As an exercise of learning scala and functional programming, I implemented the following non tail-recursive def that calculates the pascal's number at any location. The program itself serves as the definition of pascal's triangle. It looks pictorially as follows

```
1
1 1
1 2 1
1 3 3 1
1 4 6 4 1
1 5 10 10 5 1
...
def pascal(c: Int, r: Int): Int =
if (c == 0 || c == r) 1 else pascal(c - 1, r - 1) + pascal(c, r - 1)
```

However when trying to run for `pascal(25,50)`

on Mac OS X 10.6.8 (2.53 GHz Intel Core 2 Duo) it still hasn't finished running after **20 min**.

Just to compare with erlang, I installed R15B02 and wrote equivalent program as follows:

```
-module(pascal).
-export([calc_pascal/2]).
calc_pascal(0,_) -> 1;
calc_pascal(C,R) when C==R -> 1;
calc_pascal(C,R) when C<R -> calc_pascal(C-1,R-1) + calc_pascal(C-1,R).
```

`pascal:calc_pascal(25,50)`

finishes in **~4sec**.

Why might be the reason for such a huge performance difference? Is jvm not as advanced as erlang runtime for recursive programs?

`calc_pascal(C-1,R)`

should be`calc_pascal(C,R-1)`

– Kim Stebel Sep 23 '12 at 13:01`egregiously sloppy, no-effort-expended post`

, which is clearly not the case... – Lo Sauer Sep 23 '12 at 13:07`def pascal(c: Int, r: Int): BigInt = Seq.iterate(Seq(BigInt(1)), r)(a => (BigInt(0) +: a, a :+ BigInt(0)).zipped.map(_ + _)).last(c)`

(there are more efficient ways to get an individual number, but this simply calculates the whole triangle and returns the relevant cell). – Luigi Plinge Sep 23 '12 at 17:27