A norman window has the shape of a semicircle atop a rectangle so that the diameter of the semicircle is equal to the width of the rectangle. what is the area of the largest possible norman window with a perimeter of 50 feet?
The area largest possible for norman with a perimeter of 50ft is equal to 50r-2r^2-πr^2+(πr^2)/2 because of A=b*h+(πr^2)/2 h=25-r-(πr)/2 b=2r A=2rh+(πr^2)/2 A=2r(25-r-(πr)/2)+(πr^2)/2 A=50r-2r^2-πr^2+(πr^2)/2
