A playground is 50-feet long by 30-feet wide. The length and width of the playground will each be increased by the same number of feet. The following expression represents the perimeter of the larger playground:

(x + 50) + (x + 30) + (x + 50) + (x + 30)

Which expression is equivalent to the expression for the perimeter of the larger playground?
A) (x + 50) + (x + 30)
B) 4x + 40
C) 4(x + 40)
D) 4(x + 160)

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Аноним Аноним · Answer 1 · 2018-04-02T20:54:44+02:00

The answer is C
You can ignore the parenthesis so you have
x + 50 + x + 30 + x + 50 + x + 30 (combine like terms)
4x+160 (factor out the 4)
4(x+40)

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OrethaWilkison OrethaWilkison · Answer 2 · 2019-05-16T09:43:27+02:00

Answer:

Option C is correct

4(x+40)

Step-by-step explanation:

Perimeter(P) of rectangle is given by:

[tex]P = 2(l+w)[/tex]

where, l is the length and w is the width of the rectangle.

As per the statement:

A playground is 50-feet long by 30-feet wide.

The length and width of the playground will each be increased by the same number of feet.

The following expression represents the perimeter of the larger playground is:

(x + 50) + (x + 30) + (x + 50) + (x + 30)

first Remove parenthesis:

x + 50+ x + 30 + x + 50+ x + 30

Combine like terms;

4x+160

using distributive property [tex]a \cdot (b+c) = a\cdot b+ a\cdot c[/tex] we have

⇒4(x+40)

Therefore, the expression is equivalent to the expression for the perimeter of the larger playground is, 4(x+40)