Thread: Most likely simple Math question 'bout sums

First you need to split it into partial fractions (I'm gonna use "r" so I don't get confused), so:

1/(r(r+1)) = 1/r - 1/(r+1)

Now write Sum(thing) =

1/1 - 1/2 (that's putting r=1)
+1/2 - 1/3 (r=2)
+1/3 - 1/4
etc...
+1/(n-1) - 1/n (r=n-1)
+1/n - 1/(n+1) (r=n)

Notice that for each line, the first term will cancel with the second on the line before, so the -1/2 cancels with the 1/2 etc... However for the first line, there is no line before, so the first term on the first line doesn't cancel. Also after the last line there are no more lines (!) so the second term of the last line can't cancel.

So the answer is whatever's left:

1 - 1/(n+1)

Well the other common way of doing finite sums is to put the thing in terms of powers of r: such as r, r², r³, etc, the formulae for the sum from 1 to n of which are known, or runs of r: r, r(r+1), r(r+1)(r+1), etc, for which the formulae are also known. I can't see how you'd apply that here though.