Long Edge of Pentagonal Icositetrahedron given Insphere Radius Solution

STEP 0: Pre-Calculation Summary
Formula Used
Long Edge of Pentagonal Icositetrahedron = sqrt((2-[Tribonacci_C])*(3-[Tribonacci_C])*([Tribonacci_C]+1))*Insphere Radius of Pentagonal Icositetrahedron
le(Long) = sqrt((2-[Tribonacci_C])*(3-[Tribonacci_C])*([Tribonacci_C]+1))*ri
This formula uses 1 Constants, 1 Functions, 2 Variables
Constants Used
[Tribonacci_C] - Tribonacci constant Value Taken As 1.839286755214161
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
Long Edge of Pentagonal Icositetrahedron - (Measured in Meter) - Long Edge of Pentagonal Icositetrahedron is the length of longest edge which is the top edge of the axial-symmetric pentagonal faces of Pentagonal Icositetrahedron.
Insphere Radius of Pentagonal Icositetrahedron - (Measured in Meter) - Insphere Radius of Pentagonal Icositetrahedron is the radius of the sphere that the Pentagonal Icositetrahedron contains in such a way that all the faces touch the sphere.
STEP 1: Convert Input(s) to Base Unit
Insphere Radius of Pentagonal Icositetrahedron: 12 Meter --> 12 Meter No Conversion Required
STEP 2: Evaluate Formula
Substituting Input Values in Formula
le(Long) = sqrt((2-[Tribonacci_C])*(3-[Tribonacci_C])*([Tribonacci_C]+1))*ri --> sqrt((2-[Tribonacci_C])*(3-[Tribonacci_C])*([Tribonacci_C]+1))*12
Evaluating ... ...
le(Long) = 8.73321554561571
STEP 3: Convert Result to Output's Unit
8.73321554561571 Meter --> No Conversion Required
FINAL ANSWER
8.73321554561571 8.733216 Meter <-- Long Edge of Pentagonal Icositetrahedron
(Calculation completed in 00.020 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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7 Long Edge of Pentagonal Icositetrahedron Calculators

Long Edge of Pentagonal Icositetrahedron given Surface to Volume Ratio
Go Long Edge of Pentagonal Icositetrahedron = sqrt([Tribonacci_C]+1)/2*((3*sqrt((22*(5*[Tribonacci_C]-1))/((4*[Tribonacci_C])-3)))/(SA:V of Pentagonal Icositetrahedron*sqrt((11*([Tribonacci_C]-4))/(2*((20*[Tribonacci_C])-37)))))
Long Edge of Pentagonal Icositetrahedron given Total Surface Area
Go Long Edge of Pentagonal Icositetrahedron = sqrt([Tribonacci_C]+1)/2*(sqrt(Total Surface Area of Pentagonal Icositetrahedron/3)*(((4*[Tribonacci_C])-3)/(22*((5*[Tribonacci_C])-1)))^(1/4))
Long Edge of Pentagonal Icositetrahedron given Volume
Go Long Edge of Pentagonal Icositetrahedron = sqrt([Tribonacci_C]+1)/2*(Volume of Pentagonal Icositetrahedron^(1/3)*((2*((20*[Tribonacci_C])-37))/(11*([Tribonacci_C]-4)))^(1/6))
Long Edge of Pentagonal Icositetrahedron given Insphere Radius
Go Long Edge of Pentagonal Icositetrahedron = sqrt((2-[Tribonacci_C])*(3-[Tribonacci_C])*([Tribonacci_C]+1))*Insphere Radius of Pentagonal Icositetrahedron
Long Edge of Pentagonal Icositetrahedron given Midsphere Radius
Go Long Edge of Pentagonal Icositetrahedron = sqrt(([Tribonacci_C]+1)*(2-[Tribonacci_C]))*Midsphere Radius of Pentagonal Icositetrahedron
Long Edge of Pentagonal Icositetrahedron
Go Long Edge of Pentagonal Icositetrahedron = sqrt([Tribonacci_C]+1)/2*Snub Cube Edge of Pentagonal Icositetrahedron
Long Edge of Pentagonal Icositetrahedron given Short Edge
Go Long Edge of Pentagonal Icositetrahedron = ([Tribonacci_C]+1)/2*Short Edge of Pentagonal Icositetrahedron

Long Edge of Pentagonal Icositetrahedron given Insphere Radius Formula

Long Edge of Pentagonal Icositetrahedron = sqrt((2-[Tribonacci_C])*(3-[Tribonacci_C])*([Tribonacci_C]+1))*Insphere Radius of Pentagonal Icositetrahedron
le(Long) = sqrt((2-[Tribonacci_C])*(3-[Tribonacci_C])*([Tribonacci_C]+1))*ri

What is Pentagonal Icositetrahedron?

The Pentagonal Icositetrahedron can be constructed from a snub cube. Its faces are axial-symmetric pentagons with the top angle acos(2-t)=80.7517°. Of this polyhedron, there are two forms that are mirror images of each other, but otherwise identical. It has 24 faces, 60 edges, and 38 vertices.

