Answer:
[tex]l=32[/tex] and [tex]w=12[/tex]
Step-by-step explanation:
Given: The length of a rectangle is eight more than twice its width. The perimeter is 88 feet.
To find: The dimensions of the rectangle.
Solution:
It is given that the length of a rectangle is eight more than twice its width.
Let the width of the rectangle be w.
So, the length of the rectangle[tex]=2w+8[/tex]
We know that the perimeter of a rectangle is [tex]2(l+w)[/tex]
Here, perimeter of rectangle[tex]=88[/tex]
So, we have
[tex]2(2w+8+w)=88[/tex]
[tex]\implies2w+w+8=44[/tex]
[tex]\implies3w=44-8[/tex]
[tex]\implies3w=36[/tex]
[tex]\implies w=12[/tex]
Therefore, width of the rectangle is 12 feet
length[tex]=2\times12+8=32[/tex]
Hence, length of the rectangle is 32 feet and width of the rectangle is 12 feet.
