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  1. Pythagorean Triples. If three positive integers (a, b, and c) that represent the length of each side of a right triangle, satisfy the equation a! + b! = c!, it is called a Pythagorean triple.

  2. Not a Pythagorean triple Pythagorean triple Not a Pythagorean triple Pythagorean triple Not a Pythagorean triple Pythagorean triple Pythagorean triple Not a Pythagorean triple Pythagorean triple Not a Pythagorean triple 10) Determine whether the sides of the triangle form a Pythagorean triple. 6 cm 11 cm A B2 cm C 6, 10, 8 8, 15, 17 5, 11, 9 1 ...

  3. Given the triples above that you put in the table, use the factors in the table below to compute additional triples. (Use the chart above, and fill in the chart below.)

  4. Handout 12.1 NAME Pythagorean Triples Use Pythagorean Theorem to find the missing dimension of each right triangle. Then complete the chart. Short Le Long Hypotenuse Given the triples above that you put in the table, use the factors in the table below to compute additional triples. (Use the chart above, and fill in the chart below.)

  5. You are to generate up to twenty Pythagorean triples. Your group will be assigned one of the following four formulas to use to generate your triples. (2m, m2 – 1, m2 + 1) for m > 1. (v2 – u2, 2uv, u2 + v2), where v > u > 1. (2k + 1, (2k + 1)k + k, (2k + 1)k + k + 1) for k ≥ 1.

  6. Pythagorean Triples. A Pythagorean triple is a set of three integers a, b and c that specify the lengths of a right triangle - that is c2 = a2 + b2. The numbers 3, 4 and 5 is one example. We want to find a way of generating all Pythagorean triples.

  7. Pythagorean Triples: A. The Pythagorean Theorem (arguably the most famous theorem) states that if given a right triangle then the following is true: c2= a2+ b2, where a,b are the legs and c is the hypotenuse. 1. There are many famous triples that occur often on number sense tests and should therefore be memorized. The following table shows a ...

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