How to Calculate Long Edge of Pentagonal Icositetrahedron given Insphere Radius?

Long Edge of Pentagonal Icositetrahedron given Insphere Radius calculator uses Long Edge of Pentagonal Icositetrahedron = sqrt((2-[Tribonacci_C])*(3-[Tribonacci_C])*([Tribonacci_C]+1))*Insphere Radius of Pentagonal Icositetrahedron to calculate the Long Edge of Pentagonal Icositetrahedron, Long Edge of Pentagonal Icositetrahedron given Insphere Radius formula is defined as the length of longest edge which is the top edge of the axial-symmetric pentagonal faces of Pentagonal Icositetrahedron, calculated using insphere radius of Pentagonal Icositetrahedron. Long Edge of Pentagonal Icositetrahedron is denoted by le(Long) symbol.

How to calculate Long Edge of Pentagonal Icositetrahedron given Insphere Radius using this online calculator? To use this online calculator for Long Edge of Pentagonal Icositetrahedron given Insphere Radius, enter Insphere Radius of Pentagonal Icositetrahedron (ri) and hit the calculate button. Here is how the Long Edge of Pentagonal Icositetrahedron given Insphere Radius calculation can be explained with given input values -> 8.733216 = sqrt((2-[Tribonacci_C])*(3-[Tribonacci_C])*([Tribonacci_C]+1))*12.

FAQ

What is Long Edge of Pentagonal Icositetrahedron given Insphere Radius?
Long Edge of Pentagonal Icositetrahedron given Insphere Radius formula is defined as the length of longest edge which is the top edge of the axial-symmetric pentagonal faces of Pentagonal Icositetrahedron, calculated using insphere radius of Pentagonal Icositetrahedron and is represented as le(Long) = sqrt((2-[Tribonacci_C])*(3-[Tribonacci_C])*([Tribonacci_C]+1))*ri or Long Edge of Pentagonal Icositetrahedron = sqrt((2-[Tribonacci_C])*(3-[Tribonacci_C])*([Tribonacci_C]+1))*Insphere Radius of Pentagonal Icositetrahedron. Insphere Radius of Pentagonal Icositetrahedron is the radius of the sphere that the Pentagonal Icositetrahedron contains in such a way that all the faces touch the sphere.
How to calculate Long Edge of Pentagonal Icositetrahedron given Insphere Radius?
Long Edge of Pentagonal Icositetrahedron given Insphere Radius formula is defined as the length of longest edge which is the top edge of the axial-symmetric pentagonal faces of Pentagonal Icositetrahedron, calculated using insphere radius of Pentagonal Icositetrahedron is calculated using Long Edge of Pentagonal Icositetrahedron = sqrt((2-[Tribonacci_C])*(3-[Tribonacci_C])*([Tribonacci_C]+1))*Insphere Radius of Pentagonal Icositetrahedron. To calculate Long Edge of Pentagonal Icositetrahedron given Insphere Radius, you need Insphere Radius of Pentagonal Icositetrahedron (ri). With our tool, you need to enter the respective value for Insphere Radius of Pentagonal 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 Long Edge of Pentagonal Icositetrahedron?
In this formula, Long Edge of Pentagonal Icositetrahedron uses Insphere Radius of Pentagonal Icositetrahedron. We can use 6 other way(s) to calculate the same, which is/are as follows -
  • Long Edge of Pentagonal Icositetrahedron = ([Tribonacci_C]+1)/2*Short Edge of Pentagonal Icositetrahedron
  • Long Edge of Pentagonal Icositetrahedron = sqrt([Tribonacci_C]+1)/2*Snub Cube Edge of Pentagonal Icositetrahedron
  • Long Edge of Pentagonal Icositetrahedron = sqrt([Tribonacci_C]+1)/2*(sqrt(Total Surface Area of Pentagonal Icositetrahedron/3)*(((4*[Tribonacci_C])-3)/(22*((5*[Tribonacci_C])-1)))^(1/4))
  • Long Edge of Pentagonal Icositetrahedron = sqrt([Tribonacci_C]+1)/2*(Volume of Pentagonal Icositetrahedron^(1/3)*((2*((20*[Tribonacci_C])-37))/(11*([Tribonacci_C]-4)))^(1/6))
  • Long Edge of Pentagonal Icositetrahedron = sqrt(([Tribonacci_C]+1)*(2-[Tribonacci_C]))*Midsphere Radius of Pentagonal Icositetrahedron
  • Long Edge of Pentagonal Icositetrahedron = sqrt([Tribonacci_C]+1)/2*((3*sqrt((22*(5*[Tribonacci_C]-1))/((4*[Tribonacci_C])-3)))/(SA:V of Pentagonal Icositetrahedron*sqrt((11*([Tribonacci_C]-4))/(2*((20*[Tribonacci_C])-37)))))
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