PROOF of a (Mathematical) Geometrical discovery of 1961- HOW TO CONSTRUCT A PYRAMID REQUIRING A GIVEN HEIGHT with a given base-length USING ONLY RULER, COMPASS, AND PENCIL. Buy on Amazon
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PROOF of a (Mathematical) Geometrical discovery of 1961- HOW TO CONSTRUCT A PYRAMID REQUIRING A GIVEN HEIGHT with a given base-length USING ONLY RULER, COMPASS, AND PENCIL.

Author Sam Yulish
Publisher Sam Yulish
Book Details
Author(s) Sam Yulish
Publisher Sam Yulish
ISBN / ASIN B006V2B63Q
ISBN-13 978B006V2B639
Sales Rank #849,194
Marketplace United States 🇺🇸
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Description
In Mechanical Drawing class, 1960 or 1961, we were to construct some basic platonic solids with compass and ruler. The problem was to construct a square pyramid with base length of 2a and height of b. W is the center of the square base. (I give these variables, as I cannot remember the actual numbers.) Our textbook stated that this could only be done by trial and error—there was no way to construct this pyramid with just a ruler and compass. The method of trial and error the book showed was very tedious. I was too lazy for trial and error-- I had to find another way.
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