For this problem, we'll define a superset of the repunit numbers which we shall call repnums, which are composed of repeated numbers. That is, if we denote repnums by 
, then x is the number to be repeated and n is the number of repetitions. Hence, 
, 
, 
and so on.
, then x is the number to be repeated and n is the number of repetitions. Hence, , , and so on.We can see from the figure below that 
can be a hypotenuse of a right triangle with integer sides (Pythagorean Triangle).
can be a hypotenuse of a right triangle with integer sides (Pythagorean Triangle).
In fact, this is the only Pythagorean triangle that can be formed with hypotenuse equal to . There is also only one Pythagorean triangle with hypotenuse equal to 
, that is the triangle with sides 
, while there are seven Pythagorean triangles with hypotenures of 
, with legs as follows:
. There is also only one Pythagorean triangle with hypotenuse equal to , that is the triangle with sides , while there are seven Pythagorean triangles with hypotenures of , with legs as follows:
Create the function, 
, that counts the number of Pythagorean triangles that can be formed with hypotenuse equal to .
, that counts the number of Pythagorean triangles that can be formed with hypotenuse equal to .Solution Stats
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I think test 2 might be wrong. C(1,1) should be 0, but I believe you are counting it as 1.