I think the others have given fine answers, but since they haven't been accepted I'll offer one more. Perhaps the piece you're missing (I'm guessing) is this: So if a^x=a^y is true, shouldn't it ...

Do you really want a demonstration? Here we go We’ll start by defining the Taylor series for a function f and a value x (x \in \mathbb C) at point a (a \in \mathbb C) as (if we note f^{(n)} ...

The core idea with the \propto short-cut is that in Bayesian posterior calculations, you can drop any multiplicative *constant* because you know you will recover the right constant in imposing ...

{\cal L}\left(u(t-c)f(t-c)\right)=e^{-cs}{\cal L}(f) now let c=1: {\cal L}\left(u(t-1)e^{t-1}\right)=e^{-s}\dfrac{1}{s-1}

If F(s) = \int_{-\infty}^\infty f(t) e^{-st}dt converges for Re(s) > \sigma_0 with f(t) e^{-\sigma_0 t} \in L^1, then (by the Fourier inversion theorem) it is always true that for \sigma > \sigma_0 ...

Viewing it as a singular simplex, the identity i_n: \Delta^n \to \Delta^n is a cycle by the definition of singular homology: its boundary \partial i_n is sum with the alternating signs of the ...