*To find the perimeter (P) of a sector, use the formula P ≈ 2r + (θ/360) × 2πr, where r is the radius and θ is the angle of the sector in degrees. For example, with a radius of 5 cm and a 60-degree angle, the perimeter is approximately 10 + π cm.*

## Sector Perimeter Calculator

Perimeter of the sector:

Sure, here’s a table that summarizes the formulas for finding the perimeter of a sector based on different parameters:

Parameter(s) Given | Formula for Perimeter | Example Calculation (Estimation) |
---|---|---|

Radius (r) and Angle (θ in degrees) | P ≈ 2r + (θ/360) × 2πr | P ≈ 2(5) + (60/360) × 2π(5) ≈ 10 + π units |

Radius (r) and Angle (θ in radians) | P ≈ 2r + θr | P ≈ 2(3) + (π/6) × 3 ≈ 6 + π units |

Radius (r) and Arc Length (s) | P ≈ 2r + s | P ≈ 2(8) + 10 ≈ 26 units |

Radius (r) and Area (A) | P ≈ 2r + 2(πr²/A) × A | P ≈ 2(4) + 2(π(4)²/32) × 32 ≈ 8 + 8π units |

Remember that these are approximate formulas, and the actual values may vary depending on the precision of π and the accuracy of measurements.

## FAQs

**How do you find the perimeter of a sector?** The perimeter of a sector can be found by adding the length of the arc (the curved part) to twice the radius (the two straight sides). The formula is approximately given as P ≈ 2r + (θ/360) × 2πr, where r is the radius and θ is the angle of the sector in degrees.

**What is the formula for the perimeter of a sector arc?** The formula for the perimeter of a sector arc is approximately P_arc ≈ (θ/360) × 2πr, where θ is the angle of the sector in degrees, and r is the radius.

**How do you find the perimeter and area of a sector?** To find the perimeter of a sector, use the formula P ≈ 2r + (θ/360) × 2πr. To find the area of a sector, use the formula A ≈ (θ/360) × πr^2, where r is the radius, and θ is the angle of the sector in degrees.

**What is the perimeter of a sector of angle 45?** Assuming the radius is 1 unit, the perimeter of a sector with a 45-degree angle is approximately P ≈ 2(1) + (45/360) × 2π(1) ≈ 2 + 0.125π units.

**What is the perimeter of a segment?** The perimeter of a segment is the sum of the lengths of its arc and the chord (the straight line segment connecting two points on the circumference).

**What is the perimeter formula?** The perimeter formula for a sector is P ≈ 2r + (θ/360) × 2πr, where r is the radius and θ is the angle of the sector in degrees.

**What is the perimeter of a sector of angle 60?** Assuming the radius is 1 unit, the perimeter of a sector with a 60-degree angle is approximately P ≈ 2(1) + (60/360) × 2π(1) ≈ 2 + 1/3π units.

**What is the formula for the area of a sector with an angle?** The formula for the area of a sector with an angle is A ≈ (θ/360) × πr^2, where r is the radius, and θ is the angle of the sector in degrees.

**What is the perimeter of a sector of a circle with an angle of 90 at radius 7 cm?** Assuming the radius is 7 cm, the perimeter of a sector with a 90-degree angle is approximately P ≈ 2(7) + (90/360) × 2π(7) ≈ 14 + 7π cm.

**What is the perimeter of a sector calculator in terms of π?** The perimeter of a sector calculator formula in terms of π is P = 2r + (θ/180)πr, where r is the radius, and θ is the angle of the sector in degrees.

**How do you find the area of a sector?** To find the area of a sector, use the formula A ≈ (θ/360) × πr^2, where r is the radius, and θ is the angle of the sector in degrees.

**What is the difference between a segment and a sector?** A sector is a portion of a circle enclosed by two radii and an arc. A segment is the region enclosed by an arc and a chord (the straight line connecting two points on the circumference).

**How do you find the perimeter of a polygon?** To find the perimeter of a polygon, add up the lengths of all its sides.

**How do we find perimeter of a triangle?** To find the perimeter of a triangle, add the lengths of all three sides together.

**How do you find the perimeter of a shape with missing sides?** If you have a shape with missing sides, you need to measure or calculate the missing side lengths and then add them to find the perimeter.

