A gazebo is located in the center of a large, circular lawn with a diameter of 200 feet. Straight paths extend from the gazebo to a sidewalk around the lawn. If two of the paths form a 75 degree angle, how far would you have to travel around the sidewalk to get from one path to another?

To find the distance around the sidewalk from one path to another, we need to find the circumference of the circle with a diameter of 200 feet.

The formula for the circumference of a circle is C = πd, where C is the circumference and d is the diameter.

C = π(200 feet)
C ≈ 628.32 feet

Now that we have the circumference of the circle, we need to determine what fraction of the circle is between the two paths forming a 75 degree angle. Since the angle between the two paths is 75 degrees, the fraction of the circle between the paths is 75/360 = 0.2083.

To find the distance around the sidewalk between the two paths, we multiply the circumference by the fraction of the circle between the paths.

628.32 feet * 0.2083 ≈ 130.94 feet

Therefore, to get from one path to another, you would have to travel approximately 130.94 feet around the sidewalk.