New posts in pythagorean-triples

If $A^2+B^2=C^2$ with $A$ odd, $A,B,C$ coprime and $A<B<C$, is $B+C$ a square? [closed]

Fermat's Last Theorem for Negative $n$

Primitive Pythagorean triple divisible by 3

Near-Pythagorean triplets: What are the general solutions to $a^2+b^2=c^2-1$?

proof: primitive pythagorean triple, a or b has to be divisible by 3

Looking for references to Pythagorean triple subsets

Does any given integer only occur in one primitive Pythagorean triple?

Four squares such that the difference of any two is a square?

For integers $x<y<z$, why are these cases impossible for Mengoli's Six-Square Problem?

When is $5n^2+14n+1$ a perfect square?

Is it possible to get arbitrarily near any acute angle with Pythagorean triangles?

Why can't prime numbers satisfy the Pythagoras Theorem? That is, why can't a set of 3 prime numbers be a Pythagorean triplet?

A very different property of primitive Pythagorean triplets: Can number be in more than two of them?

How to find all Pythagorean triples containing a given number?

Can two perfect squares average to a third perfect square? [duplicate]

Pythagorean triplets of the form $a^2+(a+1)^2=c^2$ and the space between them

How do you find Pythagorean triples that approximately correspond to a right triangle with a given angle?

Is $100$ the only square number of the form $a^b+b^a$?

Derivation of Pythagorean Triple General Solution Starting Point:

Where is my error in trying to find Pythagorean triples with matching areas?