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Perimeter of a sector when angle subtended by an arc at center is given Calculator

Category Math
Math Geometry
Geometry 2D Geometry
2D-Geometry Circle
Circle Sector of a circle
Theta is an angle that can be defined as the figure formed by two rays meeting at a common endpoint.Theta [ϑ]
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Radius is a radial line from the focus to any point of a curve.Radius [r]
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The perimeter of a figure is the total distance around the edge of the figure.Perimeter of a sector when angle subtended by an arc at center is given [P]
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11 Other formulas that you can solve using the same Inputs

Total Surface Area of a Cone
Total Surface Area=pi*Radius*(Radius+sqrt(Radius^2+Height^2)) GO
Lateral Surface Area of a Cone
Lateral Surface Area=pi*Radius*sqrt(Radius^2+Height^2) GO
Surface Area of a Capsule
Surface Area=2*pi*Radius*(2*Radius+Side) GO
Volume of a Capsule
Volume=pi*(Radius)^2*((4/3)*Radius+Side) GO
Volume of a Circular Cone
Volume=(1/3)*pi*(Radius)^2*Height GO
Base Surface Area of a Cone
Base Surface Area=pi*Radius^2 GO
Top Surface Area of a Cylinder
Top Surface Area=pi*Radius^2 GO
Volume of a Circular Cylinder
Volume=pi*(Radius)^2*Height GO
Area of a Circle when radius is given
Area of Circle=pi*Radius^2 GO
Volume of a Hemisphere
Volume=(2/3)*pi*(Radius)^3 GO
Volume of a Sphere
Volume=(4/3)*pi*(Radius)^3 GO

11 Other formulas that calculate the same Output

Perimeter of a rectangle when diagonal and length are given
Perimeter=2*(Length+sqrt((Diagonal)^2-(Length)^2)) GO
Perimeter of a Right Angled Triangle
Perimeter=Side A+Side B+sqrt(Side A^2+Side B^2) GO
Perimeter Of Parallelepiped
Perimeter=4*Side A+4*Side B+4*Side C GO
Perimeter of a Parallelogram
Perimeter=2*Side A+2*Side B GO
Perimeter of a Kite
Perimeter=2*(Side A+Side B) GO
Perimeter of a rectangle when length and width are given
Perimeter=2*Length+2*Width GO
Perimeter of an Isosceles Triangle
Perimeter=Side A+2*Side B GO
Perimeter of a Cube
Perimeter=12*Side GO
Perimeter of a square when side is given
Perimeter=4*Side GO
Perimeter of an Equilateral Triangle
Perimeter=3*Side GO
Perimeter of a Rhombus
Perimeter=4*Side GO

Perimeter of a sector when angle subtended by an arc at center is given Formula

Perimeter=((Theta/360)*2*pi*Radius)+(2*Radius)
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Area of a Circle when circumference is given GO
Area of a Circle when area of sector is given GO
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Circumference of the circle when the area of the circle is given GO
Area of the quadrant GO
Area of the ring GO
Area of a segment GO
Perimeter of a quadrant GO
Perimeter of a segment GO
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Area of Sector When Radius and Angle in Radians are Given GO
Radius of Circle from Arc Angle and Arc Length GO
Radius of Circle from Arc Angle and Area GO
Area of Sector when Radius and Angle in Degrees are Given GO
Sector angle from radius and Arc length GO
Sector angle from radius and Sector Area GO
Arc length from Radius and Arc Angle GO
Sector Area from Arc length and Radius GO
Arc Angle from Arc length and Radius GO

What is a sector and how its perimeter is calculated?

The sector of a circle is the area enclosed between two radii and the perimeter of the circle. Its formula is P = 2 r + ((θ/360) × 2πr ) where P is the perimeter of the sector, r is the radius, θ is the angle subtended by the arc at center.

How to Calculate Perimeter of a sector when angle subtended by an arc at center is given?

Perimeter of a sector when angle subtended by an arc at center is given calculator uses Perimeter=((Theta/360)*2*pi*Radius)+(2*Radius) to calculate the Perimeter, Perimeter of a sector when angle subtended by an arc at center is given of the sector is the length "around" the entire sector of a circle. Perimeter and is denoted by P symbol.

How to calculate Perimeter of a sector when angle subtended by an arc at center is given using this online calculator? To use this online calculator for Perimeter of a sector when angle subtended by an arc at center is given, enter Radius (r) and Theta (ϑ) and hit the calculate button. Here is how the Perimeter of a sector when angle subtended by an arc at center is given calculation can be explained with given input values -> 0.454248 = ((30/360)*2*pi*0.18)+(2*0.18).

FAQ

What is Perimeter of a sector when angle subtended by an arc at center is given?
Perimeter of a sector when angle subtended by an arc at center is given of the sector is the length "around" the entire sector of a circle and is represented as P=((ϑ/360)*2*pi*r)+(2*r) or Perimeter=((Theta/360)*2*pi*Radius)+(2*Radius). Radius is a radial line from the focus to any point of a curve and Theta is an angle that can be defined as the figure formed by two rays meeting at a common endpoint.
How to calculate Perimeter of a sector when angle subtended by an arc at center is given?
Perimeter of a sector when angle subtended by an arc at center is given of the sector is the length "around" the entire sector of a circle is calculated using Perimeter=((Theta/360)*2*pi*Radius)+(2*Radius). To calculate Perimeter of a sector when angle subtended by an arc at center is given, you need Radius (r) and Theta (ϑ). With our tool, you need to enter the respective value for Radius and Theta and hit the calculate button. You can also select the units (if any) for Input(s) and the Output as well.
How many ways are there to calculate Perimeter?
In this formula, Perimeter uses Radius and Theta. We can use 11 other way(s) to calculate the same, which is/are as follows -
  • Perimeter=2*Length+2*Width
  • Perimeter=4*Side
  • Perimeter=3*Side
  • Perimeter=2*Side A+2*Side B
  • Perimeter=4*Side
  • Perimeter=Side A+2*Side B
  • Perimeter=Side A+Side B+sqrt(Side A^2+Side B^2)
  • Perimeter=12*Side
  • Perimeter=2*(Side A+Side B)
  • Perimeter=4*Side A+4*Side B+4*Side C
  • Perimeter=2*(Length+sqrt((Diagonal)^2-(Length)^2))
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