<div id=\"fs-id1167131397018\" class=\"problem textbox\">\n<div id=\"fs-id1167131397020\">\n<p id=\"fs-id1167131397023\">You fly $$ 32.0\\,\\text{km} $$ in a straight line in still air in the direction $$ 35.0\\text{\u00b0} $$ south of west. (a) Find the distances you would have to fly due south and then due west to arrive at the same point. (b) Find the distances you would have to fly first in a direction $$ 45.0\\text{\u00b0} $$ south of west and then in a direction $$ 45.0\\text{\u00b0} $$ west of north. Note these are the components of the displacement along a different set of axes\u2014namely, the one rotated by $$ 45\\text{\u00b0} $$ with respect to the axes in (a).<\/p>\n<\/div>\n<div id=\"fs-id1167131608214\" class=\"solution\">\n<div class=\"qa-wrapper\" style=\"display: block\"><span class=\"show-answer collapsed\" style=\"cursor: pointer\" data-target=\"qfs-id1167131608214\">Show Solution<\/span><\/p>\n<div id=\"qfs-id1167131608214\" class=\"hidden-answer\" style=\"display: none\">\n<p id=\"fs-id1167131608216\">a. 18.4 km and 26.2 km, b. 31.5 km and 5.56 km<\/p>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<div id=\"fs-id1167131182898\" class=\"problem textbox\">\n<div id=\"fs-id1167131182900\">\n<p id=\"fs-id1167131182902\">Rectangular coordinates of a point are given by (2, <em>y<\/em>) and its polar coordinates are given by $$ (r,\\pi \\text{\/}6)$$. Find <em>y<\/em> and <em>r<\/em>.<\/p>\n<\/div>\n<\/div>\n<div id=\"fs-id1167131200226\" class=\"problem textbox\">\n<div id=\"fs-id1167131200228\">\n<p id=\"fs-id1167131200230\">If the polar coordinates of a point are $$ (r,\\phi ) $$ and its rectangular coordinates are $$ (x,y)$$, determine the polar coordinates of the following points: (a) (\u2212<em>x<\/em>, <em>y<\/em>), (b) (\u22122<em>x<\/em>, \u22122<em>y<\/em>), and (c) (3<em>x<\/em>, \u22123<em>y<\/em>).<\/p>\n<\/div>\n<div id=\"fs-id1167134887251\" class=\"solution\">\n<div class=\"qa-wrapper\" style=\"display: block\"><span class=\"show-answer collapsed\" style=\"cursor: pointer\" data-target=\"qfs-id1167134887251\">Show Solution<\/span><\/p>\n<div id=\"qfs-id1167134887251\" class=\"hidden-answer\" style=\"display: none\">\n<p id=\"fs-id1167134887253\">a. $$ (r,\\phi +\\pi \\text{\/}2)$$, b. $$ (2r,\\phi +2\\pi )$$, (c) $$ (3r,\\text{\u2212}\\phi )$$<\/p>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<div id=\"fs-id1167131448284\" class=\"problem textbox\">\n<div id=\"fs-id1167131455145\">\n<p id=\"fs-id1167131455147\">Vectors $$ \\overset{\\to }{A} $$ and $$ \\overset{\\to }{B} $$ have identical magnitudes of 5.0 units. Find the angle between them if $$ \\overset{\\to }{A}+\\overset{\\to }{B}=5\\sqrt{2}\\hat{j}$$.<\/p>\n<\/div>\n<\/div>\n<div id=\"fs-id1167131376976\" class=\"problem textbox\">\n<div id=\"fs-id1167131376978\">\n<p id=\"fs-id1167131376980\">Starting at the island of Moi in an unknown archipelago, a fishing boat makes a round trip with two stops at the islands of Noi and Poi. It sails from Moi for 4.76 nautical miles (nmi) in a direction $$ 37\\text{\u00b0} $$ north of east to Noi. From Noi, it sails $$ 69\\text{\u00b0} $$ west of north to Poi. On its return leg from Poi, it sails $$ 28\\text{\u00b0} $$ east of south. What distance does the boat sail between Noi and Poi? What distance does it sail between Moi and Poi? Express your answer both in nautical miles and in kilometers. Note: 1 nmi = 1852 m.