Insphere Radius of Deltoidal Icositetrahedron given Symmetry Diagonal Solution

STEP 0: Pre-Calculation Summary
Formula Used
Insphere Radius of Deltoidal Icositetrahedron = sqrt((22+(15*sqrt(2)))/34)*(7*Symmetry Diagonal of Deltoidal Icositetrahedron)/(sqrt(46+(15*sqrt(2))))
ri = sqrt((22+(15*sqrt(2)))/34)*(7*dSymmetry)/(sqrt(46+(15*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
Insphere Radius of Deltoidal Icositetrahedron - (Measured in Meter) - Insphere Radius of Deltoidal Icositetrahedron is the radius of the sphere that is contained by the Deltoidal Icositetrahedron in such a way that all the faces just touching the sphere.
Symmetry Diagonal of Deltoidal Icositetrahedron - (Measured in Meter) - Symmetry Diagonal of Deltoidal Icositetrahedron is the diagonal which cuts the deltoid faces of Deltoidal Icositetrahedron into two equal halves.
STEP 1: Convert Input(s) to Base Unit
Symmetry Diagonal of Deltoidal Icositetrahedron: 23 Meter --> 23 Meter No Conversion Required
STEP 2: Evaluate Formula
Substituting Input Values in Formula
ri = sqrt((22+(15*sqrt(2)))/34)*(7*dSymmetry)/(sqrt(46+(15*sqrt(2)))) --> sqrt((22+(15*sqrt(2)))/34)*(7*23)/(sqrt(46+(15*sqrt(2))))
Evaluating ... ...
ri = 22.1394766885656
STEP 3: Convert Result to Output's Unit
22.1394766885656 Meter --> No Conversion Required
FINAL ANSWER
22.1394766885656 22.13948 Meter <-- Insphere Radius of Deltoidal Icositetrahedron
(Calculation completed in 00.004 seconds)

Credits

Created by Shweta Patil
Walchand College of Engineering (WCE), Sangli
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Indian Institute of Information Technology (IIIT), Bhopal
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8 Insphere Radius of Deltoidal Icositetrahedron Calculators

Insphere Radius of Deltoidal Icositetrahedron given Total Surface Area
Go Insphere Radius of Deltoidal Icositetrahedron = sqrt((22+(15*sqrt(2)))/34)*sqrt((7*Total Surface Area of Deltoidal Icositetrahedron)/(12*sqrt(61+(38*sqrt(2)))))
Insphere Radius of Deltoidal Icositetrahedron given Surface to Volume Ratio
Go Insphere Radius of Deltoidal Icositetrahedron = sqrt((22+(15*sqrt(2)))/34)*6/SA:V of Deltoidal Icositetrahedron*sqrt((61+(38*sqrt(2)))/(292+(206*sqrt(2))))
Insphere Radius of Deltoidal Icositetrahedron given NonSymmetry Diagonal
Go Insphere Radius of Deltoidal Icositetrahedron = sqrt((22+(15*sqrt(2)))/34)*(2*NonSymmetry Diagonal of Deltoidal Icositetrahedron)/(sqrt(4+(2*sqrt(2))))
Insphere Radius of Deltoidal Icositetrahedron given Volume
Go Insphere Radius of Deltoidal Icositetrahedron = sqrt((22+(15*sqrt(2)))/34)*((7*Volume of Deltoidal Icositetrahedron)/(2*sqrt(292+(206*sqrt(2)))))^(1/3)
Insphere Radius of Deltoidal Icositetrahedron given Symmetry Diagonal
Go Insphere Radius of Deltoidal Icositetrahedron = sqrt((22+(15*sqrt(2)))/34)*(7*Symmetry Diagonal of Deltoidal Icositetrahedron)/(sqrt(46+(15*sqrt(2))))
Insphere Radius of Deltoidal Icositetrahedron given Midsphere Radius
Go Insphere Radius of Deltoidal Icositetrahedron = sqrt((22+(15*sqrt(2)))/34)*(2*Midsphere Radius of Deltoidal Icositetrahedron)/(1+sqrt(2))
Insphere Radius of Deltoidal Icositetrahedron given Short Edge
Go Insphere Radius of Deltoidal Icositetrahedron = sqrt((22+(15*sqrt(2)))/34)*(7*Short Edge of Deltoidal Icositetrahedron)/(4+sqrt(2))
Insphere Radius of Deltoidal Icositetrahedron
Go Insphere Radius of Deltoidal Icositetrahedron = sqrt((22+(15*sqrt(2)))/34)*Long Edge of Deltoidal Icositetrahedron

Insphere Radius of Deltoidal Icositetrahedron given Symmetry Diagonal Formula

Insphere Radius of Deltoidal Icositetrahedron = sqrt((22+(15*sqrt(2)))/34)*(7*Symmetry Diagonal of Deltoidal Icositetrahedron)/(sqrt(46+(15*sqrt(2))))
ri = sqrt((22+(15*sqrt(2)))/34)*(7*dSymmetry)/(sqrt(46+(15*sqrt(2))))

What is Deltoidal Icositetrahedron?

A Deltoidal Icositetrahedron is a polyhedron with deltoid (kite) faces, those have three angles with 81.579° and one with 115.263°. It has eight vertices with three edges and eighteen vertices with four edges. In total, it has 24 faces, 48 edges, 26 vertices.

