A city park commission received a donation of playground equipment from a parents' organization. The area of the playground needs to be 256 square yards for the children to use it safely. The playground will be rectangular. The city will also put a fence around the playground. The perimeter, P, of the fence includes the gates. To save money, the city wants the least perimeter of fencing for the area of 256 square yards. With one side 8 yards longer than the other side, what are the side lengths for the least perimeter of fencing?

Answer:Length = 20.49 yards and Width = 12.49 yards.Step-by-step explanation:The area of the rectangular playground is given by 256 yards square. It is also known that one of the sides of the playground is 8 yards longer than the other side. Therefore, let the smaller side by x yards. Then the longer side will be (x+8) yards. The area of the rectangle is given by:Area of the rectangle = length * width.256 = x*(x+8)x^2 + 8x = 256. Applying the completing the square method gives:(x)^2 + 2(x)(4) + (4)^2 = 256 + 16(x+4)^2 = 272. Taking square root on both sides gives:x+4 = 16.49 or x+4 = -16.49 (to the nearest 2 decimal places).x = 12.49 or x = -20.49.Since length cannot be negative, therefore x = 12.49 yards.Since smaller side = x yards, thus smaller side = 12.49 yards.Since larger side = (x+8) yards, thus larger side = 12.49+8 = 20.49 yards.Thus, the length and the width to minimize the perimeter of fencing is 20.49 yards and 12.49 yards respectively!!!