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Angle of intersection of Torus Sector given volume, minor and major radius Solution

STEP 0: Pre-Calculation Summary
Formula Used
angle_a = (Volume Polyhedron/(2*(pi^2)*(Major Radius)*(Minor Radius^2)))*(2*pi)
∠A = (Vpolyhedron/(2*(pi^2)*(rMajor)*(rMinor^2)))*(2*pi)
This formula uses 1 Constants, 3 Variables
Constants Used
pi - Archimedes' constant Value Taken As 3.14159265358979323846264338327950288
Variables Used
Volume Polyhedron - Volume Polyhedron is amount of three dimensional space covered by polyhedron. (Measured in Cubic Meter)
Major Radius - Major Radius is the measurement of the largest radius of any shape or object. (Measured in Meter)
Minor Radius - Minor Radius is the measurement of smallest radius of any shape or object. (Measured in Meter)
STEP 1: Convert Input(s) to Base Unit
Volume Polyhedron: 1200 Cubic Meter --> 1200 Cubic Meter No Conversion Required
Major Radius: 10 Meter --> 10 Meter No Conversion Required
Minor Radius: 3 Meter --> 3 Meter No Conversion Required
STEP 2: Evaluate Formula
Substituting Input Values in Formula
∠A = (Vpolyhedron/(2*(pi^2)*(rMajor)*(rMinor^2)))*(2*pi) --> (1200/(2*(pi^2)*(10)*(3^2)))*(2*pi)
Evaluating ... ...
∠A = 4.24413181578388
STEP 3: Convert Result to Output's Unit
4.24413181578388 Radian -->243.170840741656 Degree (Check conversion here)
FINAL ANSWER
243.170840741656 Degree <-- Angle A
(Calculation completed in 00.015 seconds)

2 Angle of intersection of Torus Sector Calculators

Angle of intersection of Torus Sector
angle_a = (Lateral Surface Area 1/(4*(pi^2)*(Major Radius)*(Minor Radius)))*(2*pi) Go
Angle of intersection of Torus Sector given volume, minor and major radius
angle_a = (Volume Polyhedron/(2*(pi^2)*(Major Radius)*(Minor Radius^2)))*(2*pi) Go

Angle of intersection of Torus Sector given volume, minor and major radius Formula

angle_a = (Volume Polyhedron/(2*(pi^2)*(Major Radius)*(Minor Radius^2)))*(2*pi)
∠A = (Vpolyhedron/(2*(pi^2)*(rMajor)*(rMinor^2)))*(2*pi)

What is Torus?

In geometry, a torus is a surface of revolution generated by revolving a circle in three-dimensional space about an axis that is coplanar with the circle. If the axis of revolution does not touch the circle, the surface has a ring shape and is called a torus of revolution.

How to Calculate Angle of intersection of Torus Sector given volume, minor and major radius?

Angle of intersection of Torus Sector given volume, minor and major radius calculator uses angle_a = (Volume Polyhedron/(2*(pi^2)*(Major Radius)*(Minor Radius^2)))*(2*pi) to calculate the Angle A, Angle of intersection of Torus Sector given volume, minor and major radius formula is defined as an angle which determines size of the piece of Torus Sector. Angle A and is denoted by ∠A symbol.

How to calculate Angle of intersection of Torus Sector given volume, minor and major radius using this online calculator? To use this online calculator for Angle of intersection of Torus Sector given volume, minor and major radius, enter Volume Polyhedron (Vpolyhedron), Major Radius (rMajor) & Minor Radius (rMinor) and hit the calculate button. Here is how the Angle of intersection of Torus Sector given volume, minor and major radius calculation can be explained with given input values -> 243.1708 = (1200/(2*(pi^2)*(10)*(3^2)))*(2*pi).

FAQ

What is Angle of intersection of Torus Sector given volume, minor and major radius?
Angle of intersection of Torus Sector given volume, minor and major radius formula is defined as an angle which determines size of the piece of Torus Sector and is represented as ∠A = (Vpolyhedron/(2*(pi^2)*(rMajor)*(rMinor^2)))*(2*pi) or angle_a = (Volume Polyhedron/(2*(pi^2)*(Major Radius)*(Minor Radius^2)))*(2*pi). Volume Polyhedron is amount of three dimensional space covered by polyhedron, Major Radius is the measurement of the largest radius of any shape or object & Minor Radius is the measurement of smallest radius of any shape or object.
How to calculate Angle of intersection of Torus Sector given volume, minor and major radius?
Angle of intersection of Torus Sector given volume, minor and major radius formula is defined as an angle which determines size of the piece of Torus Sector is calculated using angle_a = (Volume Polyhedron/(2*(pi^2)*(Major Radius)*(Minor Radius^2)))*(2*pi). To calculate Angle of intersection of Torus Sector given volume, minor and major radius, you need Volume Polyhedron (Vpolyhedron), Major Radius (rMajor) & Minor Radius (rMinor). With our tool, you need to enter the respective value for Volume Polyhedron, Major Radius & Minor Radius 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 Angle A?
In this formula, Angle A uses Volume Polyhedron, Major Radius & Minor Radius. We can use 2 other way(s) to calculate the same, which is/are as follows -
  • angle_a = (Lateral Surface Area 1/(4*(pi^2)*(Major Radius)*(Minor Radius)))*(2*pi)
  • angle_a = (Volume Polyhedron/(2*(pi^2)*(Major Radius)*(Minor Radius^2)))*(2*pi)
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