<\/p>\n<\/div>\n<div id=\"fs-id1167131436626\" class=\"solution\">\n<div class=\"qa-wrapper\" style=\"display: block\"><span class=\"show-answer collapsed\" style=\"cursor: pointer\" data-target=\"qfs-id1167131436626\">Show Solution<\/span><\/p>\n<div id=\"qfs-id1167131436626\" class=\"hidden-answer\" style=\"display: none\">\n<p id=\"fs-id1167131436628\">$${d}_{\\text{PM}}=33.12\\,\\text{nmi}=61.34\\,\\text{km},\\enspace{d}_{\\text{NP}}=35.47\\,\\text{nmi}=65.69\\,\\text{km}$$<\/p>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<div id=\"fs-id1167134435523\" class=\"problem textbox\">\n<div id=\"fs-id1167134435525\">\n<p id=\"fs-id1167134435527\">An air traffic controller notices two signals from two planes on the radar monitor. One plane is at altitude 800 m and in a 19.2-km horizontal distance to the tower in a direction $$ 25\\text{\u00b0} $$ south of west. The second plane is at altitude 1100 m and its horizontal distance is 17.6 km and $$ 20\\text{\u00b0} $$ south of west. What is the distance between these planes?<\/p>\n<\/div>\n<\/div>\n<div id=\"fs-id1167131514285\" class=\"problem textbox\">\n<div id=\"fs-id1167131514287\">\n<p id=\"fs-id1167131514289\">Show that when $$ \\overset{\\to }{A}+\\overset{\\to }{B}=\\overset{\\to }{C}$$, then $$ {C}^{2}={A}^{2}+{B}^{2}+2AB\\,\\text{cos}\\,\\phi $$, where $$ \\phi  $$ is the angle between vectors $$ \\overset{\\to }{A} $$ and $$ \\overset{\\to }{B}$$.<\/p>\n<\/div>\n<div id=\"fs-id1167131501386\" class=\"solution\">\n<div class=\"qa-wrapper\" style=\"display: block\"><span class=\"show-answer collapsed\" style=\"cursor: pointer\" data-target=\"qfs-id1167131501386\">Show Solution<\/span><\/p>\n<div id=\"qfs-id1167131501386\" class=\"hidden-answer\" style=\"display: none\">\n<p id=\"fs-id1167131501389\">proof<\/p>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<div id=\"fs-id1167131469964\" class=\"problem textbox\">\n<div id=\"fs-id1167131469966\">\n<p id=\"fs-id1167131469968\">Four force vectors each have the same magnitude <em>f<\/em>. What is the largest magnitude the resultant force vector may have when these forces are added? What is the smallest magnitude of the resultant? Make a graph of both situations.<\/p>\n<\/div>\n<\/div>\n<div id=\"fs-id1167131128625\" class=\"problem textbox\">\n<div id=\"fs-id1167131128628\">\n<p id=\"fs-id1167131128630\">A skater glides along a circular path of radius 5.00 m in clockwise direction. When he coasts around one-half of the circle, starting from the west point, find (a) the magnitude of his displacement vector and (b) how far he actually skated. (c) What is the magnitude of his displacement vector when he skates all the way around the circle and comes back to the west point?<\/p>\n<\/div>\n<div id=\"fs-id1167131128637\" class=\"solution\">\n<div class=\"qa-wrapper\" style=\"display: block\"><span class=\"show-answer collapsed\" style=\"cursor: pointer\" data-target=\"qfs-id1167131128637\">Show Solution<\/span><\/p>\n<div id=\"qfs-id1167131128637\" class=\"hidden-answer\" style=\"display: none\">\n<p id=\"fs-id1167131128639\">a. 10.00 m, b. $$ 5\\pi \\,\\text{m}$$, c. 0<\/p>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<div id=\"fs-id1167131127272\" class=\"problem textbox\">\n<div id=\"fs-id1167131127274\">\n<p id=\"fs-id1167131127276\">A stubborn dog is being walked on a leash by its owner. At one point, the dog encounters an interesting scent at some spot on the ground and wants to explore it in detail, but the owner gets impatient and pulls on the leash with force $$ \\overset{\\to }{F}=(98.0\\hat{i}+132.0\\hat{j}+32.0\\hat{k})\\text{N} $$ along the leash. (a) What is the magnitude of the pulling force? (b) What angle does the leash make with the vertical?