1/3v+5/6=17/6 One solution was found :                   v = 6 Rearrange: Rearrange the equation by subtracting what is to the right of the equal sign from both sides of the equation : ...

\displaystyle{\frac{{{1}}}{{{2}}}} Explanation: \displaystyle{\left(-{\frac{{{15}}}{{{18}}}}\right)}+{1}{\frac{{{1}}}{{{3}}}} Write the mixed fraction in improper form by multiplying the ...

1/3-87/100 Final result : -161 ———— = -0.53667 300 Step by step solution : Step  1  : 87 Simplify ——— 100 Equation at the end of step  1  : 1 87 — - ——— 3 100 Step  2  : 1 Simplify — 3 Equation at ...

\displaystyle{c}={1} Explanation: \displaystyle\frac{{1}}{{3}}{\left({9}{c}-{36}\right)}=-{9} \displaystyle\frac{{1}}{{3}}\cdot{9}{c}-\frac{{1}}{{3}}\cdot{36}=-{9} \displaystyle{3}{c}-{12}=-{9} ...

Substitute z = e^{-t}, \begin{align} \int_0^1 \frac{\log z}{z^3-1} dz &= \int_0^\infty t \frac{e^{-t}}{1-e^{-3t}}dt =\int_0^\infty t \left(\sum_{k=0}^\infty e^{-(3k+1)t}\right) dt\\ \color{blue}{\text{by Tonelli}\;\rightarrow}\quad &= \sum_{k=0}^\infty \int_0^\infty te ^{-(3k+1)t} dt\\ &= \sum_{k=0}^\infty \frac{1}{(3k+1)^2} = \frac19 \sum_{k=0}^\infty \frac{1}{(k+\frac13)^2}\\ &= \frac19 \zeta\left(2,\frac13\right) \end{align} ...

\begin{align*} \\\frac{d}{du}\frac{g(u)}{h(u)} &= \frac{g'(u)h(u)-g(u)h'(u)}{h(u)^2}\ \ \ (1) \\\frac{d}{du}\frac{u}{1+\ln(u)} &= \frac{1*(1+\ln(u))-u*(0+\frac{1}{u})}{(1+\ln(u))^2} \\\\\frac{d}{du}\frac{u}{1+\ln(u)} &= \frac{\ln(u)}{(1+\ln(u))^2} \end{align*} ...