{"id":1365,"date":"2023-06-05T14:51:00","date_gmt":"2023-06-05T14:51:00","guid":{"rendered":"https:\/\/courses.lumenlearning.com\/tulsacc-math1613\/chapter\/the-other-trigonometric-functions\/"},"modified":"2023-06-05T14:51:00","modified_gmt":"2023-06-05T14:51:00","slug":"the-other-trigonometric-functions","status":"publish","type":"chapter","link":"https:\/\/courses.lumenlearning.com\/tulsacc-math1613\/chapter\/the-other-trigonometric-functions\/","title":{"raw":"The Other Trigonometric Functions","rendered":"The Other Trigonometric Functions"},"content":{"raw":"\n<div class=\"textbox learning-objectives\">\n<h3>Learning Outcomes<\/h3>\n<ul>\n \t<li style=\"font-weight: 400;\">Find exact values of the trigonometric functions secant, cosecant, tangent, and cotangent of\u2009 30\u00b0 (\u03c0\/6),\u2009\u2009\u200945\u00b0 (\u03c0\/4),\u2009and\u200960\u00b0 (\u03c0\/3).<\/li>\n \t<li style=\"font-weight: 400;\">Use reference angles to evaluate the trigonometric functions secant, cosecant, tangent, and cotangent.<\/li>\n \t<li style=\"font-weight: 400;\">Use properties of even and odd trigonometric functions.<\/li>\n \t<li style=\"font-weight: 400;\">Recognize and use fundamental identities.<\/li>\n \t<li style=\"font-weight: 400;\">Evaluate trigonometric functions with a calculator.<\/li>\n<\/ul>\n<\/div>\n<h2>Find exact values of the trigonometric functions secant, cosecant, tangent, and cotangent<\/h2>\nTo define the remaining functions, we will once again draw a unit circle with a point [latex]\\left(x,y\\right)[\/latex] corresponding to an angle of [latex]t[\/latex], as shown in Figure 1. As with the sine and cosine, we can use the [latex]\\left(x,y\\right)[\/latex] coordinates to find the other functions.\n\n[caption id=\"\" align=\"aligncenter\" width=\"487\"]<img src=\"https:\/\/s3-us-west-2.amazonaws.com\/courses-images\/wp-content\/uploads\/sites\/3675\/2018\/09\/27003658\/CNX_Precalc_Figure_05_03_0012.jpg\" alt=\"Graph of circle with angle of t inscribed. Point of (x, y) is at intersection of terminal side of angle and edge of circle.\" width=\"487\" height=\"198\"> <b>Figure 1<\/b>[\/caption]\n\nThe first function we will define is the tangent. The <strong>tangent<\/strong> of an angle is the ratio of the <em>y<\/em>-value to the <em>x<\/em>-value of the corresponding point on the unit circle. In Figure 1, the tangent of angle [latex]t[\/latex] is equal to [latex]\\frac{y}{x},x\\ne 0[\/latex]. Because the <em>y<\/em>-value is equal to the sine of [latex]t[\/latex], and the <em>x<\/em>-value is equal to the cosine of [latex]t[\/latex], the tangent of angle [latex]t[\/latex] can also be defined as [latex]\\frac{\\sin t}{\\cos t},\\cos t\\ne 0[\/latex]. The tangent function is abbreviated as [latex]\\tan[\/latex]. The remaining three functions can all be expressed as reciprocals of functions we have already defined.\n<ul>\n \t<li>The <strong>secant<\/strong> function is the reciprocal of the cosine function. In Figure 1, the secant of angle [latex]t[\/latex] is equal to [latex]\\frac{1}{\\cos t}=\\frac{1}{x},x\\ne 0[\/latex]. The secant function is abbreviated as [latex]\\sec[\/latex].<\/li>\n \t<li>The <strong>cotangent<\/strong> function is the reciprocal of the tangent function. In Figure 1, the cotangent of angle [latex]t[\/latex] is equal to [latex]\\frac{\\cos t}{\\sin t}=\\frac{x}{y},y\\ne 0[\/latex]. The cotangent function is abbreviated as [latex]\\cot[\/latex].<\/li>\n \t<li>The <strong>cosecant<\/strong> function is the reciprocal of the sine function. In Figure 1, the cosecant of angle [latex]t[\/latex] is equal to [latex]\\frac{1}{\\sin t}=\\frac{1}{y},y\\ne 0[\/latex]. The cosecant function is abbreviated as [latex]\\csc[\/latex].<\/li>\n<\/ul>\n<div class=\"textbox\">\n<h3>A General Note: Tangent, Secant, Cosecant, and Cotangent Functions<\/h3>\nIf [latex]t[\/latex] is a real number and [latex]\\left(x,y\\right)[\/latex] is a point where the terminal side of an angle of [latex]t[\/latex] radians intercepts the unit circle, then\n<p style=\"text-align: center;\">[latex]\\begin{gathered}\\tan t=\\frac{y}{x},x\\ne 0\\\\ \\sec t=\\frac{1}{x},x\\ne 0\\\\ \\csc t=\\frac{1}{y},y\\ne 0\\\\ \\cot t=\\frac{x}{y},y\\ne 0\\end{gathered}[\/latex]<\/p>\n\n<\/div>\n<div class=\"textbox shaded\">\n<h3>Example 1: Finding Trigonometric Functions from a Point on the Unit Circle<\/h3>\nThe point [latex]\\left(-\\frac{\\sqrt{3}}{2},\\frac{1}{2}\\right)[\/latex] is on the unit circle, as shown in Figure 2. Find [latex]\\sin t,\\cos t,\\tan t,\\sec t,\\csc t[\/latex], and [latex]\\cot t[\/latex].\n\n[caption id=\"\" align=\"aligncenter\" width=\"487\"]<img src=\"https:\/\/s3-us-west-2.amazonaws.com\/courses-images\/wp-content\/uploads\/sites\/3675\/2018\/09\/27003700\/CNX_Precalc_Figure_05_03_0022.jpg\" alt=\"Graph of circle with angle of t inscribed. Point of (negative square root of 3 over 2, 1\/2) is at intersection of terminal side of angle and edge of circle.\" width=\"487\" height=\"216\"> <b>Figure 2<\/b>[\/caption]\n\n[reveal-answer q=\"714608\"]Show Solution[\/reveal-answer]\n[hidden-answer a=\"714608\"]\n\nBecause we know the [latex]\\left(x,y\\right)[\/latex] coordinates of the point on the unit circle indicated by angle [latex]t[\/latex], we can use those coordinates to find the six functions:\n<p style=\"text-align: center;\">[latex]\\begin{gathered}\\sin t=y=\\frac{1}{2}\\\\ \\cos t=x=-\\frac{\\sqrt{3}}{2}\\\\ \\tan t=\\frac{y}{x}=\\frac{\\frac{1}{2}}{-\\frac{\\sqrt{3}}{2}}=\\frac{1}{2}\\left(-\\frac{2}{\\sqrt{3}}\\right)=-\\frac{1}{\\sqrt{3}}=-\\frac{\\sqrt{3}}{3}\\\\ \\sec t=\\frac{1}{x}=\\frac{1}{\\frac{-\\frac{\\sqrt{3}}{2}}{}}=-\\frac{2}{\\sqrt{3}}=-\\frac{2\\sqrt{3}}{3}\\\\ \\csc t=\\frac{1}{y}=\\frac{1}{\\frac{1}{2}}=2\\\\ \\cot t=\\frac{x}{y}=\\frac{-\\frac{\\sqrt{3}}{2}}{\\frac{1}{2}}=-\\frac{\\sqrt{3}}{2}\\left(\\frac{2}{1}\\right)=-\\sqrt{3}\\end{gathered}[\/latex]<\/p>\n[\/hidden-answer]\n\n<\/div>\n<div class=\"bcc-box bcc-success\">\n<h3>Try It<\/h3>\nThe point [latex]\\left(\\frac{\\sqrt{2}}{2},-\\frac{\\sqrt{2}}{2}\\right)[\/latex] is on the unit circle, as shown in Figure 3. Find [latex]\\sin t,\\cos t,\\tan t,\\sec t,\\csc t[\/latex], and [latex]\\cot t[\/latex].\n\n[caption id=\"\" align=\"aligncenter\" width=\"487\"]<img src=\"https:\/\/s3-us-west-2.amazonaws.com\/courses-images\/wp-content\/uploads\/sites\/3675\/2018\/09\/27003703\/CNX_Precalc_Figure_05_03_0032.jpg\" alt=\"Graph of circle with angle of t inscribed. Point of (square root of 2 over 2, negative square root of 2 over 2) is at intersection of terminal side of angle and edge of circle.\" width=\"487\" height=\"347\"> <b>Figure 3<\/b>[\/caption]\n\n[reveal-answer q=\"264592\"]Show Solution[\/reveal-answer]\n[hidden-answer a=\"264592\"]\n\n[latex]\\sin t=-\\frac{\\sqrt{2}}{2},\\cos t=\\frac{\\sqrt{2}}{2},\\tan t=-1,\\sec t=\\sqrt{2},\\csc t=-\\sqrt{2},\\cot t=-1[\/latex]\n\n[\/hidden-answer]\n\n<\/div>\n<div class=\"textbox shaded\">\n<h3>Example 2: Finding the Trigonometric Functions of an Angle<\/h3>\nFind [latex]\\sin t,\\cos t,\\tan t,\\sec t,\\csc t[\/latex], and [latex]\\cot t[\/latex] when [latex]t=\\frac{\\pi }{6}[\/latex].\n\n[reveal-answer q=\"419551\"]Show Solution[\/reveal-answer]\n[hidden-answer a=\"419551\"]\n\nWe have previously used the properties of equilateral triangles to demonstrate that [latex]\\sin \\frac{\\pi }{6}=\\frac{1}{2}[\/latex] and [latex]\\cos \\frac{\\pi }{6}=\\frac{\\sqrt{3}}{2}[\/latex]. We can use these values and the definitions of tangent, secant, cosecant, and cotangent as functions of sine and cosine to find the remaining function values.\n<p style=\"text-align: center;\">[latex]\\begin{gathered} \\tan \\frac{\\pi }{6}=\\frac{\\sin\\frac{\\pi }{6}}{\\cos \\frac{\\pi }{6}} =\\frac{\\frac{1}{2}}{\\frac{\\sqrt{3}}{2}}=\\frac{1}{\\sqrt{3}}=\\frac{\\sqrt{3}}{3}\\end{gathered}[\/latex]<\/p>\n<p style=\"text-align: center;\">[latex]\\begin{gathered}\\sec \\frac{\\pi }{6}=\\frac{1}{\\cos \\frac{\\pi }{6}} =\\frac{1}{\\frac{\\sqrt{3}}{2}}=\\frac{2}{\\sqrt{3}}=\\frac{2\\sqrt{3}}{3}\\end{gathered}[\/latex]<\/p>\n<p style=\"text-align: center;\">[latex]\\begin{gathered}\\csc \\frac{\\pi }{6}=\\frac{1}{\\sin \\frac{\\pi }{6}}=\\frac{1}{\\frac{1}{2}}=2\\end{gathered}[\/latex]<\/p>\n<p style=\"text-align: center;\"><span style=\"font-size: 1rem;\">[latex]\\begin{gathered}\\cot \\frac{\\pi }{6}=\\frac{\\cos \\frac{\\pi }{6}}{\\sin \\frac{\\pi }{6}} =\\frac{\\frac{\\sqrt{3}}{2}}{\\frac{1}{2}}=\\sqrt{3} \\end{gathered}[\/latex]<\/span><\/p>\n[\/hidden-answer]\n\n<\/div>\n<div class=\"bcc-box bcc-success\">\n<h3>Try It<\/h3>\nFind [latex]\\sin t,\\cos t,\\tan t,\\sec t,\\csc t[\/latex], and [latex]\\cot t[\/latex] when [latex]t=\\frac{\\pi }{3}[\/latex].\n\n[reveal-answer q=\"151548\"]Show Solution[\/reveal-answer]\n[hidden-answer a=\"151548\"]\n\n[latex]\\begin{align}&amp;\\sin \\frac{\\pi }{3}=\\frac{\\sqrt{3}}{2}\\\\ &amp;\\cos \\frac{\\pi }{3}=\\frac{1}{2}\\\\ &amp;\\tan \\frac{\\pi }{3}=\\sqrt{3}\\\\ &amp;\\sec \\frac{\\pi }{3}=2\\\\ &amp;\\csc \\frac{\\pi }{3}=\\frac{2\\sqrt{3}}{3}\\\\ &amp;\\cot \\frac{\\pi }{3}=\\frac{\\sqrt{3}}{3}\\end{align}[\/latex]\n\n[\/hidden-answer]\n\n<\/div>\n<div class=\"textbox key-takeaways\">\n<h3>Try It<\/h3>\n[ohm_question hide_question_numbers=1]173354[\/ohm_question]\n\n<\/div>\nBecause we know the sine and cosine values for the common first-quadrant angles, we can find the other function values for those angles as well by setting [latex]x[\/latex] equal to the cosine and [latex]y[\/latex] equal to the sine and then using the definitions of tangent, secant, cosecant, and cotangent. The results are shown in the table below.\n<table id=\"Table_05_03_01\" summary=\"..\">\n<tbody>\n<tr>\n<td><strong>Angle<\/strong><\/td>\n<td><strong> [latex]0[\/latex] <\/strong><\/td>\n<td><strong> [latex]\\frac{\\pi }{6},\\text{ or }{30}^{\\circ}[\/latex] <\/strong><\/td>\n<td><strong> [latex]\\frac{\\pi }{4},\\text{ or } {45}^{\\circ }[\/latex] <\/strong><\/td>\n<td><strong> [latex]\\frac{\\pi }{3},\\text{ or }{60}^{\\circ }[\/latex] <\/strong><\/td>\n<td><strong> [latex]\\frac{\\pi }{2},\\text{ or }{90}^{\\circ }[\/latex] <\/strong><\/td>\n<\/tr>\n<tr>\n<td><strong>Cosine<\/strong><\/td>\n<td>1<\/td>\n<td>[latex]\\frac{\\sqrt{3}}{2}[\/latex]<\/td>\n<td>[latex]\\frac{\\sqrt{2}}{2}[\/latex]<\/td>\n<td>[latex]\\frac{1}{2}[\/latex]<\/td>\n<td>0<\/td>\n<\/tr>\n<tr>\n<td><strong>Sine<\/strong><\/td>\n<td>0<\/td>\n<td>[latex]\\frac{1}{2}[\/latex]<\/td>\n<td>[latex]\\frac{\\sqrt{2}}{2}[\/latex]<\/td>\n<td>[latex]\\frac{\\sqrt{3}}{2}[\/latex]<\/td>\n<td>1<\/td>\n<\/tr>\n<tr>\n<td><strong>Tangent<\/strong><\/td>\n<td>0<\/td>\n<td>[latex]\\frac{\\sqrt{3}}{3}[\/latex]<\/td>\n<td>1<\/td>\n<td>[latex]\\sqrt{3}[\/latex]<\/td>\n<td>Undefined<\/td>\n<\/tr>\n<tr>\n<td><strong>Secant<\/strong><\/td>\n<td>1<\/td>\n<td>[latex]\\frac{2\\sqrt{3}}{3}[\/latex]<\/td>\n<td>[latex]\\sqrt{2}[\/latex]<\/td>\n<td>2<\/td>\n<td>Undefined<\/td>\n<\/tr>\n<tr>\n<td><strong>Cosecant<\/strong><\/td>\n<td>Undefined<\/td>\n<td>2<\/td>\n<td>[latex]\\sqrt{2}[\/latex]<\/td>\n<td>[latex]\\frac{2\\sqrt{3}}{3}[\/latex]<\/td>\n<td>1<\/td>\n<\/tr>\n<tr>\n<td><strong>Cotangent<\/strong><\/td>\n<td>Undefined<\/td>\n<td>[latex]\\sqrt{3}[\/latex]<\/td>\n<td>1<\/td>\n<td>[latex]\\frac{\\sqrt{3}}{3}[\/latex]<\/td>\n<td>0<\/td>\n<\/tr>\n<\/tbody>\n<\/table>\n<h2>Using Reference Angles to Evaluate Tangent, Secant, Cosecant, and Cotangent<\/h2>\nWe can evaluate trigonometric functions of angles outside the first quadrant using reference angles as we have already done with the sine and cosine functions. The procedure is the same: Find the <strong>reference angle<\/strong> formed by the terminal side of the given angle with the horizontal axis. The trigonometric function values for the original angle will be the same as those for the reference angle, except for the positive or negative sign, which is determined by <em>x<\/em>- and <em>y<\/em>-values in the original quadrant. Figure 4&nbsp;shows which functions are positive in which quadrant.