Euclid's formula, many other formulas for generating Pythagorean triples have been developed. Euclid's, Pythagoras' and Plato's formulas for calculating...
30 KB (4,539 words) - 09:33, 5 June 2025
remaining primitive Pythagorean triples of numbers up to 300: Euclid's formula is a fundamental formula for generating Pythagorean triples given an arbitrary...
82 KB (11,409 words) - 04:26, 1 August 2025
55, 73), (65, 72, 97) There are many formulas for generating Pythagorean triples. Of these, Euclid's formula is the most well-known: given arbitrary...
95 KB (12,787 words) - 21:00, 12 July 2025
sides produces the same relationship. Using Euclid's formula for generating Pythagorean triples, the sides must be in the ratio m2 − n2 : 2mn : m2 + n2...
20 KB (1,689 words) - 16:03, 4 May 2025
t} . The curves of this form can be generated by a formula analogous to a formula for generating Pythagorean triples. Let u ( t ) {\displaystyle u(t)} ...
7 KB (1,146 words) - 03:40, 3 August 2025
method allows retrieving Euclid's formula for generating Pythagorean triples. For retrieving exactly Euclid's formula, we start from the solution (−1,...
33 KB (4,809 words) - 14:16, 7 July 2025
all primitive Pythagorean triples are described in Tree of primitive Pythagorean triples and in Formulas for generating Pythagorean triples. The root node...
7 KB (1,070 words) - 07:20, 14 May 2025
et Cosmographie (1711) La Perspective (1711). VIII. Formulas for Generating Pythagorean Triples Bernard Le Bovier de Fontenelle (1790) Eloge de Ozanam...
5 KB (447 words) - 16:58, 2 March 2025
application of the above formula for the square of a binomial is the "(m, n)-formula" for generating Pythagorean triples: For m < n, let a = n2 − m2, b...
4 KB (672 words) - 19:11, 17 May 2025
primitive Pythagorean triples is a mathematical tree in which each node represents a primitive Pythagorean triple and each primitive Pythagorean triple is represented...
14 KB (2,099 words) - 15:32, 20 June 2025
zero (thus allowing Pythagorean triples to be included) with the only condition being that d > 0. In this setting, a Pythagorean quadruple (a, b, c, d)...
11 KB (1,383 words) - 14:21, 5 March 2025
Fibonacci sequence (redirect from Binet's formula)
} Putting k = 2 in this formula, one gets again the formulas of the end of above section Matrix form. The generating function of the Fibonacci sequence...
85 KB (12,946 words) - 22:47, 28 July 2025
Pell number (section Pythagorean triples)
to form Pythagorean triples in which a and b are one unit apart, corresponding to right triangles that are nearly isosceles. Each such triple has the...
28 KB (3,687 words) - 22:59, 24 July 2025
Earth's geodesy and to navigate the oceans since antiquity. Pythagorean triples are triples of integers ( a , b , c ) {\displaystyle (a,b,c)} with the...
101 KB (10,041 words) - 09:53, 17 July 2025
examples: Hindin, H. J. (1983). "Stars, hexes, triangular numbers and Pythagorean triples". J. Rec. Math. 16: 191–193. Deza, Elena; Deza, M. (2012). Figurate...
9 KB (728 words) - 14:40, 18 January 2025
Quadric (section Pythagorean triples)
transforms a Pythagorean triple into another Pythagorean triple, only one of the two cases is sufficient for producing all primitive Pythagorean triples up to...
41 KB (7,423 words) - 17:19, 10 April 2025
Centered square number (section Generating function)
is the hypotenuse of a Pythagorean triple (3-4-5, 5-12-13, 7-24-25, ...). This is exactly the sequence of Pythagorean triples where the two longest sides...
13 KB (805 words) - 21:50, 10 July 2025
Euler brick (category Pythagorean theorem)
infinitude of Euler bricks can be generated with Saunderson's parametric formula. Let (u, v, w) be a Pythagorean triple (that is, u2 + v2 = w2.) Then: 105 ...
18 KB (2,171 words) - 10:35, 30 June 2025
Solver Competition. Cube-and-Conquer was used to solve the Boolean Pythagorean triples problem. Cube-and-Conquer is a modification or a generalization of...
30 KB (3,628 words) - 02:41, 18 July 2025
Integer triangle (section Pythagorean triangles)
three integer sides are known as a Pythagorean triple or Pythagorean triplet or Pythagorean triad. All Pythagorean triples ( a , b , c ) {\displaystyle (a...
41 KB (7,271 words) - 18:11, 23 July 2025
and was later reduced to 850 megabytes. 2016 – Solving the Boolean Pythagorean triples problem required the generation of 200 terabytes of proof. 2017 –...
12 KB (1,551 words) - 22:14, 28 July 2025
Archive for History of Exact Sciences, vol 18. (Staal 1999) (Hayashi 2003, p. 118) (Hayashi 2005, p. 363) Pythagorean triples are triples of integers...
107 KB (13,954 words) - 19:59, 12 July 2025
four consecutive primes (167 + 173 + 179 + 181), the perimeter of a Pythagorean triangle (75 + 308 + 317) and a Harshad number. Nearly all of the palindromic...
28 KB (4,084 words) - 15:17, 10 July 2025
Coprime integers (section Generating all coprime pairs)
(July 2001), "An alternative characterisation of all primitive Pythagorean triples", Mathematical Gazette, 85: 273–275, doi:10.2307/3622017. Klaus Pommerening...
16 KB (2,386 words) - 02:29, 29 July 2025
dated c. 1800 BC. It is a broken clay tablet that contains a list of Pythagorean triples, that is, integers ( a , b , c ) {\displaystyle (a,b,c)} such that...
81 KB (9,977 words) - 15:36, 28 June 2025
680, and 697, forming four right triangle faces described by the Pythagorean triples (153,104,185), (104,672,680), (153,680,697), and (185,672,697). Eight...
10 KB (1,189 words) - 10:25, 10 July 2025
primitive Pythagorean triples (the ones in which the two sides and hypotenuse have no common factor), derive the standard formula for generating all primitive...
6 KB (617 words) - 18:39, 28 May 2025
Brahmagupta (section Pythagorean triplets)
his Brāhmasphuṭasiddhānta, Brahmagupta provides a formula useful for generating Pythagorean triples: 12.39. The height of a mountain multiplied by a given...
44 KB (5,840 words) - 11:12, 27 July 2025
values. In Euclidean geometry, for right triangles the triangle inequality is a consequence of the Pythagorean theorem, and for general triangles, a consequence...
35 KB (5,287 words) - 02:03, 31 July 2025
because of its connections to the square root of 2, almost-isosceles Pythagorean triples, square triangular numbers, Pell numbers, the octagon, and six polyhedra...
33 KB (4,572 words) - 23:04, 23 July 2025