In other words, if x and y are complex (each have the form a+bi), show that x^y can have a real value, or prove that it is impossible.

Note: i is the imaginary value defined as the number that yields -1 when squared. a and b are any real numbers, but b is not 0.

I know that ln(i)=(π/2)*i, but you need to prove it. I know it's true because it comes from the fact that e^(iπ)=-1, but then you'd need to prove that too. If you didn't need to prove it, then you could just say that e^(iπ)=-1 as your example...

Since it needs to be proven, I suppose I should ask you to, but then I'd get a long calculus proof I wouldn't understand... So I'm happy with your proof! Ah... such is the world of complex numbers!

Posted by Tristan on 2003-11-25 19:02:43