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## Edge length of octahedron of Triakis Octahedron given midradius Solution

STEP 0: Pre-Calculation Summary
Formula Used
Sa = 2*rm
This formula uses 1 Variables
Variables Used
Midradius - Midradius is the radius of sphere which is in between insphere and circumsphere. (Measured in Meter)
STEP 1: Convert Input(s) to Base Unit
Midradius: 13 Meter --> 13 Meter No Conversion Required
STEP 2: Evaluate Formula
Substituting Input Values in Formula
Sa = 2*rm --> 2*13
Evaluating ... ...
Sa = 26
STEP 3: Convert Result to Output's Unit
26 Meter --> No Conversion Required
26 Meter <-- Side A
(Calculation completed in 00.015 seconds)

## < 6 Edge length of octahedron of Triakis Octahedron Calculators

Edge length of octahedron of Triakis Octahedron given surface to volume ratio
side_a = (6*sqrt(23-16*sqrt(2)))/((2-sqrt(2))*Surface to Volume Ratio) Go
Edge length of octahedron of Triakis Octahedron given surface area
side_a = sqrt(Surface Area/(6*sqrt(23-16*sqrt(2)))) Go
Edge length of octahedron of Triakis Octahedron given inradius
Edge length of octahedron of Triakis Octahedron given volume
side_a = ((Volume)/(2-sqrt(2)))^(1/3) Go
Edge length of octahedron of Triakis Octahedron given edge length of pyramid
side_a = Side B/(2-sqrt(2)) Go
Edge length of octahedron of Triakis Octahedron given midradius

Sa = 2*rm

## What is triakis octahedron and what are its properties?

It can be seen as an octahedron with triangular pyramids added to each face; that is, it is the Kleetope of the octahedron. It is also sometimes called a trisoctahedron, or, more fully, trigonal trisoctahedron. Both names reflect the fact that it has three triangular faces for every face of an octahedron. The tetragonal trisoctahedron is another name for the deltoidal icositetrahedron, a different polyhedron with three quadrilateral faces for every face of an octahedron. This convex polyhedron is topologically similar to the concave stellated octahedron. They have the same face connectivity, but the vertices are in different relative distances from the center.

## How to Calculate Edge length of octahedron of Triakis Octahedron given midradius?

Edge length of octahedron of Triakis Octahedron given midradius calculator uses side_a = 2*Midradius to calculate the Side A, The Edge length of octahedron of triakis octahedron given midradius formula is defined as a straight line coonecting two adjacent vertices of octahedron of triakis octahedron. Where, side_a = Edge length octahedron (a) of triakis octahedron. Side A and is denoted by Sa symbol.

How to calculate Edge length of octahedron of Triakis Octahedron given midradius using this online calculator? To use this online calculator for Edge length of octahedron of Triakis Octahedron given midradius, enter Midradius (rm) and hit the calculate button. Here is how the Edge length of octahedron of Triakis Octahedron given midradius calculation can be explained with given input values -> 26 = 2*13.

### FAQ

What is Edge length of octahedron of Triakis Octahedron given midradius?
The Edge length of octahedron of triakis octahedron given midradius formula is defined as a straight line coonecting two adjacent vertices of octahedron of triakis octahedron. Where, side_a = Edge length octahedron (a) of triakis octahedron and is represented as Sa = 2*rm or side_a = 2*Midradius. Midradius is the radius of sphere which is in between insphere and circumsphere.
How to calculate Edge length of octahedron of Triakis Octahedron given midradius?
The Edge length of octahedron of triakis octahedron given midradius formula is defined as a straight line coonecting two adjacent vertices of octahedron of triakis octahedron. Where, side_a = Edge length octahedron (a) of triakis octahedron is calculated using side_a = 2*Midradius. To calculate Edge length of octahedron of Triakis Octahedron given midradius, you need Midradius (rm). With our tool, you need to enter the respective value for Midradius 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 Side A?
In this formula, Side A uses Midradius. We can use 6 other way(s) to calculate the same, which is/are as follows -
• side_a = (6*sqrt(23-16*sqrt(2)))/((2-sqrt(2))*Surface to Volume Ratio)
• side_a = Side B/(2-sqrt(2))
• side_a = sqrt(Surface Area/(6*sqrt(23-16*sqrt(2))))
• side_a = ((Volume)/(2-sqrt(2)))^(1/3)