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## Edge length of peaks of Stellated Octahedron given surface area Solution

STEP 0: Pre-Calculation Summary
Formula Used
length = (1/2)*(sqrt((2*Surface Area Polyhedron)/(3*sqrt(3))))
L = (1/2)*(sqrt((2*SAPolyhedron)/(3*sqrt(3))))
This formula uses 1 Functions, 1 Variables
Functions Used
sqrt - Squre root function, sqrt(Number)
Variables Used
Surface Area Polyhedron - Surface Area Polyhedron is the area of an outer part or uppermost layer of polyhedron. (Measured in Square Meter)
STEP 1: Convert Input(s) to Base Unit
Surface Area Polyhedron: 1000 Square Meter --> 1000 Square Meter No Conversion Required
STEP 2: Evaluate Formula
Substituting Input Values in Formula
L = (1/2)*(sqrt((2*SAPolyhedron)/(3*sqrt(3)))) --> (1/2)*(sqrt((2*1000)/(3*sqrt(3))))
Evaluating ... ...
L = 9.80943652127571
STEP 3: Convert Result to Output's Unit
9.80943652127571 Meter --> No Conversion Required
9.80943652127571 Meter <-- Length
(Calculation completed in 00.000 seconds)

## < 5 Edge length of peaks of Stellated Octahedron Calculators

Edge length of peaks of Stellated Octahedron given surface to volume ratio
length = (1/2)*(((3/2)*sqrt(3))/((1/8)*sqrt(2)*Surface to Volume Ratio)) Go
Edge length of peaks of Stellated Octahedron given surface area
length = (1/2)*(sqrt((2*Surface Area Polyhedron)/(3*sqrt(3)))) Go
Edge length of peaks of Stellated Octahedron given volume
length = (1/2)*((8*Volume/sqrt(2))^(1/3)) Go
Edge length of peaks of Stellated Octahedron given circumradius
Edge length of peaks of Stellated Octahedron given edge length
length = Side A/2 Go

### Edge length of peaks of Stellated Octahedron given surface area Formula

length = (1/2)*(sqrt((2*Surface Area Polyhedron)/(3*sqrt(3))))
L = (1/2)*(sqrt((2*SAPolyhedron)/(3*sqrt(3))))

## What is Stellated Octahedron?

The stellated octahedron is the only stellation of the octahedron. It is also called the stella octangula, a name given to it by Johannes Kepler in 1609, though it was known to earlier geometers. It was depicted in Pacioli's De Divina Proportione, 1509.

## How to Calculate Edge length of peaks of Stellated Octahedron given surface area?

Edge length of peaks of Stellated Octahedron given surface area calculator uses length = (1/2)*(sqrt((2*Surface Area Polyhedron)/(3*sqrt(3)))) to calculate the Length, Edge length of peaks of Stellated Octahedron given surface area formula is defined as measurement of length of peaks of Stellated Octahedron. Length and is denoted by L symbol.

How to calculate Edge length of peaks of Stellated Octahedron given surface area using this online calculator? To use this online calculator for Edge length of peaks of Stellated Octahedron given surface area, enter Surface Area Polyhedron (SAPolyhedron) and hit the calculate button. Here is how the Edge length of peaks of Stellated Octahedron given surface area calculation can be explained with given input values -> 9.809437 = (1/2)*(sqrt((2*1000)/(3*sqrt(3)))).

### FAQ

What is Edge length of peaks of Stellated Octahedron given surface area?
Edge length of peaks of Stellated Octahedron given surface area formula is defined as measurement of length of peaks of Stellated Octahedron and is represented as L = (1/2)*(sqrt((2*SAPolyhedron)/(3*sqrt(3)))) or length = (1/2)*(sqrt((2*Surface Area Polyhedron)/(3*sqrt(3)))). Surface Area Polyhedron is the area of an outer part or uppermost layer of polyhedron.
How to calculate Edge length of peaks of Stellated Octahedron given surface area?
Edge length of peaks of Stellated Octahedron given surface area formula is defined as measurement of length of peaks of Stellated Octahedron is calculated using length = (1/2)*(sqrt((2*Surface Area Polyhedron)/(3*sqrt(3)))). To calculate Edge length of peaks of Stellated Octahedron given surface area, you need Surface Area Polyhedron (SAPolyhedron). With our tool, you need to enter the respective value for Surface Area Polyhedron 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 Length?
In this formula, Length uses Surface Area Polyhedron. We can use 5 other way(s) to calculate the same, which is/are as follows -
• length = Side A/2 