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Pythagorean Theorem Ornaments
por paulblankenbaker
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# Pythagorean Theorem Pieces
One of my favorite Pythagorean proofs involves a square having sides that are "a+b" long. This is a physical example of that proof with two different sizes of "a" and "b".
* Print four of the right triangles and one of the corresponding squares
* The four triangles and square will assemble into a single square having a total area of (a + b)^2
* You can also assemble the four triangles into two rectangles and leave the square separate showing an area of (2 * a * b) + c^2
* Since the same pieces were used, both are equal in area: (a + b)^2 = (2 * a * b) + c^2
* This equation simplifies to: a^2 + b^2 = c^2
Each piece has a 3 mm hole in a corner. This allows the pieces to be converted into ornaments that can serve as annual reminder of the proof each year over the holidays.
One of my favorite Pythagorean proofs involves a square having sides that are "a+b" long. This is a physical example of that proof with two different sizes of "a" and "b".
* Print four of the right triangles and one of the corresponding squares
* The four triangles and square will assemble into a single square having a total area of (a + b)^2
* You can also assemble the four triangles into two rectangles and leave the square separate showing an area of (2 * a * b) + c^2
* Since the same pieces were used, both are equal in area: (a + b)^2 = (2 * a * b) + c^2
* This equation simplifies to: a^2 + b^2 = c^2
Each piece has a 3 mm hole in a corner. This allows the pieces to be converted into ornaments that can serve as annual reminder of the proof each year over the holidays.
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