<\/p>\n<\/div>\n<\/div>\n<div id=\"fs-id1167131515978\" class=\"problem textbox\">\n<div id=\"fs-id1167131515980\">\n<p id=\"fs-id1167131626949\">If the velocity vector of a polar bear is $$ \\overset{\\to }{u}=(-18.0\\hat{i}-13.0\\hat{j})\\text{km}\\text{\/}\\text{h}$$, how fast and in what geographic direction is it heading? Here, $$ \\hat{i} $$ and $$ \\hat{j} $$ are directions to geographic east and north, respectively.<\/p>\n<\/div>\n<div id=\"fs-id1167130010413\" class=\"solution\">\n<div class=\"qa-wrapper\" style=\"display: block\"><span class=\"show-answer collapsed\" style=\"cursor: pointer\" data-target=\"qfs-id1167130010413\">Show Solution<\/span><\/p>\n<div id=\"qfs-id1167130010413\" class=\"hidden-answer\" style=\"display: none\">\n<p id=\"fs-id1167130010415\">22.2 km\/h, $$ 35.8\\text{\u00b0} $$ south of west<\/p>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<div id=\"fs-id1167130010431\" class=\"problem textbox\">\n<div id=\"fs-id1167130010433\">\n<p id=\"fs-id1167130010435\">Find the scalar components of three-dimensional vectors $$ \\overset{\\to }{G} $$ and $$ \\overset{\\to }{H} $$ in the following figure and write the vectors in vector component form in terms of the unit vectors of the axes.<\/p>\n<p><span id=\"fs-id1167134965692\"><img decoding=\"async\" src=\"https:\/\/s3-us-west-2.amazonaws.com\/courses-images\/wp-content\/uploads\/sites\/2952\/2018\/01\/31184052\/CNX_UPhysics_02_02_problems_img.jpg\" alt=\"Vector G has magnitude 10.0. Its projection in the x y plane is between the positive x and positive y directions, at an angle of 45 degrees from the positive x direction. The angle between vector G and the positive z direction is 60 degrees. Vector H has magnitude 15.0. Its projection in the x y plane is between the negative x and positive y directions, at an angle of 30 degrees from the positive y direction. The angle between vector H and the positive z direction is 450 degrees.\" \/><\/span><\/p>\n<\/div>\n<\/div>\n<div id=\"fs-id1167129967943\" class=\"problem textbox\">\n<div id=\"fs-id1167129967945\">\n<p id=\"fs-id1167129967948\">A diver explores a shallow reef off the coast of Belize. She initially swims 90.0 m north, makes a turn to the east and continues for 200.0 m, then follows a big grouper for 80.0 m in the direction $$ 30\\text{\u00b0} $$ north of east. In the meantime, a local current displaces her by 150.0 m south. Assuming the current is no longer present, in what direction and how far should she now swim to come back to the point where she started?<\/p>\n<\/div>\n<div id=\"fs-id1167130051819\" class=\"solution\">\n<div class=\"qa-wrapper\" style=\"display: block\"><span class=\"show-answer collapsed\" style=\"cursor: pointer\" data-target=\"qfs-id1167130051819\">Show Solution<\/span><\/p>\n<div id=\"qfs-id1167130051819\" class=\"hidden-answer\" style=\"display: none\">\n<p id=\"fs-id1167130051821\">240.2 m, $$ 2.2\\text{\u00b0} $$ south of west<\/p>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<div id=\"fs-id1167131389955\" class=\"problem textbox\">\n<div id=\"fs-id1167131389958\">\n<p id=\"fs-id1167131389960\">A force vector $$ \\overset{\\to }{A} $$ has <em>x<\/em>&#8211; and <em>y<\/em>-components, respectively, of \u22128.80 units of force and 15.00 units of force. The <em>x<\/em>&#8211; and <em>y<\/em>-components of force vector $$ \\overset{\\to }{B} $$ are, respectively, 13.20 units of force and \u22126.60 units of force. Find the components of force vector $$ \\overset{\\to }{C} $$ that satisfies the vector equation $$ \\overset{\\to }{A}-\\overset{\\to }{B}+3\\overset{\\to }{C}=0$$.