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The length of a rectangle is 15 and its width is w. The perimeter of the rectangle is, at most, 50, Which inequality can be used to find the longes possible width? A 30+ 2x < 50 B. 30 + 2w < 50 D. 30+ 2w > 50 C.30 + 2w > 50

asked Sep 28, 2020 75.3k views

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Waleed Muaz · Answer 1 · 2020-10-01T11:30:56+0000

Answer:

2x+30< 50 ...answer : A

Explanation:

the perimeter is : P = 2(L+W)

let : L= x given : L=15

P= 2(x+15)

The perimeter of the rectangle is, at most, 50: P<50

2(x+15) < 50

2x+30< 50 ...answer : A

Rakitin · Answer 2 · 2020-10-04T03:20:15+0000

A rectangle with sides 15 and w has perimeter

2p = 2(15+w) = 2w+30

We want this quantity to be at most 50, so it must be less than or equal to 50:

$2w+30\leq 50$

For the record, this implies that

$2w\leq 20 \iff w \leq 10$

So, the width can be at most 10.

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