Note that \begin{align}\frac{8k}{4k^4+1}&=\frac{8k}{\left(2k^2-2k+1\right)\,\left(2k^2+2k+1\right)}\\&=\frac{2}{2k^2-2k+1}-\frac{2}{2k^2+2k+1}\\&=\frac{2}{2k^2-2k+1}-\frac{2}{2(k+1)^2-2(k+1)+1}\,.\end{align}

\displaystyle{v}_{{1}}=-{6} and \displaystyle{v}_{{2}}=\frac{{3}}{{4}} Explanation: \displaystyle-{4}+\frac{{3}}{{{v}+{7}}}=\frac{{7}}{{{\left({v}-{1}\right)}\cdot{\left({v}+{7}\right)}}} ...

(u+7/u+5)+1=(u+6)/(u+4) One solution was found :                         u ≓ -5.258258879 Rearrange: Rearrange the equation by subtracting what is to the right of the equal sign from both sides of ...

\displaystyle-\frac{{9}}{{41}}+\frac{{40}}{{41}}{i} Explanation: The Given Exp. \displaystyle=\frac{{-\cancel{{{\left({1}-{2}{i}\right)}}}{\left({5}-{4}{i}\right)}}}{{\cancel{{{\left({1}-{2}{i}\right)}}}{\left({5}+{4}{i}\right)}}} ...

See the entire simplification process below Explanation: First, expand the terms in parenthesis by multiplying the by the terms outside their respective parenthesis: \displaystyle{\left(\frac{{1}}{{3}}\right)}{\left({15}{a}+{9}{b}\right)}-{\left(\frac{{1}}{{7}}\right)}{\left({28}{b}-{84}{a}\right)}\to ...

(1/(a-1))+(1/(a-2))=1/(a+4) Two solutions were found :  a =(-8-√120)/2=-4-√ 30 = -9.477  a =(-8+√120)/2=-4+√ 30 = 1.477 Rearrange: Rearrange the equation by subtracting what is to the right of ...