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19 votes
19 votes
Which of the following is a solution to the equation ¾x-12=-18?

4.5
-22.5
-40
-8

User Shivang Agarwal
by
2.8k points

1 Answer

11 votes
11 votes


\frak{Hi!}


\orange\hspace{300pt}\above2

We have the equation
\large\boldsymbol{\sf{\displaystyle(3)/(4)x-12=-18}}.

First we should add 12 to both sides of the equation.


\large\boldsymbol{\sf{\displaystyle(3)/(4)x=-18+12}}. Simplify


\large\boldsymbol{\sf{\displaystyle(3)/(4)x=-6}}.

This done, let's multiply the equation by 4. You'll see why


\large\boldsymbol{\sf{\displaystyle(3)/(\\ot4)x*\\ot4=-6*4}}

Did you see how on the left, the 4's cancelled? That's

because dividing by 4 and then multiplying the same

number, or the result, by 4, are operations that undo each

other.

This being said, let's finish solving this equation in terms of x


\large\boldsymbol{\sf{3x=-24}}. See how this works?

Now, remember that we ought to use inverse operations

to solve for x. These are operations that undo each other.

So if x is multiplied by 3, we should... divide by 3!

Also, please keep in mind that we can only divide the left side

by 3 if we divide the right side by 3.


\large\boldsymbol{\sf{\displaystyle(3x)/(3)=\displaystyle(-24)/(3)}}. Once again the 3s on the left cancel, leaving

x. Wait! Isn't that what we wanted? Yepp, sure!

The right side is now -8. Thus,


\large\boldsymbol{\sf{x=-8}}


\orange\hspace{300pt}\above3

User Loukas
by
2.9k points
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