<\/p>\n<\/div>\n<\/div>\n<div id=\"fs-id1167134724436\" class=\"problem textbox\">\n<div id=\"fs-id1167134724438\">\n<p id=\"fs-id1167134724440\">Vectors $$ \\overset{\\to }{A} $$ and $$ \\overset{\\to }{B} $$ are two orthogonal vectors in the <em>xy<\/em>-plane and they have identical magnitudes. If $$ \\overset{\\to }{A}=3.0\\hat{i}+4.0\\hat{j}$$, find $$ \\overset{\\to }{B}$$.<\/p>\n<\/div>\n<div id=\"fs-id1167131091310\" class=\"solution\">\n<div class=\"qa-wrapper\" style=\"display: block\"><span class=\"show-answer collapsed\" style=\"cursor: pointer\" data-target=\"qfs-id1167131091310\">Show Solution<\/span><\/p>\n<div id=\"qfs-id1167131091310\" class=\"hidden-answer\" style=\"display: none\">\n<p id=\"fs-id1167131091313\">$$\\overset{\\to }{B}=-4.0\\hat{i}+3.0\\hat{j} $$ or $$ \\overset{\\to }{B}=4.0\\hat{i}-3.0\\hat{j}$$<\/p>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<div id=\"fs-id1167134886863\" class=\"problem textbox\">\n<div id=\"fs-id1167134886865\">\n<p id=\"fs-id1167134886867\">For the three-dimensional vectors in the following figure, find (a) $$ \\overset{\\to }{G}\\,\u00d7\\,\\overset{\\to }{H}$$, (b) $$ |\\overset{\\to }{G}\\,\u00d7\\,\\overset{\\to }{H}|$$, and (c) $$ \\overset{\\to }{G}\u00b7\\overset{\\to }{H}$$.<\/p>\n<p><span id=\"fs-id1167131482624\"><img decoding=\"async\" src=\"https:\/\/s3-us-west-2.amazonaws.com\/courses-images\/wp-content\/uploads\/sites\/2952\/2018\/01\/31184052\/CNX_UPhysics_02_02_problems_img.jpg\" alt=\"Vector G has magnitude 10.0. Its projection in the x y plane is between the positive x and positive y directions, at an angle of 45 degrees from the positive x direction. The angle between vector G and the positive z direction is 60 degrees. Vector H has magnitude 15.0. Its projection in the x y plane is between the negative x and positive y directions, at an angle of 30 degrees from the positive y direction. The angle between vector H and the positive z direction is 450 degrees.\" \/><\/span><\/p>\n<\/div>\n<\/div>\n<div id=\"fs-id1167131140153\" class=\"problem textbox\">\n<div id=\"fs-id1167131140155\">\n<p id=\"fs-id1167131140157\">Show that $$ (\\overset{\\to }{B}\\,\u00d7\\,\\overset{\\to }{C})\u00b7\\overset{\\to }{A} $$ is the volume of the parallelepiped, with edges formed by the three vectors in the following figure.<\/p>\n<p><span id=\"fs-id1167131160308\"><img decoding=\"async\" src=\"https:\/\/s3-us-west-2.amazonaws.com\/courses-images\/wp-content\/uploads\/sites\/2952\/2018\/01\/31184054\/CNX_UPhysics_02_04_piped_img.jpg\" alt=\"Vector G has magnitude 10.0. Its projection in the x y plane is between the positive x and positive y directions, at an angle of 45 degrees from the positive x direction. The angle between vector G and the positive z direction is 60 degrees. Vector H has magnitude 15.0. Its projection in the x y plane is between the negative x and positive y directions, at an angle of 30 degrees from the positive y direction. The angle between vector H and the positive z direction is 450 degrees.