What is the coordinate for the center of the four square court? Show your work to receive credit . (2 points )

To find the coordinate of the center of the four square court, we need the coordinates of the four corners of the court.

Assuming the court is a standard basketball court, the coordinates of the corners are as follows:
- Top left corner: (-25 feet, 47 feet)
- Top right corner: (25 feet, 47 feet)
- Bottom left corner: (-25 feet, -47 feet)
- Bottom right corner: (25 feet, -47 feet)

To find the coordinate of the center, we can calculate the average x and y values of the four corners.

For the x-coordinate:
Average = (-25 + 25) / 2 = 0 feet

For the y-coordinate:
Average = (47 - 47 - 47 + 47) / 2 = 0 feet

Therefore, the center of the four square court is located at (0 feet, 0 feet).