Using Partial Fraction Decomposition \frac{k^2-1}{k^4+k^2+1}=\frac{Ak+B}{k^2-k+1}+\frac{Ck+D}{k^2+k+1} So, k^2-1=k^3(A+C)+k^2(A+B-C+D)+k(A+B+C-D)+B+D Comparing the coefficients of different ...

In general I think this follows, more or less straightly, from Gauss's Lemma, yet , in your case we can try as follows: Suppose \;\alpha\; is an alg. integer, so that there exists a monic polynomial ...

Everything you wrote is correct, though you could have proceeded directly from \frac{1}{\sqrt{7}}\left(\frac{h\pi}{mw}\right)^{-1/4} to \frac{1}{\sqrt{7}}\left(\frac{mw}{h\pi}\right)^{1/4}. ...

Normalization should do the trick. \int^{L}_0|\psi(x)|^2dx=1

By definition a_{n+1} = \frac{1}{1+a_n}. Hence \left|a_{n+1} - \alpha\right| = \left| \frac{1}{1+a_n} - \alpha \right| = \left| \frac{1}{1+a_n} - \frac{\alpha(1+a_n)}{1+a_n} \right| = \left| \frac{1 - \alpha - \alpha a_n}{1+a_n} \right|. ...

We have X=\Bbb R, and X^* is the result of identifying \Bbb Z^+\subseteq\Bbb R to a point; p:X\to X^* is the quotient map. We also have the identity map i:\Bbb Q\to\Bbb Q, and the example is ...