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Equations with Variables on Both Sides

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Practice Equations with Variables on Both Sides
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Equations with Variables on Both Sides

Thomas has $50 and Jack has$100. Thomas is saving $10 per week for his new bike. Jack is saving$5 a week for his new bike. Can you represent this situation with an equation? How long will it be before the two boys have the same amount of money?

Guidance

The methods used for solving equations with variables on both sides of the equation are the same as the methods used to solve equations with variables on one side of the equation. What differs is that first you must add or subtract a term from both sides in order to have the variable on only one side of the equals sign.

Remember that your goal for solving any equation is to get the variables on one side and the constants on the other side. You do this by adding and subtracting terms from both sides of the equals sign. Then you isolate the variables by multiplying or dividing. You must remember in these problems, as with any equation, whatever operation (addition, subtraction, multiplication, or division) you do to one side of the equals sign, you must do to the other side. This is a big rule to remember in order for equations to remain equal or to remain in balance.

Example A

$x+4=2x-6$

Solution: You can solve this problem using the balance method.

You could first try to get the variables all on one side of the equation. You do this by subtracting $x$ from both sides of the equation.

Next, isolate the $x$ variable by adding 6 to both sides.

Therefore $x = 10$ .

$\text{Check:}&\\x+4 &= 2x-6\\({\color{red}10})+4 &= 2({\color{red}10})-6\\14 &= 20-6\\14 &= 14 \ \$

Example B

$14-3y=4y$

Solution: You can solve this equation using algebra tiles.

You first have to combine our variables $(x)$ tiles onto the same side of the equation. You do this by adding $3 x$ tiles to both sides of the equals sign. In this way the $-3y$ will be eliminated from the left hand side of the equation.

By isolating the variable $(y)$ you are left with these algebra tiles.

Rearranging you will get the following.

$\text{Check:} &\\14 - 3y &= 4y\\14-3({\color{red}2}) &= 4({\color{red}2})\\14-6 &= 8\\8 &= 8 \ \$

Therefore $y = 2$ .

Example C

$53a-99=42a$

Solution: To solve this problem, you would need to have a large number of algebra tiles! It might be more efficient to use the balance method to solve this problem.

$\text{Check:} &\\53a-99 &= 42a\\53({\color{red}9}) - 99 &= 42({\color{red}9})\\477-99 &= 378\\378 &= 378 \ \$

Therefore, $a = 9$ .

Concept Problem Revisited

Thomas has $50 and Jack has$100. Thomas is saving $10 per week for his new bike. Jack is saving$5 a week for his new bike.

If you let $x$ be the number of weeks, you can write the following equation.

$\underbrace{ 10x+50 }_{\text{Thomas's money:} \ \10 \ \text{per week} + \50}= \underbrace{ 5x+100 }_{\text{Jack's money:} \ \5 \ \text{per week} + \100}$

You can solve the equation now by first combining like terms.

$10x+50 &= 5x+100\\10x {\color{red}-5x}+50 &= 5x {\color{red}-5x}+100 && \text{-moving the} \ x \ \text{variables to left side of the equation}\\5x+50 {\color{red}-50} &= 100 {\color{red}-50} && \text{-moving the constants to right side of the equation}\\5x &= 50$

You can now solve for $x$ to find the number of weeks until the boys have the same amount of money.

$5x &= 50\\\frac{5x}{5} &= \frac{50}{5}\\x &= 10$

Therefore, in 10 weeks Jack and Thomas will each have the same amount of money.

Vocabulary

Variable
A variable is an unknown quantity in a mathematical expression. It is represented by a letter. It is sometimes referred to as the literal coefficient.

Guided Practice

1. Solve for the variable in the equation $6x+4=5x-5$ .

2. Solve for the variable in the equation $7r-4=3+8r$ .

3. Determine the most efficient method to solve for the variable in the problem $10b-22=29-7b$ . Explain your choice of method for solving this problem.

1. $6x+4=5x-5$

Therefore $x = -9$ .

2. $7r-4=3+8r$

You can begin by combining the $r$ terms. Subtract $8r$ from both sides of the equation.

You next have to isolate the variable. To do this, add 4 to both sides of the equation.

But there is still a negative sign with the $r$ term. You now have to divide both sides by –1 to finally isolate the variable.

Therefore $r = -7$ .

3. You could choose either method but there are larger numbers in this equation. With larger numbers, the use of algebra tiles is not an efficient manipulative. You should solve the problem using the balance method. Work through the steps to see if you can follow them.

Therefore $b = 3$ .

Practice

Use the balance method to find the solution for the variable in each of the following problems.

1. $5p+3=-3p-5$
2. $6b-13=2b+3$
3. $2x-5=x+6$
4. $3x-2x=-4x+4$
5. $4t-5t+9=5t-9$

Use algebra tiles to find the solution for the variable in each of the following problems.

1. $6-2d=15-d$
2. $8-s=s-6$
3. $5x+5=2x-7$
4. $3x-2x=-4x+4$
5. $8+t=2t+2$

Use the methods that you have learned for solving equations with variables on both sides to solve for the variables in each of the following problems. Remember to choose an efficient method to solve for the variable.

1. $4p-7=21-3p$
2. $75-6x=4x-15$
3. $3t+7=15-t$
4. $5+h=11-2h$
5. $9-2e=3-e$

For each of the following models, write a problem to represent the model and solve for the variable for the problem.

1. .

1. .

1. .

1. .

1. .