Note: Avoiding a small calculation error in OPs work in 4.) and considering a small trick in 6.) will close the gap. Here's a calculation: \begin{align*} \binom{-\frac{1}{2}}{r} ...

Let b \in \mathbb{Z}_p^*, and let a \in \mathbb{Z} such that \gcd(a, p - 1) = 1. Then by Euler's theorem we have a^{\varphi(p-1)} \equiv 1 \pmod {p-1}. Then \left(b^{a^{\varphi(p-1)-1}}\right)^a = b^{a^{\varphi(p-1)}} \equiv b \pmod p ...

Slant asymptote: \displaystyle{2}{x}+{y}-{4}={0} Vertical asymptote { \displaystyle\uparrow{x}=-{2}\downarrow . The asymptotes design proximity ( getting the graph closer ), as the end ...

\displaystyle\frac{{x}}{{\left({1}+{x}\right)}^{{4}}}=\frac{{1}}{{6}}{\sum_{{\nu={0}}}^{\infty}}{\left(-{1}\right)}^{{\nu+{1}}}\nu{\left(\nu+{1}\right)}{\left(\nu+{2}\right)}{x}^{\nu} for \displaystyle{\left|{x}\right|}{<}{1} ...

The answer is \displaystyle\frac{{x}}{{{\left({x}-{1}\right)}{\left({x}^{{2}}+{4}\right)}}}=\frac{{1}}{{{5}{\left({x}-{1}\right)}}}+\frac{{-{x}+{4}}}{{{5}{\left({x}^{{2}}+{4}\right)}}} ...

Note that \frac {2x}{x-1}-\frac {x^2}{(x-1)^2}=\frac {2x(x-1)-x^2}{(x-1)^2}=\frac {x^2-2x}{(x-1)^2}