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 ...

Note that \alpha = e^{i\pi/3} and \beta=e^{-i\pi/3}. We then have \alpha^n - \beta^n = e^{in\pi/3}-e^{-in\pi/3} = 2i\sin(n\pi/3) This gives us a_n = \dfrac{\alpha^n - \beta^n}{i\sqrt3} = \dfrac2{\sqrt3}\sin\left(n\pi/3\right)

n = \sqrt{n}^2 So in your result you can simplify both numerator and denominator by \sqrt{n} and get the book's result. Or, starting from the book's result, you just have to multiply both by \sqrt{n} ...

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 ...

It is true that \sqrt{3/2} is equal to \sqrt{3}/\sqrt{2}. However, the point of the transformations you give it to have a denominator without root. More generally, for positive a,b it is ...

There is a book around 1968-71 which is a conference proceedings of a Conference in Oxford (maybe "Oxford Symposium on Finite Group Theory", edited by M.B. Powell and G. Higman), in which an article ...