THIS IS OPTIONAL ADDITIONAL PRACTICE

Solve Equations Using the Subtraction and Addition Properties of Equality

In the following exercises, determine whether the given value is a solution to the equation.

Is $y=\Large\frac{1}{3}$ a solution of $4y+2=10y?$

yes

Is $x=\Large\frac{3}{4}$ a solution of $5x+3=9x?$

Is $u=-\Large\frac{1}{2}$ a solution of $8u - 1=6u?$

no

Is $v=-\Large\frac{1}{3}$ a solution of $9v - 2=3v?$

In the following exercises, solve each equation.

$x+7=12$

x = 5

$y+5=-6$

$b+\Large\frac{1}{4}\normalsize =\Large\frac{3}{4}$

$b=\Large\frac{1}{2}$

$a+\Large\frac{2}{5}\normalsize =\Large\frac{4}{5}$

$p+2.4=-9.3$

p = −11.7

$m+7.9=11.6$

$a - 3=7$

a = 10

$m - 8=-20$

$x-\Large\frac{1}{3}\normalsize=2$

$x=\Large\frac{7}{3}$

$x-\Large\frac{1}{5}\normalsize =4$

$y - 3.8=10$

y = 13.8

$y - 7.2=5$

$x - 15=-42$

x = −27

$z+5.2=-8.5$

$q+\Large\frac{3}{4}\normalsize =\Large\frac{1}{2}$

$q=-\Large\frac{1}{4}$

$p-\Large\frac{2}{5}\normalsize =\Large\frac{2}{3}$

$y-\Large\frac{3}{4}\normalsize =\Large\frac{3}{5}$

$y=\Large\frac{27}{20}$

Solve Equations that Need to be Simplified
In the following exercises, solve each equation.

$c+3 - 10=18$

$m+6 - 8=15$

17

$9x+5 - 8x+14=20$

$6x+8 - 5x+16=32$

8

$-6x - 11+7x - 5=-16$

$-8n - 17+9n - 4=-41$

−20

$3\left(y - 5\right)-2y=-7$

$4\left(y - 2\right)-3y=-6$

2

$8\left(u+1.5\right)-7u=4.9$

$5\left(w+2.2\right)-4w=9.3$

1.7

$-5\left(y - 2\right)+6y=-7+4$

$-8\left(x - 1\right)+9x=-3+9$

−2

$3\left(5n - 1\right)-14n+9=1 - 2$

$2\left(8m+3\right)-15m - 4=3 - 5$

−4

$-\left(j+2\right)+2j - 1=5$

$-\left(k+7\right)+2k+8=7$

6

$6a - 5\left(a - 2\right)+9=-11$

$8c - 7\left(c - 3\right)+4=-16$

−41

$8\left(4x+5\right)-5\left(6x\right)-x=53$

$6\left(9y - 1\right)-10\left(5y\right)-3y=22$

28

Translate to an Equation and Solve

In the following exercises, translate to an equation and then solve.

Five more than $x$ is equal to $21$.

The sum of $x$ and $-5$ is $33$.

x + (−5) = 33; x = 38

Ten less than $m$ is $-14$.

Three less than $y$ is $-19$.

y − 3 = −19; y = −16

The sum of $y$ and $-3$ is $40$.

Eight more than $p$ is equal to $52$.

p + 8 = 52; p = 44

The difference of $9x$ and $8x$ is $17$.

The difference of $5c$ and $4c$ is $60$.

5c − 4c = 60; 60

The difference of $n$ and $\Large\frac{1}{6}$ is $\Large\frac{1}{2}$.

The difference of $f$ and $\Large\frac{1}{3}$ is $\Large\frac{1}{12}$.

$f-\Large\frac{1}{3}\normalsize =\Large\frac{1}{12}\normalsize ;\Large\frac{5}{12}$

The sum of $-4n$ and $5n$ is $-32$.

The sum of $-9m$ and $10m$ is $-25$.

−9m + 10m = −25; m = −25

Translate and Solve Applications

In the following exercises, translate into an equation and solve.

Pilar drove from home to school and then to her aunt’s house, a total of $18$ miles. The distance from Pilar’s house to school is $7$ miles. What is the distance from school to her aunt’s house?

Jeff read a total of $54$ pages in his English and Psychology textbooks. He read $41$ pages in his English textbook. How many pages did he read in his Psychology textbook?

Let p equal the number of pages read in the Psychology book 41 + p = 54. Jeff read pages in his Psychology book.

