Circumsphere Radius of Truncated Cuboctahedron given Midsphere Radius Calculator

✖Midsphere Radius of Truncated Cuboctahedron is the radius of the sphere for which all the edges of the Truncated Cuboctahedron become a tangent line on that sphere.ⓘ Midsphere Radius of Truncated Cuboctahedron [r_m]

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✖Circumsphere Radius of Truncated Cuboctahedron is the radius of the sphere that contains the Truncated Cuboctahedron in such a way that all the vertices are lying on the sphere.ⓘ Circumsphere Radius of Truncated Cuboctahedron given Midsphere Radius [r_c]

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Formula

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Circumsphere Radius of Truncated Cuboctahedron given Midsphere Radius

Formula

`"r"_{"c"} = sqrt(13+(6*sqrt(2)))*"r"_{"m"}/(sqrt(12+(6*sqrt(2))))`

Example

`"22.53057m"=sqrt(13+(6*sqrt(2)))*"22m"/(sqrt(12+(6*sqrt(2))))`

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Circumsphere Radius of Truncated Cuboctahedron given Midsphere Radius Solution

STEP 0: Pre-Calculation Summary

Formula Used

Circumsphere Radius of Truncated Cuboctahedron = sqrt(13+(6*sqrt(2)))*Midsphere Radius of Truncated Cuboctahedron/(sqrt(12+(6*sqrt(2))))
r_c = sqrt(13+(6*sqrt(2)))*r_m/(sqrt(12+(6*sqrt(2))))
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

Circumsphere Radius of Truncated Cuboctahedron - (Measured in Meter) - Circumsphere Radius of Truncated Cuboctahedron is the radius of the sphere that contains the Truncated Cuboctahedron in such a way that all the vertices are lying on the sphere.
Midsphere Radius of Truncated Cuboctahedron - (Measured in Meter) - Midsphere Radius of Truncated Cuboctahedron is the radius of the sphere for which all the edges of the Truncated Cuboctahedron become a tangent line on that sphere.

STEP 1: Convert Input(s) to Base Unit

Midsphere Radius of Truncated Cuboctahedron: 22 Meter --> 22 Meter No Conversion Required

STEP 2: Evaluate Formula

Substituting Input Values in Formula

r_c = sqrt(13+(6*sqrt(2)))*r_m/(sqrt(12+(6*sqrt(2)))) --> sqrt(13+(6*sqrt(2)))*22/(sqrt(12+(6*sqrt(2))))

Evaluating ... ...

r_c = 22.5305729987267

STEP 3: Convert Result to Output's Unit

22.5305729987267 Meter --> No Conversion Required

FINAL ANSWER

22.5305729987267 ≈ 22.53057 Meter <-- Circumsphere Radius of Truncated Cuboctahedron

(Calculation completed in 00.020 seconds)

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< 5 Circumsphere Radius of Truncated Cuboctahedron Calculators

Circumsphere Radius of Truncated Cuboctahedron given Surface to Volume Ratio

Go Circumsphere Radius of Truncated Cuboctahedron = sqrt(13+(6*sqrt(2)))/2*((6*(2+sqrt(2)+sqrt(3)))/(Surface to Volume Ratio of Truncated Cuboctahedron*(11+(7*sqrt(2)))))

Circumsphere Radius of Truncated Cuboctahedron given Total Surface Area

Go Circumsphere Radius of Truncated Cuboctahedron = sqrt(13+(6*sqrt(2)))/2*sqrt(Total Surface Area of Truncated Cuboctahedron/(12*(2+sqrt(2)+sqrt(3))))

Circumsphere Radius of Truncated Cuboctahedron given Midsphere Radius

Go Circumsphere Radius of Truncated Cuboctahedron = sqrt(13+(6*sqrt(2)))*Midsphere Radius of Truncated Cuboctahedron/(sqrt(12+(6*sqrt(2))))

Circumsphere Radius of Truncated Cuboctahedron given Volume

Go Circumsphere Radius of Truncated Cuboctahedron = sqrt(13+(6*sqrt(2)))/2*(Volume of Truncated Cuboctahedron/(2*(11+(7*sqrt(2)))))^(1/3)

Circumsphere Radius of Truncated Cuboctahedron

Go Circumsphere Radius of Truncated Cuboctahedron = sqrt(13+(6*sqrt(2)))/2*Edge Length of Truncated Cuboctahedron

Circumsphere Radius of Truncated Cuboctahedron given Midsphere Radius Formula

Circumsphere Radius of Truncated Cuboctahedron = sqrt(13+(6*sqrt(2)))*Midsphere Radius of Truncated Cuboctahedron/(sqrt(12+(6*sqrt(2))))
r_c = sqrt(13+(6*sqrt(2)))*r_m/(sqrt(12+(6*sqrt(2))))

What is a Truncated Cuboctahedron?