\n\nTo help us remember which of the six trigonometric functions are positive in each quadrant, we can use the mnemonic phrase \"A Smart Trig Class.\" Each of the four words in the phrase corresponds to one of the four quadrants, starting with quadrant I and rotating counterclockwise. In quadrant I, which is \"<strong>A<\/strong>,\" <strong><u>a<\/u><\/strong>ll of the six trigonometric functions are positive. In quadrant II, \"<strong>S<\/strong>mart,\" only <strong><u>s<\/u><\/strong>ine and its reciprocal function, cosecant, are positive. In quadrant III, \"<strong>T<\/strong>rig,\" only <strong><u>t<\/u><\/strong>angent and its reciprocal function, cotangent, are positive. Finally, in quadrant IV, \"<strong>C<\/strong>lass,\" only <strong><u>c<\/u><\/strong>osine and its reciprocal function, secant, are positive.\n\n[caption id=\"\" align=\"aligncenter\" width=\"487\"]<img src=\"https:\/\/s3-us-west-2.amazonaws.com\/courses-images\/wp-content\/uploads\/sites\/3675\/2018\/09\/27003705\/CNX_Precalc_Figure_05_03_0042.jpg\" alt=\"Graph of circle with each quadrant labeled. Under quadrant 1, labels fro sin t, cos t, tan t, sec t, csc t, and cot t. Under quadrant 2, labels for sin t and csc t. Under quadrant 3, labels for tan t and cot t. Under quadrant 4, labels for cos t, sec t.\" width=\"487\" height=\"363\"> <b>Figure 4<\/b>[\/caption]\n\n<div class=\"textbox\">\n<h3>How To: Given an angle not in the first quadrant, use reference angles to find all six trigonometric functions.<strong>\n<\/strong><\/h3>\n<ol>\n \t<li>Measure the angle formed by the terminal side of the given angle and the horizontal axis. This is the reference angle.<\/li>\n \t<li>Evaluate the function at the reference angle.<\/li>\n \t<li>Observe the quadrant where the terminal side of the original angle is located. Based on the quadrant, determine whether the output is positive or negative.<\/li>\n<\/ol>\n<\/div>\n<div class=\"textbox shaded\">\n<h3>Example 3: Using Reference Angles to Find Trigonometric Functions<\/h3>\nUse reference angles to find all six trigonometric functions of [latex]-\\frac{5\\pi }{6}[\/latex].\n\n[reveal-answer q=\"720177\"]Show Solution[\/reveal-answer]\n[hidden-answer a=\"720177\"]\n\nThe angle between this angle\u2019s terminal side and the <em>x<\/em>-axis is [latex]\\frac{\\pi }{6}[\/latex], so that is the reference angle. Since [latex]-\\frac{5\\pi }{6}[\/latex] is in the third quadrant, where both [latex]x[\/latex] and [latex]y[\/latex] are negative, cosine, sine, secant, and cosecant will be negative, while tangent and cotangent will be positive.\n<p style=\"text-align: center;\">[latex]\\begin{gathered}\\cos \\left(-\\frac{5\\pi }{6}\\right)=-\\frac{\\sqrt{3}}{2} \\\\ \\sin \\left(-\\frac{5\\pi }{6}\\right)=-\\frac{1}{2} \\\\ \\tan\\left(-\\frac{5\\pi }{6}\\right)=\\frac{\\sqrt{3}}{3} \\\\ \\sec\\left(-\\frac{5\\pi }{6}\\right)=-\\frac{2\\sqrt{3}}{3}\\\\ \\csc\\left(-\\frac{5\\pi }{6}\\right)=-2\\\\ \\cot \\left(-\\frac{5\\pi }{6}\\right)=\\sqrt{3} \\end{gathered}[\/latex]<\/p>\n[\/hidden-answer]\n\n<\/div>\n<div class=\"bcc-box bcc-success\">\n<h3>Try It<\/h3>\nUse reference angles to find all six trigonometric functions of [latex]-\\frac{7\\pi }{4}[\/latex].\n\n[reveal-answer q=\"621482\"]Show Solution[\/reveal-answer]\n[hidden-answer a=\"621482\"]\n\n[latex]\\sin \\left(-\\frac{7\\pi }{4}\\right)=\\frac{\\sqrt{2}}{2},\\cos \\left(-\\frac{7\\pi }{4}\\right)=\\frac{\\sqrt{2}}{2},\\tan \\left(-\\frac{7\\pi }{4}\\right)=1[\/latex],\n[latex]\\sec \\left(-\\frac{7\\pi }{4}\\right)=\\sqrt{2},\\csc \\left(-\\frac{7\\pi }{4}\\right)=\\sqrt{2},\\cot \\left(-\\frac{7\\pi }{4}\\right)=1[\/latex]\n\n[\/hidden-answer]\n\n<\/div>\n<div class=\"textbox key-takeaways\">\n<h3>Try It<\/h3>\n[ohm_question hide_question_numbers=1]100617[\/ohm_question]\n\n<\/div>\n<h2>Using Even and Odd Trigonometric Functions<\/h2>\nTo be able to use our six trigonometric functions freely with both positive and negative angle inputs, we should examine how each function treats a negative input. As it turns out, there is an important difference among the functions in this regard.\n\nConsider the function [latex]f\\left(x\\right)={x}^{2}[\/latex], shown in Figure 5. The graph of the function is symmetrical about the <em>y<\/em>-axis. All along the curve, any two points with opposite <em>x<\/em>-values have the same function value. This matches the result of calculation: [latex]{\\left(4\\right)}^{2}={\\left(-4\\right)}^{2}[\/latex], [latex]{\\left(-5\\right)}^{2}={\\left(5\\right)}^{2}[\/latex],&nbsp;and so on. So [latex]f\\left(x\\right)={x}^{2}[\/latex] is an <strong>even function<\/strong>, a function such that two inputs that are opposites have the same output. That means [latex]f\\left(-x\\right)=f\\left(x\\right)[\/latex].\n\n<span id=\"fs-id1165137817732\"> <img class=\"aligncenter\" src=\"https:\/\/s3-us-west-2.amazonaws.com\/courses-images\/wp-content\/uploads\/sites\/3675\/2018\/09\/27003707\/CNX_Precalc_Figure_05_03_0052.jpg\" alt=\"Graph of parabola with points (-2, 4) and (2, 4) labeled.\"><\/span>\n<p style=\"text-align: center;\"><strong>Figure 5.&nbsp;<\/strong>The function [latex]f\\left(x\\right)={x}^{2}[\/latex]&nbsp;is an even function.<\/p>\nNow consider the function [latex]f\\left(x\\right)={x}^{3}[\/latex], shown in Figure 6. The graph is not symmetrical about the <em>y<\/em>-axis. All along the graph, any two points with opposite <em>x<\/em>-values also have opposite <em>y<\/em>-values. So [latex]f\\left(x\\right)={x}^{3}[\/latex] is an <strong>odd function<\/strong>, one such that two inputs that are opposites have outputs that are also opposites. That means [latex]f\\left(-x\\right)=-f\\left(x\\right)[\/latex].\n\n<span id=\"fs-id1165135545756\"> <img class=\"aligncenter\" src=\"https:\/\/s3-us-west-2.amazonaws.com\/courses-images\/wp-content\/uploads\/sites\/3675\/2018\/09\/27003710\/CNX_Precalc_Figure_05_03_0062.jpg\" alt=\"Graph of function with labels for points (-1, -1) and (1, 1).\"><\/span>\n<p style=\"text-align: center;\"><strong>Figure 6.&nbsp;<\/strong>The function [latex]f\\left(x\\right)={x}^{3}[\/latex]&nbsp;is an odd function.<\/p>\nWe can test whether a trigonometric function is even or odd by drawing a <strong>unit circle<\/strong> with a positive and a negative angle, as in Figure 7. The sine of the positive angle is [latex]y[\/latex]. The sine of the negative angle is \u2212<em>y<\/em>. The <strong>sine function<\/strong>, then, is an odd function. We can test each of the six trigonometric functions in this fashion. The results are shown in in the table below.\n\n[caption id=\"\" align=\"aligncenter\" width=\"487\"]<img src=\"https:\/\/s3-us-west-2.amazonaws.com\/courses-images\/wp-content\/uploads\/sites\/3675\/2018\/09\/27003712\/CNX_Precalc_Figure_05_03_0072.jpg\" alt=\"Graph of circle with angle of t and -t inscribed. Point of (x, y) is at intersection of terminal side of angle t and edge of circle. Point of (x, -y) is at intersection of terminal side of angle -t and edge of circle.\" width=\"487\" height=\"369\"> <b>Figure 7<\/b>[\/caption]\n<table id=\"Table_05_03_02\" summary=\"..\">\n<tbody>\n<tr>\n<td>[latex]\\begin{array}{l}\\sin t=y\\hfill \\\\ \\sin \\left(-t\\right)=-y\\hfill \\\\ \\sin t\\ne \\sin \\left(-t\\right)\\hfill \\end{array}[\/latex]<\/td>\n<td>[latex]\\begin{array}{l}\\text{cos}t=x\\hfill \\\\ \\cos \\left(-t\\right)=x\\hfill \\\\ \\cos t=\\cos \\left(-t\\right)\\hfill \\end{array}[\/latex]<\/td>\n<td>[latex]\\begin{array}{l}\\text{tan}\\left(t\\right)=\\frac{y}{x}\\hfill \\\\ \\tan \\left(-t\\right)=-\\frac{y}{x}\\hfill \\\\ \\tan t\\ne \\tan \\left(-t\\right)\\hfill \\end{array}[\/latex]<\/td>\n<\/tr>\n<tr>\n<td>[latex]\\begin{array}{l}\\sec t=\\frac{1}{x}\\hfill \\\\ \\sec \\left(-t\\right)=\\frac{1}{x}\\hfill \\\\ \\sec t=\\sec \\left(-t\\right)\\hfill \\end{array}[\/latex]<\/td>\n<td>[latex]\\begin{array}{l}\\csc t=\\frac{1}{y}\\hfill \\\\ \\csc \\left(-t\\right)=\\frac{1}{-y}\\hfill \\\\ \\csc t\\ne \\csc \\left(-t\\right)\\hfill \\end{array}[\/latex]<\/td>\n<td>[latex]\\begin{array}{l}\\cot t=\\frac{x}{y}\\hfill \\\\ \\cot \\left(-t\\right)=\\frac{x}{-y}\\hfill \\\\ \\cot t\\ne cot\\left(-t\\right)\\hfill \\end{array}[\/latex]<\/td>\n<\/tr>\n<\/tbody>\n<\/table>\n<div class=\"textbox\">\n<h3>A General Note: Even and Odd Trigonometric Functions<\/h3>\nAn <strong>even function<\/strong> is one in which [latex]f\\left(-x\\right)=f\\left(x\\right)[\/latex].\n\nAn <strong>odd function<\/strong> is one in which [latex]f\\left(-x\\right)=-f\\left(x\\right)[\/latex].\n\nCosine and secant are even:\n<p style=\"text-align: center;\">[latex]\\begin{gathered}\\cos \\left(-t\\right)=\\cos t \\\\ \\sec \\left(-t\\right)=\\sec t \\end{gathered}[\/latex]<\/p>\nSine, tangent, cosecant, and cotangent are odd:\n<p style=\"text-align: center;\">[latex]\\begin{gathered}\\sin \\left(-t\\right)=-\\sin t \\\\ \\tan \\left(-t\\right)=-\\tan t \\\\ \\csc \\left(-t\\right)=-\\csc t \\\\ \\cot \\left(-t\\right)=-\\cot t \\end{gathered}[\/latex]<\/p>\n\n<\/div>\n<div class=\"textbox shaded\">\n<h3>Example 4: Using Even and Odd Properties of Trigonometric Functions<\/h3>\nIf the [latex]\\sec t=2[\/latex], what is the [latex]\\sec (-t)[\/latex]?\n\n[reveal-answer q=\"5363\"]Show Solution[\/reveal-answer]\n[hidden-answer a=\"5363\"]\n\nSecant is an even function. The secant of an angle is the same as the secant of its opposite. So if the secant of angle <em>t<\/em> is 2, the secant of [latex]-t[\/latex] is also 2.\n\n[\/hidden-answer]\n\n<\/div>\n<div class=\"bcc-box bcc-success\">\n<h3>Try It<\/h3>\nIf the [latex]\\cot t=\\sqrt{3}[\/latex], what is [latex]\\cot (-t)[\/latex]?\n\n[reveal-answer q=\"840134\"]Show Solution[\/reveal-answer]\n[hidden-answer a=\"840134\"]\n\n[latex]-\\sqrt{3}[\/latex]\n\n[\/hidden-answer]\n\n<\/div>\nhttps:\/\/youtu.be\/YbU8Sq0quWE\n<h2>Recognize and Use Fundamental Identities<\/h2>\nWe have explored a number of properties of trigonometric functions. Now, we can take the relationships a step further, and derive some fundamental identities. Identities are statements that are true for all values of the input on which they are defined. Usually, identities can be derived from definitions and relationships we already know. For example, the Pythagorean Identity we learned earlier was derived from the Pythagorean Theorem and the definitions of sine and cosine.\n<div class=\"textbox\">\n<h3>A General Note: Fundamental Identities<\/h3>\nWe can derive some useful <strong>identities<\/strong> from the six trigonometric functions. The other four trigonometric functions can be related back to the sine and cosine functions using these basic relationships:\n<p style=\"text-align: center;\">[latex]\\tan t=\\frac{\\sin t}{\\cos t}[\/latex]<\/p>\n<p style=\"text-align: center;\">[latex]\\sec t=\\frac{1}{\\cos t}[\/latex]<\/p>\n<p style=\"text-align: center;\">[latex]\\csc t=\\frac{1}{\\sin t}[\/latex]<\/p>\n<p style=\"text-align: center;\">[latex]\\cot t=\\frac{1}{\\tan t}=\\frac{\\cos t}{\\sin t}[\/latex]<\/p>\n\n<\/div>\n<div class=\"textbox shaded\">\n<h3>Example 5: Using Identities to Evaluate Trigonometric Functions<\/h3>\n<ol>\n \t<li>Given [latex]\\sin \\left(45^\\circ \\right)=\\frac{\\sqrt{2}}{2},\\cos \\left(45^\\circ \\right)=\\frac{\\sqrt{2}}{2}[\/latex], evaluate [latex]\\tan \\left(45^\\circ \\right)[\/latex].<\/li>\n \t<li>Given [latex]\\sin \\left(\\frac{5\\pi }{6}\\right)=\\frac{1}{2},\\cos\\left(\\frac{5\\pi }{6}\\right)=-\\frac{\\sqrt{3}}{2}[\/latex], evaluate [latex]\\sec \\left(\\frac{5\\pi }{6}\\right)[\/latex].<\/li>\n<\/ol>\n[reveal-answer q=\"581515\"]Show Solution[\/reveal-answer]\n[hidden-answer a=\"581515\"]\n\nBecause we know the sine and cosine values for these angles, we can use identities to evaluate the other functions.