Question

Item 17 A tennis court is divided into rectangular sections. The doubles alleys are the areas on either side of the court used for doubles games. The rest of the court is the singles court. Each service box is identical in shape and has a perimeter of 69 feet. Find the area and perimeter of the indicated regions. Write your answers as mixed numbers, if necessary. a. One service box: Perimeter: ft Area: ft2 b. The singles court: Perimeter: ft Area: ft2 c. One doubles alley on one side of the net: Perimeter: ft Area: ft2

Answer 1

To calculate the area and perimeter for each of the different rectangular regions of a tennis court (service box, singles court, doubles alley), it's essential to know the length and width of these regions. Once we know these dimensions, we can calculate the perimeter using 2 * (length + width), and the area using length * width.

Step-by-step explanation:

In order to solve this problem, it's necessary to know the dimensions of the service box, singles court and the doubles alley. The dimensions refer to the length and width for each rectangular region. Without this information, we cannot calculate the area and the perimeter. Once the dimensions are known, the perimeter can be calculated as 2*(length + width) and the area is calculated as length * width. That's how you can get the area and perimeter of each rectangular region in the tennis court.

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