Question

How do you solve the system of equations `5x - 2y = 32` and `x + y = - 9`?

Answer 1

`x=2` and `y=-11`
BUT READ WHY :)

Explanation:

Okay so basically we start by putting both of the equations next to each other.

So...

`5x - 2y = 32`

`x + y = -9`

For this one, I'd use the substitution method, so...

`x + y = -9`

y= -9 - x

Now that we've got that, we can plug it into the top equation for y...

`5x - 2(-9 - x) = 32`

`5x+18+2x=32`

`7x + 18 = 32`

`7x = 14`

`x=2`

Now we solve in terms of y, using 2 for x...

`2 + y = -9`

`y=-11`

Now we have

`x=2` and `y=-11`

Of course, don't forget to check ;)

`5(2)-2(-11)=32`

`10+22=32`

`32=32`

It checks! Make sure you understand what you're doing, don't just copy because I won't be here during your test! Leave a comment if you need further help!