How to Calculate Insphere Radius of Deltoidal Icositetrahedron given Symmetry Diagonal?

Insphere Radius of Deltoidal Icositetrahedron given Symmetry Diagonal calculator uses Insphere Radius of Deltoidal Icositetrahedron = sqrt((22+(15*sqrt(2)))/34)*(7*Symmetry Diagonal of Deltoidal Icositetrahedron)/(sqrt(46+(15*sqrt(2)))) to calculate the Insphere Radius of Deltoidal Icositetrahedron, Insphere Radius of Deltoidal Icositetrahedron given Symmetry Diagonal formula is defined as the radius of the sphere that is contained by the Deltoidal Icositetrahedron in such a way that all the faces just touch the sphere, calculated using the symmetry diagonal of Deltoidal Icositetrahedron. Insphere Radius of Deltoidal Icositetrahedron is denoted by ri symbol.

How to calculate Insphere Radius of Deltoidal Icositetrahedron given Symmetry Diagonal using this online calculator? To use this online calculator for Insphere Radius of Deltoidal Icositetrahedron given Symmetry Diagonal, enter Symmetry Diagonal of Deltoidal Icositetrahedron (dSymmetry) and hit the calculate button. Here is how the Insphere Radius of Deltoidal Icositetrahedron given Symmetry Diagonal calculation can be explained with given input values -> 22.13948 = sqrt((22+(15*sqrt(2)))/34)*(7*23)/(sqrt(46+(15*sqrt(2)))).

FAQ

What is Insphere Radius of Deltoidal Icositetrahedron given Symmetry Diagonal?
Insphere Radius of Deltoidal Icositetrahedron given Symmetry Diagonal formula is defined as the radius of the sphere that is contained by the Deltoidal Icositetrahedron in such a way that all the faces just touch the sphere, calculated using the symmetry diagonal of Deltoidal Icositetrahedron and is represented as ri = sqrt((22+(15*sqrt(2)))/34)*(7*dSymmetry)/(sqrt(46+(15*sqrt(2)))) or Insphere Radius of Deltoidal Icositetrahedron = sqrt((22+(15*sqrt(2)))/34)*(7*Symmetry Diagonal of Deltoidal Icositetrahedron)/(sqrt(46+(15*sqrt(2)))). Symmetry Diagonal of Deltoidal Icositetrahedron is the diagonal which cuts the deltoid faces of Deltoidal Icositetrahedron into two equal halves.
How to calculate Insphere Radius of Deltoidal Icositetrahedron given Symmetry Diagonal?
Insphere Radius of Deltoidal Icositetrahedron given Symmetry Diagonal formula is defined as the radius of the sphere that is contained by the Deltoidal Icositetrahedron in such a way that all the faces just touch the sphere, calculated using the symmetry diagonal of Deltoidal Icositetrahedron is calculated using Insphere Radius of Deltoidal Icositetrahedron = sqrt((22+(15*sqrt(2)))/34)*(7*Symmetry Diagonal of Deltoidal Icositetrahedron)/(sqrt(46+(15*sqrt(2)))). To calculate Insphere Radius of Deltoidal Icositetrahedron given Symmetry Diagonal, you need Symmetry Diagonal of Deltoidal Icositetrahedron (dSymmetry). With our tool, you need to enter the respective value for Symmetry Diagonal of Deltoidal Icositetrahedron 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 Insphere Radius of Deltoidal Icositetrahedron?
In this formula, Insphere Radius of Deltoidal Icositetrahedron uses Symmetry Diagonal of Deltoidal Icositetrahedron. We can use 7 other way(s) to calculate the same, which is/are as follows -
  • Insphere Radius of Deltoidal Icositetrahedron = sqrt((22+(15*sqrt(2)))/34)*Long Edge of Deltoidal Icositetrahedron
  • Insphere Radius of Deltoidal Icositetrahedron = sqrt((22+(15*sqrt(2)))/34)*(7*Short Edge of Deltoidal Icositetrahedron)/(4+sqrt(2))
  • Insphere Radius of Deltoidal Icositetrahedron = sqrt((22+(15*sqrt(2)))/34)*(2*NonSymmetry Diagonal of Deltoidal Icositetrahedron)/(sqrt(4+(2*sqrt(2))))
  • Insphere Radius of Deltoidal Icositetrahedron = sqrt((22+(15*sqrt(2)))/34)*sqrt((7*Total Surface Area of Deltoidal Icositetrahedron)/(12*sqrt(61+(38*sqrt(2)))))
  • Insphere Radius of Deltoidal Icositetrahedron = sqrt((22+(15*sqrt(2)))/34)*((7*Volume of Deltoidal Icositetrahedron)/(2*sqrt(292+(206*sqrt(2)))))^(1/3)
  • Insphere Radius of Deltoidal Icositetrahedron = sqrt((22+(15*sqrt(2)))/34)*(2*Midsphere Radius of Deltoidal Icositetrahedron)/(1+sqrt(2))
  • Insphere Radius of Deltoidal Icositetrahedron = sqrt((22+(15*sqrt(2)))/34)*6/SA:V of Deltoidal Icositetrahedron*sqrt((61+(38*sqrt(2)))/(292+(206*sqrt(2))))
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