\n<ol>\n \t<li>\n<div>[latex]\\begin{align}\\tan \\left(45^\\circ \\right)=\\frac{\\sin \\left(45^\\circ \\right)}{\\cos \\left(45^\\circ \\right)} =\\frac{\\frac{\\sqrt{2}}{2}}{\\frac{\\sqrt{2}}{2}} =1 \\end{align}[\/latex]<\/div><\/li>\n \t<li>\n<div>[latex]\\begin{align}\\sec \\left(\\frac{5\\pi }{6}\\right)=\\frac{1}{\\cos \\left(\\frac{5\\pi }{6}\\right)} =\\frac{1}{-\\frac{\\sqrt{3}}{2}} =\\frac{-2\\sqrt{3}}{1} =\\frac{-2}{\\sqrt{3}} =-\\frac{2\\sqrt{3}}{3} \\end{align}[\/latex]<\/div><\/li>\n<\/ol>\n[\/hidden-answer]\n\n<\/div>\n<div class=\"bcc-box bcc-success\">\n<h3>Try It<\/h3>\nEvaluate [latex]\\csc\\left(\\frac{7\\pi }{6}\\right)[\/latex].\n\n[reveal-answer q=\"608392\"]Show Solution[\/reveal-answer]\n[hidden-answer a=\"608392\"]\n\n[latex]-2[\/latex]\n\n[\/hidden-answer]\n\n<\/div>\n<div class=\"textbox shaded\">\n<h3>Example 6: Using Identities to Simplify Trigonometric Expressions<\/h3>\nSimplify [latex]\\frac{\\sec t}{\\tan t}[\/latex].\n\n[reveal-answer q=\"803642\"]Show Solution[\/reveal-answer]\n[hidden-answer a=\"803642\"]\n\nWe can simplify this by rewriting both functions in terms of sine and cosine.\n<p style=\"text-align: center;\">[latex]\\begin{align} \\frac{\\sec t}{\\tan t}&amp;=\\frac{\\frac{1}{\\cos t}}{\\frac{\\sin t}{\\cos t}}&amp;&amp; \\text{To divide the functions, we multiply by the reciprocal.} \\\\&amp;=\\frac{1}{\\cos t}\\frac{\\cos t}{\\sin t}&amp;&amp;\\text{Divide out the cosines.} \\\\ &amp;=\\frac{1}{\\sin t}&amp;&amp;\\text{Simplify and use the identity.}\\\\ &amp;=\\csc t \\end{align}[\/latex]<\/p>\nBy showing that [latex]\\frac{\\sec t}{\\tan t}[\/latex] can be simplified to [latex]\\csc t[\/latex], we have, in fact, established a new identity.\n<p style=\"text-align: center;\">[latex]\\frac{\\sec t}{\\tan t}=\\csc t[\/latex]<\/p>\n[\/hidden-answer]\n\n<\/div>\n<div class=\"bcc-box bcc-success\">\n<h3>Try It<\/h3>\nSimplify [latex]\\tan t\\left(\\cos t\\right)[\/latex].\n\n[reveal-answer q=\"232307\"]Show Solution[\/reveal-answer]\n[hidden-answer a=\"232307\"]\n\n[latex]\\sin t[\/latex]\n\n[\/hidden-answer]\n\n<\/div>\n<h2>Alternate Forms of the Pythagorean Identity<\/h2>\nWe can use these fundamental identities to derive alternative forms of the <strong>Pythagorean Identity<\/strong>, [latex]{\\cos }^{2}t+{\\sin }^{2}t=1[\/latex]. One form is obtained by dividing both sides by [latex]{\\cos }^{2}t:[\/latex]\n<div style=\"text-align: center;\">[latex]\\begin{gathered}\\frac{{\\cos }^{2}t}{{\\cos }^{2}t}+\\frac{{\\sin }^{2}t}{{\\cos }^{2}t}=\\frac{1}{{\\cos }^{2}t}\\\\ \\\\ 1+{\\tan }^{2}t={\\sec }^{2}t\\end{gathered}[\/latex]<\/div>\nThe other form is obtained by dividing both sides by [latex]{\\sin }^{2}t:[\/latex]\n<div style=\"text-align: center;\">[latex]\\begin{gathered}\\frac{{\\cos }^{2}t}{{\\sin }^{2}t}+\\frac{{\\sin }^{2}t}{{\\sin }^{2}t}=\\frac{1}{{\\sin }^{2}t}\\\\ \\\\ {\\cot }^{2}t+1={\\csc }^{2}t\\end{gathered}[\/latex]<\/div>\n<div class=\"textbox\">\n<h3>A General Note: Alternate Forms of the Pythagorean Identity<\/h3>\n<p style=\"text-align: center;\">[latex]1+{\\tan }^{2}t={\\sec }^{2}t[\/latex]<\/p>\n<p style=\"text-align: center;\">[latex]{\\cot }^{2}t+1={\\csc }^{2}t[\/latex]<\/p>\n\n<\/div>\n<div class=\"textbox shaded\">\n<h3>Example 7: Using Identities to Relate Trigonometric Functions<\/h3>\nIf [latex]\\text{cos}\\left(t\\right)=\\frac{12}{13}[\/latex] and [latex]t[\/latex] is in quadrant IV, as shown in Figure 8, find the values of the other five trigonometric functions.<span id=\"fs-id1165137444782\">\n<\/span>\n\n[caption id=\"\" align=\"aligncenter\" width=\"487\"]<img src=\"https:\/\/s3-us-west-2.amazonaws.com\/courses-images\/wp-content\/uploads\/sites\/3675\/2018\/09\/27003714\/CNX_Precalc_Figure_05_03_0082.jpg\" alt=\"Graph of circle with angle of t inscribed. Point of (12\/13, y) is at intersection of terminal side of angle and edge of circle.\" width=\"487\" height=\"383\"> <b>Figure 8<\/b>[\/caption]\n\n[reveal-answer q=\"627612\"]Show Solution[\/reveal-answer]\n[hidden-answer a=\"627612\"]\n\nWe can find the sine using the Pythagorean Identity, [latex]{\\cos }^{2}t+{\\sin }^{2}t=1[\/latex], and the remaining functions by relating them to sine and cosine.\n<p style=\"text-align: center;\">[latex]\\begin{gathered}{\\left(\\frac{12}{13}\\right)}^{2}+{\\sin }^{2}t=1 \\\\ {\\sin }^{2}t=1-{\\left(\\frac{12}{13}\\right)}^{2} \\\\ {\\sin }^{2}t=1-\\frac{144}{169} \\\\ {\\sin }^{2}t=\\frac{25}{169} \\\\ \\sin t=\\pm \\sqrt{\\frac{25}{169}} \\\\ \\sin t=\\pm \\frac{\\sqrt{25}}{\\sqrt{169}} \\\\ \\sin t=\\pm \\frac{5}{13} \\end{gathered}[\/latex]<\/p>\nThe sign of the sine depends on the <em>y<\/em>-values in the quadrant where the angle is located. Since the angle is in quadrant IV, where the <em>y<\/em>-values are negative, its sine is negative, [latex]-\\frac{5}{13}[\/latex].\n\nThe remaining functions can be calculated using identities relating them to sine and cosine.\n<p style=\"text-align: center;\">[latex]\\begin{gathered}\\tan t=\\frac{\\sin t}{\\cos t}=\\frac{-\\frac{5}{13}}{\\frac{12}{13}}=-\\frac{5}{12} \\\\ \\sec t=\\frac{1}{\\cos t}=\\frac{1}{\\frac{12}{13}}=\\frac{13}{12} \\\\ \\csc t=\\frac{1}{\\sin t}=\\frac{1}{-\\frac{5}{13}}=-\\frac{13}{5}\\\\ \\cot t=\\frac{1}{\\tan t}=\\frac{1}{-\\frac{5}{12}}=-\\frac{12}{5}\\end{gathered}[\/latex]<\/p>\n[\/hidden-answer]\n\n<\/div>\n<div class=\"bcc-box bcc-success\">\n<h3>Try It<\/h3>\nIf [latex]\\sec \\left(t\\right)=-\\frac{17}{8}[\/latex] and [latex]0&lt;t&lt;\\pi [\/latex], find the values of the other five functions.\n\n[reveal-answer q=\"568112\"]Show Solution[\/reveal-answer]\n[hidden-answer a=\"568112\"]\n\n[latex]\\cos t=-\\frac{8}{17},\\sin t=\\frac{15}{17},\\tan t=-\\frac{15}{8},\\csc t=\\frac{17}{15},\\cot t=-\\frac{8}{15}[\/latex]\n\n[\/hidden-answer]\n\n<\/div>\n<div class=\"textbox key-takeaways\">\n<h3>Try It<\/h3>\n[ohm_question hide_question_numbers=1]100893[\/ohm_question]\n\n<\/div>\nAs we discussed in the chapter opening, a function that repeats its values in regular intervals is known as a <strong>periodic function<\/strong>. The trigonometric functions are periodic. For the four trigonometric functions, sine, cosine, cosecant and secant, a revolution of one circle, or [latex]2\\pi [\/latex],&nbsp;will result in the same outputs for these functions. And for tangent and cotangent, only a half a revolution will result in the same outputs.\n\nOther functions can also be periodic. For example, the lengths of months repeat every four years. If [latex]x[\/latex] represents the length time, measured in years, and [latex]f\\left(x\\right)[\/latex] represents the number of days in February, then [latex]f\\left(x+4\\right)=f\\left(x\\right)[\/latex].&nbsp;This pattern repeats over and over through time. In other words, every four years, February is guaranteed to have the same number of days as it did 4 years earlier. The positive number 4 is the smallest positive number that satisfies this condition and is called the period. A <strong>period<\/strong> is the shortest interval over which a function completes one full cycle\u2014in this example, the period is 4 and represents the time it takes for us to be certain February has the same number of days.\n<div class=\"textbox\">\n<h3>A General Note: Period of a Function<\/h3>\nThe <strong>period<\/strong> [latex]P[\/latex] of a repeating function [latex]f[\/latex] is the number representing the interval such that [latex]f\\left(x+P\\right)=f\\left(x\\right)[\/latex] for any value of [latex]x[\/latex].\n\nThe period of the cosine, sine, secant, and cosecant functions is [latex]2\\pi [\/latex].\n\nThe period of the tangent and cotangent functions is [latex]\\pi [\/latex].\n\n<\/div>\n<div class=\"textbox shaded\">\n<h3>Example 8: Finding the Values of Trigonometric Functions<\/h3>\nFind the values of the six trigonometric functions of angle [latex]t[\/latex] based on Figure 9<strong>.<\/strong><span id=\"fs-id1165137692365\">\n<\/span>\n\n[caption id=\"\" align=\"aligncenter\" width=\"487\"]<img src=\"https:\/\/s3-us-west-2.amazonaws.com\/courses-images\/wp-content\/uploads\/sites\/3675\/2018\/09\/27003716\/CNX_Precalc_Figure_05_03_0092.jpg\" alt=\"Graph of circle with angle of t inscribed. Point of (1\/2, negative square root of 3 over 2) is at intersection of terminal side of angle and edge of circle.\" width=\"487\" height=\"383\"> <b>Figure 9<\/b>[\/caption]\n\n[reveal-answer q=\"99481\"]Show Solution[\/reveal-answer]\n[hidden-answer a=\"99481\"]\n<p style=\"text-align: center;\">[latex]\\begin{gathered}\\sin t=y=-\\frac{\\sqrt{3}}{2}\\\\ \\cos t=x=-\\frac{1}{2}\\\\ \\tan t=\\frac{\\sin t}{\\cos t}=\\frac{-\\frac{\\sqrt{3}}{2}}{-\\frac{1}{2}}=\\sqrt{3}\\\\ \\sec t=\\frac{1}{\\cos t}=\\frac{1}{-\\frac{1}{2}}=-2\\\\ \\csc t=\\frac{1}{\\sin t}=\\frac{1}{-\\frac{\\sqrt{3}}{2}}=-\\frac{2\\sqrt{3}}{3}\\\\ \\cot t=\\frac{1}{\\tan t}=\\frac{1}{\\sqrt{3}}=\\frac{\\sqrt{3}}{3}\\end{gathered}[\/latex]<\/p>\n[\/hidden-answer]\n\n<\/div>\n<div class=\"bcc-box bcc-success\">\n<h3>Try It<\/h3>\nFind the values of the six trigonometric functions of angle [latex]t[\/latex]&nbsp;based on Figure 10.<span id=\"fs-id1165132972951\">\n<\/span>\n\n[caption id=\"\" align=\"aligncenter\" width=\"487\"]<img src=\"https:\/\/s3-us-west-2.amazonaws.com\/courses-images\/wp-content\/uploads\/sites\/3675\/2018\/09\/27003719\/CNX_Precalc_Figure_05_03_0102.jpg\" alt=\"Graph of circle with angle of t inscribed. Point of (0, -1) is at intersection of terminal side of angle and edge of circle.\" width=\"487\" height=\"406\"> <b>Figure 10<\/b>[\/caption]\n\n[reveal-answer q=\"766306\"]Show Solution[\/reveal-answer]\n[hidden-answer a=\"766306\"]\n\n[latex]\\begin{align}&amp;\\sin t=-1\\\\&amp;\\cos t=0\\\\&amp;\\tan t \\text{ is undefined}\\\\ &amp;\\sec t \\text{ is undefined}\\\\&amp;\\csc t=-1\\\\&amp;\\cot t=0\\end{align}[\/latex]\n\n[\/hidden-answer]\n\n<\/div>\n<div class=\"textbox shaded\">\n<h3>Example 9: Finding the Value of Trigonometric Functions<\/h3>\nIf [latex]\\sin \\left(t\\right)=-\\frac{\\sqrt{3}}{2}[\/latex] and [latex]\\text{cos}\\left(t\\right)=\\frac{1}{2}[\/latex], find [latex]\\text{sec}\\left(t\\right),\\text{csc}\\left(t\\right),\\text{tan}\\left(t\\right),\\text{ cot}\\left(t\\right)[\/latex].\n\n[reveal-answer q=\"940244\"]Show Solution[\/reveal-answer]\n[hidden-answer a=\"940244\"]\n<p style=\"text-align: center;\">[latex]\\begin{gathered} \\sec t=\\frac{1}{\\cos t}=\\frac{1}{\\frac{1}{2}}=2 \\\\ \\csc t=\\frac{1}{\\sin t}=\\frac{1}{-\\frac{\\sqrt{3}}{2}}-\\frac{2\\sqrt{3}}{3} \\\\ \\tan t=\\frac{\\sin t}{\\cos t}=\\frac{-\\frac{\\sqrt{3}}{2}}{\\frac{1}{2}}=-\\sqrt{3} \\\\ \\cot t=\\frac{1}{\\tan t}=\\frac{1}{-\\sqrt{3}}=-\\frac{\\sqrt{3}}{3} \\end{gathered}[\/latex]<\/p>\n[\/hidden-answer]\n\n<\/div>\n<div class=\"bcc-box bcc-success\">\n<h3>Try It<\/h3>\nIf [latex]\\sin \\left(t\\right)=\\frac{\\sqrt{2}}{2}[\/latex]&nbsp;and [latex]\\cos \\left(t\\right)=\\frac{\\sqrt{2}}{2}[\/latex], find [latex]\\text{sec}\\left(t\\right),\\text{csc}\\left(t\\right),\\text{tan}\\left(t\\right),\\text{ and cot}\\left(t\\right)[\/latex].\n\n[reveal-answer q=\"701998\"]Show Solution[\/reveal-answer]\n[hidden-answer a=\"701998\"]\n\n[latex]\\sec t=\\sqrt{2},\\csc t=\\sqrt{2},\\tan t=1,\\cot t=1[\/latex]\n\n[\/hidden-answer]\n\n<\/div>\nhttps:\/\/youtu.be\/4BR_qUZ5jK0\n<h2>Evaluating Trigonometric Functions with a Calculator<\/h2>\nWe have learned how to evaluate the six trigonometric functions for the common first-quadrant angles and to use them as reference angles for angles in other quadrants. To evaluate trigonometric functions of other angles, we use a scientific or graphing calculator or computer software. If the calculator has a degree mode and a radian mode, confirm the correct mode is chosen before making a calculation.