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Volume of a triangular prism

The volume of a triangular prism can be calculated from its area as A = l(s/s) h. We also know that the length of the bases is s and the perpendicular height is h. So the formula for the volume of the triangular prism is A = l(h/s) s. Given this formula, we can easily find the volume for a triangular prism with height h and base length s.Both of the pictures of the Triangular prisms below illustrate the same formula. The formula, in general, is the area of the base (the red triangle in the picture on the left) times the height, h. The right hand picture illustrates the same formula.

The volume of a triangular prism is the space occupied by it from all three dimensions. A prism is a solid object which has identical bases, flat rectangular side faces, and the same cross-section all along its length. There are different types of prisms that are classified and named as per the shape of their base. A triangular prism has 2 identical triangular bases and 3 rectangular lateral faces. The volume of a triangular prism can be calculated by taking the product of the area of the triangular base and the height of thA triangular prism is a polyhedron made up of two triangular bases and three rectangular sides. Or, it can be considered as a pentahedron (as it has 5 faces altogether) wherein the edges and vertices of the bases are joined with each other via three rectangular sides. By definition, the two triangular bases are parallel and congruent to each other. Consider a triangular prism whose height is 'H' and 'a' and 'b' are the two sides of its base with an included angle θ.

Then its base area is (1/2) ab sin θ. We know that the volume of the prism is base area × height and hence the volume of the prism, in this case, is found using the formula (1/2) ab siIf the base of a triangular prism is a right-angled triangle of base 'b' and height 'h' and the height of the prism is 'H", then its base area = (1/2) bh. We know that the volume of the prism is base area × height and hence the volume of the prism, in this case, is found using the formula (1/2) bhH cubic units.If you ever wondered how to find the volume of a triangular prism, this triangular prism calculator is the thing you are looking for. Not only can it calculate the volume but also may be helpful if you need to determine the triangular prism surface area. Choose the option which fits your needs and experiment with the tool! If you are curious about triangular prism formulas behind the calculator, scroll down to find out more. (Source: www.omnicalculator.com)

It's easy to assume that you'd calculate the volume of a triangular prism the same way you would for a pyramid. However, a triangular prism is a three-sided polyhedron with two parallel triangular bases and three rectangular faces. To calculate the volume, all you have to do is find the area of one of the triangular bases and multiply it by the height of the prism.

"I had to study for a test on volume and surface area. I wasn't very good at both, so I asked my sister. She tried to help me, but was sick and didn't really know if she was teaching me teaching me right! I was frustrated and couldn't ask anyone else, so I looked it up. I tried the first website I saw, but it didn't help because it had too many confusing equations! So I looked it up again and I tried the second website, yours. It was so easy to understand with the pictures! Thanks."..." more (Source: www.wikihow.com)