Let me explain then in layman's terms. Assumption of a false believe to be true can be used with very little rigor to prove that anything can be true.
So we'll take two statements, one false and one true by inverse, and we'll claim them to BOTH be true (since all false statements have a true counterpart).
Statement A = All decent raiders are in TMO
Statement B = Not all decent raiders are in TMO
Then we'll take an obviously false statement:
Statement C = The Easter Bunny lays golden eggs.
Then we can do a little of proofing:
A = TRUE;
B = TRUE
(A || C) = TRUE;
But B is also true, and !B = A, so C must be true, since this becomes
( B! || C ) = TRUE, with B being true and !B must be false.
Therefore, C must be true and the Easter Bunny is in fact shitting golden eggs right now.
As you can see, C can be any argument.
Just something to ponder.
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