\n\nEvaluating a tangent function with a scientific calculator as opposed to a graphing calculator or computer algebra system is like evaluating a sine or cosine: Enter the value and press the TAN key. For the reciprocal functions, there may not be any dedicated keys that say CSC, SEC, or COT. In that case, the function must be evaluated as the reciprocal of a sine, cosine, or tangent.\n\nIf we need to work with degrees and our calculator or software does not have a degree mode, we can enter the degrees multiplied by the conversion factor [latex]\\frac{\\pi }{180}[\/latex] to convert the degrees to radians. To find the secant of [latex]30^\\circ [\/latex], we could press\n<div style=\"text-align: center;\">[latex]\\text{(for a scientific calculator):}\\frac{1}{30\\times \\frac{\\pi }{180}}\\text{COS}[\/latex]<\/div>\nor\n<div style=\"text-align: center;\">[latex]\\text{(for a graphing calculator):}\\frac{1}{\\cos \\left(\\frac{30\\pi }{180}\\right)}[\/latex]<\/div>\n<div class=\"textbox\">\n<h3>How To: Given an angle measure in radians, use a scientific calculator to find the cosecant.<strong>\n<\/strong><\/h3>\n<ol>\n \t<li>If the calculator has degree mode and radian mode, set it to radian mode.<\/li>\n \t<li>Enter: [latex]1\\text{ \/}[\/latex]<\/li>\n \t<li>Enter the value of the angle inside parentheses.<\/li>\n \t<li>Press the SIN key.<\/li>\n \t<li>Press the = key.<\/li>\n<\/ol>\n<\/div>\n<div class=\"textbox\">\n<h3>How To: Given an angle measure in radians, use a graphing utility\/calculator to find the cosecant.<strong>\n<\/strong><\/h3>\n<ol>\n \t<li>If the graphing utility has degree mode and radian mode, set it to radian mode.<\/li>\n \t<li>Enter: [latex]1\\text{ \/}[\/latex]<\/li>\n \t<li>Press the SIN key.<\/li>\n \t<li>Enter the value of the angle inside parentheses.<\/li>\n \t<li>Press the ENTER key.<\/li>\n<\/ol>\n<\/div>\n<div class=\"textbox shaded\">\n<h3>Example 10: Evaluating the Secant Using Technology<\/h3>\nEvaluate the cosecant of [latex]\\frac{5\\pi }{7}[\/latex].\n\n[reveal-answer q=\"710943\"]Show Solution[\/reveal-answer]\n[hidden-answer a=\"710943\"]\n\nFor a scientific calculator, enter information as follows:\n<p style=\"text-align: center;\">[latex]\\text{1 \/ ( 5 }\\times \\text{ }\\pi \\text{ \/ 7 ) SIN =}[\/latex]<\/p>\n<p style=\"text-align: center;\">[latex]\\csc \\left(\\frac{5\\pi }{7}\\right)\\approx 1.279[\/latex]<\/p>\n[\/hidden-answer]\n\n<\/div>\n<div class=\"bcc-box bcc-success\">\n<h3>Try It<\/h3>\nEvaluate the cotangent of [latex]-\\frac{\\pi }{8}[\/latex].\n\n[reveal-answer q=\"56177\"]Show Solution[\/reveal-answer]\n[hidden-answer a=\"56177\"]\n\n[latex]\\approx -2.414[\/latex]\n\n[\/hidden-answer]\n\n<\/div>\n<div class=\"textbox key-takeaways\">\n<h3>Try It<\/h3>\n[ohm_question hide_question_numbers=1]173357[\/ohm_question]\n\n<\/div>\nhttps:\/\/youtu.be\/rhRi_IuE_18\n\n<section id=\"fs-id1165137938685\" class=\"key-equations\">\n<h2>Key Equations<\/h2>\n<table id=\"eip-id1165134112952\" summary=\"..\">\n<tbody>\n<tr>\n<td>Tangent function<\/td>\n<td>[latex]\\tan t=\\frac{\\sin t}{\\cos t}[\/latex]<\/td>\n<\/tr>\n<tr>\n<td>Secant function<\/td>\n<td>[latex]\\sec t=\\frac{1}{\\cos t}[\/latex]<\/td>\n<\/tr>\n<tr>\n<td>Cosecant function<\/td>\n<td>[latex]\\csc t=\\frac{1}{\\sin t}[\/latex]<\/td>\n<\/tr>\n<tr>\n<td>Cotangent function<\/td>\n<td>[latex]\\cot t=\\frac{1}{\\tan t}=\\frac{\\cos t}{\\sin t}[\/latex]<\/td>\n<\/tr>\n<\/tbody>\n<\/table>\n<\/section><section id=\"fs-id1165137832791\" class=\"key-concepts\">\n<h2>Key Concepts<\/h2>\n<ul id=\"fs-id1165134211396\">\n \t<li>The tangent of an angle is the ratio of the <em>y<\/em>-value to the <em>x<\/em>-value of the corresponding point on the unit circle.<\/li>\n \t<li>The secant, cotangent, and cosecant are all reciprocals of other functions. The secant is the reciprocal of the cosine function, the cotangent is the reciprocal of the tangent function, and the cosecant is the reciprocal of the sine function.<\/li>\n \t<li>The six trigonometric functions can be found from a point on the unit circle.<\/li>\n \t<li>Trigonometric functions can also be found from an angle.<\/li>\n \t<li>Trigonometric functions of angles outside the first quadrant can be determined using reference angles.<\/li>\n \t<li>A function is said to be even if [latex]f\\left(-x\\right)=f\\left(x\\right)[\/latex] and odd if [latex]f\\left(-x\\right)=-f\\left(x\\right)[\/latex].<\/li>\n \t<li>Cosine and secant are even; sine, tangent, cosecant, and cotangent are odd.<\/li>\n \t<li>Even and odd properties can be used to evaluate trigonometric functions.<\/li>\n \t<li>The Pythagorean Identity makes it possible to find a cosine from a sine or a sine from a cosine.<\/li>\n \t<li>Identities can be used to evaluate trigonometric functions.<\/li>\n \t<li>Fundamental identities such as the Pythagorean Identity can be manipulated algebraically to produce new identities.<\/li>\n \t<li>The trigonometric functions repeat at regular intervals.<\/li>\n \t<li>The period [latex]P[\/latex] of a repeating function [latex]f[\/latex] is the smallest interval such that [latex]f\\left(x+P\\right)=f\\left(x\\right)[\/latex] for any value of [latex]x[\/latex].<\/li>\n \t<li>The values of trigonometric functions of special angles can be found by mathematical analysis.<\/li>\n \t<li>To evaluate trigonometric functions of other angles, we can use a calculator or computer software.<\/li>\n<\/ul>\n<div>\n<h2>Glossary<\/h2>\n<dl id=\"fs-id1165137640892\" class=\"definition\">\n \t<dt>cosecant<\/dt>\n \t<dd id=\"fs-id1165137640897\">the reciprocal of the sine function: on the unit circle, [latex]\\csc t=\\frac{1}{y},y\\ne 0[\/latex]<\/dd>\n<\/dl>\n<dl id=\"fs-id1165137529833\" class=\"definition\">\n \t<dt>cotangent<\/dt>\n \t<dd id=\"fs-id1165137529838\">the reciprocal of the tangent function: on the unit circle, [latex]\\cot t=\\frac{x}{y},y\\ne 0[\/latex]<\/dd>\n<\/dl>\n<dl id=\"fs-id1165137410476\" class=\"definition\">\n \t<dt>identities<\/dt>\n \t<dd id=\"fs-id1165137410481\">statements that are true for all values of the input on which they are defined<\/dd>\n<\/dl>\n<dl id=\"fs-id1165135195519\" class=\"definition\">\n \t<dt>period<\/dt>\n \t<dd id=\"fs-id1165135195524\">the smallest interval [latex]P[\/latex]\nof a repeating function [latex]f[\/latex] such that [latex]f\\left(x+P\\right)=f\\left(x\\right)[\/latex]<\/dd>\n<\/dl>\n<dl id=\"fs-id1165135591029\" class=\"definition\">\n \t<dt>secant<\/dt>\n \t<dd id=\"fs-id1165135591035\">the reciprocal of the cosine function: on the unit circle, [latex]\\sec t=\\frac{1}{x},x\\ne 0[\/latex]<\/dd>\n<\/dl>\n<dl id=\"fs-id1165137834349\" class=\"definition\">\n \t<dt>tangent<\/dt>\n \t<dd id=\"fs-id1165137834355\">the quotient of the sine and cosine: on the unit circle, [latex]\\tan t=\\frac{y}{x},x\\ne 0[\/latex]<\/dd>\n<\/dl>\n<\/div>\n<\/section>\n","rendered":"<div class=\"textbox learning-objectives\">\n<h3>Learning Outcomes<\/h3>\n<ul>\n<li style=\"font-weight: 400;\">Find exact values of the trigonometric functions secant, cosecant, tangent, and cotangent of\u2009 30\u00b0 (\u03c0\/6),\u2009\u2009\u200945\u00b0 (\u03c0\/4),\u2009and\u200960\u00b0 (\u03c0\/3).<\/li>\n<li style=\"font-weight: 400;\">Use reference angles to evaluate the trigonometric functions secant, cosecant, tangent, and cotangent.<\/li>\n<li style=\"font-weight: 400;\">Use properties of even and odd trigonometric functions.<\/li>\n<li style=\"font-weight: 400;\">Recognize and use fundamental identities.<\/li>\n<li style=\"font-weight: 400;\">Evaluate trigonometric functions with a calculator.<\/li>\n<\/ul>\n<\/div>\n<h2>Find exact values of the trigonometric functions secant, cosecant, tangent, and cotangent<\/h2>\n<p>To define the remaining functions, we will once again draw a unit circle with a point [latex]\\left(x,y\\right)[\/latex] corresponding to an angle of [latex]t[\/latex], as shown in Figure 1. As with the sine and cosine, we can use the [latex]\\left(x,y\\right)[\/latex] coordinates to find the other functions.<\/p>\n<div style=\"width: 497px\" class=\"wp-caption aligncenter\"><img loading=\"lazy\" decoding=\"async\" src=\"https:\/\/s3-us-west-2.amazonaws.com\/courses-images\/wp-content\/uploads\/sites\/3675\/2018\/09\/27003658\/CNX_Precalc_Figure_05_03_0012.jpg\" alt=\"Graph of circle with angle of t inscribed. Point of (x, y) is at intersection of terminal side of angle and edge of circle.\" width=\"487\" height=\"198\" \/><\/p>\n<p class=\"wp-caption-text\"><b>Figure 1<\/b><\/p>\n<\/div>\n<p>The first function we will define is the tangent. The <strong>tangent<\/strong> of an angle is the ratio of the <em>y<\/em>-value to the <em>x<\/em>-value of the corresponding point on the unit circle. In Figure 1, the tangent of angle [latex]t[\/latex] is equal to [latex]\\frac{y}{x},x\\ne 0[\/latex]. Because the <em>y<\/em>-value is equal to the sine of [latex]t[\/latex], and the <em>x<\/em>-value is equal to the cosine of [latex]t[\/latex], the tangent of angle [latex]t[\/latex] can also be defined as [latex]\\frac{\\sin t}{\\cos t},\\cos t\\ne 0[\/latex]. The tangent function is abbreviated as [latex]\\tan[\/latex]. The remaining three functions can all be expressed as reciprocals of functions we have already defined.<\/p>\n<ul>\n<li>The <strong>secant<\/strong> function is the reciprocal of the cosine function. In Figure 1, the secant of angle [latex]t[\/latex] is equal to [latex]\\frac{1}{\\cos t}=\\frac{1}{x},x\\ne 0[\/latex]. The secant function is abbreviated as [latex]\\sec[\/latex].<\/li>\n<li>The <strong>cotangent<\/strong> function is the reciprocal of the tangent function. In Figure 1, the cotangent of angle [latex]t[\/latex] is equal to [latex]\\frac{\\cos t}{\\sin t}=\\frac{x}{y},y\\ne 0[\/latex]. The cotangent function is abbreviated as [latex]\\cot[\/latex].<\/li>\n<li>The <strong>cosecant<\/strong> function is the reciprocal of the sine function. In Figure 1, the cosecant of angle [latex]t[\/latex] is equal to [latex]\\frac{1}{\\sin t}=\\frac{1}{y},y\\ne 0[\/latex]. The cosecant function is abbreviated as [latex]\\csc[\/latex].<\/li>\n<\/ul>\n<div class=\"textbox\">\n<h3>A General Note: Tangent, Secant, Cosecant, and Cotangent Functions<\/h3>\n<p>If [latex]t[\/latex] is a real number and [latex]\\left(x,y\\right)[\/latex] is a point where the terminal side of an angle of [latex]t[\/latex] radians intercepts the unit circle, then<\/p>\n<p style=\"text-align: center;\">[latex]\\begin{gathered}\\tan t=\\frac{y}{x},x\\ne 0\\\\ \\sec t=\\frac{1}{x},x\\ne 0\\\\ \\csc t=\\frac{1}{y},y\\ne 0\\\\ \\cot t=\\frac{x}{y},y\\ne 0\\end{gathered}[\/latex]<\/p>\n<\/div>\n<div class=\"textbox shaded\">\n<h3>Example 1: Finding Trigonometric Functions from a Point on the Unit Circle<\/h3>\n<p>The point [latex]\\left(-\\frac{\\sqrt{3}}{2},\\frac{1}{2}\\right)[\/latex] is on the unit circle, as shown in Figure 2. Find [latex]\\sin t,\\cos t,\\tan t,\\sec t,\\csc t[\/latex], and [latex]\\cot t[\/latex].<\/p>\n<div style=\"width: 497px\" class=\"wp-caption aligncenter\"><img loading=\"lazy\" decoding=\"async\" src=\"https:\/\/s3-us-west-2.amazonaws.com\/courses-images\/wp-content\/uploads\/sites\/3675\/2018\/09\/27003700\/CNX_Precalc_Figure_05_03_0022.jpg\" alt=\"Graph of circle with angle of t inscribed. Point of (negative square root of 3 over 2, 1\/2) is at intersection of terminal side of angle and edge of circle.