Pablo’s father is $3$ years older than his mother. Pablo’s mother is $42$ years old. How old is his father?

Eva’s daughter is $5$ years younger than her son. Eva’s son is $12$ years old. How old is her daughter?

Let d equal the daughter’s age. d = 12 − 5. Eva’s daughter’s age is 7 years old.

Allie weighs $8$ pounds less than her twin sister Lorrie. Allie weighs $124$ pounds. How much does Lorrie weigh?

For a family birthday dinner, Celeste bought a turkey that weighed $5$ pounds less than the one she bought for Thanksgiving. The birthday dinner turkey weighed $16$ pounds. How much did the Thanksgiving turkey weigh?

21 pounds

The nurse reported that Tricia’s daughter had gained $4.2$ pounds since her last checkup and now weighs $31.6$ pounds. How much did Tricia’s daughter weigh at her last checkup?

Connor’s temperature was $0.7$ degrees higher this morning than it had been last night. His temperature this morning was $101.2$ degrees. What was his temperature last night?

100.5 degrees

Melissa’s math book cost ${$22.85}$ less than her art book cost. Her math book cost ${$93.75}$. How much did her art book cost?

Ron’s paycheck this week was ${$17.43}$ less than his paycheck last week. His paycheck this week was ${$103.76}$. How much was Ron’s paycheck last week?

$121.19

 

 

Solve Equations Using the Division and Multiplication Properties of Equality

Solve Equations Using the Division and Multiplication Properties of Equality

In the following exercises, solve each equation for the variable using the Division Property of Equality and check the solution.

$8x=32$

$7p=63$

9

$-5c=55$

$-9x=-27$

3

$-90=6y$

$-72=12y$

−7

$-16p=-64$

$-8m=-56$

7

$0.25z=3.25$

$0.75a=11.25$

15

$-3x=0$

$4x=0$

0

In the following exercises, solve each equation for the variable using the Multiplication Property of Equality and check the solution.

$\Large\frac{x}{4}\normalsize =15$

$\Large\frac{z}{2}\normalsize =14$

28

$-20=\Large\frac{q}{-5}$

$\Large\frac{c}{-3}\normalsize =-12$

36

$\Large\frac{y}{9}\normalsize =-6$

$\Large\frac{q}{6}\normalsize =-8$

−48

$\Large\frac{m}{-12}\normalsize =5$

$-4=\Large\frac{p}{-20}$

80

$\Large\frac{2}{3}\normalsize y=18$

$\Large\frac{3}{5}\normalsize r=15$

25

$-\Large\frac{5}{8}\normalsize w=40$

$24=-\Large\frac{3}{4}\normalsize x$

−32

$-\Large\frac{2}{5}\normalsize =\Large\frac{1}{10}\normalsize a$

$-\Large\frac{1}{3}\normalsize q=-\Large\frac{5}{6}$

5/2

Solve Equations That Need to be Simplified
In the following exercises, solve the equation.

$8a+3a - 6a=-17+27$

$6y - 3y+12y=-43+28$

y = −1

$-9x - 9x+2x=50 - 2$

$-5m+7m - 8m=-6+36$

m = −5

$100 - 16=4p - 10p-p$

$-18 - 7=5t - 9t - 6t$

$t=\Large\frac{5}{2}$

$\Large\frac{7}{8}\normalsize n-\Large\frac{3}{4}\normalsize n=9+2$

$\Large\frac{5}{12}\normalsize q+\Large\frac{1}{2}\normalsize q=25 - 3$

q = 24

$0.25d+0.10d=6 - 0.75$

$0.05p - 0.01p=2+0.24$

p = 56

 

Solve Equations with Variables and Constants on Both Sides

Solve an Equation with Constants on Both Sides

In the following exercises, solve the equation for the variable.

$6x - 2=40$

$7x - 8=34$

6

$11w+6=93$

$14y+7=91$

6

$3a+8=-46$

$4m+9=-23$

−8

$-50=7n - 1$

$-47=6b+1$

−8

$25=-9y+7$

$29=-8x - 3$

−4

$-12p - 3=15$

$-14\text{q}-15=13$

−2

Solve an Equation with Variables on Both Sides
In the following exercises, solve the equation for the variable.

