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[tex][/tex]
1. Compute all the values of [tex] e^ {\pi i} [/tex], indicating clearly whether there is just one or many of them.
Trivially, exp(pi * i) = -1. However, we can also consider e to be the complex number z, and pi * i to be the complex number alpha. Then we get:
[tex]e^{\pi i} = z^{\alpha} = e^{\alpha log(z)}
= e^{\alpha (Log |z| + i arg(z))}
= e^{\pi i (Log |e| + i arg(e))}
= e^{\pi i (1 + i2k\pi)}
= e^{\pi i}e^{-2\pi^{2}k}
= - e^{-2\pi^{2}k}
[/tex]
where k is an integer.
So what exactly is going on here? does exp(pi*i) = -1 or -exp(-2kpi^2)??
P.S. I hope all this tex doesn't mess up :(
1. Compute all the values of [tex] e^ {\pi i} [/tex], indicating clearly whether there is just one or many of them.
Trivially, exp(pi * i) = -1. However, we can also consider e to be the complex number z, and pi * i to be the complex number alpha. Then we get:
[tex]e^{\pi i} = z^{\alpha} = e^{\alpha log(z)}
= e^{\alpha (Log |z| + i arg(z))}
= e^{\pi i (Log |e| + i arg(e))}
= e^{\pi i (1 + i2k\pi)}
= e^{\pi i}e^{-2\pi^{2}k}
= - e^{-2\pi^{2}k}
[/tex]
where k is an integer.
So what exactly is going on here? does exp(pi*i) = -1 or -exp(-2kpi^2)??
P.S. I hope all this tex doesn't mess up :(