\" width=\"487\" height=\"216\" \/><\/p>\n<p class=\"wp-caption-text\"><b>Figure 2<\/b><\/p>\n<\/div>\n<div class=\"qa-wrapper\" style=\"display: block\"><span class=\"show-answer collapsed\" style=\"cursor: pointer\" data-target=\"q714608\">Show Solution<\/span><\/p>\n<div id=\"q714608\" class=\"hidden-answer\" style=\"display: none\">\n<p>Because we know the [latex]\\left(x,y\\right)[\/latex] coordinates of the point on the unit circle indicated by angle [latex]t[\/latex], we can use those coordinates to find the six functions:<\/p>\n<p style=\"text-align: center;\">[latex]\\begin{gathered}\\sin t=y=\\frac{1}{2}\\\\ \\cos t=x=-\\frac{\\sqrt{3}}{2}\\\\ \\tan t=\\frac{y}{x}=\\frac{\\frac{1}{2}}{-\\frac{\\sqrt{3}}{2}}=\\frac{1}{2}\\left(-\\frac{2}{\\sqrt{3}}\\right)=-\\frac{1}{\\sqrt{3}}=-\\frac{\\sqrt{3}}{3}\\\\ \\sec t=\\frac{1}{x}=\\frac{1}{\\frac{-\\frac{\\sqrt{3}}{2}}{}}=-\\frac{2}{\\sqrt{3}}=-\\frac{2\\sqrt{3}}{3}\\\\ \\csc t=\\frac{1}{y}=\\frac{1}{\\frac{1}{2}}=2\\\\ \\cot t=\\frac{x}{y}=\\frac{-\\frac{\\sqrt{3}}{2}}{\\frac{1}{2}}=-\\frac{\\sqrt{3}}{2}\\left(\\frac{2}{1}\\right)=-\\sqrt{3}\\end{gathered}[\/latex]<\/p>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"bcc-box bcc-success\">\n<h3>Try It<\/h3>\n<p>The point [latex]\\left(\\frac{\\sqrt{2}}{2},-\\frac{\\sqrt{2}}{2}\\right)[\/latex] is on the unit circle, as shown in Figure 3. Find [latex]\\sin t,\\cos t,\\tan t,\\sec t,\\csc t[\/latex], and [latex]\\cot t[\/latex].<\/p>\n<div style=\"width: 497px\" class=\"wp-caption aligncenter\"><img loading=\"lazy\" decoding=\"async\" src=\"https:\/\/s3-us-west-2.amazonaws.com\/courses-images\/wp-content\/uploads\/sites\/3675\/2018\/09\/27003703\/CNX_Precalc_Figure_05_03_0032.jpg\" alt=\"Graph of circle with angle of t inscribed. Point of (square root of 2 over 2, negative square root of 2 over 2) is at intersection of terminal side of angle and edge of circle.\" width=\"487\" height=\"347\" \/><\/p>\n<p class=\"wp-caption-text\"><b>Figure 3<\/b><\/p>\n<\/div>\n<div class=\"qa-wrapper\" style=\"display: block\"><span class=\"show-answer collapsed\" style=\"cursor: pointer\" data-target=\"q264592\">Show Solution<\/span><\/p>\n<div id=\"q264592\" class=\"hidden-answer\" style=\"display: none\">\n<p>[latex]\\sin t=-\\frac{\\sqrt{2}}{2},\\cos t=\\frac{\\sqrt{2}}{2},\\tan t=-1,\\sec t=\\sqrt{2},\\csc t=-\\sqrt{2},\\cot t=-1[\/latex]<\/p>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"textbox shaded\">\n<h3>Example 2: Finding the Trigonometric Functions of an Angle<\/h3>\n<p>Find [latex]\\sin t,\\cos t,\\tan t,\\sec t,\\csc t[\/latex], and [latex]\\cot t[\/latex] when [latex]t=\\frac{\\pi }{6}[\/latex].<\/p>\n<div class=\"qa-wrapper\" style=\"display: block\"><span class=\"show-answer collapsed\" style=\"cursor: pointer\" data-target=\"q419551\">Show Solution<\/span><\/p>\n<div id=\"q419551\" class=\"hidden-answer\" style=\"display: none\">\n<p>We have previously used the properties of equilateral triangles to demonstrate that [latex]\\sin \\frac{\\pi }{6}=\\frac{1}{2}[\/latex] and [latex]\\cos \\frac{\\pi }{6}=\\frac{\\sqrt{3}}{2}[\/latex]. We can use these values and the definitions of tangent, secant, cosecant, and cotangent as functions of sine and cosine to find the remaining function values.<\/p>\n<p style=\"text-align: center;\">[latex]\\begin{gathered} \\tan \\frac{\\pi }{6}=\\frac{\\sin\\frac{\\pi }{6}}{\\cos \\frac{\\pi }{6}} =\\frac{\\frac{1}{2}}{\\frac{\\sqrt{3}}{2}}=\\frac{1}{\\sqrt{3}}=\\frac{\\sqrt{3}}{3}\\end{gathered}[\/latex]<\/p>\n<p style=\"text-align: center;\">[latex]\\begin{gathered}\\sec \\frac{\\pi }{6}=\\frac{1}{\\cos \\frac{\\pi }{6}} =\\frac{1}{\\frac{\\sqrt{3}}{2}}=\\frac{2}{\\sqrt{3}}=\\frac{2\\sqrt{3}}{3}\\end{gathered}[\/latex]<\/p>\n<p style=\"text-align: center;\">[latex]\\begin{gathered}\\csc \\frac{\\pi }{6}=\\frac{1}{\\sin \\frac{\\pi }{6}}=\\frac{1}{\\frac{1}{2}}=2\\end{gathered}[\/latex]<\/p>\n<p style=\"text-align: center;\"><span style=\"font-size: 1rem;\">[latex]\\begin{gathered}\\cot \\frac{\\pi }{6}=\\frac{\\cos \\frac{\\pi }{6}}{\\sin \\frac{\\pi }{6}} =\\frac{\\frac{\\sqrt{3}}{2}}{\\frac{1}{2}}=\\sqrt{3} \\end{gathered}[\/latex]<\/span><\/p>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"bcc-box bcc-success\">\n<h3>Try It<\/h3>\n<p>Find [latex]\\sin t,\\cos t,\\tan t,\\sec t,\\csc t[\/latex], and [latex]\\cot t[\/latex] when [latex]t=\\frac{\\pi }{3}[\/latex].<\/p>\n<div class=\"qa-wrapper\" style=\"display: block\"><span class=\"show-answer collapsed\" style=\"cursor: pointer\" data-target=\"q151548\">Show Solution<\/span><\/p>\n<div id=\"q151548\" class=\"hidden-answer\" style=\"display: none\">\n<p>[latex]\\begin{align}&\\sin \\frac{\\pi }{3}=\\frac{\\sqrt{3}}{2}\\\\ &\\cos \\frac{\\pi }{3}=\\frac{1}{2}\\\\ &\\tan \\frac{\\pi }{3}=\\sqrt{3}\\\\ &\\sec \\frac{\\pi }{3}=2\\\\ &\\csc \\frac{\\pi }{3}=\\frac{2\\sqrt{3}}{3}\\\\ &\\cot \\frac{\\pi }{3}=\\frac{\\sqrt{3}}{3}\\end{align}[\/latex]<\/p>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"textbox key-takeaways\">\n<h3>Try It<\/h3>\n<p><iframe loading=\"lazy\" id=\"ohm173354\" class=\"resizable\" src=\"https:\/\/ohm.lumenlearning.com\/multiembedq.php?id=173354&theme=oea&iframe_resize_id=ohm173354\" width=\"100%\" height=\"150\"><\/iframe><\/p>\n<\/div>\n<p>Because we know the sine and cosine values for the common first-quadrant angles, we can find the other function values for those angles as well by setting [latex]x[\/latex] equal to the cosine and [latex]y[\/latex] equal to the sine and then using the definitions of tangent, secant, cosecant, and cotangent. The results are shown in the table below.<\/p>\n<table id=\"Table_05_03_01\" summary=\"..\">\n<tbody>\n<tr>\n<td><strong>Angle<\/strong><\/td>\n<td><strong> [latex]0[\/latex] <\/strong><\/td>\n<td><strong> [latex]\\frac{\\pi }{6},\\text{ or }{30}^{\\circ}[\/latex] <\/strong><\/td>\n<td><strong> [latex]\\frac{\\pi }{4},\\text{ or } {45}^{\\circ }[\/latex] <\/strong><\/td>\n<td><strong> [latex]\\frac{\\pi }{3},\\text{ or }{60}^{\\circ }[\/latex] <\/strong><\/td>\n<td><strong> [latex]\\frac{\\pi }{2},\\text{ or }{90}^{\\circ }[\/latex] <\/strong><\/td>\n<\/tr>\n<tr>\n<td><strong>Cosine<\/strong><\/td>\n<td>1<\/td>\n<td>[latex]\\frac{\\sqrt{3}}{2}[\/latex]<\/td>\n<td>[latex]\\frac{\\sqrt{2}}{2}[\/latex]<\/td>\n<td>[latex]\\frac{1}{2}[\/latex]<\/td>\n<td>0<\/td>\n<\/tr>\n<tr>\n<td><strong>Sine<\/strong><\/td>\n<td>0<\/td>\n<td>[latex]\\frac{1}{2}[\/latex]<\/td>\n<td>[latex]\\frac{\\sqrt{2}}{2}[\/latex]<\/td>\n<td>[latex]\\frac{\\sqrt{3}}{2}[\/latex]<\/td>\n<td>1<\/td>\n<\/tr>\n<tr>\n<td><strong>Tangent<\/strong><\/td>\n<td>0<\/td>\n<td>[latex]\\frac{\\sqrt{3}}{3}[\/latex]<\/td>\n<td>1<\/td>\n<td>[latex]\\sqrt{3}[\/latex]<\/td>\n<td>Undefined<\/td>\n<\/tr>\n<tr>\n<td><strong>Secant<\/strong><\/td>\n<td>1<\/td>\n<td>[latex]\\frac{2\\sqrt{3}}{3}[\/latex]<\/td>\n<td>[latex]\\sqrt{2}[\/latex]<\/td>\n<td>2<\/td>\n<td>Undefined<\/td>\n<\/tr>\n<tr>\n<td><strong>Cosecant<\/strong><\/td>\n<td>Undefined<\/td>\n<td>2<\/td>\n<td>[latex]\\sqrt{2}[\/latex]<\/td>\n<td>[latex]\\frac{2\\sqrt{3}}{3}[\/latex]<\/td>\n<td>1<\/td>\n<\/tr>\n<tr>\n<td><strong>Cotangent<\/strong><\/td>\n<td>Undefined<\/td>\n<td>[latex]\\sqrt{3}[\/latex]<\/td>\n<td>1<\/td>\n<td>[latex]\\frac{\\sqrt{3}}{3}[\/latex]<\/td>\n<td>0<\/td>\n<\/tr>\n<\/tbody>\n<\/table>\n<h2>Using Reference Angles to Evaluate Tangent, Secant, Cosecant, and Cotangent<\/h2>\n<p>We can evaluate trigonometric functions of angles outside the first quadrant using reference angles as we have already done with the sine and cosine functions. The procedure is the same: Find the <strong>reference angle<\/strong> formed by the terminal side of the given angle with the horizontal axis. The trigonometric function values for the original angle will be the same as those for the reference angle, except for the positive or negative sign, which is determined by <em>x<\/em>&#8211; and <em>y<\/em>-values in the original quadrant. Figure 4&nbsp;shows which functions are positive in which quadrant.<\/p>\n<p>To help us remember which of the six trigonometric functions are positive in each quadrant, we can use the mnemonic phrase &#8220;A Smart Trig Class.&#8221; Each of the four words in the phrase corresponds to one of the four quadrants, starting with quadrant I and rotating counterclockwise. In quadrant I, which is &#8220;<strong>A<\/strong>,&#8221; <strong><u>a<\/u><\/strong>ll of the six trigonometric functions are positive. In quadrant II, &#8220;<strong>S<\/strong>mart,&#8221; only <strong><u>s<\/u><\/strong>ine and its reciprocal function, cosecant, are positive. In quadrant III, &#8220;<strong>T<\/strong>rig,&#8221; only <strong><u>t<\/u><\/strong>angent and its reciprocal function, cotangent, are positive. Finally, in quadrant IV, &#8220;<strong>C<\/strong>lass,&#8221; only <strong><u>c<\/u><\/strong>osine and its reciprocal function, secant, are positive.<\/p>\n<div style=\"width: 497px\" class=\"wp-caption aligncenter\"><img loading=\"lazy\" decoding=\"async\" src=\"https:\/\/s3-us-west-2.amazonaws.com\/courses-images\/wp-content\/uploads\/sites\/3675\/2018\/09\/27003705\/CNX_Precalc_Figure_05_03_0042.jpg\" alt=\"Graph of circle with each quadrant labeled. Under quadrant 1, labels fro sin t, cos t, tan t, sec t, csc t, and cot t. Under quadrant 2, labels for sin t and csc t. Under quadrant 3, labels for tan t and cot t. Under quadrant 4, labels for cos t, sec t.\" width=\"487\" height=\"363\" \/><\/p>\n<p class=\"wp-caption-text\"><b>Figure 4<\/b><\/p>\n<\/div>\n<div class=\"textbox\">\n<h3>How To: Given an angle not in the first quadrant, use reference angles to find all six trigonometric functions.<strong><br \/>\n<\/strong><\/h3>\n<ol>\n<li>Measure the angle formed by the terminal side of the given angle and the horizontal axis. This is the reference angle.<\/li>\n<li>Evaluate the function at the reference angle.<\/li>\n<li>Observe the quadrant where the terminal side of the original angle is located. Based on the quadrant, determine whether the output is positive or negative.<\/li>\n<\/ol>\n<\/div>\n<div class=\"textbox shaded\">\n<h3>Example 3: Using Reference Angles to Find Trigonometric Functions<\/h3>\n<p>Use reference angles to find all six trigonometric functions of [latex]-\\frac{5\\pi }{6}[\/latex].<\/p>\n<div class=\"qa-wrapper\" style=\"display: block\"><span class=\"show-answer collapsed\" style=\"cursor: pointer\" data-target=\"q720177\">Show Solution<\/span><\/p>\n<div id=\"q720177\" class=\"hidden-answer\" style=\"display: none\">\n<p>The angle between this angle\u2019s terminal side and the <em>x<\/em>-axis is [latex]\\frac{\\pi }{6}[\/latex], so that is the reference angle. Since [latex]-\\frac{5\\pi }{6}[\/latex] is in the third quadrant, where both [latex]x[\/latex] and [latex]y[\/latex] are negative, cosine, sine, secant, and cosecant will be negative, while tangent and cotangent will be positive.<\/p>\n<p style=\"text-align: center;\">[latex]\\begin{gathered}\\cos \\left(-\\frac{5\\pi }{6}\\right)=-\\frac{\\sqrt{3}}{2} \\\\ \\sin \\left(-\\frac{5\\pi }{6}\\right)=-\\frac{1}{2} \\\\ \\tan\\left(-\\frac{5\\pi }{6}\\right)=\\frac{\\sqrt{3}}{3} \\\\ \\sec\\left(-\\frac{5\\pi }{6}\\right)=-\\frac{2\\sqrt{3}}{3}\\\\ \\csc\\left(-\\frac{5\\pi }{6}\\right)=-2\\\\ \\cot \\left(-\\frac{5\\pi }{6}\\right)=\\sqrt{3} \\end{gathered}[\/latex]<\/p>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"bcc-box bcc-success\">\n<h3>Try It<\/h3>\n<p>Use reference angles to find all six trigonometric functions of [latex]-\\frac{7\\pi }{4}[\/latex].<\/p>\n<div class=\"qa-wrapper\" style=\"display: block\"><span class=\"show-answer collapsed\" style=\"cursor: pointer\" data-target=\"q621482\">Show Solution<\/span><\/p>\n<div id=\"q621482\" class=\"hidden-answer\" style=\"display: none\">\n<p>[latex]\\sin \\left(-\\frac{7\\pi }{4}\\right)=\\frac{\\sqrt{2}}{2},\\cos \\left(-\\frac{7\\pi }{4}\\right)=\\frac{\\sqrt{2}}{2},\\tan \\left(-\\frac{7\\pi }{4}\\right)=1[\/latex],<br \/>\n[latex]\\sec \\left(-\\frac{7\\pi }{4}\\right)=\\sqrt{2},\\csc \\left(-\\frac{7\\pi }{4}\\right)=\\sqrt{2},\\cot \\left(-\\frac{7\\pi }{4}\\right)=1[\/latex]<\/p>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"textbox key-takeaways\">\n<h3>Try It<\/h3>\n<p><iframe loading=\"lazy\" id=\"ohm100617\" class=\"resizable\" src=\"https:\/\/ohm.lumenlearning.com\/multiembedq.php?id=100617&theme=oea&iframe_resize_id=ohm100617\" width=\"100%\" height=\"150\"><\/iframe><\/p>\n<\/div>\n<h2>Using Even and Odd Trigonometric Functions<\/h2>\n<p>To be able to use our six trigonometric functions freely with both positive and negative angle inputs, we should examine how each function treats a negative input. As it turns out, there is an important difference among the functions in this regard.