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Ok so I just proved 1 = -1. Someone help me find my error.
Hi guys. First post in this forum.
Working on a problem set recently, a few friends and I accidentally discovered a proof of -1=1, and for the life of us we can't find out what we did wrong. And it's not like we're math slouches either; we're all graduate students in physical/theoretical chemistry. From what I understand posting TeX doesn't work on 2+2, so you'll have to follow my algebra. Start with the identity (E-V)^(1/2) = (E-V)^(1/2) Now multiply each side by -1, except on the RHS substitute i^2 for -1 (where i of course is the imaginary number). (-1)(E-V)^(1/2) = (i^2)(E-V)^(1/2) Now divide through by i (-1/i)(E-V)^(1/2) = i*(E-V)^(1/2) But since i is just the square root of -1, we can subsume it into the square root of E-V (-1)[(E-V)/-1]^(1/2) = [(-1)(E-V)]^(1/2) and then rearrange the interior of the square root to find (-1)(V-E)^(1/2) = (V-E)^(1/2) or -1 = 1. No dividing by zero in this proof either. Where did I make a mistake? The Doc |
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