Full proof: ![[Image: 9mnetnt.png]](http://mathurl.com/9mnetnt.png)
Additional resource:
![[Image: 943lpmy.png]](http://mathurl.com/943lpmy.png)
Basically just do the same thing you do for a normal partial fraction problem, just with 10x more symbols and a little bit of reasoning. There's a sketchy part in expressing the product from m=1 to j-1 when j can very well be 1. I can easily do a piece-wise solution (when j = 1, when j = n, and otherwise), but you get the idea of the proof anyway. And by "two of the three terms", I mean either the A1 term remains, or the An term remains, or Aj remains where 1 < j < n. Better wording should say "all but one term get eliminated" instead.
EDIT: Long time no see, guys.
![[Image: 9mnetnt.png]](http://mathurl.com/9mnetnt.png)
Additional resource:
![[Image: 943lpmy.png]](http://mathurl.com/943lpmy.png)
Basically just do the same thing you do for a normal partial fraction problem, just with 10x more symbols and a little bit of reasoning. There's a sketchy part in expressing the product from m=1 to j-1 when j can very well be 1. I can easily do a piece-wise solution (when j = 1, when j = n, and otherwise), but you get the idea of the proof anyway. And by "two of the three terms", I mean either the A1 term remains, or the An term remains, or Aj remains where 1 < j < n. Better wording should say "all but one term get eliminated" instead.
EDIT: Long time no see, guys.

