# Factorial of 170+

everytime I try to get the factorial of 171, I get INF. 170 works fine. Is it possible to get the factorial of 171+ in a script? How? My function:

``````function factorial(\$n) {
if (\$n == 0) return 1;
return \$n * factorial(\$n - 1);
}
``````
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You'll have to use BC Math or GNU MP extension. PHP doesn't provide any tools for high-values or high-precision operations OOTB.

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If you deal with very large numbers, you'll need to use an extension that allows you to do that.

There's BCMath ( http://www.php.net/manual/en/book.bc.php) , and GMP ( http://www.php.net/manual/en/book.gmp.php ).

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The GNU MP extension even offer a `gmp_fact()` function to compute large factorials out of the box. –  Alexandre Jasmin Nov 22 '10 at 20:09

You are probably getting a value that exceeds the maximum double precision float in a 32-bit machine (`~10^308`). 170! factorial is `~7.25741562 × 10^307` which is just under that, however, 171! is larger. Your best bet is to use one of the libraries EboMike or Crozin recommends in their answers.

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``````echo "1241018070217667823424840524103103992616605577501693185388951803611996075221691752992751978120487585576464959501670387052809889858690710767331242032218484364310473577889968548278290754541561964852153468318044293239598173696899657235903947616152278558180061176365108428800000000000000000000000000000000000000000"
``````

really though, your function is fine. I think PHP lacks that kind of precision. I got the value (it is correct btw) in python

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I don't need the 171 factorial, I need the script, which could count that :) –  Tom Nov 22 '10 at 20:07
open up terminal. type 'python' type 'import math' type 'math.factorial(171)'. you can't do it in PHP without an extension like @Crozin and @EboMike mentioned –  jon_darkstar Nov 22 '10 at 20:08
Even google won't do 171, it stops at 170. –  DampeS8N Nov 22 '10 at 20:29
Cool... Calc.exe actualy beats google here? –  Heiko Hatzfeld Nov 22 '10 at 21:32
lol, yes. A calculator actually beats a search engine at math. Go figure. –  webbiedave Nov 22 '10 at 21:59

For large n, you can compute n! very quickly with little error using Stirling's approximation. Take a look at this post; it has an analysis of the function and some sample code:

http://threebrothers.org/brendan/blog/stirlings-approximation-formula-clojure/

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