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Angle subtended by arc of Circle given arc length Solution

STEP 0: Pre-Calculation Summary
Formula Used
central_angle = Arc Length
Anglecentral = s
This formula uses 1 Variables
Variables Used
Arc Length - Arc length is the distance between two points along a section of a curve. (Measured in Meter)
STEP 1: Convert Input(s) to Base Unit
Arc Length: 2.4 Meter --> 2.4 Meter No Conversion Required
STEP 2: Evaluate Formula
Substituting Input Values in Formula
Anglecentral = s --> 2.4
Evaluating ... ...
Anglecentral = 2.4
STEP 3: Convert Result to Output's Unit
2.4 Radian -->137.509870831423 Degree (Check conversion here)
FINAL ANSWER
137.509870831423 Degree <-- Central Angle
(Calculation completed in 00.016 seconds)

10+ Angle of Circle Calculators

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angle_a = arccos((((Radius 1)^2)+((Radius 2)^2)-((Distance between centers)^2))/(2*Radius 1*Radius 2)) Go
Interior angle of Circle given arc lengths
inscribed_angle = (Length of Major Arc+Length of Minor Arc)/2 Go
Exterior angle of Circle given arc lengths
exterior_angle = (Length of Major Arc-Length of Minor Arc)/2 Go
Angle formed at centre of Circle given area of sector
central_angle = (Area of Sector*2)/(Radius^2) Go
Central angle of Circle given radius and major arc length
central_angle = Length of Major Arc/Radius Go
Central angle of Circle given radius and minor arc length
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Angle formed at circumference of Circle given inscribed angle
angle_a = 2*Inscribed Angle Go
Angle subtended by arc of Circle given arc length
central_angle = Arc Length Go
Angle subtended by arc of Circle given angle subtended on circumference
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Angle formed by intersecting tangent and chord of Circle
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Angle subtended by arc of Circle given arc length Formula

central_angle = Arc Length
Anglecentral = s

What is a central angle?

A central angle is an angle formed by two radii with the vertex at the center of the circle. The measure of the central angle is the same as the measure of the arc that the two sides cut out of the circle, specifically, A0B=AB. Many real-world applications involve arc length. If a rocket is launched along a parabolic path, we might want to know how far the rocket travels.

How to Calculate Angle subtended by arc of Circle given arc length?

Angle subtended by arc of Circle given arc length calculator uses central_angle = Arc Length to calculate the Central Angle, Angle subtended by arc of circle given arc length formula is defined as equal to the length of the arc subtending the circle. Central Angle and is denoted by Anglecentral symbol.

How to calculate Angle subtended by arc of Circle given arc length using this online calculator? To use this online calculator for Angle subtended by arc of Circle given arc length, enter Arc Length (s) and hit the calculate button. Here is how the Angle subtended by arc of Circle given arc length calculation can be explained with given input values -> 137.5099 = 2.4.

FAQ

What is Angle subtended by arc of Circle given arc length?
Angle subtended by arc of circle given arc length formula is defined as equal to the length of the arc subtending the circle and is represented as Anglecentral = s or central_angle = Arc Length. Arc length is the distance between two points along a section of a curve.
How to calculate Angle subtended by arc of Circle given arc length?
Angle subtended by arc of circle given arc length formula is defined as equal to the length of the arc subtending the circle is calculated using central_angle = Arc Length. To calculate Angle subtended by arc of Circle given arc length, you need Arc Length (s). With our tool, you need to enter the respective value for Arc Length 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 Arc Length. We can use 10 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 = (Area of Sector*2)/(Radius^2)
  • central_angle = 2*Angle A
  • angle_a = 2*Inscribed Angle
  • angle_a = arccos((((Radius 1)^2)+((Radius 2)^2)-((Distance between centers)^2))/(2*Radius 1*Radius 2))
  • central_angle = Arc Length
  • exterior_angle = (Length of Major Arc-Length of Minor Arc)/2
  • inscribed_angle = (Length of Major Arc+Length of Minor Arc)/2
  • angle = Arc Length/2
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