Example
Solve: [latex]8x+9x - 5x=-3+15[/latex].
Solution:
First, we need to simplify both sides of the equation as much as possible
Start by combining like terms to simplify each side.
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[latex]8x+9x-5x=-3+15[/latex] |
Combine like terms. |
[latex]12x=12[/latex] |
Divide both sides by 12 to isolate x. |
[latex]\frac{12x}{\color{red}{12}}=\frac{12}{\color{red}{12}}[/latex] |
Simplify. |
[latex]x=1[/latex] |
Check your answer. Let [latex]x=1[/latex] |
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[latex]8x+9x-5x=-3+15[/latex] |
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[latex]8\cdot\color{red}{1}+9\cdot\color{red}{1}-5\cdot\color{red}{1}\stackrel{\text{?}}{=}-3+15[/latex] |
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[latex]8+9-5\stackrel{\text{?}}{=}-3+15[/latex] |
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[latex]12=12\quad\checkmark[/latex] |
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Here is a similar problem for you to try.
You may not always have the variables on the left side of the equation, so we will show an example with variables on the right side. You will see that the properties used to solve this equation are exactly the same as the previous example.
example
Solve: [latex]11 - 20=17y - 8y - 6y[/latex].
Answer:
Solution:
Simplify each side by combining like terms.
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[latex]11-20=17y-8y-6y[/latex] |
Simplify each side. |
[latex]-9=3y[/latex] |
Divide both sides by 3 to isolate y. |
[latex]\frac{-9}{\color{red}{3}}=\frac{3y}{\color{red}{3}}[/latex] |
Simplify. |
[latex]-3=y[/latex] |
Check your answer. Let [latex]y=-3[/latex] |
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[latex]11-20=17y-8y-6y[/latex] |
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[latex]11-20\stackrel{\text{?}}{=}17(
\color{red}{-3})-8(\color{red}{-3})-6(\color{red}{-3})[/latex] |
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[latex]11-20\stackrel{\text{?}}{=}-51+24+18[/latex] |
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[latex]-9=-9\quad\checkmark[/latex] |
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Notice that the variable ended up on the right side of the equal sign when we solved the equation. You may prefer to take one more step to write the solution with the variable on the left side of the equal sign.
Now you can try solving a similar problem.
In our next example, we have an equation that contains a set of parentheses. We will use the distributive property of multiplication over addition first, simplify, then use the division property to finally solve.
example
Solve: [latex]-3\left(n - 2\right)-6=21[/latex].
Remember—always simplify each side first.
Answer:
Solution:
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[latex]-3(n-2)-6=21[/latex] |
Distribute. |
[latex]-3n+6-6=21[/latex] |
Simplify. |
[latex]-3n=21[/latex] |
Divide both sides by -3 to isolate n. |
[latex]\frac{-3n}{\color{red}{-3}}=\frac{21}{\color{red}{-3}}[/latex]
[latex]n=-7[/latex] |
Check your answer. Let [latex]n=-7[/latex] . |
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[latex]-3(n-2)-6=21[/latex] |
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[latex]-3(\color{red}{-7}-2)-6\stackrel{\text{?}}{=}21[/latex] |
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[latex]-3(-9)-6\stackrel{\text{?}}{=}21[/latex] |
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[latex]27-6\stackrel{\text{?}}{=}21[/latex] |
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[latex]21=21\quad\checkmark[/latex] |
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Now you can try a similar problem.
In the following video you will see another example of using the division property of equality to solve an equation as well as another example of how to solve a multi-step equation that includes a set of parentheses.
https://youtu.be/qe89pkRKzRw