\displaystyle{48}^{{\frac{{4}}{{3}}}}\cdot{8}^{{\frac{{2}}{{3}}}}\cdot{\left(\frac{{1}}{{6}^{{2}}}\right)}^{{\frac{{3}}{{2}}}}=\frac{{2}^{{\frac{{13}}{{3}}}}}{{3}^{{\frac{{1}}{{3}}}}} ...

\displaystyle\frac{{{\left({p}+{2}\right)}{\left({p}-{3}\right)}}}{{{3}{\left({p}+{3}\right)}}} Explanation: \displaystyle\frac{{{p}^{{2}}-{p}-{6}}}{{{3}{p}-{9}}}\cdot\frac{{{p}^{{2}}-{9}}}{{{p}^{{2}}+{6}{p}+{9}}} ...

Note that we can start with the sum (where I replaced c with x) \frac{x}{x-1}=\sum_{k=0}^\infty x^{-k} Differentiating and multiplying by x, we get that \frac{x}{(x-1)^2 }= \sum_{k=0}^{\infty} kx^{-k} ...

The Jacobi symbol doesn't tell us that the top number is or is not a quadratic residue. Your calculation is correct, but the fact that \left(\frac{-1}{p^2}\right) = 1 doesn't imply that -1 is a ...

depend on the geometric series , we can get the following to compute the sum {\frac {x^2}{1-x^2}}=\sum _{n=1}^{\infty }x^{2n}\quad {\text{ for }}|x|<1\! {\displaystyle {\frac {x^2}{(1-x^2)^{2}}}=\sum _{n=1}^{\infty }nx^{2n}\quad {\text{ for }}|x|<1\!}

The sum of the k^{th} power of the integers is a polynomial of degree k+1 in n, with leading term \dfrac{n^{k+1}}{k+1}. Indeed, by the binomial theorem, n^k=\sum_{i=1}^ni^k-\sum_{i=1}^{n-1}i^k\sim\frac{n^{k+1}}{k+1}-\frac{(n-1)^{k+1}}{k+1}=n^k+\text{lower degree terms}. ...