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Math junior two questions prove absurd: if the product of two integers is even, then at least one of these two integers is even.
Assumption is not valid: if the first odd number is m and the second odd number is n, then m = 2a+ 1(a is an integer) and n = 2 b+ 1, so Mn = (2a+1) (2b+1) 4ab+2.
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