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A circle is separated into ten sections of equal area. These ten sections are arranged to form a shape similar to a parallelogram. Part A: How does the height of the parallelogram and its base relate to
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A circle is separated into ten sections of equal area. These ten sections are arranged to form a shape similar to a parallelogram. Part A: How does the height of the parallelogram and its base relate to the circle?

User Jelle Van Geuns
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Final answer:

The height of the parallelogram is equal to the radius of the circle, and the base of the parallelogram is equal to the circumference of the circle.

Step-by-step explanation:

The height of the parallelogram is equal to the radius of the circle, and the base of the parallelogram is equal to the circumference of the circle.

Since the circle is separated into ten sections of equal area, each section will have an angle of 36 degrees (360 degrees divided by 10). Therefore, the base of the parallelogram will be 10 times the length of the radius of the circle, which is equal to the circumference of the circle.

User Nicola Ambrosetti
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