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5.04 Solving one-step equations

Lesson

One way to solve an equation is to use inverse operations along with the properties of equality. An inverse operation is an operation that "undoes" another operation. A property of equality is an operation that produces a new equation with the same solution as the original.

 

Solving equations with addition or subtraction

Addition and subtraction are inverse operations. For example, adding two to a number is the opposite of subtracting two. As we saw in modeling balanced equations, we can also add or subtract the same amount to both sides of an equation, and it will remain true.

Adding or subtracting the same amount to both sides keeps the equations balanced.

Addition and subtraction properties of equality

Addition property of equality: Adding the same number to each side of an equation produces an equivalent equation.

Example:

If

$x-2$x2 $=$= $7$7

Then

$x-2+2$x2+2 $=$= $7+2$7+2

 

 

Subtraction property of equality: Subtracting the same number to each side of an equation produces an equivalent equation.

Example:

If

$x+5$x+5 $=$= $7$7

 

Then

$x+5-5$x+55 $=$= $7-5$75

 

Let's apply our knowledge of inverses and the addition and subtraction properties of equality to solve some equations.

 

Worked examples

Question 1

Solve for $x$x in the equation $x+8=15$x+8=15, showing all of your work algebraically.

Think: The number $8$8 is being added to the variable $x$x. In order to undo the operation of adding $8$8, we should subtract $8$8 from both sides of the equation.

Do: 

$x+8$x+8 $=$= $15$15

Write the original equation.

$x+8-8$x+88 $=$= $15-8$158

Subtract $8$8 from each side.

$x$x $=$= $7$7

Simplify by doing the subtraction

 

Reflect: We can check our answer by substituting it back into the original equation.

$x+8$x+8 $=$= $15$15

Write the original equation.

$7+8$7+8 ? $15$15

Substitute $7$7 for $x$x.

$15$15 $=$= $15$15

The solution checks.

Question 2

Solve for $m$m in the equation $m-6=8$m6=8, showing all of your work algebraically.

Think: The number $6$6 is being subtracted from the variable $m$m. In order to undo the operation of subtracting $6$6, we should add $6$6 to both sides of the equation.

Do: 

$m-6$m6 $=$= $8$8

Write the original equation.

$m-6+6$m6+6 $=$= $8+6$8+6

Add $6$6 to each side.

$m$m $=$= $14$14

Simplify by doing the addition.

 

Reflect: We can check our answer by substituting it back into the original equation.

$m-6$m6 $=$= $8$8

Write the original equation.

$14-6$146 ? $8$8

Substitute $14$14 for $m$m.

$8$8 $=$= $8$8

The solution checks.

 

Practice questions

Question 3

Solve: $21=x+13$21=x+13

Question 4

Solve: $x-4=10$x4=10

 

Solving equations with multiplication or division

Multiplication and division are also inverse operations. For example, multiplying a number by two is the opposite of dividing it by two. As we saw in modeling balanced equations, we can also multiply or divide the same nonzero amount to both sides of an equation, and it will remain true.

Multiplying or dividing both sides by the same nonzero amount keeps the equations balanced.

Multiplication and division properties of equality

Multiplication property of equality: Multiplying each side of an equation by the same nonzero number produces an equivalent equation.

Example:

If

$\frac{x}{12}$x12 $=$= $4$4

Then

$\frac{x}{12}\times12$x12×12 $=$= $4\times12$4×12

Division properties of equality: Dividing each side of an equation by the same nonzero number produces an equivalent equation.

Example:

 

If

$6x$6x $=$= $12$12

Then

$\frac{6x}{6}$6x6 $=$= $\frac{12}{6}$126

Let's apply our knowledge of inverses and the multiplication and division properties of equality to solve some equations.

 

Worked examples

Question 5

Solve for $x$x in the equation $3x=15$3x=15, showing all of your work algebraically.

Think: The number $3$3 is being multiplied by the variable $x$x. In order to undo the operation of multiplying by $3$3, we should divide each side of the equation by $3$3.

Do: 

$3x$3x $=$= $15$15

Write the original equation.

$\frac{3x}{3}$3x3 $=$= $\frac{15}{3}$153

Divide each side by $3$3.

$x$x $=$= $5$5

Simplify.

 

Reflect: We can check our answer by substituting it back into the original equation.

$3x$3x $=$= $15$15

Write the original equation.

$3\times5$3×5 ? $15$15

Substitute $5$5 for $x$x.

$15$15 $=$= $15$15

The solution checks.

Question 6

Solve for $w$w in the equation $8=\frac{w}{2}$8=w2, showing all of your work algebraically.

Think: Notice that the variable is on the right side, but this does not change anything about how we solve it. The variable $w$w is being divided by $2$2. In order to undo the operation of dividing by $2$2, we should multiply each side of the equation by $2$2.

Do: 

$8$8 $=$= $\frac{w}{2}$w2

Write the original equation.

$8\times2$8×2 $=$= $\frac{w}{2}\times2$w2×2

Multiply each side by $2$2.

$16$16 $=$= $w$w

Simplify.

 

Reflect: We can check our answer by substituting it back into the original equation.

$8$8 $=$= $\frac{w}{2}$w2

Write the original equation.

$8$8 ? $\frac{16}{2}$162

Substitute $16$16 for $w$w.

$8$8 $=$= $8$8

The solution checks.

 

Practice questions

Question 7

Solve: $5x=45$5x=45

Question 8

Solve: $\frac{x}{8}=6$x8=6

Outcomes

6.EE.B.7

Solve mathematical problems and problems in real-world context by writing and solving equations of the form x + p = q, x - p = q, px = q, and x/p = q for cases in which p, q and x are all non-negative rational numbers.

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