<\/p>\n<p>Consider the function [latex]f\\left(x\\right)={x}^{2}[\/latex], shown in Figure 5. The graph of the function is symmetrical about the <em>y<\/em>-axis. All along the curve, any two points with opposite <em>x<\/em>-values have the same function value. This matches the result of calculation: [latex]{\\left(4\\right)}^{2}={\\left(-4\\right)}^{2}[\/latex], [latex]{\\left(-5\\right)}^{2}={\\left(5\\right)}^{2}[\/latex],&nbsp;and so on. So [latex]f\\left(x\\right)={x}^{2}[\/latex] is an <strong>even function<\/strong>, a function such that two inputs that are opposites have the same output. That means [latex]f\\left(-x\\right)=f\\left(x\\right)[\/latex].<\/p>\n<p><span id=\"fs-id1165137817732\"> <img decoding=\"async\" class=\"aligncenter\" src=\"https:\/\/s3-us-west-2.amazonaws.com\/courses-images\/wp-content\/uploads\/sites\/3675\/2018\/09\/27003707\/CNX_Precalc_Figure_05_03_0052.jpg\" alt=\"Graph of parabola with points (-2, 4) and (2, 4) labeled.\" \/><\/span><\/p>\n<p style=\"text-align: center;\"><strong>Figure 5.&nbsp;<\/strong>The function [latex]f\\left(x\\right)={x}^{2}[\/latex]&nbsp;is an even function.<\/p>\n<p>Now consider the function [latex]f\\left(x\\right)={x}^{3}[\/latex], shown in Figure 6. The graph is not symmetrical about the <em>y<\/em>-axis. All along the graph, any two points with opposite <em>x<\/em>-values also have opposite <em>y<\/em>-values. So [latex]f\\left(x\\right)={x}^{3}[\/latex] is an <strong>odd function<\/strong>, one such that two inputs that are opposites have outputs that are also opposites. That means [latex]f\\left(-x\\right)=-f\\left(x\\right)[\/latex].<\/p>\n<p><span id=\"fs-id1165135545756\"> <img decoding=\"async\" class=\"aligncenter\" src=\"https:\/\/s3-us-west-2.amazonaws.com\/courses-images\/wp-content\/uploads\/sites\/3675\/2018\/09\/27003710\/CNX_Precalc_Figure_05_03_0062.jpg\" alt=\"Graph of function with labels for points (-1, -1) and (1, 1).\" \/><\/span><\/p>\n<p style=\"text-align: center;\"><strong>Figure 6.&nbsp;<\/strong>The function [latex]f\\left(x\\right)={x}^{3}[\/latex]&nbsp;is an odd function.<\/p>\n<p>We can test whether a trigonometric function is even or odd by drawing a <strong>unit circle<\/strong> with a positive and a negative angle, as in Figure 7. The sine of the positive angle is [latex]y[\/latex]. The sine of the negative angle is \u2212<em>y<\/em>. The <strong>sine function<\/strong>, then, is an odd function. We can test each of the six trigonometric functions in this fashion. The results are shown in in the table below.<\/p>\n<div style=\"width: 497px\" class=\"wp-caption aligncenter\"><img loading=\"lazy\" decoding=\"async\" src=\"https:\/\/s3-us-west-2.amazonaws.com\/courses-images\/wp-content\/uploads\/sites\/3675\/2018\/09\/27003712\/CNX_Precalc_Figure_05_03_0072.jpg\" alt=\"Graph of circle with angle of t and -t inscribed. Point of (x, y) is at intersection of terminal side of angle t and edge of circle. Point of (x, -y) is at intersection of terminal side of angle -t and edge of circle.\" width=\"487\" height=\"369\" \/><\/p>\n<p class=\"wp-caption-text\"><b>Figure 7<\/b><\/p>\n<\/div>\n<table id=\"Table_05_03_02\" summary=\"..\">\n<tbody>\n<tr>\n<td>[latex]\\begin{array}{l}\\sin t=y\\hfill \\\\ \\sin \\left(-t\\right)=-y\\hfill \\\\ \\sin t\\ne \\sin \\left(-t\\right)\\hfill \\end{array}[\/latex]<\/td>\n<td>[latex]\\begin{array}{l}\\text{cos}t=x\\hfill \\\\ \\cos \\left(-t\\right)=x\\hfill \\\\ \\cos t=\\cos \\left(-t\\right)\\hfill \\end{array}[\/latex]<\/td>\n<td>[latex]\\begin{array}{l}\\text{tan}\\left(t\\right)=\\frac{y}{x}\\hfill \\\\ \\tan \\left(-t\\right)=-\\frac{y}{x}\\hfill \\\\ \\tan t\\ne \\tan \\left(-t\\right)\\hfill \\end{array}[\/latex]<\/td>\n<\/tr>\n<tr>\n<td>[latex]\\begin{array}{l}\\sec t=\\frac{1}{x}\\hfill \\\\ \\sec \\left(-t\\right)=\\frac{1}{x}\\hfill \\\\ \\sec t=\\sec \\left(-t\\right)\\hfill \\end{array}[\/latex]<\/td>\n<td>[latex]\\begin{array}{l}\\csc t=\\frac{1}{y}\\hfill \\\\ \\csc \\left(-t\\right)=\\frac{1}{-y}\\hfill \\\\ \\csc t\\ne \\csc \\left(-t\\right)\\hfill \\end{array}[\/latex]<\/td>\n<td>[latex]\\begin{array}{l}\\cot t=\\frac{x}{y}\\hfill \\\\ \\cot \\left(-t\\right)=\\frac{x}{-y}\\hfill \\\\ \\cot t\\ne cot\\left(-t\\right)\\hfill \\end{array}[\/latex]<\/td>\n<\/tr>\n<\/tbody>\n<\/table>\n<div class=\"textbox\">\n<h3>A General Note: Even and Odd Trigonometric Functions<\/h3>\n<p>An <strong>even function<\/strong> is one in which [latex]f\\left(-x\\right)=f\\left(x\\right)[\/latex].<\/p>\n<p>An <strong>odd function<\/strong> is one in which [latex]f\\left(-x\\right)=-f\\left(x\\right)[\/latex].<\/p>\n<p>Cosine and secant are even:<\/p>\n<p style=\"text-align: center;\">[latex]\\begin{gathered}\\cos \\left(-t\\right)=\\cos t \\\\ \\sec \\left(-t\\right)=\\sec t \\end{gathered}[\/latex]<\/p>\n<p>Sine, tangent, cosecant, and cotangent are odd:<\/p>\n<p style=\"text-align: center;\">[latex]\\begin{gathered}\\sin \\left(-t\\right)=-\\sin t \\\\ \\tan \\left(-t\\right)=-\\tan t \\\\ \\csc \\left(-t\\right)=-\\csc t \\\\ \\cot \\left(-t\\right)=-\\cot t \\end{gathered}[\/latex]<\/p>\n<\/div>\n<div class=\"textbox shaded\">\n<h3>Example 4: Using Even and Odd Properties of Trigonometric Functions<\/h3>\n<p>If the [latex]\\sec t=2[\/latex], what is the [latex]\\sec (-t)[\/latex]?<\/p>\n<div class=\"qa-wrapper\" style=\"display: block\"><span class=\"show-answer collapsed\" style=\"cursor: pointer\" data-target=\"q5363\">Show Solution<\/span><\/p>\n<div id=\"q5363\" class=\"hidden-answer\" style=\"display: none\">\n<p>Secant is an even function. The secant of an angle is the same as the secant of its opposite. So if the secant of angle <em>t<\/em> is 2, the secant of [latex]-t[\/latex] is also 2.<\/p>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"bcc-box bcc-success\">\n<h3>Try It<\/h3>\n<p>If the [latex]\\cot t=\\sqrt{3}[\/latex], what is [latex]\\cot (-t)[\/latex]?<\/p>\n<div class=\"qa-wrapper\" style=\"display: block\"><span class=\"show-answer collapsed\" style=\"cursor: pointer\" data-target=\"q840134\">Show Solution<\/span><\/p>\n<div id=\"q840134\" class=\"hidden-answer\" style=\"display: none\">\n<p>[latex]-\\sqrt{3}[\/latex]<\/p>\n<\/div>\n<\/div>\n<\/div>\n<p><iframe loading=\"lazy\" id=\"oembed-1\" title=\"Even and Odd Trigonometric Identities\" width=\"500\" height=\"281\" src=\"https:\/\/www.youtube.com\/embed\/YbU8Sq0quWE?feature=oembed&#38;rel=0\" frameborder=\"0\" allowfullscreen=\"allowfullscreen\"><\/iframe><\/p>\n<h2>Recognize and Use Fundamental Identities<\/h2>\n<p>We have explored a number of properties of trigonometric functions. Now, we can take the relationships a step further, and derive some fundamental identities. Identities are statements that are true for all values of the input on which they are defined. Usually, identities can be derived from definitions and relationships we already know. For example, the Pythagorean Identity we learned earlier was derived from the Pythagorean Theorem and the definitions of sine and cosine.<\/p>\n<div class=\"textbox\">\n<h3>A General Note: Fundamental Identities<\/h3>\n<p>We can derive some useful <strong>identities<\/strong> from the six trigonometric functions. The other four trigonometric functions can be related back to the sine and cosine functions using these basic relationships:<\/p>\n<p style=\"text-align: center;\">[latex]\\tan t=\\frac{\\sin t}{\\cos t}[\/latex]<\/p>\n<p style=\"text-align: center;\">[latex]\\sec t=\\frac{1}{\\cos t}[\/latex]<\/p>\n<p style=\"text-align: center;\">[latex]\\csc t=\\frac{1}{\\sin t}[\/latex]<\/p>\n<p style=\"text-align: center;\">[latex]\\cot t=\\frac{1}{\\tan t}=\\frac{\\cos t}{\\sin t}[\/latex]<\/p>\n<\/div>\n<div class=\"textbox shaded\">\n<h3>Example 5: Using Identities to Evaluate Trigonometric Functions<\/h3>\n<ol>\n<li>Given [latex]\\sin \\left(45^\\circ \\right)=\\frac{\\sqrt{2}}{2},\\cos \\left(45^\\circ \\right)=\\frac{\\sqrt{2}}{2}[\/latex], evaluate [latex]\\tan \\left(45^\\circ \\right)[\/latex].<\/li>\n<li>Given [latex]\\sin \\left(\\frac{5\\pi }{6}\\right)=\\frac{1}{2},\\cos\\left(\\frac{5\\pi }{6}\\right)=-\\frac{\\sqrt{3}}{2}[\/latex], evaluate [latex]\\sec \\left(\\frac{5\\pi }{6}\\right)[\/latex].<\/li>\n<\/ol>\n<div class=\"qa-wrapper\" style=\"display: block\"><span class=\"show-answer collapsed\" style=\"cursor: pointer\" data-target=\"q581515\">Show Solution<\/span><\/p>\n<div id=\"q581515\" class=\"hidden-answer\" style=\"display: none\">\n<p>Because we know the sine and cosine values for these angles, we can use identities to evaluate the other functions.<\/p>\n<ol>\n<li>\n<div>[latex]\\begin{align}\\tan \\left(45^\\circ \\right)=\\frac{\\sin \\left(45^\\circ \\right)}{\\cos \\left(45^\\circ \\right)} =\\frac{\\frac{\\sqrt{2}}{2}}{\\frac{\\sqrt{2}}{2}} =1 \\end{align}[\/latex]<\/div>\n<\/li>\n<li>\n<div>[latex]\\begin{align}\\sec \\left(\\frac{5\\pi }{6}\\right)=\\frac{1}{\\cos \\left(\\frac{5\\pi }{6}\\right)} =\\frac{1}{-\\frac{\\sqrt{3}}{2}} =\\frac{-2\\sqrt{3}}{1} =\\frac{-2}{\\sqrt{3}} =-\\frac{2\\sqrt{3}}{3} \\end{align}[\/latex]<\/div>\n<\/li>\n<\/ol>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"bcc-box bcc-success\">\n<h3>Try It<\/h3>\n<p>Evaluate [latex]\\csc\\left(\\frac{7\\pi }{6}\\right)[\/latex].<\/p>\n<div class=\"qa-wrapper\" style=\"display: block\"><span class=\"show-answer collapsed\" style=\"cursor: pointer\" data-target=\"q608392\">Show Solution<\/span><\/p>\n<div id=\"q608392\" class=\"hidden-answer\" style=\"display: none\">\n<p>[latex]-2[\/latex]<\/p>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"textbox shaded\">\n<h3>Example 6: Using Identities to Simplify Trigonometric Expressions<\/h3>\n<p>Simplify [latex]\\frac{\\sec t}{\\tan t}[\/latex].<\/p>\n<div class=\"qa-wrapper\" style=\"display: block\"><span class=\"show-answer collapsed\" style=\"cursor: pointer\" data-target=\"q803642\">Show Solution<\/span><\/p>\n<div id=\"q803642\" class=\"hidden-answer\" style=\"display: none\">\n<p>We can simplify this by rewriting both functions in terms of sine and cosine.<\/p>\n<p style=\"text-align: center;\">[latex]\\begin{align} \\frac{\\sec t}{\\tan t}&=\\frac{\\frac{1}{\\cos t}}{\\frac{\\sin t}{\\cos t}}&& \\text{To divide the functions, we multiply by the reciprocal.} \\\\&=\\frac{1}{\\cos t}\\frac{\\cos t}{\\sin t}&&\\text{Divide out the cosines.} \\\\ &=\\frac{1}{\\sin t}&&\\text{Simplify and use the identity.}\\\\ &=\\csc t \\end{align}[\/latex]<\/p>\n<p>By showing that [latex]\\frac{\\sec t}{\\tan t}[\/latex] can be simplified to [latex]\\csc t[\/latex], we have, in fact, established a new identity.<\/p>\n<p style=\"text-align: center;\">[latex]\\frac{\\sec t}{\\tan t}=\\csc t[\/latex]<\/p>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"bcc-box bcc-success\">\n<h3>Try It<\/h3>\n<p>Simplify [latex]\\tan t\\left(\\cos t\\right)[\/latex].