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The volume of tetrahedron is given by $$\frac{1}{3}(\text{Area of base})(\text{vertical height})$$

Similar formula is applicable for the volume of a cone.

I know that a right circular cone can be enveloped in a right circular cylinder with common base and height but can't still corelated their volumes.

Can someone explain or prove where did this $\frac13$ come in the formula of volume of tetrahedron. Thanks

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    $\begingroup$ Do you want a formal proof or an intuitive explanation/geometric argument? $\endgroup$ Commented Feb 26, 2022 at 22:12
  • $\begingroup$ A similar question: How to calculate the volume of an arbitrary pyramid without calculus? $\endgroup$ Commented Feb 26, 2022 at 22:36
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    $\begingroup$ Does this answer your question? Volume of Pyramid among many others. $\endgroup$ Commented Feb 26, 2022 at 23:52

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Here is a geometric intuition where a cube is divided into three pyramids with the same base:

https://www.polyhedra.net/en/model.php?name-en=three-pyramids-that-form-a-cube

And because three of them fit into a cube with the same "height" and "base" it is a third of that Volume ($V=b*h/3$).

This can also be proven using calculus but I think this is rather what you asked for.

A video with an accesible proof.

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