Given an integer x in the interval [1 .. 6], I am looking for two mathematical functions
y2 so that:
- y1(x) ∈ [1 .. 6], y2(x) ∈ [1 .. 6]
- y1(x) ≠ y2(x) ≠ x
- y1(x) and y2(x) are integers
y1(x) = 7-x and
y2(x) = (1+x)%6 where
% is the remainder or modulo operation.
That solution does not work for
x=6. I get
y1(x) = y2(x) = 1, which does not fulfills the condition 2. Neither for
Does anyone sees a working solution?