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## Volume (V) of Square Pyramid given Slant height (s) and Edge length of the base (a) is missing Solution

STEP 0: Pre-Calculation Summary
Formula Used
volume = (1/3)*Height*(4*((Slant Height^2)-(Height^2)))
V = (1/3)*h*(4*((s^2)-(h^2)))
This formula uses 2 Variables
Variables Used
Height - Height is the distance between the lowest and highest points of a person standing upright. (Measured in Meter)
Slant Height - Slant Height is the height of a cone from the vertex to the periphery (rather than the center) of the base. (Measured in Meter)
STEP 1: Convert Input(s) to Base Unit
Height: 12 Meter --> 12 Meter No Conversion Required
Slant Height: 5 Meter --> 5 Meter No Conversion Required
STEP 2: Evaluate Formula
Substituting Input Values in Formula
V = (1/3)*h*(4*((s^2)-(h^2))) --> (1/3)*12*(4*((5^2)-(12^2)))
Evaluating ... ...
V = -1904
STEP 3: Convert Result to Output's Unit
-1904 Cubic Meter --> No Conversion Required
-1904 Cubic Meter <-- Volume
(Calculation completed in 00.015 seconds)

## < 11 Other formulas that you can solve using the same Inputs

Volume of a Conical Frustum
Total Surface Area of a Cone
Lateral Surface Area of a Cone
Total Surface Area of a Cylinder
Lateral Surface Area of a Cylinder
Volume of a Circular Cone
Area of a Trapezoid
area = ((Base A+Base B)/2)*Height Go
Volume of a Circular Cylinder
Volume of a Pyramid
volume = (1/3)*Side^2*Height Go
Area of a Triangle when base and height are given
area = 1/2*Base*Height Go
Area of a Parallelogram when base and height are given
area = Base*Height Go

## < 11 Other formulas that calculate the same Output

Volume of a Conical Frustum
Volume of a Capsule
Volume of a Circular Cone
Volume of a Circular Cylinder
Volume of a Rectangular Prism
volume = Width*Height*Length Go
Volume of Regular Dodecahedron
volume = ((15+(7*sqrt(5)))*Side^3)/4 Go
Volume of Regular Icosahedron
volume = (5*(3+sqrt(5))*Side^3)/12 Go
Volume of a Hemisphere
Volume of a Sphere
Volume of a Pyramid
volume = (1/3)*Side^2*Height Go
Volume of a Cube
volume = Side^3 Go

### Volume (V) of Square Pyramid given Slant height (s) and Edge length of the base (a) is missing Formula

volume = (1/3)*Height*(4*((Slant Height^2)-(Height^2)))
V = (1/3)*h*(4*((s^2)-(h^2)))

## What is Square Pyramid?

In geometry, a square pyramid is a pyramid having a square base. If the apex is perpendicularly above the center of the square, it is a right square pyramid, and has C₄ᵥ symmetry. If all edges are equal, it is an equilateral square pyramid, the Johnson solid J₁

## How to Calculate Volume (V) of Square Pyramid given Slant height (s) and Edge length of the base (a) is missing?

Volume (V) of Square Pyramid given Slant height (s) and Edge length of the base (a) is missing calculator uses volume = (1/3)*Height*(4*((Slant Height^2)-(Height^2))) to calculate the Volume, Volume (V) of Square Pyramid given Slant height (s) and Edge length of the base (a) is missing formula is defined as an amount of three dimensional space covered by Square Pyramid. Volume and is denoted by V symbol.

How to calculate Volume (V) of Square Pyramid given Slant height (s) and Edge length of the base (a) is missing using this online calculator? To use this online calculator for Volume (V) of Square Pyramid given Slant height (s) and Edge length of the base (a) is missing, enter Height (h) and Slant Height (s) and hit the calculate button. Here is how the Volume (V) of Square Pyramid given Slant height (s) and Edge length of the base (a) is missing calculation can be explained with given input values -> -1904 = (1/3)*12*(4*((5^2)-(12^2))).

### FAQ

What is Volume (V) of Square Pyramid given Slant height (s) and Edge length of the base (a) is missing?
Volume (V) of Square Pyramid given Slant height (s) and Edge length of the base (a) is missing formula is defined as an amount of three dimensional space covered by Square Pyramid and is represented as V = (1/3)*h*(4*((s^2)-(h^2))) or volume = (1/3)*Height*(4*((Slant Height^2)-(Height^2))). Height is the distance between the lowest and highest points of a person standing upright and Slant Height is the height of a cone from the vertex to the periphery (rather than the center) of the base.
How to calculate Volume (V) of Square Pyramid given Slant height (s) and Edge length of the base (a) is missing?
Volume (V) of Square Pyramid given Slant height (s) and Edge length of the base (a) is missing formula is defined as an amount of three dimensional space covered by Square Pyramid is calculated using volume = (1/3)*Height*(4*((Slant Height^2)-(Height^2))). To calculate Volume (V) of Square Pyramid given Slant height (s) and Edge length of the base (a) is missing, you need Height (h) and Slant Height (s). With our tool, you need to enter the respective value for Height and Slant Height 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 Volume?
In this formula, Volume uses Height and Slant Height. We can use 11 other way(s) to calculate the same, which is/are as follows -
• volume = Side^3
• volume = (1/3)*Side^2*Height
• volume = Width*Height*Length
• volume = ((15+(7*sqrt(5)))*Side^3)/4
• volume = (5*(3+sqrt(5))*Side^3)/12
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