5n/n+1+3n-2/n+1 Final result : 3n2 + 7n - 2 ———————————— n Step by step solution : Step  1  : 2 Simplify — n Equation at the end of step  1  : n 2 ((((5•—)+1)+3n)-—)+1 n n Step  2  : n Simplify — n ...

\displaystyle{n}=-\frac{{17}}{{3}} Explanation: Put everything on the least common denominator of \displaystyle{\left({n}+{8}\right)}{\left({n}+{1}\right)} . \displaystyle\frac{{{\left({n}+{5}\right)}{\left({n}+{1}\right)}}}{{{\left({n}+{8}\right)}{\left({n}+{1}\right)}}}=\frac{{{1}{\left({n}+{8}\right)}{\left({n}+{1}\right)}}}{{{\left({n}+{8}\right)}{\left({n}+{1}\right)}}}+\frac{{{6}{\left({n}+{8}\right)}}}{{{\left({n}+{1}\right)}{\left({n}+{8}\right)}}} ...

But when you divide a degree-three polynomial, \,n^3 + 3n^2 + 2n,\, by a degree-one polynomial, \,n+3,\, you end up with a degree two polyonomial n^2 + 2\; with remainder of \quad \frac{-6}{n+3}

\star This is a Telescoping series :- \begin{align}S_n =&\sum_{r=1}^n \dfrac{1}{r(r+2)}\\S_n=&\sum_{r=1}^n \dfrac{1}{2}\left[\dfrac{1}{r}-\dfrac{1}{r+2}\right]\\S_n=&\dfrac{1}{2}\left[\sum_{r=1}^n\left(\dfrac{1}{r}-\dfrac{1}{r+1}\right)-\sum_{r=1}^n\left(\dfrac{1}{r+2}-\dfrac{1}{r+1}\right)\right]\\S_n=&\dfrac{1}{2}\left[\left(1-\dfrac{1}{n+1}\right)-\left(\dfrac{1}{n+2}-\dfrac{1}{2}\right)\right]\\S_n=&\dfrac{1}{2}\left[\dfrac{n}{n+1}-\dfrac{n}{2(n+2)}\right]\\S_n=&\dfrac{n(3n+5)}{4(n+1)(n+2)}\end{align} ...

You can split it one step further as follows: \frac{1}{n(n-1)}=\frac{1}{n-1}-\frac{1}{n},\qquad \frac{1}{(n-1)(n+1)}=\frac{1}{2}\left[\frac{1}{n-1}-\frac{1}{n+1}\right] Now both series ...

Note that a+b+ab=(a+1)(b+1)-1 So, in the end after all operations, we get (a_1+1)(a_2+1) \cdots (a_n+1) -1=\prod_{i=1}^{n}\left(1+\frac1i\right)-1=(n+1)-1=n