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What is the coordinate for the center of the four square court? Show your work to receive credit. (2 points )Asked by Anonymous
What is the coordinate for the center of the four square court? Show your work to receive credit . (2 points )
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GPT 3.5
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).
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).
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