n2-5n+4/n-4 Final result : n3 - 5n2 - 4n + 4 ————————————————— n Reformatting the input : Changes made to your input should not affect the solution:  (1): "n2"   was replaced by   "n^2". Step by ...

n+3/4=19/20 One solution was found :                   n = 1/5 = 0.200 Rearrange: Rearrange the equation by subtracting what is to the right of the equal sign from both sides of the equation : ...

w4/3w2/3w1/3 Final result : w7 —— 27 Reformatting the input : Changes made to your input should not affect the solution:  (1): "w1"   was replaced by   "w^1".  2 more similar replacement(s). Step ...

\displaystyle\frac{{1}}{{37}}{\left({34}+{19}{i}\right)} Explanation: We have \displaystyle{\frac{{-{4}+{5}{i}}}{{-{1}+{6}{i}}}} \displaystyle={\frac{{\sqrt{{{41}}}{e}^{{{i}{\left(\pi-{{\tan}^{{-{1}}}{\left(\frac{{5}}{{4}}\right)}}\right)}}}}}{{\sqrt{{{37}}}{e}^{{{i}{\left(\pi-{{\tan}^{{-{1}}}{\left({6}\right)}}\right)}}}}}} ...

\begin{align} \sum_{r=1}^{2n-1}S_r^2&=\sum_{r=1}^{2n-1}\left(\frac r{1-\frac 1{r+1}}\right)^2\\ &=\sum_{r=1}^{2n-1}(r+1)^2\\ &=\sum_{r=2}^{2n}r^2\\ &=\frac 16 (2n)(2n+1)(4n+1)-1\\ &=\boxed{\frac {n(2n+1)(4n+1)}3}-1\\ &=\frac {8n^3+6n^2+n-3}3\\ &=\frac {(2n-1)(4n^2+5n+3)}3\end{align}

Quite so. There are indeed \binom {11}{2} equally probable ways to select places for the two white balls . That is 55. The event labeled \{X=x\} consists of some arrangement in this outcome ...