$8z=7z - 7$

$9k=8k - 11$

−11

$4x+36=10x$

$6x+27=9x$

9

$c=-3c - 20$

$b=-4b - 15$

−3

$5q=44 - 6q$

$7z=39 - 6z$

3

$3y+\Large\frac{1}{2}\normalsize =2y$

$8x+\Large\frac{3}{4}\normalsize =7x$

−3/4

$-12a - 8=-16a$

$-15r - 8=-11r$

2

Solve an Equation with Variables and Constants on Both Sides
In the following exercises, solve the equations for the variable.

$6x - 15=5x+3$

$4x - 17=3x+2$

19

$26+8d=9d+11$

$21+6f=7f+14$

7

$3p - 1=5p - 33$

$8q - 5=5q - 20$

−5

$4a+5=-a - 40$

$9c+7=-2c - 37$

−4

$8y - 30=-2y+30$

$12x - 17=-3x+13$

2

$2\text{z}-4=23-\text{z}$

$3y - 4=12-y$

4

$\Large\frac{5}{4}\normalsize c - 3=\Large\frac{1}{4}\normalsize c - 16$

$\Large\frac{4}{3}\normalsize m - 7=\Large\frac{1}{3}\normalsize m - 13$

6

$8-\Large\frac{2}{5}\normalsize q=\Large\frac{3}{5}\normalsize q+6$

$11-\Large\frac{1}{4}\normalsize a=\Large\frac{3}{4}\normalsize a+4$

7

$\Large\frac{4}{3}\normalsize n+9=\Large\frac{1}{3}\normalsize n - 9$

$\Large\frac{5}{4}\normalsize a+15=\Large\frac{3}{4}\normalsize a - 5$

−40

$\Large\frac{1}{4}\normalsize y+7=\Large\frac{3}{4}\normalsize y - 3$

$\Large\frac{3}{5}\normalsize p+2=\Large\frac{4}{5}\normalsize p - 1$

3

$14n+8.25=9n+19.60$

$13z+6.45=8z+23.75$

3.46

$2.4w - 100=0.8w+28$

$2.7w - 80=1.2w+10$

60

$5.6r+13.1=3.5r+57.2$

$6.6x - 18.9=3.4x+54.7$

23

Solve an Equation Using the General Strategy
In the following exercises, solve the linear equation using the general strategy.

$5\left(x+3\right)=75$

$4\left(y+7\right)=64$

9

$8=4\left(x - 3\right)$

$9=3\left(x - 3\right)$

6

$20\left(y - 8\right)=-60$

$14\left(y - 6\right)=-42$

3

$-4\left(2n+1\right)=16$

$-7\left(3n+4\right)=14$

−2

$3\left(10+5r\right)=0$

$8\left(3+3\text{p}\right)=0$

−1

$\Large\frac{2}{3}\normalsize\left(9c - 3\right)=22$

$\Large\frac{3}{5}\normalsize\left(10x - 5\right)=27$

5

$5\left(1.2u - 4.8\right)=-12$

$4\left(2.5v - 0.6\right)=7.6$

0.52

$0.2\left(30n+50\right)=28$

$0.5\left(16m+34\right)=-15$

0.25

$-\left(w - 6\right)=24$

$-\left(t - 8\right)=17$

−9

$9\left(3a+5\right)+9=54$

$8\left(6b - 7\right)+23=63$

2

$10+3\left(z+4\right)=19$

$13+2\left(m - 4\right)=17$

6

$7+5\left(4-q\right)=12$

$-9+6\left(5-k\right)=12$

3/2

$15-\left(3r+8\right)=28$

$18-\left(9r+7\right)=-16$

3

$11 - 4\left(y - 8\right)=43$

$18 - 2\left(y - 3\right)=32$

−4

$9\left(p - 1\right)=6\left(2p - 1\right)$

$3\left(4n - 1\right)-2=8n+3$

2

$9\left(2m - 3\right)-8=4m+7$

$5\left(x - 4\right)-4x=14$

34

$8\left(x - 4\right)-7x=14$

$5+6\left(3s - 5\right)=-3+2\left(8s - 1\right)$

10

$-12+8\left(x - 5\right)=-4+3\left(5x - 2\right)$

$4\left(x - 1\right)-8=6\left(3x - 2\right)-7$

2

$7\left(2x - 5\right)=8\left(4x - 1\right)-9$

 

 

Solve Equations with Fraction or Decimal Coefficients

Solve equations with fraction coefficients

In the following exercises, solve the equation by clearing the fractions.