\" \/><\/span><\/p>\n<\/div>\n<div id=\"fs-id1167131423351\">\n<p id=\"fs-id1167131423353\">proof<\/p>\n<\/div>\n<\/div>\n<\/div>\n<div id=\"fs-id1167131423360\" class=\"review-challenge\">\n<h3>Challenge Problems<\/h3>\n<div id=\"fs-id1167130007383\" class=\"problem textbox\">\n<div id=\"fs-id1167130007385\">\n<p id=\"fs-id1167130007388\">Vector $$ \\overset{\\to }{B} $$ is 5.0 cm long and vector $$ \\overset{\\to }{A} $$ is 4.0 cm long. Find the angle between these two vectors when $$ |\\overset{\\to }{A}+\\overset{\\to }{B}|=\\,3.0\\,\\text{cm} $$ and $$ |\\overset{\\to }{A}-\\overset{\\to }{B}|=\\,3.0\\,\\text{cm}$$.<\/p>\n<\/div>\n<\/div>\n<div id=\"fs-id1167131503571\" class=\"problem textbox\">\n<div id=\"fs-id1167131503573\">\n<p id=\"fs-id1167131632115\">What is the component of the force vector $$ \\overset{\\to }{G}=(3.0\\hat{i}+4.0\\hat{j}+10.0\\hat{k})\\text{N} $$ along the force vector $$ \\overset{\\to }{H}=(1.0\\hat{i}+4.0\\hat{j})\\text{N}$$?<\/p>\n<\/div>\n<div id=\"fs-id1167129963920\" class=\"solution\">\n<div class=\"qa-wrapper\" style=\"display: block\"><span class=\"show-answer collapsed\" style=\"cursor: pointer\" data-target=\"qfs-id1167129963920\">Show Solution<\/span><\/p>\n<div id=\"qfs-id1167129963920\" class=\"hidden-answer\" style=\"display: none\">\n<p id=\"fs-id1167129963922\">$${G}_{\\perp }=2375\\sqrt{17}\\approx 9792$$<\/p>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<div id=\"fs-id1167131518912\" class=\"problem textbox\">\n<div id=\"fs-id1167131518915\">\n<p id=\"fs-id1167131518917\">The following figure shows a triangle formed by the three vectors $$ \\overset{\\to }{A}$$, $$ \\overset{\\to }{B}$$, and $$ \\overset{\\to }{C}$$. If vector $$ {\\overset{\\to }{C}}^{\\prime } $$ is drawn between the midpoints of vectors $$ \\overset{\\to }{A} $$ and $$ \\overset{\\to }{B}$$, show that $$ {\\overset{\\to }{C}}^{\\prime }=\\overset{\\to }{C}\\text{\/}2$$.<\/p>\n<p><span id=\"fs-id1167134937953\"><img decoding=\"async\" src=\"https:\/\/s3-us-west-2.amazonaws.com\/courses-images\/wp-content\/uploads\/sites\/2952\/2018\/01\/31184057\/CNX_UPhysics_02_04_triangle_img.jpg\" alt=\"Vectors A, B and C form a triangle. Vector A points up and right, vector B starts at the head of A and points down and right, and vector C starts at the head of B, ends at the tail of A and points to the left. Vector C prime is parallel to vector C and connects the midpoints of vectors A and B.\" \/><\/span><\/p>\n<\/div>\n<\/div>\n<div id=\"fs-id1167134883911\" class=\"problem textbox\">\n<div id=\"fs-id1167134883913\">\n<p id=\"fs-id1167131554928\">Distances between points in a plane do not change when a coordinate system is rotated. In other words, the magnitude of a vector is <em>invariant<\/em> under rotations of the coordinate system. Suppose a coordinate system S is rotated about its origin by angle $$ \\phi  $$ to become a new coordinate system $$ {\\text{S}}^{\\prime }$$, as shown in the following figure. A point in a plane has coordinates (<em>x<\/em>, <em>y<\/em>) in S and coordinates $$ ({x}^{\\prime },{y}^{\\prime }) $$ in $$ {\\text{S}}^{\\prime }$$.<\/p>\n<p id=\"fs-id1167129967376\">(a) Show that, during the transformation of rotation, the coordinates in $$ {\\text{S}}^{\\prime } $$ are expressed in terms of the coordinates in S by the following relations:<\/p>\n<div id=\"fs-id1167129967387\" class=\"unnumbered\">$$\\{\\begin{array}{c}{x}^{\\prime }=x\\,\\text{cos}\\,\\phi +y\\,\\text{sin}\\,\\phi \\\\ {y}^{\\prime }=\\text{\u2212}x\\,\\text{sin}\\,\\phi +y\\,\\text{cos}\\,\\phi \\end{array}.