How do you solve $4 (2 r + 8) = 88$ $4(2r+8)=88$ using the distributive property?

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How do you solve $4 (2 r + 8) = 88$ $4(2r+8)=88$ using the distributive property?

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Answer 1 · 2016-09-09T19:02:08

Distribute $4 (2 r + 8) = 88$ $4(2r+8)=88$ to $8 r + 32 = 88$ $8r+32=88$ and solve.

Explanation:

Let's look at what the distributive property says first.

$a (b + c) = a b + a c$ $a(b+c) = ab+ac$
It says we can distribute a coefficient outside parenthesis amongst the terms inside.

We see the same pattern with this equation,
$4 (2 r + 8) = 88$ $4(2r+8) = 88$
where $4$ $4$ is the outside coefficient, and $2 r$ $2r$ and $8$ $8$ are the inside terms.

Therefore, we can distribute that equation as,
$4 (2 r + 8) = 8 r + 32 = 88$ $4(2r+8) = 8r + 32 =88$

We can then subtract 32 from both sides,
$8 r = 56$ $8r = 56$
then divide 8 from both sides to reach,
$r = 7$ $r = 7$
which is our answer. $square$

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How do you solve $4 (2 r + 8) = 88$ $4(2r+8)=88$ using the distributive property?

1 Answer

Explanation:

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How do you solve $4 (2 r + 8) = 88$ $4(2r+8)=88$ using the distributive property?