<\/p>\n<div class=\"qa-wrapper\" style=\"display: block\"><span class=\"show-answer collapsed\" style=\"cursor: pointer\" data-target=\"q232307\">Show Solution<\/span><\/p>\n<div id=\"q232307\" class=\"hidden-answer\" style=\"display: none\">\n<p>[latex]\\sin t[\/latex]<\/p>\n<\/div>\n<\/div>\n<\/div>\n<h2>Alternate Forms of the Pythagorean Identity<\/h2>\n<p>We can use these fundamental identities to derive alternative forms of the <strong>Pythagorean Identity<\/strong>, [latex]{\\cos }^{2}t+{\\sin }^{2}t=1[\/latex]. One form is obtained by dividing both sides by [latex]{\\cos }^{2}t:[\/latex]<\/p>\n<div style=\"text-align: center;\">[latex]\\begin{gathered}\\frac{{\\cos }^{2}t}{{\\cos }^{2}t}+\\frac{{\\sin }^{2}t}{{\\cos }^{2}t}=\\frac{1}{{\\cos }^{2}t}\\\\ \\\\ 1+{\\tan }^{2}t={\\sec }^{2}t\\end{gathered}[\/latex]<\/div>\n<p>The other form is obtained by dividing both sides by [latex]{\\sin }^{2}t:[\/latex]<\/p>\n<div style=\"text-align: center;\">[latex]\\begin{gathered}\\frac{{\\cos }^{2}t}{{\\sin }^{2}t}+\\frac{{\\sin }^{2}t}{{\\sin }^{2}t}=\\frac{1}{{\\sin }^{2}t}\\\\ \\\\ {\\cot }^{2}t+1={\\csc }^{2}t\\end{gathered}[\/latex]<\/div>\n<div class=\"textbox\">\n<h3>A General Note: Alternate Forms of the Pythagorean Identity<\/h3>\n<p style=\"text-align: center;\">[latex]1+{\\tan }^{2}t={\\sec }^{2}t[\/latex]<\/p>\n<p style=\"text-align: center;\">[latex]{\\cot }^{2}t+1={\\csc }^{2}t[\/latex]<\/p>\n<\/div>\n<div class=\"textbox shaded\">\n<h3>Example 7: Using Identities to Relate Trigonometric Functions<\/h3>\n<p>If [latex]\\text{cos}\\left(t\\right)=\\frac{12}{13}[\/latex] and [latex]t[\/latex] is in quadrant IV, as shown in Figure 8, find the values of the other five trigonometric functions.<span id=\"fs-id1165137444782\"><br \/>\n<\/span><\/p>\n<div style=\"width: 497px\" class=\"wp-caption aligncenter\"><img loading=\"lazy\" decoding=\"async\" src=\"https:\/\/s3-us-west-2.amazonaws.com\/courses-images\/wp-content\/uploads\/sites\/3675\/2018\/09\/27003714\/CNX_Precalc_Figure_05_03_0082.jpg\" alt=\"Graph of circle with angle of t inscribed. Point of (12\/13, y) is at intersection of terminal side of angle and edge of circle.\" width=\"487\" height=\"383\" \/><\/p>\n<p class=\"wp-caption-text\"><b>Figure 8<\/b><\/p>\n<\/div>\n<div class=\"qa-wrapper\" style=\"display: block\"><span class=\"show-answer collapsed\" style=\"cursor: pointer\" data-target=\"q627612\">Show Solution<\/span><\/p>\n<div id=\"q627612\" class=\"hidden-answer\" style=\"display: none\">\n<p>We can find the sine using the Pythagorean Identity, [latex]{\\cos }^{2}t+{\\sin }^{2}t=1[\/latex], and the remaining functions by relating them to sine and cosine.<\/p>\n<p style=\"text-align: center;\">[latex]\\begin{gathered}{\\left(\\frac{12}{13}\\right)}^{2}+{\\sin }^{2}t=1 \\\\ {\\sin }^{2}t=1-{\\left(\\frac{12}{13}\\right)}^{2} \\\\ {\\sin }^{2}t=1-\\frac{144}{169} \\\\ {\\sin }^{2}t=\\frac{25}{169} \\\\ \\sin t=\\pm \\sqrt{\\frac{25}{169}} \\\\ \\sin t=\\pm \\frac{\\sqrt{25}}{\\sqrt{169}} \\\\ \\sin t=\\pm \\frac{5}{13} \\end{gathered}[\/latex]<\/p>\n<p>The sign of the sine depends on the <em>y<\/em>-values in the quadrant where the angle is located. Since the angle is in quadrant IV, where the <em>y<\/em>-values are negative, its sine is negative, [latex]-\\frac{5}{13}[\/latex].<\/p>\n<p>The remaining functions can be calculated using identities relating them to sine and cosine.<\/p>\n<p style=\"text-align: center;\">[latex]\\begin{gathered}\\tan t=\\frac{\\sin t}{\\cos t}=\\frac{-\\frac{5}{13}}{\\frac{12}{13}}=-\\frac{5}{12} \\\\ \\sec t=\\frac{1}{\\cos t}=\\frac{1}{\\frac{12}{13}}=\\frac{13}{12} \\\\ \\csc t=\\frac{1}{\\sin t}=\\frac{1}{-\\frac{5}{13}}=-\\frac{13}{5}\\\\ \\cot t=\\frac{1}{\\tan t}=\\frac{1}{-\\frac{5}{12}}=-\\frac{12}{5}\\end{gathered}[\/latex]<\/p>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"bcc-box bcc-success\">\n<h3>Try It<\/h3>\n<p>If [latex]\\sec \\left(t\\right)=-\\frac{17}{8}[\/latex] and [latex]0<t<\\pi[\/latex], find the values of the other five functions.\n\n\n\n<div class=\"qa-wrapper\" style=\"display: block\"><span class=\"show-answer collapsed\" style=\"cursor: pointer\" data-target=\"q568112\">Show Solution<\/span><\/p>\n<div id=\"q568112\" class=\"hidden-answer\" style=\"display: none\">\n<p>[latex]\\cos t=-\\frac{8}{17},\\sin t=\\frac{15}{17},\\tan t=-\\frac{15}{8},\\csc t=\\frac{17}{15},\\cot t=-\\frac{8}{15}[\/latex]<\/p>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"textbox key-takeaways\">\n<h3>Try It<\/h3>\n<p><iframe loading=\"lazy\" id=\"ohm100893\" class=\"resizable\" src=\"https:\/\/ohm.lumenlearning.com\/multiembedq.php?id=100893&theme=oea&iframe_resize_id=ohm100893\" width=\"100%\" height=\"150\"><\/iframe><\/p>\n<\/div>\n<p>As we discussed in the chapter opening, a function that repeats its values in regular intervals is known as a <strong>periodic function<\/strong>. The trigonometric functions are periodic. For the four trigonometric functions, sine, cosine, cosecant and secant, a revolution of one circle, or [latex]2\\pi[\/latex],&nbsp;will result in the same outputs for these functions. And for tangent and cotangent, only a half a revolution will result in the same outputs.<\/p>\n<p>Other functions can also be periodic. For example, the lengths of months repeat every four years. If [latex]x[\/latex] represents the length time, measured in years, and [latex]f\\left(x\\right)[\/latex] represents the number of days in February, then [latex]f\\left(x+4\\right)=f\\left(x\\right)[\/latex].&nbsp;This pattern repeats over and over through time. In other words, every four years, February is guaranteed to have the same number of days as it did 4 years earlier. The positive number 4 is the smallest positive number that satisfies this condition and is called the period. A <strong>period<\/strong> is the shortest interval over which a function completes one full cycle\u2014in this example, the period is 4 and represents the time it takes for us to be certain February has the same number of days.<\/p>\n<div class=\"textbox\">\n<h3>A General Note: Period of a Function<\/h3>\n<p>The <strong>period<\/strong> [latex]P[\/latex] of a repeating function [latex]f[\/latex] is the number representing the interval such that [latex]f\\left(x+P\\right)=f\\left(x\\right)[\/latex] for any value of [latex]x[\/latex].<\/p>\n<p>The period of the cosine, sine, secant, and cosecant functions is [latex]2\\pi[\/latex].<\/p>\n<p>The period of the tangent and cotangent functions is [latex]\\pi[\/latex].<\/p>\n<\/div>\n<div class=\"textbox shaded\">\n<h3>Example 8: Finding the Values of Trigonometric Functions<\/h3>\n<p>Find the values of the six trigonometric functions of angle [latex]t[\/latex] based on Figure 9<strong>.<\/strong><span id=\"fs-id1165137692365\"><br \/>\n<\/span><\/p>\n<div style=\"width: 497px\" class=\"wp-caption aligncenter\"><img loading=\"lazy\" decoding=\"async\" src=\"https:\/\/s3-us-west-2.amazonaws.com\/courses-images\/wp-content\/uploads\/sites\/3675\/2018\/09\/27003716\/CNX_Precalc_Figure_05_03_0092.jpg\" alt=\"Graph of circle with angle of t inscribed. Point of (1\/2, negative square root of 3 over 2) is at intersection of terminal side of angle and edge of circle.\" width=\"487\" height=\"383\" \/><\/p>\n<p class=\"wp-caption-text\"><b>Figure 9<\/b><\/p>\n<\/div>\n<div class=\"qa-wrapper\" style=\"display: block\"><span class=\"show-answer collapsed\" style=\"cursor: pointer\" data-target=\"q99481\">Show Solution<\/span><\/p>\n<div id=\"q99481\" class=\"hidden-answer\" style=\"display: none\">\n<p style=\"text-align: center;\">[latex]\\begin{gathered}\\sin t=y=-\\frac{\\sqrt{3}}{2}\\\\ \\cos t=x=-\\frac{1}{2}\\\\ \\tan t=\\frac{\\sin t}{\\cos t}=\\frac{-\\frac{\\sqrt{3}}{2}}{-\\frac{1}{2}}=\\sqrt{3}\\\\ \\sec t=\\frac{1}{\\cos t}=\\frac{1}{-\\frac{1}{2}}=-2\\\\ \\csc t=\\frac{1}{\\sin t}=\\frac{1}{-\\frac{\\sqrt{3}}{2}}=-\\frac{2\\sqrt{3}}{3}\\\\ \\cot t=\\frac{1}{\\tan t}=\\frac{1}{\\sqrt{3}}=\\frac{\\sqrt{3}}{3}\\end{gathered}[\/latex]<\/p>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"bcc-box bcc-success\">\n<h3>Try It<\/h3>\n<p>Find the values of the six trigonometric functions of angle [latex]t[\/latex]&nbsp;based on Figure 10.<span id=\"fs-id1165132972951\"><br \/>\n<\/span><\/p>\n<div style=\"width: 497px\" class=\"wp-caption aligncenter\"><img loading=\"lazy\" decoding=\"async\" src=\"https:\/\/s3-us-west-2.amazonaws.com\/courses-images\/wp-content\/uploads\/sites\/3675\/2018\/09\/27003719\/CNX_Precalc_Figure_05_03_0102.jpg\" alt=\"Graph of circle with angle of t inscribed. Point of (0, -1) is at intersection of terminal side of angle and edge of circle.\" width=\"487\" height=\"406\" \/><\/p>\n<p class=\"wp-caption-text\"><b>Figure 10<\/b><\/p>\n<\/div>\n<div class=\"qa-wrapper\" style=\"display: block\"><span class=\"show-answer collapsed\" style=\"cursor: pointer\" data-target=\"q766306\">Show Solution<\/span><\/p>\n<div id=\"q766306\" class=\"hidden-answer\" style=\"display: none\">\n<p>[latex]\\begin{align}&\\sin t=-1\\\\&\\cos t=0\\\\&\\tan t \\text{ is undefined}\\\\ &\\sec t \\text{ is undefined}\\\\&\\csc t=-1\\\\&\\cot t=0\\end{align}[\/latex]<\/p>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"textbox shaded\">\n<h3>Example 9: Finding the Value of Trigonometric Functions<\/h3>\n<p>If [latex]\\sin \\left(t\\right)=-\\frac{\\sqrt{3}}{2}[\/latex] and [latex]\\text{cos}\\left(t\\right)=\\frac{1}{2}[\/latex], find [latex]\\text{sec}\\left(t\\right),\\text{csc}\\left(t\\right),\\text{tan}\\left(t\\right),\\text{ cot}\\left(t\\right)[\/latex].<\/p>\n<div class=\"qa-wrapper\" style=\"display: block\"><span class=\"show-answer collapsed\" style=\"cursor: pointer\" data-target=\"q940244\">Show Solution<\/span><\/p>\n<div id=\"q940244\" class=\"hidden-answer\" style=\"display: none\">\n<p style=\"text-align: center;\">[latex]\\begin{gathered} \\sec t=\\frac{1}{\\cos t}=\\frac{1}{\\frac{1}{2}}=2 \\\\ \\csc t=\\frac{1}{\\sin t}=\\frac{1}{-\\frac{\\sqrt{3}}{2}}-\\frac{2\\sqrt{3}}{3} \\\\ \\tan t=\\frac{\\sin t}{\\cos t}=\\frac{-\\frac{\\sqrt{3}}{2}}{\\frac{1}{2}}=-\\sqrt{3} \\\\ \\cot t=\\frac{1}{\\tan t}=\\frac{1}{-\\sqrt{3}}=-\\frac{\\sqrt{3}}{3} \\end{gathered}[\/latex]<\/p>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"bcc-box bcc-success\">\n<h3>Try It<\/h3>\n<p>If [latex]\\sin \\left(t\\right)=\\frac{\\sqrt{2}}{2}[\/latex]&nbsp;and [latex]\\cos \\left(t\\right)=\\frac{\\sqrt{2}}{2}[\/latex], find [latex]\\text{sec}\\left(t\\right),\\text{csc}\\left(t\\right),\\text{tan}\\left(t\\right),\\text{ and cot}\\left(t\\right)[\/latex].<\/p>\n<div class=\"qa-wrapper\" style=\"display: block\"><span class=\"show-answer collapsed\" style=\"cursor: pointer\" data-target=\"q701998\">Show Solution<\/span><\/p>\n<div id=\"q701998\" class=\"hidden-answer\" style=\"display: none\">\n<p>[latex]\\sec t=\\sqrt{2},\\csc t=\\sqrt{2},\\tan t=1,\\cot t=1[\/latex]<\/p>\n<\/div>\n<\/div>\n<\/div>\n<p><iframe loading=\"lazy\" id=\"oembed-2\" title=\"The Reciprocal, Quotient, and Pythagorean Identities\" width=\"500\" height=\"281\" src=\"https:\/\/www.youtube.com\/embed\/4BR_qUZ5jK0?feature=oembed&#38;rel=0\" frameborder=\"0\" allowfullscreen=\"allowfullscreen\"><\/iframe><\/p>\n<h2>Evaluating Trigonometric Functions with a Calculator<\/h2>\n<p>We have learned how to evaluate the six trigonometric functions for the common first-quadrant angles and to use them as reference angles for angles in other quadrants. To evaluate trigonometric functions of other angles, we use a scientific or graphing calculator or computer software. If the calculator has a degree mode and a radian mode, confirm the correct mode is chosen before making a calculation.<\/p>\n<p>Evaluating a tangent function with a scientific calculator as opposed to a graphing calculator or computer algebra system is like evaluating a sine or cosine: Enter the value and press the TAN key. For the reciprocal functions, there may not be any dedicated keys that say CSC, SEC, or COT. In that case, the function must be evaluated as the reciprocal of a sine, cosine, or tangent.