$$<\/div>\n<p id=\"fs-id1167134887327\">(b) Show that the distance of point <em>P<\/em> to the origin is invariant under rotations of the coordinate system. Here, you have to show that<\/p>\n<div id=\"fs-id1167134887336\" class=\"unnumbered\">$$\\sqrt{{x}^{2}+{y}^{2}}=\\sqrt{{{x}^{\\prime }}^{2}+{{y}^{\\prime }}^{2}}.$$<\/div>\n<p id=\"fs-id1167130002700\">(c) Show that the distance between points <em>P<\/em> and <em>Q<\/em> is invariant under rotations of the coordinate system. Here, you have to show that<\/p>\n<div id=\"fs-id1167131409536\" class=\"unnumbered\">$$\\sqrt{{({x}_{P}-{x}_{Q})}^{2}+{({y}_{P}-{y}_{Q})}^{2}}=\\sqrt{{({{x}^{\\prime }}_{P}-{{x}^{\\prime }}_{Q})}^{2}+{({{y}^{\\prime }}_{P}-{{y}^{\\prime }}_{Q})}^{2}}.$$<\/div>\n<p><span id=\"fs-id1167131327810\"><img decoding=\"async\" src=\"https:\/\/s3-us-west-2.amazonaws.com\/courses-images\/wp-content\/uploads\/sites\/2952\/2018\/01\/31184059\/CNX_UPhysics_02_04_challenge_img.jpg\" alt=\"Two coordinate systems are shown. The x y coordinate system S, in red, has positive x to to the right and positive y up. The x prime y prime coordinate system S prime, in blue, shares the same origin as S but is rotated relative to S counterclockwise an angle phi. Two points, P and Q are shown. Point P\u2019s x coordinate in frame S is shown as a dashed line from P to the x axis, drawn parallel to the y axis. Point P\u2019s y coordinate in frame S is shown as a dashed line from P to the y axis, drawn parallel to the x axis. Point P\u2019s x prime coordinate in frame S prime is shown as a dashed line from P to the x prime axis, drawn parallel to the y prime axis. Point P\u2019s y prime coordinate in frame S prime is shown as a dashed line from P to the y prime axis, drawn parallel to the x prime axis.\" \/><\/span><\/p>\n<\/div>\n<div id=\"fs-id1167131220245\">\n<p id=\"fs-id1167131220247\">proof<\/p>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"textbox shaded\">\n<h3>Glossary<\/h3>\n<dl id=\"fs-id1167131220257\">\n<dt><strong>anticommutative property<\/strong><\/dt>\n<dd id=\"fs-id1167131220262\">change in the order of operation introduces the minus sign<\/dd>\n<\/dl>\n<dl id=\"fs-id1167131220266\">\n<dt><strong>corkscrew right-hand rule<\/strong><\/dt>\n<dd id=\"fs-id1167134969664\">a rule used to determine the direction of the vector product<\/dd>\n<\/dl>\n<dl id=\"fs-id1167134969668\">\n<dt><strong>cross product<\/strong><\/dt>\n<dd id=\"fs-id1167134969673\">the result of the vector multiplication of vectors is a vector called a cross product; also called a vector product<\/dd>\n<\/dl>\n<dl id=\"fs-id1167134969678\">\n<dt><strong>dot product<\/strong><\/dt>\n<dd id=\"fs-id1167134969684\">the result of the scalar multiplication of two vectors is a scalar called a dot product; also called a scalar product<\/dd>\n<\/dl>\n<dl id=\"fs-id1167131606476\">\n<dt><strong>scalar product<\/strong><\/dt>\n<dd id=\"fs-id1167131606481\">the result of the scalar multiplication of two vectors is a scalar called a scalar product; also called a dot product<\/dd>\n<\/dl>\n<dl id=\"fs-id1167131606486\">\n<dt><strong>vector product<\/strong><\/dt>\n<dd id=\"fs-id1167131606492\">the result of the vector multiplication of vectors is a vector called a vector product; also called a cross product<\/dd>\n<\/dl>\n<\/div>\n\n\t\t\t <section