The distance from the pole in the center of the tetherball circle to the painted circle is about 6 feet. What was the approximate radius of the tetherball circle?

6 ft

To find the approximate radius of the tetherball circle, subtract the distance from the pole to the painted circle from the diameter of the tetherball circle.

The diameter of the tetherball circle is twice the radius.

Let's assume the radius of the tetherball circle is "r" feet.

So, the diameter of the tetherball circle is 2r feet.

The distance from the pole to the painted circle is 6 feet.

Therefore, the equation becomes:

2r - 6 = 0.

To find the value of r, we can solve this equation:

2r = 6.

Divide both sides of the equation by 2:

r = 3.

Therefore, the approximate radius of the tetherball circle is 3 feet.

To find the approximate radius of the tetherball circle, we have the information that the distance from the pole to the painted circle is about 6 feet.

To determine the radius, we need to understand that the distance from the center of a circle to any point on the circle is the radius.

Therefore, the approximate radius of the tetherball circle is approximately 6 feet.