Question

Find the sum of the series: `sum_{n=5}^ ∞ 6 / (n^2 - 3n)` ?

`sum_{n=5}^ ∞ 6 / (n^2 - 3n)`
Also, I was wondering if it can be solved as a telescoping series?

Answer 1

`= 13/6`

Explanation:

`6/( n(n-3) ) = A/ n + B/(n-3)`

`=> 6 = A(n-3) + Bn`

`n = 3`

`=> 6 = 3B => B = 2`

`n = 0`

`6 = -3A => A = -2`

`=> sum_(n=5) ^(oo) (2/(n-3) -2/n)`

Using method of differences:

`n = 5 : 2/2 cancel(- 2/5 )`

`n = 6: 2/3 cancel(- 2/6)`

`n = 7: 2/4 cancel(- 2/7)`

`n = 8: cancel( 2/5) cancel(- 2/8)`

`.`
`.`
`.`
`.`
`n = r-3 : cancel(2/(r-6)) cancel(- 2/(r-3)`

`n = r-2 :cancel( 2/(r-5)) - 2/(r-2)`

`n = r-1 : cancel(2/(r-4)) - 2/(r-1)`

`n = r: cancel(2/(r-3)) - 2/r`

`=> sum_(n =5 ) ^r 6/(n^2 - 3n )`

`= 2/2 + 2/3 + 2/4 - 2/(r-2) - 2/(r-1) - 2/r`

`=> sum_(n =5 ) ^oo 6/(n^2 - 3n ) = lim_(r to oo) sum_(n =5 ) ^r 6/(n^2 - 3n )`

`= 2/2 +2/3 + 2/4`

`= 13/6`