The perimeter of a square can be found using the formula P = 4s where s is the side length of the square. If you were to increase the length s by 11, the
expression for the perimeter would become 4/5 + 11). Expand the expression to represent the perimeter of the larger square.
Which expression represents the perimeter of the larger square?
O A. 4s +11
O B. 45 +44
O C. 5s + 15
O D. S +44

Are you scanning the question?—because there are some errors. If the length of a side is increased by 11, the expression for the perimeter would become

4(s+11)

not 4/5+11)

4(s+11) = 4s+44

The answer is B, which should read 4s+44, not 45+44

Answer Link

Yakavi Yakavi · Answer 2 · 2022-05-10T16:04:45+02:00

The perimeter of a square is 4s+44. So option (B) is the correct option.

What is the perimeter?

The perimeter of a square is the total length of all the sides of the square. Hence we can find the perimeter of a square by adding all its four sides.

For the given situation,

The perimeter of the square is given by the formula, P = 4s

where, P is the perimeter and s is the side of the square

The length of the square is increased by [tex]11[/tex]

So, the perimeter becomes [tex]p=4(s+11)[/tex]

⇒[tex]p=4s+44[/tex]

Hence we can conclude that the correct option is (B) 4s+44.

Learn more about the perimeter of square here

https://brainly.com/question/11495285

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