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An integer triangle or integral triangle is a triangle all of whose side lengths are integers. A rational triangle is one whose side lengths are rational numbers ; any rational triangle can be rescaled by the lowest common denominator of the sides to obtain a similar integer triangle, so there is a close relationship between integer triangles ...
A Heronian triangle is commonly defined as one with integer sides whose area is also an integer. The lengths of the sides of such a triangle form a Heronian triple ( a, b, c ) for a ≤ b ≤ c . Every Pythagorean triple is a Heronian triple, because at least one of the legs a , b must be even in a Pythagorean triple, so the area ab /2 is an ...
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In geometry, a Heronian triangle (or Heron triangle) is a triangle whose side lengths a, b, and c and area A are all positive integers. [ 1 ] [ 2 ] Heronian triangles are named after Heron of Alexandria , based on their relation to Heron's formula which Heron demonstrated with the example triangle of sides 13, 14, 15 and area 84 .
Pages in category "Types of triangles" The following 22 pages are in this category, out of 22 total. ... Integer triangle; Isosceles triangle; K. Kepler triangle; R ...
A Pythagorean triple is a set of three positive integers a, b, and c having the property that they can be respectively the two legs and the hypotenuse of a right triangle, thus satisfying the equation + =; the triple is said to be primitive if and only if the greatest common divisor of a, b, and c is one.
Similar to a Pythagorean triple, an Eisenstein triple (named after Gotthold Eisenstein) is a set of integers which are the lengths of the sides of a triangle where one of the angles is 60 or 120 degrees. The relation of such triangles to the Eisenstein integers is analogous to the relation of Pythagorean triples to the Gaussian integers.
Irrespective of where the 45 degree angle occurs in a triangle, the answer is always no. By the law of cosines, every angle of an integer triangle has a rational cosine and the cosine of 45 degrees is irrational. See beginning of article. Frank M. Jackson 08:23, 4 February 2018 (UTC)