The formula to calculate the Height of a Right Square Pyramid given its Volume is:
\[ h = \frac{3V}{l_e^2} \]
The Height of a Right Square Pyramid is the length of the perpendicular from the apex to the base of the Right Square Pyramid. The Volume of a Right Square Pyramid is the total quantity of three-dimensional space enclosed by the surface of the Right Square Pyramid. The Edge Length of the Base of a Right Square Pyramid is the length of the straight line connecting any two adjacent vertices of the base of the Right Square Pyramid.
Let's assume the following values:
Using the formula:
\[ h = \frac{3 \times 500}{10^2} = 15 \text{ Meter} \]
The Height of the Right Square Pyramid is 15 Meter.
| Volume (Cubic Meter) | Edge Length (Meter) | Height (Meter) |
|---|---|---|
| 450 | 10 | 13.500000000000000 |
| 460 | 10 | 13.800000000000001 |
| 470 | 10 | 14.100000000000000 |
| 480 | 10 | 14.400000000000000 |
| 490 | 10 | 14.699999999999999 |
| 500 | 10 | 15.000000000000000 |
| 510 | 10 | 15.300000000000001 |
| 520 | 10 | 15.600000000000000 |
| 530 | 10 | 15.900000000000000 |
| 540 | 10 | 16.199999999999999 |
| 550 | 10 | 16.500000000000000 |