<\/p>\n<p>If we need to work with degrees and our calculator or software does not have a degree mode, we can enter the degrees multiplied by the conversion factor [latex]\\frac{\\pi }{180}[\/latex] to convert the degrees to radians. To find the secant of [latex]30^\\circ[\/latex], we could press<\/p>\n<div style=\"text-align: center;\">[latex]\\text{(for a scientific calculator):}\\frac{1}{30\\times \\frac{\\pi }{180}}\\text{COS}[\/latex]<\/div>\n<p>or<\/p>\n<div style=\"text-align: center;\">[latex]\\text{(for a graphing calculator):}\\frac{1}{\\cos \\left(\\frac{30\\pi }{180}\\right)}[\/latex]<\/div>\n<div class=\"textbox\">\n<h3>How To: Given an angle measure in radians, use a scientific calculator to find the cosecant.<strong><br \/>\n<\/strong><\/h3>\n<ol>\n<li>If the calculator has degree mode and radian mode, set it to radian mode.<\/li>\n<li>Enter: [latex]1\\text{ \/}[\/latex]<\/li>\n<li>Enter the value of the angle inside parentheses.<\/li>\n<li>Press the SIN key.<\/li>\n<li>Press the = key.<\/li>\n<\/ol>\n<\/div>\n<div class=\"textbox\">\n<h3>How To: Given an angle measure in radians, use a graphing utility\/calculator to find the cosecant.<strong><br \/>\n<\/strong><\/h3>\n<ol>\n<li>If the graphing utility has degree mode and radian mode, set it to radian mode.<\/li>\n<li>Enter: [latex]1\\text{ \/}[\/latex]<\/li>\n<li>Press the SIN key.<\/li>\n<li>Enter the value of the angle inside parentheses.<\/li>\n<li>Press the ENTER key.<\/li>\n<\/ol>\n<\/div>\n<div class=\"textbox shaded\">\n<h3>Example 10: Evaluating the Secant Using Technology<\/h3>\n<p>Evaluate the cosecant of [latex]\\frac{5\\pi }{7}[\/latex].<\/p>\n<div class=\"qa-wrapper\" style=\"display: block\"><span class=\"show-answer collapsed\" style=\"cursor: pointer\" data-target=\"q710943\">Show Solution<\/span><\/p>\n<div id=\"q710943\" class=\"hidden-answer\" style=\"display: none\">\n<p>For a scientific calculator, enter information as follows:<\/p>\n<p style=\"text-align: center;\">[latex]\\text{1 \/ ( 5 }\\times \\text{ }\\pi \\text{ \/ 7 ) SIN =}[\/latex]<\/p>\n<p style=\"text-align: center;\">[latex]\\csc \\left(\\frac{5\\pi }{7}\\right)\\approx 1.279[\/latex]<\/p>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"bcc-box bcc-success\">\n<h3>Try It<\/h3>\n<p>Evaluate the cotangent of [latex]-\\frac{\\pi }{8}[\/latex].<\/p>\n<div class=\"qa-wrapper\" style=\"display: block\"><span class=\"show-answer collapsed\" style=\"cursor: pointer\" data-target=\"q56177\">Show Solution<\/span><\/p>\n<div id=\"q56177\" class=\"hidden-answer\" style=\"display: none\">\n<p>[latex]\\approx -2.414[\/latex]<\/p>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"textbox key-takeaways\">\n<h3>Try It<\/h3>\n<p><iframe loading=\"lazy\" id=\"ohm173357\" class=\"resizable\" src=\"https:\/\/ohm.lumenlearning.com\/multiembedq.php?id=173357&theme=oea&iframe_resize_id=ohm173357\" width=\"100%\" height=\"150\"><\/iframe><\/p>\n<\/div>\n<p><iframe loading=\"lazy\" id=\"oembed-3\" title=\"Determining Trigonometric Function Values on the Calculator\" width=\"500\" height=\"281\" src=\"https:\/\/www.youtube.com\/embed\/rhRi_IuE_18?feature=oembed&#38;rel=0\" frameborder=\"0\" allowfullscreen=\"allowfullscreen\"><\/iframe><\/p>\n<section id=\"fs-id1165137938685\" class=\"key-equations\">\n<h2>Key Equations<\/h2>\n<table id=\"eip-id1165134112952\" summary=\"..\">\n<tbody>\n<tr>\n<td>Tangent function<\/td>\n<td>[latex]\\tan t=\\frac{\\sin t}{\\cos t}[\/latex]<\/td>\n<\/tr>\n<tr>\n<td>Secant function<\/td>\n<td>[latex]\\sec t=\\frac{1}{\\cos t}[\/latex]<\/td>\n<\/tr>\n<tr>\n<td>Cosecant function<\/td>\n<td>[latex]\\csc t=\\frac{1}{\\sin t}[\/latex]<\/td>\n<\/tr>\n<tr>\n<td>Cotangent function<\/td>\n<td>[latex]\\cot t=\\frac{1}{\\tan t}=\\frac{\\cos t}{\\sin t}[\/latex]<\/td>\n<\/tr>\n<\/tbody>\n<\/table>\n<\/section>\n<section id=\"fs-id1165137832791\" class=\"key-concepts\">\n<h2>Key Concepts<\/h2>\n<ul id=\"fs-id1165134211396\">\n<li>The tangent of an angle is the ratio of the <em>y<\/em>-value to the <em>x<\/em>-value of the corresponding point on the unit circle.<\/li>\n<li>The secant, cotangent, and cosecant are all reciprocals of other functions. The secant is the reciprocal of the cosine function, the cotangent is the reciprocal of the tangent function, and the cosecant is the reciprocal of the sine function.<\/li>\n<li>The six trigonometric functions can be found from a point on the unit circle.<\/li>\n<li>Trigonometric functions can also be found from an angle.<\/li>\n<li>Trigonometric functions of angles outside the first quadrant can be determined using reference angles.<\/li>\n<li>A function is said to be even if [latex]f\\left(-x\\right)=f\\left(x\\right)[\/latex] and odd if [latex]f\\left(-x\\right)=-f\\left(x\\right)[\/latex].<\/li>\n<li>Cosine and secant are even; sine, tangent, cosecant, and cotangent are odd.<\/li>\n<li>Even and odd properties can be used to evaluate trigonometric functions.<\/li>\n<li>The Pythagorean Identity makes it possible to find a cosine from a sine or a sine from a cosine.<\/li>\n<li>Identities can be used to evaluate trigonometric functions.<\/li>\n<li>Fundamental identities such as the Pythagorean Identity can be manipulated algebraically to produce new identities.<\/li>\n<li>The trigonometric functions repeat at regular intervals.<\/li>\n<li>The period [latex]P[\/latex] of a repeating function [latex]f[\/latex] is the smallest interval such that [latex]f\\left(x+P\\right)=f\\left(x\\right)[\/latex] for any value of [latex]x[\/latex].<\/li>\n<li>The values of trigonometric functions of special angles can be found by mathematical analysis.<\/li>\n<li>To evaluate trigonometric functions of other angles, we can use a calculator or computer software.<\/li>\n<\/ul>\n<div>\n<h2>Glossary<\/h2>\n<dl id=\"fs-id1165137640892\" class=\"definition\">\n<dt>cosecant<\/dt>\n<dd id=\"fs-id1165137640897\">the reciprocal of the sine function: on the unit circle, [latex]\\csc t=\\frac{1}{y},y\\ne 0[\/latex]<\/dd>\n<\/dl>\n<dl id=\"fs-id1165137529833\" class=\"definition\">\n<dt>cotangent<\/dt>\n<dd id=\"fs-id1165137529838\">the reciprocal of the tangent function: on the unit circle, [latex]\\cot t=\\frac{x}{y},y\\ne 0[\/latex]<\/dd>\n<\/dl>\n<dl id=\"fs-id1165137410476\" class=\"definition\">\n<dt>identities<\/dt>\n<dd id=\"fs-id1165137410481\">statements that are true for all values of the input on which they are defined<\/dd>\n<\/dl>\n<dl id=\"fs-id1165135195519\" class=\"definition\">\n<dt>period<\/dt>\n<dd id=\"fs-id1165135195524\">the smallest interval [latex]P[\/latex]<br \/>\nof a repeating function [latex]f[\/latex] such that [latex]f\\left(x+P\\right)=f\\left(x\\right)[\/latex]<\/dd>\n<\/dl>\n<dl id=\"fs-id1165135591029\" class=\"definition\">\n<dt>secant<\/dt>\n<dd id=\"fs-id1165135591035\">the reciprocal of the cosine function: on the unit circle, [latex]\\sec t=\\frac{1}{x},x\\ne 0[\/latex]<\/dd>\n<\/dl>\n<dl id=\"fs-id1165137834349\" class=\"definition\">\n<dt>tangent<\/dt>\n<dd id=\"fs-id1165137834355\">the quotient of the sine and cosine: on the unit circle, [latex]\\tan t=\\frac{y}{x},x\\ne 0[\/latex]<\/dd>\n<\/dl>\n<\/div>\n<\/section>\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-1365\">\n\t\t\t\t\t\t\t <div class=\"licensing\"><div class=\"license-attribution-dropdown-subheading\">CC licensed content, Specific attribution<\/div><ul class=\"citation-list\"><li>Precalculus. <strong>Authored by<\/strong>: OpenStax College. <strong>Provided by<\/strong>: OpenStax. <strong>Located at<\/strong>: <a target=\"_blank\" href=\"http:\/\/cnx.org\/contents\/fd53eae1-fa23-47c7-bb1b-972349835c3c@5.175:1\/Preface\">http:\/\/cnx.org\/contents\/fd53eae1-fa23-47c7-bb1b-972349835c3c@5.175:1\/Preface<\/a>. <strong>License<\/strong>: <em><a target=\"_blank\" rel=\"license\" href=\"https:\/\/creativecommons.org\/licenses\/by\/4.0\/\">CC BY: Attribution<\/a><\/em><\/li><\/ul><div class=\"license-attribution-dropdown-subheading\">All rights reserved content<\/div><ul class=\"citation-list\"><li>Even and Odd Trigonometric Identities. <strong>Authored by<\/strong>: Mathispower4u. <strong>Located at<\/strong>: <a target=\"_blank\" href=\"https:\/\/youtu.be\/YbU8Sq0quWE\">https:\/\/youtu.be\/YbU8Sq0quWE<\/a>. <strong>License<\/strong>: <em>All Rights Reserved<\/em>. <strong>License Terms<\/strong>: Standard YouTube License<\/li><li> The Reciprocal, Quotient, and Pythagorean Identities . <strong>Authored by<\/strong>: Mathispower4u. <strong>Located at<\/strong>: <a target=\"_blank\" href=\"https:\/\/youtu.be\/4BR_qUZ5jK0\">https:\/\/youtu.be\/4BR_qUZ5jK0<\/a>. <strong>License<\/strong>: <em>All Rights Reserved<\/em>. <strong>License Terms<\/strong>: Standard YouTube License<\/li><li>Determining Trigonometric Function Values on the Calculator . <strong>Authored by<\/strong>: Mathispower4u. <strong>Located at<\/strong>: <a target=\"_blank\" href=\"https:\/\/youtu.be\/rhRi_IuE_18\">https:\/\/youtu.be\/rhRi_IuE_18<\/a>. <strong>License<\/strong>: <em>All Rights Reserved<\/em><\/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":503070,"menu_order":3,"template":"","meta":{"_candela_citation":"[{\"type\":\"cc-attribution\",\"description\":\"Precalculus\",\"author\":\"OpenStax College\",\"organization\":\"OpenStax\",\"url\":\"http:\/\/cnx.org\/contents\/fd53eae1-fa23-47c7-bb1b-972349835c3c@5.175:1\/Preface\",\"project\":\"\",\"license\":\"cc-by\",\"license_terms\":\"\"},{\"type\":\"copyrighted_video\",\"description\":\"Even and Odd Trigonometric Identities\",\"author\":\"Mathispower4u\",\"organization\":\"\",\"url\":\"https:\/\/youtu.be\/YbU8Sq0quWE\",\"project\":\"\",\"license\":\"arr\",\"license_terms\":\"Standard YouTube License\"},{\"type\":\"copyrighted_video\",\"description\":\" The Reciprocal, Quotient, and Pythagorean Identities \",\"author\":\"Mathispower4u\",\"organization\":\"\",\"url\":\"https:\/\/youtu.be\/4BR_qUZ5jK0\",\"project\":\"\",\"license\":\"arr\",\"license_terms\":\"Standard YouTube License\"},{\"type\":\"copyrighted_video\",\"description\":\"Determining Trigonometric Function Values on the Calculator \",\"author\":\"Mathispower4u\",\"organization\":\"\",\"url\":\"https:\/\/youtu.be\/rhRi_IuE_18\",\"project\":\"\",\"license\":\"arr\",\"license_terms\":\"\"}]","CANDELA_OUTCOMES_GUID":"","pb_show_title":"on","pb_short_title":"","pb_subtitle":"","pb_authors":[],"pb_section_license":""},"chapter-type":[],"contributor":[],"license":[],"class_list":["post-1365","chapter","type-chapter","status-publish","hentry"],"part":1362,"_links":{"self":[{"href":"https:\/\/courses.lumenlearning.com\/tulsacc-math1613\/wp-json\/pressbooks\/v2\/chapters\/1365","targetHints":{"allow":["GET"]}}],"collection":[{"href":"https:\/\/courses.lumenlearning.com\/tulsacc-math1613\/wp-json\/pressbooks\/v2\/chapters"}],"about":[{"href":"https:\/\/courses.lumenlearning.com\/tulsacc-math1613\/wp-json\/wp\/v2\/types\/chapter"}],"author":[{"embeddable":true,"href":"https:\/\/courses.lumenlearning.com\/tulsacc-math1613\/wp-json\/wp\/v2\/users\/503070"}],"version-history":[{"count":2,"href":"https:\/\/courses.lumenlearning.com\/tulsacc-math1613\/wp-json\/pressbooks\/v2\/chapters\/1365\/revisions"}],"predecessor-version":[{"id":1669,"href":"https:\/\/courses.lumenlearning.com\/tulsacc-math1613\/wp-json\/pressbooks\/v2\/chapters\/1365\/revisions\/1669"}],"part":[{"href":"https:\/\/courses.lumenlearning.com\/tulsacc-math1613\/wp-json\/pressbooks\/v2\/parts\/1362"}],"metadata":[{"href":"https:\/\/courses.lumenlearning.com\/tulsacc-math1613\/wp-json\/pressbooks\/v2\/chapters\/1365\/metadata\/"}],"wp:attachment":[{"href":"https:\/\/courses.lumenlearning.com\/tulsacc-math1613\/wp-json\/wp\/v2\/media?parent=1365"}],"wp:term":[{"taxonomy":"chapter-type","embeddable":true,"href":"https:\/\/courses.lumenlearning.com\/tulsacc-math1613\/wp-json\/pressbooks\/v2\/chapter-type?post=1365"},{"taxonomy":"contributor","embeddable":true,"href":"https:\/\/courses.lumenlearning.com\/tulsacc-math1613\/wp-json\/wp\/v2\/contributor?post=1365"},{"taxonomy":"license","embeddable":true,"href":"https:\/\/courses.lumenlearning.com\/tulsacc-math1613\/wp-json\/wp\/v2\/license?post=1365"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}