Rational Triangles

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A rational triangle can be defined as one having all sides with rational length.

Rational Right Triangles - Early Solutions

In Śulba solution for the equation -------(1) is available. Baudhāyana (c. 800 B.C.), Āpastamba and Kātyāyana (c. 500 B.C.) gave a method for the transformation of a rectangle into a square, which is the equivalent of the algebraical identity.

where m, n are any two arbitrary numbers. Thus we get

substituting p2,q2 for m, n respectively in order to eliminate the irrational quantities, we get

which gives the rational solution of (1).

Kātyāyana gives a very simple method for finding a square equal to the sum of a number of other squares of the same size which gives us with another solution of the rational right triangle.

Kātyāyana says: "As many squares (of equal size) as you wish to combine into one, the transverse line will be (equal to) one less than that; twice a side will be (equal to) one more than that; (thus) form (an isosceles) triangle. Its arrow (i.e., altitude) will do that."

<Triangle picture to be added here>

For combining n squares of sides a each we form the isosceles triangle ABC such that and

Then which gives the formula

put m2 for n in order to make the sides of the right angled triangle without the radical, we have

which gives the rational solution of (1).