Solving Equations Containing Fractions Using the Multiplication Property of Equality
Learning Outcomes
Solve equations with fractions using the Multiplication Property of Equality
Solve Equations with Fractions Using the Multiplication Property of Equality
We will now solve equations that require multiplication to isolate the variable. Consider the equation [latex]\Large\frac{x}{4}\normalsize=3[/latex]. We want to know what number divided by [latex]4[/latex] gives [latex]3[/latex]. To “undo” the division, we will need to multiply by [latex]4[/latex]. The Multiplication Property of Equality will allow us to do this. This property says that if we start with two equal quantities and multiply both by the same number, the results are equal.
The Multiplication Property of Equality
For any numbers [latex]a,b[/latex], and [latex]c[/latex],
[latex]\text{if }a=b,\text{ then }ac=bc[/latex].
If you multiply both sides of an equation by the same quantity, you still have equality.
Let’s use the Multiplication Property of Equality to solve the equation [latex]\Large\frac{x}{7}\normalsize=-9[/latex].
In the following video we show two more examples of when to use the multiplication and division properties to solve a one-step equation.
Solve Equations with a Coefficient of [latex]-1[/latex]
Look at the equation [latex]-y=15[/latex]. Does it look as if [latex]y[/latex] is already isolated? But there is a negative sign in front of [latex]y[/latex], so it is not isolated.
There are three different ways to isolate the variable in this type of equation. We will show all three ways in the next example.
Example
Solve: [latex]-y=15[/latex]
Show Solution
Solution:
One way to solve the equation is to rewrite [latex]-y[/latex] as [latex]-1y[/latex], and then use the Division Property of Equality to isolate [latex]y[/latex].
The third way to solve the equation is to read [latex]-y[/latex] as “the opposite of [latex]y\text{.''}[/latex] What number has [latex]15[/latex] as its opposite? The opposite of [latex]15[/latex] is [latex]-15[/latex]. So [latex]y=-15[/latex].
For all three methods, we isolated [latex]y[/latex] is isolated and solved the equation.
Check:
In the next video we show more examples of how to solve an equation with a negative variable.
Solve Equations with a Fraction Coefficient
When we have an equation with a fraction coefficient we can use the Multiplication Property of Equality to make the coefficient equal to [latex]1[/latex].
For example, in the equation:
[latex]\Large\frac{3}{4}\normalsize x=24[/latex]
The coefficient of [latex]x[/latex] is [latex]\Large\frac{3}{4}[/latex]. To solve for [latex]x[/latex], we need its coefficient to be [latex]1[/latex]. Since the product of a number and its reciprocal is [latex]1[/latex], our strategy here will be to isolate [latex]x[/latex] by multiplying by the reciprocal of [latex]\Large\frac{3}{4}[/latex]. We will do this in the next example.
Notice that in the equation [latex]\Large\frac{3}{4}\normalsize x=24[/latex], we could have divided both sides by [latex]\Large\frac{3}{4}[/latex] to get [latex]x[/latex] by itself. Dividing is the same as multiplying by the reciprocal, so we would get the same result. But most people agree that multiplying by the reciprocal is easier.
Solution:
The coefficient is a negative fraction. Remember that a number and its reciprocal have the same sign, so the reciprocal of the coefficient must also be negative.
[latex]\Large\frac{3}{8}\normalsize w=72[/latex]
Multiply both sides by the reciprocal of [latex]-\Large\frac{3}{8}[/latex] .
Ex: Solve a One Step Equation by Multiplying by Reciprocal (a/b)x=-c. Authored by: James Sousa (Mathispower4u.com). Located at: https://youtu.be/Ea5eW8rZxEI. License: CC BY: Attribution
Prealgebra. Provided by: OpenStax. License: CC BY: Attribution. License Terms: Download for free at http://cnx.org/contents/caa57dab-41c7-455e-bd6f-f443cda5519c@9.757