In geometry, the Truncated Cuboctahedron is an Archimedean solid, named by Kepler as a truncation of a cuboctahedron. It has 26 faces which include 12 square faces, 8 regular hexagonal faces, 6 regular octagonal faces, 48 vertices and 72 edges. And each vertex are identical in such a way that, at each vertex one square, one hexagon and one octagon joins. Since each of its faces has point symmetry (equivalently, 180° rotational symmetry), the Truncated Cuboctahedron is a zonohedron. The Truncated Cuboctahedron can tessellate with the octagonal prism.

How to Calculate Circumsphere Radius of Truncated Cuboctahedron given Midsphere Radius?

Circumsphere Radius of Truncated Cuboctahedron given Midsphere Radius calculator uses Circumsphere Radius of Truncated Cuboctahedron = sqrt(13+(6*sqrt(2)))*Midsphere Radius of Truncated Cuboctahedron/(sqrt(12+(6*sqrt(2)))) to calculate the Circumsphere Radius of Truncated Cuboctahedron, Circumsphere Radius of Truncated Cuboctahedron given Midsphere Radius formula is defined as the radius of the sphere that contains the Truncated Cuboctahedron in such a way that all the vertices are lying on the sphere, and calculated using the midsphere radius of the Truncated Cuboctahedron. Circumsphere Radius of Truncated Cuboctahedron is denoted by r_c symbol.

How to calculate Circumsphere Radius of Truncated Cuboctahedron given Midsphere Radius using this online calculator? To use this online calculator for Circumsphere Radius of Truncated Cuboctahedron given Midsphere Radius, enter Midsphere Radius of Truncated Cuboctahedron (r_m) and hit the calculate button. Here is how the Circumsphere Radius of Truncated Cuboctahedron given Midsphere Radius calculation can be explained with given input values -> 22.53057 = sqrt(13+(6*sqrt(2)))*22/(sqrt(12+(6*sqrt(2)))).

FAQ

What is Circumsphere Radius of Truncated Cuboctahedron given Midsphere Radius?

Circumsphere Radius of Truncated Cuboctahedron given Midsphere Radius formula is defined as the radius of the sphere that contains the Truncated Cuboctahedron in such a way that all the vertices are lying on the sphere, and calculated using the midsphere radius of the Truncated Cuboctahedron and is represented as r_c = sqrt(13+(6*sqrt(2)))*r_m/(sqrt(12+(6*sqrt(2)))) or Circumsphere Radius of Truncated Cuboctahedron = sqrt(13+(6*sqrt(2)))*Midsphere Radius of Truncated Cuboctahedron/(sqrt(12+(6*sqrt(2)))). Midsphere Radius of Truncated Cuboctahedron is the radius of the sphere for which all the edges of the Truncated Cuboctahedron become a tangent line on that sphere.

How to calculate Circumsphere Radius of Truncated Cuboctahedron given Midsphere Radius?

Circumsphere Radius of Truncated Cuboctahedron given Midsphere Radius formula is defined as the radius of the sphere that contains the Truncated Cuboctahedron in such a way that all the vertices are lying on the sphere, and calculated using the midsphere radius of the Truncated Cuboctahedron is calculated using Circumsphere Radius of Truncated Cuboctahedron = sqrt(13+(6*sqrt(2)))*Midsphere Radius of Truncated Cuboctahedron/(sqrt(12+(6*sqrt(2)))). To calculate Circumsphere Radius of Truncated Cuboctahedron given Midsphere Radius, you need Midsphere Radius of Truncated Cuboctahedron (r_m). With our tool, you need to enter the respective value for Midsphere Radius of Truncated Cuboctahedron 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 Circumsphere Radius of Truncated Cuboctahedron?

In this formula, Circumsphere Radius of Truncated Cuboctahedron uses Midsphere Radius of Truncated Cuboctahedron. We can use 4 other way(s) to calculate the same, which is/are as follows -

Circumsphere Radius of Truncated Cuboctahedron = sqrt(13+(6*sqrt(2)))/2*Edge Length of Truncated Cuboctahedron
Circumsphere Radius of Truncated Cuboctahedron = sqrt(13+(6*sqrt(2)))/2*sqrt(Total Surface Area of Truncated Cuboctahedron/(12*(2+sqrt(2)+sqrt(3))))
Circumsphere Radius of Truncated Cuboctahedron = sqrt(13+(6*sqrt(2)))/2*(Volume of Truncated Cuboctahedron/(2*(11+(7*sqrt(2)))))^(1/3)
Circumsphere Radius of Truncated Cuboctahedron = sqrt(13+(6*sqrt(2)))/2*((6*(2+sqrt(2)+sqrt(3)))/(Surface to Volume Ratio of Truncated Cuboctahedron*(11+(7*sqrt(2)))))

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