According to the problem, the length is 2 feet more than its width, which is expressed as the following function
[tex]l=w+2[/tex]If the width is x, then the length is x+2.
We can express the following function for the area
[tex]A(x)=x(x+2)[/tex]Let's replace the width x = 11 ft.
[tex]A(11)=11\cdot(11+2)=11(13)=143[/tex]Where x represents the width.
