Question

What is the formula to find the perimeter of a segment of a circle?

Answer 1

Answer:

2 x r x pi x theta/360 degrees

Step-by-step explanation:

To find the full perimeter, or circumference, you need to times 2 x r x pi, or sometimes diameter x pi. Then, you times it by the fraction of the segment, which is theta/360 degrees.

PS. r = radius

Answer 2

The formula to find the perimeter of a segment of a circle is - 2r*π*θ/360°

• The area that is enclosed by the circle's arc and chord is referred to as a segment. The term "segment" refers to each component of a divided entity. A segment is a component of the circle in a similar manner. In contrast, a segment is a particular area of a circle that is divided by a chord, not just any random area of a circle. When a circle's chord (intersecting line) and arc come together to form a segment, that area of the circle is said to be that segment (part of the boundary)

• What is the Segment of a Circle?
• A segment of a circle is the region that is bounded by an arc and a chord of the circle.
• An arc is a portion of the circle's circumference.
• A chord is a line segment that joins any two points on the circle's circumference.
• There are two types of segments, one is a minor segment, and the other is a major segment. A minor segment is made by a minor arc and a major segment is made by a major arc of the circle.

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