For calculating Catalan Numbers, I wrote two codes. One (def "Catalan") works recursively and returns the right Catalan Numbers.

```
dicatalan = {}
def catalan(n):
if n == 0:
return 1
else:
res = 0
if n not in dicatalan:
for i in range(n):
res += catalan(i) * catalan(n - i - 1)
dicatalan[n] = res
return dicatalan[n]
```

the other (def "catalanFormula") applies the implicit formula, but doesn't calculate accurately starting from n=30. the problem derives from floating points - for k=9 the program returns "6835971.999999999" instead of "6835972" and from this moment on accumulates mistakes till the final wrong answer.

(print line is for checking)

```
def catalanFormula(n):
result = 1
for k in range(2, n + 1):
result *= ((n + k) / k)
print (result)
return int(result)
```

I tried rounding and failed, tried Decimal import and still got nothing right.

I need the "catalanFormula" work perfectly as "catalan"; Any Ideas?

Thanks!

`(2*n)! / ((n+1)! * n!)`

? It ought to be more accurate because the terms can all be computed with integer arithmetic there only be one final division that involved floating point. – martineau Dec 9 '12 at 12:20`(n+1) * result`

is always an integer. So you can work with integers throughout by: (1) initializing`result`

to`n + 1`

instead of`1`

, (2) replacing the update line with`result = result * (n + k) // k`

, and (3) returning`result // (n + 1)`

instead of`result`

. – Mark Dickinson Dec 9 '12 at 22:06