Half Height of Regular Bipyramid Calculator

✖Total Height of Regular Bipyramid is the total length of the perpendicular from the apex of one pyramid to the apex of another pyramid in the Regular Bipyramid.ⓘ Total Height of Regular Bipyramid [h_Total]

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✖Half Height of Regular Bipyramid is the total length of the perpendicular from the apex to the base of any one of the pyramids in the Regular Bipyramid.ⓘ Half Height of Regular Bipyramid [h_Half]

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Half Height of Regular Bipyramid Solution

STEP 0: Pre-Calculation Summary

Formula Used

Half Height of Regular Bipyramid = Total Height of Regular Bipyramid/2
h_Half = h_Total/2
This formula uses 2 Variables

Variables Used

Half Height of Regular Bipyramid - (Measured in Meter) - Half Height of Regular Bipyramid is the total length of the perpendicular from the apex to the base of any one of the pyramids in the Regular Bipyramid.
Total Height of Regular Bipyramid - (Measured in Meter) - Total Height of Regular Bipyramid is the total length of the perpendicular from the apex of one pyramid to the apex of another pyramid in the Regular Bipyramid.

STEP 1: Convert Input(s) to Base Unit

Total Height of Regular Bipyramid: 14 Meter --> 14 Meter No Conversion Required

STEP 2: Evaluate Formula

Substituting Input Values in Formula

h_Half = h_Total/2 --> 14/2

Evaluating ... ...

h_Half = 7

STEP 3: Convert Result to Output's Unit

7 Meter --> No Conversion Required

FINAL ANSWER

7 Meter <-- Half Height of Regular Bipyramid

(Calculation completed in 00.004 seconds)

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Created by Shweta Patil

Walchand College of Engineering (WCE), Sangli

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Verified by Mridul Sharma

Indian Institute of Information Technology (IIIT), Bhopal

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< Edge Length and Height of Regular Bipyramid Calculators

Half Height of Regular Bipyramid given Total Surface Area

LaTeX Go Half Height of Regular Bipyramid = sqrt((Total Surface Area of Regular Bipyramid/(Edge Length of Base of Regular Bipyramid*Number of Base Vertices of Regular Bipyramid))^2-(1/4*Edge Length of Base of Regular Bipyramid^2*(cot(pi/Number of Base Vertices of Regular Bipyramid))^2))

Half Height of Regular Bipyramid given Volume

LaTeX Go Half Height of Regular Bipyramid = (4*Volume of Regular Bipyramid*tan(pi/Number of Base Vertices of Regular Bipyramid))/(2/3*Number of Base Vertices of Regular Bipyramid*Edge Length of Base of Regular Bipyramid^2)

Total Height of Regular Bipyramid

LaTeX Go Total Height of Regular Bipyramid = 2*Half Height of Regular Bipyramid

Half Height of Regular Bipyramid

LaTeX Go Half Height of Regular Bipyramid = Total Height of Regular Bipyramid/2

Half Height of Regular Bipyramid Formula

LaTeX Go

Half Height of Regular Bipyramid = Total Height of Regular Bipyramid/2
h_Half = h_Total/2

What is a Regular Bipyramid?

A Regular Bipyramid is a regular pyramid with its mirror image attached at its base. It is made of two N-gon-based pyramids that are stuck together at their bases. It consists of 2N faces which are all isosceles triangles. Also, It has 3N edges and N+2 vertices.

How to Calculate Half Height of Regular Bipyramid?

Half Height of Regular Bipyramid calculator uses Half Height of Regular Bipyramid = Total Height of Regular Bipyramid/2 to calculate the Half Height of Regular Bipyramid, Half Height of Regular Bipyramid formula is defined as the total length of the perpendicular from the apex to the base of any one of the pyramids in the Regular Bipyramid. Half Height of Regular Bipyramid is denoted by h_Half symbol.

How to calculate Half Height of Regular Bipyramid using this online calculator? To use this online calculator for Half Height of Regular Bipyramid, enter Total Height of Regular Bipyramid (h_Total) and hit the calculate button. Here is how the Half Height of Regular Bipyramid calculation can be explained with given input values -> 7 = 14/2.

FAQ

What is Half Height of Regular Bipyramid?

Half Height of Regular Bipyramid formula is defined as the total length of the perpendicular from the apex to the base of any one of the pyramids in the Regular Bipyramid and is represented as h_Half = h_Total/2 or Half Height of Regular Bipyramid = Total Height of Regular Bipyramid/2. Total Height of Regular Bipyramid is the total length of the perpendicular from the apex of one pyramid to the apex of another pyramid in the Regular Bipyramid.

How to calculate Half Height of Regular Bipyramid?

Half Height of Regular Bipyramid formula is defined as the total length of the perpendicular from the apex to the base of any one of the pyramids in the Regular Bipyramid is calculated using Half Height of Regular Bipyramid = Total Height of Regular Bipyramid/2. To calculate Half Height of Regular Bipyramid, you need Total Height of Regular Bipyramid (h_Total). With our tool, you need to enter the respective value for Total Height of Regular Bipyramid 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 Half Height of Regular Bipyramid?

In this formula, Half Height of Regular Bipyramid uses Total Height of Regular Bipyramid. We can use 2 other way(s) to calculate the same, which is/are as follows -

Half Height of Regular Bipyramid = sqrt((Total Surface Area of Regular Bipyramid/(Edge Length of Base of Regular Bipyramid*Number of Base Vertices of Regular Bipyramid))^2-(1/4*Edge Length of Base of Regular Bipyramid^2*(cot(pi/Number of Base Vertices of Regular Bipyramid))^2))
Half Height of Regular Bipyramid = (4*Volume of Regular Bipyramid*tan(pi/Number of Base Vertices of Regular Bipyramid))/(2/3*Number of Base Vertices of Regular Bipyramid*Edge Length of Base of Regular Bipyramid^2)

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