The formula to calculate the Height of a Triangular Prism is:
\[ h = \frac{V}{A_{\text{Base}}} \]
The height of a triangular prism is the length of the straight line connecting any base vertex to the corresponding top vertex of the prism. The volume is the total quantity of three-dimensional space enclosed by the surface of the prism, and the base area is the total amount of two-dimensional space occupied by the base face of the prism.
Let's assume the following values:
Using the formula:
\[ h = \frac{1625}{65} = 25 \]
The Height is 25 Meters.
| Volume (Cubic Meters) | Base Area (Square Meters) | Height (Meters) |
|---|---|---|
| 1600 | 65 | 24.615384615384617 |
| 1625 | 65 | 25.000000000000000 |
| 1650 | 65 | 25.384615384615383 |