Inscribed Cylinder Radius of Cube given Space Diagonal Solution

STEP 0: Pre-Calculation Summary
Formula Used
Inscribed Cylinder Radius of Cube = Space Diagonal of Cube/(2*sqrt(3))
ri(Cylinder) = dSpace/(2*sqrt(3))
This formula uses 1 Functions, 2 Variables
Functions Used
sqrt - A square root function is a function that takes a non-negative number as an input and returns the square root of the given input number., sqrt(Number)
Variables Used
Inscribed Cylinder Radius of Cube - (Measured in Meter) - Inscribed Cylinder Radius of Cube is the radius of the cylinder that is contained by the Cube in such a way that all the faces of the Cube are just touching the cylinder.
Space Diagonal of Cube - (Measured in Meter) - Space Diagonal of Cube is the distance from any corner to the opposite and farthest corner of the Cube.
STEP 1: Convert Input(s) to Base Unit
Space Diagonal of Cube: 17 Meter --> 17 Meter No Conversion Required
STEP 2: Evaluate Formula
Substituting Input Values in Formula
ri(Cylinder) = dSpace/(2*sqrt(3)) --> 17/(2*sqrt(3))
Evaluating ... ...
ri(Cylinder) = 4.90747728811182
STEP 3: Convert Result to Output's Unit
4.90747728811182 Meter --> No Conversion Required
FINAL ANSWER
4.90747728811182 4.907477 Meter <-- Inscribed Cylinder Radius of Cube
(Calculation completed in 00.005 seconds)

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Created by Nikhil
Mumbai University (DJSCE), Mumbai
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The National Institute of Engineering (NIE), Mysuru
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​ LaTeX ​ Go Inscribed Cylinder Radius of Cube = Face Diagonal of Cube/(2*sqrt(2))
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​ LaTeX ​ Go Inscribed Cylinder Radius of Cube = sqrt(Face Area of Cube)/2
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​ LaTeX ​ Go Inscribed Cylinder Radius of Cube = Face Perimeter of Cube/8
Inscribed Cylinder Radius of Cube
​ LaTeX ​ Go Inscribed Cylinder Radius of Cube = Edge Length of Cube/2

Inscribed Cylinder Radius of Cube given Space Diagonal Formula

​LaTeX ​Go
Inscribed Cylinder Radius of Cube = Space Diagonal of Cube/(2*sqrt(3))
ri(Cylinder) = dSpace/(2*sqrt(3))

What is a Cube?

A Cube is a symmetric, closed three dimensional shape having 6 identical square shaped faces. It has 8 corners, 12 edges and 6 faces. And each corner is shared by 3 faces and each edge is shared by 2 faces of the Cube. In other way, a rectangular box in which length, breadth and height are numerically equal is called a Cube. That equal measurement is called the edge length of the Cube. Also Cube is a Platonic solid.

How to Calculate Inscribed Cylinder Radius of Cube given Space Diagonal?

Inscribed Cylinder Radius of Cube given Space Diagonal calculator uses Inscribed Cylinder Radius of Cube = Space Diagonal of Cube/(2*sqrt(3)) to calculate the Inscribed Cylinder Radius of Cube, The Inscribed Cylinder Radius of Cube given Space Diagonal formula is defined as the radius of the cylinder that is contained by the Cube in such a way that all the faces of the Cube are just touching the cylinder, and calculated using the space diagonal of Cube. Inscribed Cylinder Radius of Cube is denoted by ri(Cylinder) symbol.

How to calculate Inscribed Cylinder Radius of Cube given Space Diagonal using this online calculator? To use this online calculator for Inscribed Cylinder Radius of Cube given Space Diagonal, enter Space Diagonal of Cube (dSpace) and hit the calculate button. Here is how the Inscribed Cylinder Radius of Cube given Space Diagonal calculation can be explained with given input values -> 4.907477 = 17/(2*sqrt(3)).

FAQ

What is Inscribed Cylinder Radius of Cube given Space Diagonal?
The Inscribed Cylinder Radius of Cube given Space Diagonal formula is defined as the radius of the cylinder that is contained by the Cube in such a way that all the faces of the Cube are just touching the cylinder, and calculated using the space diagonal of Cube and is represented as ri(Cylinder) = dSpace/(2*sqrt(3)) or Inscribed Cylinder Radius of Cube = Space Diagonal of Cube/(2*sqrt(3)). Space Diagonal of Cube is the distance from any corner to the opposite and farthest corner of the Cube.
How to calculate Inscribed Cylinder Radius of Cube given Space Diagonal?
The Inscribed Cylinder Radius of Cube given Space Diagonal formula is defined as the radius of the cylinder that is contained by the Cube in such a way that all the faces of the Cube are just touching the cylinder, and calculated using the space diagonal of Cube is calculated using Inscribed Cylinder Radius of Cube = Space Diagonal of Cube/(2*sqrt(3)). To calculate Inscribed Cylinder Radius of Cube given Space Diagonal, you need Space Diagonal of Cube (dSpace). With our tool, you need to enter the respective value for Space Diagonal of Cube 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 Inscribed Cylinder Radius of Cube?
In this formula, Inscribed Cylinder Radius of Cube uses Space Diagonal of Cube. We can use 3 other way(s) to calculate the same, which is/are as follows -
  • Inscribed Cylinder Radius of Cube = Edge Length of Cube/2
  • Inscribed Cylinder Radius of Cube = Face Diagonal of Cube/(2*sqrt(2))
  • Inscribed Cylinder Radius of Cube = sqrt(Face Area of Cube)/2
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