Height of Triangular Cupola given Volume Solution

STEP 0: Pre-Calculation Summary
Formula Used
Height of Triangular Cupola = ((3*sqrt(2)*Volume of Triangular Cupola)/5)^(1/3)*sqrt(1-(1/4*cosec(pi/3)^(2)))
h = ((3*sqrt(2)*V)/5)^(1/3)*sqrt(1-(1/4*cosec(pi/3)^(2)))
This formula uses 1 Constants, 3 Functions, 2 Variables
Constants Used
pi - Archimedes' constant Value Taken As 3.14159265358979323846264338327950288
Functions Used
sec - Secant is a trigonometric function that is defined ratio of the hypotenuse to the shorter side adjacent to an acute angle (in a right-angled triangle); the reciprocal of a cosine., sec(Angle)
cosec - The cosecant function is a trigonometric function that is the reciprocal of the sine function., cosec(Angle)
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
Height of Triangular Cupola - (Measured in Meter) - Height of Triangular Cupola is the vertical distance from the triangular face to the opposite hexagonal face of the Triangular Cupola.
Volume of Triangular Cupola - (Measured in Cubic Meter) - Volume of Triangular Cupola is the total quantity of three-dimensional space enclosed by the surface of the Triangular Cupola.
STEP 1: Convert Input(s) to Base Unit
Volume of Triangular Cupola: 1200 Cubic Meter --> 1200 Cubic Meter No Conversion Required
STEP 2: Evaluate Formula
Substituting Input Values in Formula
h = ((3*sqrt(2)*V)/5)^(1/3)*sqrt(1-(1/4*cosec(pi/3)^(2))) --> ((3*sqrt(2)*1200)/5)^(1/3)*sqrt(1-(1/4*cosec(pi/3)^(2)))
Evaluating ... ...
h = 8.21429322730446
STEP 3: Convert Result to Output's Unit
8.21429322730446 Meter --> No Conversion Required
FINAL ANSWER
8.21429322730446 8.214293 Meter <-- Height of Triangular Cupola
(Calculation completed in 00.004 seconds)

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4 Height of Triangular Cupola Calculators

Height of Triangular Cupola given Surface to Volume Ratio
Go Height of Triangular Cupola = ((3+(5*sqrt(3))/2)*(3*sqrt(2)))/(5*Surface to Volume Ratio of Triangular Cupola)*sqrt(1-(1/4*cosec(pi/3)^(2)))
Height of Triangular Cupola given Total Surface Area
Go Height of Triangular Cupola = sqrt(Total Surface Area of Triangular Cupola/(3+(5*sqrt(3))/2))*sqrt(1-(1/4*cosec(pi/3)^(2)))
Height of Triangular Cupola given Volume
Go Height of Triangular Cupola = ((3*sqrt(2)*Volume of Triangular Cupola)/5)^(1/3)*sqrt(1-(1/4*cosec(pi/3)^(2)))
Height of Triangular Cupola
Go Height of Triangular Cupola = Edge Length of Triangular Cupola*sqrt(1-(1/4*cosec(pi/3)^(2)))

Height of Triangular Cupola given Volume Formula

Height of Triangular Cupola = ((3*sqrt(2)*Volume of Triangular Cupola)/5)^(1/3)*sqrt(1-(1/4*cosec(pi/3)^(2)))
h = ((3*sqrt(2)*V)/5)^(1/3)*sqrt(1-(1/4*cosec(pi/3)^(2)))

What is a Triangular Cupola?

A cupola is a polyhedron with two opposite polygons, of which one has twice as many vertices as the other and with alternating triangles and quadrangles as side faces. When all faces of the cupola are regular, then the cupola itself is regular and is a Johnson solid. There are three regular cupolae, the triangular, the square, and the pentagonal cupola. A Triangular Cupola has 8 faces, 15 edges, and 9 vertices. Its top surface is an equilateral triangle and its base surface is a regular hexagon.

How to Calculate Height of Triangular Cupola given Volume?

Height of Triangular Cupola given Volume calculator uses Height of Triangular Cupola = ((3*sqrt(2)*Volume of Triangular Cupola)/5)^(1/3)*sqrt(1-(1/4*cosec(pi/3)^(2))) to calculate the Height of Triangular Cupola, The Height of Triangular Cupola given Volume formula is defined as the vertical distance from the triangular face to the opposite hexagonal face of the Triangular Cupola and is calculated using the volume of the Triangular Cupola. Height of Triangular Cupola is denoted by h symbol.

How to calculate Height of Triangular Cupola given Volume using this online calculator? To use this online calculator for Height of Triangular Cupola given Volume, enter Volume of Triangular Cupola (V) and hit the calculate button. Here is how the Height of Triangular Cupola given Volume calculation can be explained with given input values -> 8.214293 = ((3*sqrt(2)*1200)/5)^(1/3)*sqrt(1-(1/4*cosec(pi/3)^(2))).

FAQ

What is Height of Triangular Cupola given Volume?
The Height of Triangular Cupola given Volume formula is defined as the vertical distance from the triangular face to the opposite hexagonal face of the Triangular Cupola and is calculated using the volume of the Triangular Cupola and is represented as h = ((3*sqrt(2)*V)/5)^(1/3)*sqrt(1-(1/4*cosec(pi/3)^(2))) or Height of Triangular Cupola = ((3*sqrt(2)*Volume of Triangular Cupola)/5)^(1/3)*sqrt(1-(1/4*cosec(pi/3)^(2))). Volume of Triangular Cupola is the total quantity of three-dimensional space enclosed by the surface of the Triangular Cupola.
How to calculate Height of Triangular Cupola given Volume?
The Height of Triangular Cupola given Volume formula is defined as the vertical distance from the triangular face to the opposite hexagonal face of the Triangular Cupola and is calculated using the volume of the Triangular Cupola is calculated using Height of Triangular Cupola = ((3*sqrt(2)*Volume of Triangular Cupola)/5)^(1/3)*sqrt(1-(1/4*cosec(pi/3)^(2))). To calculate Height of Triangular Cupola given Volume, you need Volume of Triangular Cupola (V). With our tool, you need to enter the respective value for Volume of Triangular Cupola 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 Height of Triangular Cupola?
In this formula, Height of Triangular Cupola uses Volume of Triangular Cupola. We can use 3 other way(s) to calculate the same, which is/are as follows -
  • Height of Triangular Cupola = Edge Length of Triangular Cupola*sqrt(1-(1/4*cosec(pi/3)^(2)))
  • Height of Triangular Cupola = sqrt(Total Surface Area of Triangular Cupola/(3+(5*sqrt(3))/2))*sqrt(1-(1/4*cosec(pi/3)^(2)))
  • Height of Triangular Cupola = ((3+(5*sqrt(3))/2)*(3*sqrt(2)))/(5*Surface to Volume Ratio of Triangular Cupola)*sqrt(1-(1/4*cosec(pi/3)^(2)))
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