$\Large\frac{1}{4}\normalsize x-\Large\frac{1}{2}\normalsize =-\Large\frac{3}{4}$

x = −1

$\Large\frac{3}{4}\normalsize x-\Large\frac{1}{2}\normalsize =\Large\frac{1}{4}$

$\Large\frac{5}{6}\normalsize y-\Large\frac{2}{3}\normalsize =-\Large\frac{3}{2}$

y = −1

$\Large\frac{5}{6}\normalsize y-\Large\frac{1}{3}\normalsize =-\Large\frac{7}{6}$

$\Large\frac{1}{2}\normalsize a+\Large\frac{3}{8}\normalsize =\Large\frac{3}{4}$

$a=\Large\frac{3}{4}$

$\Large\frac{5}{8}\normalsize b+\Large\frac{1}{2}\normalsize =-\Large\frac{3}{4}$

$2=\Large\frac{1}{3}\normalsize x-\Large\frac{1}{2}\normalsize x+\Large\frac{2}{3}\normalsize x$

x = 4

$2=\Large\frac{3}{5}\normalsize x-\Large\frac{1}{3}\normalsize x+\Large\frac{2}{5}\normalsize x$

$\Large\frac{1}{4}\normalsize m-\Large\frac{4}{5}\normalsize m+\Large\frac{1}{2}\normalsize m=-1$

m = 20

$\Large\frac{5}{6}\normalsize n-\Large\frac{1}{4}\normalsize n-\Large\frac{1}{2}\normalsize n=-2$

$x+\Large\frac{1}{2}\normalsize =\Large\frac{2}{3}\normalsize x-\Large\frac{1}{2}$

x = −3

$x+\Large\frac{3}{4}\normalsize =\Large\frac{1}{2}\normalsize x-\Large\frac{5}{4}$

$\Large\frac{1}{3}\normalsize w+\Large\frac{5}{4}\normalsize =w-\Large\frac{1}{4}$

$w=\Large\frac{9}{4}$

$\Large\frac{3}{2}\normalsize z+\Large\frac{1}{3}\normalsize =z-\Large\frac{2}{3}$

$\Large\frac{1}{2}\normalsize x-\Large\frac{1}{4}\normalsize =\Large\frac{1}{12}\normalsize x+\Large\frac{1}{6}$

x = 1

$\Large\frac{1}{2}\normalsize a-\Large\frac{1}{4}\normalsize =\Large\frac{1}{6}\normalsize a+\Large\frac{1}{12}$

$\Large\frac{1}{3}\normalsize b+\Large\frac{1}{5}\normalsize =\Large\frac{2}{5}\normalsize b-\Large\frac{3}{5}$

b = 12

$\Large\frac{1}{3}\normalsize x+\Large\frac{2}{5}\normalsize =\Large\frac{1}{5}\normalsize x-\Large\frac{2}{5}$

$1=\Large\frac{1}{6}\normalsize\left(12x - 6\right)$

x = 1

$1=\Large\frac{1}{5}\normalsize\left(15x - 10\right)$

$\Large\frac{1}{4}\normalsize\left(p - 7\right)=\Large\frac{1}{3}\normalsize\left(p+5\right)$

p = −41

$\Large\frac{1}{5}\normalsize\left(q+3\right)=\Large\frac{1}{2}\normalsize\left(q - 3\right)$

$\Large\frac{1}{2}\normalsize\left(x+4\right)=\Large\frac{3}{4}$

$x=-\Large\frac{5}{2}$

$\Large\frac{1}{3}\normalsize\left(x+5\right)=\Large\frac{5}{6}$

Solve Equations with Decimal Coefficients

In the following exercises, solve the equation by clearing the decimals.

$0.6y+3=9$

y = 10

$0.4y - 4=2$

$3.6j - 2=5.2$

j = 2

$2.1k+3=7.2$

$0.4x+0.6=0.5x - 1.2$

x = 18

$0.7x+0.4=0.6x+2.4$

$0.23x+1.47=0.37x - 1.05$

x = 18

$0.48x+1.56=0.58x - 0.64$

$0.9x - 1.25=0.75x+1.75$

x = 20

$1.2x - 0.91=0.8x+2.29$

$0.05n+0.10\left(n+8\right)=2.15$

n = 9

$0.05n+0.10\left(n+7\right)=3.55$

$0.10d+0.25\left(d+5\right)=4.05$

d = 8

$0.10d+0.25\left(d+7\right)=5.25$

$0.05\left(q - 5\right)+0.25q=3.05$

q = 11

$0.05\left(q - 8\right)+0.25q=4.10$

 

 

Chapter Review Exercises