Mills, J. T. S. 1996. 80.39 Another family tree of Pythagorean triples. The Mathematical Gazette, Vol. 80, Issue. 489, p. 545.

Here's the deal; there was this Greek guy named Pythagoras, who lived over 2,000 years ago during the sixth century B.C.E. Pythagoras spent a lot of time thinking about math, astronomy, and music ...

We generate a candidate solution, and then test it to determine if it is valid. Four different Pythagorean triples are calculated. However, (3, 4, 5) and (4, 3, 5) are essentially the same, as are (6, ...

Si.427 contains three Pythagorean triples: 3, 4, 5; 8, 15, 17; and 5, 12, 13. The Babylonians used a base 60 number system – similar to how we keep time today – which made working with prime ...

However, it is quite possible to select three equally spaced squares, for example 1, 25, 49. Actually, such triples correspond to Pythagorean triples in a pleasantly simple way, which we will describe ...

Consider: Mathematical induction, Euclid's algorithm, prime and composite integers, algebra of congruences, Chinese remainder theorem, quadratic reciprocity law, number theoretic functions, first ...

"[Barkley] has a love and passion for what the academy stands for and how it is shaping the lives and futures of young girls ...

Bill Whitaker: So tell me, what was this bonus question? Calcea Johnson: It was to create a new proof of the Pythagorean Theorem. And it kind of gave you a few guidelines on how would you start a ...

Mathematical induction, Euclid's algorithm, prime and composite integers, algebra of congruences, Chinese remainder theorem, quadratic reciprocity law, number theoretic functions, first degree ...

Charles Barkley and the Pythagorean theorem are two things you probably didn't expect to see linked together, but neither was proving the equation using trigonometry — until Calcea Johnson and ...