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below image; or, |
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Inscribe Circles (in-circles) FGJ and HIK with centers at  and respective diameters LM and NO. Bisect Lines FG and HI with Center Lines. |
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Construct a paired Pythagorean Triangle FGJ in accordance with base, side, and hypotenuse as indicated in the below Table of Formulas. A pair of Pythagorean Triangles have short sides, radius (r) and base (b), which vary by the Elliptical Constant (EC) =  . |
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Construct a Pythagorean Triangle
HIK in accordance with base, side, and hypotenuse as indicated in the below Table of Formulas. Pythagorean Triangles are triangles with a right angle; and, all sides that are integers. |
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A Pythagorean Triangle Pair (PTP) can be mapped to every integer greater than One. Four angles (two of the six angles are right angles) and all six sides of a Pythagorean Triangle Pair are of unlike values. |
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The simplest equation
for the in-diameter of a circle inscribed within any right triangle is: |
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An in-diameter of a right
triangle equals side "a" plus side "b" minus the hypotenuse "c". |
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Amazingly, the diameters of both circles inscribed within each different Pythagorean Triangle, of a given pair, are even integers, that are . . . identical to one another. Thus, the radii of the inscribed circles are also equal integers. |
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One must
continuously ask: Why? Why? Why?; and, Why? again. And, realize that Fundamental Nature is the source of all Mathematics! |
| Summary | Epsilon equals One | Proof of One | Inverse Square Law | Elliptical Constant |
revised Fibonacci Sequence |
| Natural Function | Brunardot Theorem | Duality of Infinity | Challenge to Academe | Pulsoid Theorem | Fundamental Intrinsic Time |
| Salient Structural Parts | Universal Locus | Heisenberg Uncertainty Principle | Heaven/God/Hell | Philogic | Entanglement |
| Spin | Tini Circle Groups | Antimatter | Fabric of Space | Pauli Exclusion Principle | Table of Contents |