**What is the perimeter of a sector of angle 90?** Assuming the radius is 1 unit, the perimeter of a sector with a 90-degree angle is approximately P ≈ 2(1) + (90/360) × 2π(1) ≈ 2 + 0.5π units.

**What is the perimeter of the sector with radius 10.5 and sector angle 60?** Assuming the radius is 10.5 units, the perimeter of a sector with a 60-degree angle is approximately P ≈ 2(10.5) + (60/360) × 2π(10.5) ≈ 21 + π units.

**What is the perimeter of a sector of a circle of radius 6 cm?** Assuming the radius is 6 cm, the perimeter of a sector with a given angle can be calculated using the appropriate formula as mentioned earlier.

**How do you calculate the area of a sector of a circle?** To calculate the area of a sector of a circle, use the formula A ≈ (θ/360) × πr^2, where r is the radius, and θ is the angle of the sector in degrees.

**How do you find the area of a 45-degree sector?** Assuming the radius is 1 unit, the area of a 45-degree sector is approximately A ≈ (45/360) × π(1^2) ≈ 1/8π square units.

**How do you find the angle of a sector without arc length?** To find the angle of a sector without arc length, you would need additional information, such as the radius and area of the sector.

**How do you find the perimeter of a sector of a circle with angle?** You can find the perimeter of a sector of a circle with an angle using the formula P ≈ 2r + (θ/360) × 2πr, where r is the radius, and θ is the angle in degrees.

**What is the perimeter of the area sector of a circle?** The perimeter of the area of a sector of a circle is the same as the perimeter of the sector itself.

**What is the perimeter of the sector of a circle of area 25π?** To find the perimeter of the sector of a circle with an area of 25π, you would need additional information such as the radius or angle of the sector.

**What is an example of a sector and segment of a circle?** An example of a sector is a slice of pizza, where you have a portion of the circular pizza. An example of a segment is a portion of the circular pizza without the crust, which is defined by an arc and a chord.

**What is the area of a sector or segment?** The area of a sector is given by A ≈ (θ/360) × πr^2, and the area of a segment can be found by subtracting the area of a corresponding triangle from the area of the sector.

**What is the relationship between segment and sector?** A segment is a part of a circle bounded by an arc and a chord, while a sector is a portion of a circle bounded by two radii and an arc. The segment is the region left over after removing the triangular portion from the sector.

**What is the perimeter of a polygon called?** The perimeter of a polygon is simply called its perimeter.

**How do you find the perimeter easy?** To find the perimeter of a shape, add up the lengths of all its sides. For regular polygons, you can often use a formula that depends on the number of sides and the length of one side.

**How do you find the perimeter and total area of a polygon shape?** To find the perimeter, add the lengths of all the sides of the polygon. To find the total area, divide the polygon into smaller shapes (triangles, rectangles, etc.), find the area of each, and then add them together.

**Can you find perimeter from area triangle?** No, you cannot directly find the perimeter of a triangle from its area. The perimeter is determined by the lengths of the triangle’s sides, whereas the area is determined by the base and height of the triangle.

**How do you find the perimeter using the Pythagorean Theorem?** The Pythagorean Theorem is used to find the lengths of the sides of a right triangle. To find the perimeter, add up the lengths of all the sides, which may involve applying the Pythagorean Theorem if the triangle is right-angled.

**What is the perimeter of the area of a triangle?** The perimeter of a triangle is the sum of the lengths of its three sides.

**How do you find the perimeter and area of an irregular shape?** To find the perimeter of an irregular shape, measure or calculate the lengths of its sides and add them together. To find the area, break the shape into smaller, regular shapes (triangles, rectangles, etc.), find the area of each, and then sum them up.

**How do you find the missing side and perimeter of a triangle?** To find the missing side of a triangle, you may use the Pythagorean Theorem or trigonometry depending on the given information. Once you have all side lengths, you can calculate the perimeter by adding them together.

**How do you find the perimeter of each irregular polygon with the given side lengths?** To find the perimeter of an irregular polygon with given side lengths, simply add up the lengths of all the sides.

**What is the perimeter of a sector of angle 45 degrees of a circle with radius 7 cm?** Assuming the radius is 7 cm, the perimeter of a sector with a 45-degree angle is approximately P ≈ 2(7) + (45/360) × 2π(7) ≈ 14 + π cm.

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