Erin, Jillian, Stephanie and Jacob went to the movies. The total bill for the tickets and snacks came to $72.00. What is an equation that represents this situation? How much should each teen pay to split the bill evenly?
Watch This
Khan Academy Slightly More Complicated Equations
Guidance
When solving any equation, your job is to find the value for the letter that makes the equation true. Solving equations with variables on one side can be done with the help of models such as a balance or algebra tiles.
When solving equations with variables on one side of the equation there is one main rule to follow: whatever you do to one side of the equals sign you must do the same to the other side of the equals sign. For example, if you add a number to the left side of an equals sign, you must add the same number to the right side of the equals sign.
Example A
Solution: The problem can be solved if you think about the problem in terms of a balance. You know that the two sides are equal so the balance has to stay horizontal. You can place each side of the equation on each side of the balance.
In order to solve the equation, you have to get the variable
First subtract 2 from both sides to get rid of the 2 on the left.
Since 5 is multiplied by
If you simplify this expression, you get:
Therefore
You can check your answer to see if you are correct by substituting your answer back into the original equation.
Example B
Solution: Again, you can solve the problem if you think about the problem in terms of a balance (or a seesaw). You know that the two sides are equal so the balance has to stay horizontal. You can place each side of the equation on each side of the balance.
In order to solve the equation, you have to get the variable
First add 7 from both sides to get rid of the 7 on the left.
Since 7 is multiplied by
If you simplify this expression, you get:
Therefore
You can check your answer to see if you are correct.
Example C
This same method can be extended by using algebra tiles. If you let rectangular tiles represent the variable, square tiles represent one unit, green tiles represent positives numbers, and white tiles represent the negative numbers, you can solve the equations using an alternate method.
The green algebra
Solution: To solve, add two negative tiles to the right and left hand sides. The same rule applies to this problem as to all of the previous problems. Whatever you do to one side you have to do to the other.
This leaves us with the following:
You can reorganize these to look like the following:
Organizing the remaining algebra tiles allows us to realize the answer to be
Let’s do your check as with the previous two problems.
Concept Problem Revisited
There are four teens going to the movies (Erin, Jillian, Stephanie, and Jacob). The total bill was $72.00. Therefore your equation is
Therefore each teen will have to pay $18.00 for their movie ticket and snack.
Vocabulary
 Constant

A constant is a numerical coefficient. For example in the equation
4x+72=0 , the 72 is a constant.
 Equation
 An equation is a mathematical statement with expressions separated by an equals sign.
 Numerical Coefficient

In mathematical equations, the numerical coefficients are the numbers associated with the variables. For example, with the expression
4x , 4 is the numerical coefficient andx is the variable.
 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. Use a model to solve for the variable in the equation
2. Use a different model to solve for the variable in the equation
3. Solve for
Answers:
1.
Therefore,
2.
First you have to subtract 9 from both sides of the equation in order to start to isolate the variable.
Now, in order to get
Therefore,
3.
You can use any method to solve this equation. Remember to isolate the
Now you can use any method to solve the equation. You now should just have to subtract 16 from both sides to isolate the
Practice
Use the models that you have learned to solve for the variables in the following problems.

a+3=−5 
2b−1=5 
4c−3=9 
2−d=3 
4−3e=−2

x+3=14 
2y−7=5 
3z+6=9 
5+3x=−3 
2x+2=−4

−4x+13=5 
3x−5=22 
11−2x=5 
2x−4=4 
5x+3=28
For each of the following models, write a problem involving an equation with a variable on one side of the equation expressed by the model and then solve for the variable.
 .
 .
 .
 .
 .