class=\"citations-section\" role=\"contentinfo\">\n\t\t\t <h3>Candela Citations<\/h3>\n\t\t\t\t\t <div>\n\t\t\t\t\t\t <div id=\"citation-list-208\">\n\t\t\t\t\t\t\t <div class=\"licensing\"><div class=\"license-attribution-dropdown-subheading\">CC licensed content, Shared previously<\/div><ul class=\"citation-list\"><li>OpenStax University Physics. <strong>Authored by<\/strong>: OpenStax CNX. <strong>Located at<\/strong>: <a target=\"_blank\" href=\"https:\/\/cnx.org\/contents\/1Q9uMg_a@10.16:Gofkr9Oy@15\">https:\/\/cnx.org\/contents\/1Q9uMg_a@10.16:Gofkr9Oy@15<\/a>. <strong>License<\/strong>: <em><a target=\"_blank\" rel=\"license\" href=\"https:\/\/creativecommons.org\/licenses\/by\/4.0\/\">CC BY: Attribution<\/a><\/em>. <strong>License Terms<\/strong>: Download for free at http:\/\/cnx.org\/contents\/d50f6e32-0fda-46ef-a362-9bd36ca7c97d@10.16<\/li><\/ul><\/div>\n\t\t\t\t\t\t <\/div>\n\t\t\t\t\t <\/div>\n\t\t\t <\/section>","protected":false},"author":311,"menu_order":5,"template":"","meta":{"_candela_citation":"[{\"type\":\"cc\",\"description\":\"OpenStax University Physics\",\"author\":\"OpenStax CNX\",\"organization\":\"\",\"url\":\"https:\/\/cnx.org\/contents\/1Q9uMg_a@10.16:Gofkr9Oy@15\",\"project\":\"\",\"license\":\"cc-by\",\"license_terms\":\"Download for free at http:\/\/cnx.org\/contents\/d50f6e32-0fda-46ef-a362-9bd36ca7c97d@10.16\"}]","CANDELA_OUTCOMES_GUID":"","pb_show_title":"on","pb_short_title":"","pb_subtitle":"","pb_authors":[],"pb_section_license":"all-rights-reserved"},"chapter-type":[],"contributor":[],"license":[56],"class_list":["post-208","chapter","type-chapter","status-publish","hentry","license-all-rights-reserved"],"part":164,"_links":{"self":[{"href":"https:\/\/courses.lumenlearning.com\/suny-osuniversityphysics\/wp-json\/pressbooks\/v2\/chapters\/208","targetHints":{"allow":["GET"]}}],"collection":[{"href":"https:\/\/courses.lumenlearning.com\/suny-osuniversityphysics\/wp-json\/pressbooks\/v2\/chapters"}],"about":[{"href":"https:\/\/courses.lumenlearning.com\/suny-osuniversityphysics\/wp-json\/wp\/v2\/types\/chapter"}],"author":[{"embeddable":true,"href":"https:\/\/courses.lumenlearning.com\/suny-osuniversityphysics\/wp-json\/wp\/v2\/users\/311"}],"version-history":[{"count":8,"href":"https:\/\/courses.lumenlearning.com\/suny-osuniversityphysics\/wp-json\/pressbooks\/v2\/chapters\/208\/revisions"}],"predecessor-version":[{"id":2212,"href":"https:\/\/courses.lumenlearning.com\/suny-osuniversityphysics\/wp-json\/pressbooks\/v2\/chapters\/208\/revisions\/2212"}],"part":[{"href":"https:\/\/courses.lumenlearning.com\/suny-osuniversityphysics\/wp-json\/pressbooks\/v2\/parts\/164"}],"metadata":[{"href":"https:\/\/courses.lumenlearning.com\/suny-osuniversityphysics\/wp-json\/pressbooks\/v2\/chapters\/208\/metadata\/"}],"wp:attachment":[{"href":"https:\/\/courses.lumenlearning.com\/suny-osuniversityphysics\/wp-json\/wp\/v2\/media?parent=208"}],"wp:term":[{"taxonomy":"chapter-type","embeddable":true,"href":"https:\/\/courses.lumenlearning.com\/suny-osuniversityphysics\/wp-json\/pressbooks\/v2\/chapter-type?post=208"},{"taxonomy":"contributor","embeddable":true,"href":"https:\/\/courses.lumenlearning.com\/suny-osuniversityphysics\/wp-json\/wp\/v2\/contributor?post=208"},{"taxonomy":"license","embeddable":true,"href":"https:\/\/courses.lumenlearning.com\/suny-osuniversityphysics\/wp-json\/wp\/v2\/license?post=208"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}