2x − y = 10

y = −4x + 2

y = −x + 8

y = x − 2

2x + 3y = 9

−3x + 3y = −6

A method for solving a system of equations. The key step in using the _____ is to add both sides of two equations to _____ one of the variables. For example, the two equations in the system below can be added together to get the simplified result 7x = 14. We can solve this equation to find x, then substitute the x-value back into either of the original equations to find the value of y.

5x + 2y = 10

2x – 2y = 4

x = 8 − 2y

y − x = 4

y = −1/2x + 7

y = x − 8

9x + 10y = 14

7x + 5y = −3

A method for solving a system of equations. To use the _____, take two expressions that are each equal to the same variable and set those expressions equal to each other. For example, in the system of equations below, –2x + 5 and x – 1 each equal y. So we write –2x + 5 = x – 1, and then solve that equation to solve for x. Once we have x, we substitute that value back into either of the original equations to find the value of y.

y = –2x + 5

y = x – 1

x = −2y − 3

4y − x = 9

y = 1/4x + 5

y = 2x − 9

x + 5y = 8

−x + 2y = −1

A _____ is written at the beginning of our work to identify the variable that will represent a certain quantity. For example, in solving a problem about grilled cheese sandwiches, we might begin by writing “_____ s = the number of sandwiches eaten.” It is particularly important to use _____ when writing mathematical sentences, so that your readers will know what the variables in the sentences represent.