You use the fact that (x^a)^b = x^{ab}, a fact that is only true for x>0. In fact, for negative values of x, the term x^{a} is only really properly defined for integer values of a, so even ...

A very nice question! Lots of maths involved, but easy to do with the use of a clever technique, Thanks Tony B \displaystyle-{3.5}\times{10}^{{0}},-\frac{{10}}{{3}},-{3}\frac{{1}}{{4}},-\sqrt{{10}}-{2.95} ...

In general, (x+y)^{1/3}\ne x^{1/3}+y^{1/3} For example, take x=y=1. If this weren't true, we'd have \sqrt[3]2=2. In fact, if x and y are positive, we have: (x+y)^{1/3}<x^{1/3}+y^{1/3}

Even though your integration method seems wrong, like David Hammen pointed out, the results look do not look wrong. The problem rely lies with the way you define your ellipse. Your definition for the ...

Dedekind zeta functions of non-imaginary quadratic number fields are more complicated. There is how you'll show \zeta_{\mathbb{Q}(\sqrt{3})}(s)= \sum_{I \subset \mathbb{Z}[\sqrt{3}]} N(I)^{-s}= \!\!\!\!\!\!\!\!\!\!\!\! \sum_{n+m\sqrt{3} \in \mathbb{Z}[\sqrt{3}]^*/\mathbb{Z}[\sqrt{3}]^\times}\!\!\!\!\!\! \!\!\! N(n+m\sqrt{3})^{-s} = \!\!\!\! \!\!\!\!\!\!\sum_{n+m\sqrt{3} \in \mathbb{Z}[\sqrt{3}]^*/(2-\sqrt{3})^\mathbb{Z}}\!\!\!\!\!\! |n^2-3m^2|^{-s} ...

The theorem you're after is the Kummer-Dedekind theorem: Theorem : Let p be a prime, and let \beta\in \mathcal O_K be such that K=\mathbb Q(\beta) and p\nmid (\mathcal O_K:\mathbb Z[\beta]). ...