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Question: Proving the volume of a pyramid
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If you get to thinking you’re a person of some influence, try ordering somebody else’s dog around.
(March 5, 2022 at 1:06 pm)Fireball Wrote: Like this- It's too early in the morning to be making me think. Stop it! Playing Cluedo with my mum while I was at Uni: "You did WHAT? With WHO? WHERE???" RE: Question: Proving the volume of a pyramid
March 5, 2022 at 9:29 pm
(This post was last modified: March 5, 2022 at 9:31 pm by polymath257.)
(March 5, 2022 at 1:06 pm)Fireball Wrote: Like this- Actually, that is slightly different from what I was describing, but still very nice. The vertices of your hexagon are not all on the same plane. This is, actually, a good way to see the decomposition of the cube into three pyramids. The opposite vertex (that you can't see in the projection) connects to each of the visible square sides to form a pyramid. So the volume of a pyramid is 1/3 the volume of the cube. (March 5, 2022 at 9:29 pm)polymath257 Wrote:(March 5, 2022 at 1:06 pm)Fireball Wrote: Like this- Oy. Now I think on it, I realize what you meant. -Hexagon inscribed in a cube
If you get to thinking you’re a person of some influence, try ordering somebody else’s dog around.
The geometric demonstration of 6 identical square based pyramids with height equal to half of the sides fitting into a cube does not seem generalizable to pyramid with non-square bases or other height to base ratios.
Fireball Wrote:Oy. Now I think on it, I realize what you meant. -Hexagon inscribed in a cube And to think, per some archeologists, that it took Humanity 10,000 years after the invention of the pottery wheel for someone to come along and rotate it by 90 degrees. (March 7, 2022 at 2:39 am)Anomalocaris Wrote: The geometric demonstration of 6 identical square based pyramids with height equal to half of the sides fitting into a cube does not seem generalizable to pyramid with non-square bases or other height to base ratios. For that, we need more general facts about what happens under expansion or contraction along different directions. Or, you could compare corresponding rectangular figures approximating the two pyramids and compare the volumes of the approximations. This is close to what Archimedes would have done. It is *close* to calculus, but not there yet. |
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