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The perimeter of a rectangle is 64 units. Can the length x of the rectangle can be 20 units when its width y is 11 units? A. No, the rectangle cannot have x = 20 and y = 11 because x + y ≠ 64 B. No, the rectangle cannot have x = 20 and y = 11 because x + y ≠ 32 C. Yes, the rectangle can have x = 20 and y = 11 because x + y is less than 64 D.Yes, the rectangle can have x = 20 and y = 11 because x + y is less than 32

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texaschic101
P = 2(L + W)
P = 64
W = 11

64 = 2(L + 11)
64 = 2L + 22
64 - 22 = 2L
42 = 2L
21 = L

can length be 20....no, because x + y does not equal 32

Answer:

No, the rectangle cannot have x = 20 and y = 11 because x + y ≠ 32

Step-by-step explanation:

The perimeter of a rectangle is 64 units.

Let the length of the rectangle be = x

The width is 11 units.

The perimeter of rectangle is given as:

[tex]P=2(L+W)[/tex]

=> [tex]64=2(x+11)[/tex]

=> [tex]64=2x+22[/tex]

=> [tex]64-22=2x[/tex]

=> [tex]42=2x[/tex]

x = 21 units.

So, we get the length as 21 units.

Therefore the answer will be - No, the rectangle cannot have x = 20 and y = 11 because x + y ≠ 32

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