Volume of a Square Pyramid Calculator
When it comes to dealing with Pyramids in geometrical Mathematics, you may face problems while solving them. The reason is you will get multiple types of this shape depending on the dimensions and similarities. One of the most common types of pyramid is a square pyramid for which you may have to find area, volume, and other related measurements.
Don’t you like to solve a complex figure like a pyramid? Making mistakes while finding the volume of a square pyramid? If yes, you don’t need to worry now because we have an efficient working volume of a square pyramid calculator. This online tool will help you in finding the volume of this type of pyramid within seconds. Also, you can learn how to find the volume using this maths calculator. Let us take you to the next sections where you will learn about this calculation.
Table of Contents
What is the square pyramid?
We all know that a pyramid is a complex figure with curved sides. But these are different when it comes to the shape of the base and its dimensions. A square pyramid is a specific type of pyramid in which the base looks like a square.
In simple words, if the base of the square has all four sides with equal measures, it will be called a square pyramid. Like other types of pyramids, it has all other sides in a curved shape as well as a specific perpendicular height that is the distance of the top narrow point from the center of the squared base.
Volume of a square pyramid formula
Now, you know what the square pyramid is. It is time to learn the formula for this calculation. But before that, you should learn about a few terms that represent the sides of the square pyramid. In this pyramid type, the sides of the base are called the base edge and represented by “a”. Similarly, the perpendicular height from the center of the base to the narrow point is called its higher and represented by “h”.
Here is the general formula for calculating the volume of a square pyramid.
Volume of a square pyramid = a2 ✖ H/3 cubic units
How to find the volume of a square pyramid?
By reading the above formula, you can estimate how easy it is to find the volume of a square pyramid. But we have also solved an example here for the sake of your understanding.
Example 1:
Find the volume of a square pyramid if its height is 15 meters and the base edge is 22 meters. ?
Solution:
From the question, we know that:
Height = h = 15 m
Base Edge = a = 22 m
So, we have to put these values in the above formula.
Volume of a square pyramid = (22)2 ✖ 15/3 m3
= 2420 m3
How to use the volume of a square pyramid calculator?
Sometimes, you may complex measures or want to solve such problems quickly. The best approach in this regard is using this tool by Calculator’s Bag. It can easily find the volume of a square pyramid using your input values and its pre-programmed algorithm.
- Enter the measure of base edge (a) in the first input box
- Enter the height (h) of the pyramid in the second box
- This calculator will automatically show you the answer to the volume of a square pyramid.
FAQ | Volume of a Square Pyramid Calculator
How do you find the volume of the square pyramid?
You can use the following formula for finding the volume of the square pyramid quickly.
Volume of a square pyramid = a2 ✖ H/3 cubic units
What is a square-based pyramid called?
A pyramid with a square base is called a square-based pyramid.
Where does the volume of a pyramid come from?
The volume of a pyramid is the space that it covers in all three dimensions. As it is a three-dimensional figure, so, the space coverage by the complete figure is called volume instead of area.
What is the maximum volume of a pyramid?
There is no fixed maximum volume for a pyramid because every pyramid has specific measures according to which its volume is different from the others.
What is the relationship between the volume of the pyramid?
The volume of the pyramid is the relationship between the height of that pyramid and the length of its base edge. Here is the formula that shows this relationship.
Volume of a square pyramid = (Base Edge)2 ✖ Height of the Pyramid / 3 cubic units