Anamika Mittal
Vellore Institute of Technology (VIT), Bhopal
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Mona Gladys
St Joseph's College (St Joseph's College), Bengaluru
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1 Other formulas that you can solve using the same Inputs

Length of a chord when radius and inscribed angle are given
Chord Length=2*Radius*sin(Inscribed Angle) GO

7 Other formulas that calculate the same Output

Angle formed at the centre when area of sector is given
Central Angle=(Area of Sector*2)/(Radius^2) GO
Central angle when radius and length for major arc are given
Central Angle=Length of Major Arc/Radius GO
Central angle when radius and length for minor arc are given
Central Angle=Length of Minor Arc/Radius GO
Central angle of n-sided polygon
Central Angle=(2*pi)/Number of sides GO
Central angle when measure of arc intercepted is given
Central Angle=1*Arc Length GO
Angle subtended by given arc at centre
Central Angle=Arc Length GO
Angle formed at centre when angle formed at other point on circumference is known
Central Angle=2*Angle A GO

Angle formed at circumference when angle formed at centre subtended by same arc is known Formula

Central Angle=2*Inscribed Angle
θ=2*θ
More formulas
Area of a Sector GO
Inscribed angle of the circle when the central angle of the circle is given GO
Inscribed angle when other inscribed angle is given GO
Arc length of the circle when central angle and radius are given GO
Area of the sector when radius and central angle are given GO
Area of sector when radius and central angle are given GO
Angle formed at the centre when area of sector is given GO
Angle formed at centre when angle formed at other point on circumference is known GO
Angle of intersection between two circles GO
Angle inscribed by given arc GO
Angle subtended by given arc at centre GO
Angle subtended to exterior of circle by given arc GO
Angle subtended inside a circle by given intersecting lines and arcs GO
Angle formed by an intersecting tangent and chord GO

What is real-life application of circles?

The radius of curvature of a camera lens can be used to determine its focal length, which is the distance from the lens where light rays will focus. Pizza and cake sizes are determined by the diameter of the pan in which they are baked, and the distance travelled by a person sitting on a Ferris wheel can be determined by calculating the circumference of the wheel.

How to Calculate Angle formed at circumference when angle formed at centre subtended by same arc is known?

Angle formed at circumference when angle formed at centre subtended by same arc is known calculator uses Central Angle=2*Inscribed Angle to calculate the Central Angle, The Angle formed at circumference when angle formed at centre subtended by same arc is known formula is defined as twice of the angle at any other point on circumference. Central Angle and is denoted by θ symbol.

How to calculate Angle formed at circumference when angle formed at centre subtended by same arc is known using this online calculator? To use this online calculator for Angle formed at circumference when angle formed at centre subtended by same arc is known, enter Inscribed Angle (θ) and hit the calculate button. Here is how the Angle formed at circumference when angle formed at centre subtended by same arc is known calculation can be explained with given input values -> 160 = 2*80.

FAQ

What is Angle formed at circumference when angle formed at centre subtended by same arc is known?
The Angle formed at circumference when angle formed at centre subtended by same arc is known formula is defined as twice of the angle at any other point on circumference and is represented as θ=2*θ or Central Angle=2*Inscribed Angle. In geometry, an inscribed angle is the angle formed in the interior of a circle when two secant lines intersect on the circle. It can also be defined as the angle subtended at a point on the circle by two given points on the circle.
How to calculate Angle formed at circumference when angle formed at centre subtended by same arc is known?
The Angle formed at circumference when angle formed at centre subtended by same arc is known formula is defined as twice of the angle at any other point on circumference is calculated using Central Angle=2*Inscribed Angle. To calculate Angle formed at circumference when angle formed at centre subtended by same arc is known, you need Inscribed Angle (θ). With our tool, you need to enter the respective value for Inscribed Angle 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 Central Angle?
In this formula, Central Angle uses Inscribed Angle. We can use 7 other way(s) to calculate the same, which is/are as follows -
  • Central Angle=Length of Major Arc/Radius
  • Central Angle=Length of Minor Arc/Radius
  • Central Angle=1*Arc Length
  • Central Angle=(Area of Sector*2)/(Radius^2)
  • Central Angle=2*Angle A
  • Central Angle=(2*pi)/Number of sides
  • Central Angle=Arc Length
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