# Large factorial using BigIntegers losing precision

It'sa me, with another problem.

I need to calculate a factorial of a really huge number, lets assume it is 95. So as we all know 95! equals to:

10329978488239062144133688859495761720042551046933218543167809699858950620982142410696539365993509132394773015016946331626553858953528454377577119744

I have used a simple method calculating factorials using BigIntegers that I found somewhere around here few months ago:

public static BigInteger FactorialTest(BigInteger x)
{
if (x == 0)
return 1;

BigInteger res = x;
x--;
while (x > 1)
{
res *= x;
x--;
}
return res;
}


And only got a rounded up number:

10329978488239059262599702099394727095397746340117372869212250571234293987594703124871765375385424468563282236864226607350415360000000000000000000000

Next step was using the builtin BigInteger methods for addition, multiplication etc, hoping it will fix the problem - no still did not work.

Last thing I tried was using code of someone smarter, so reached for SolverFoundation, unfortunately

Microsoft.SolverFoundation.Common.BigInteger.Factorial(95)

still returns the rounded up number.

Is there anything I am missing that could get me the proper result? I really hoped BigIntegers would not lose precision like that.

• Where did you get the expected results? You are multiplying by 10,20,30,40,50,60,70,80,90 so you should have at least 9 zeroes on the end. Commented Aug 23, 2018 at 9:38
• According to Wolframalpha we don't all know that 95! is the result you think it is. Where did you get that wrong number from? Commented Aug 23, 2018 at 10:00
• btw, only the first 15 digits match! That is a huge difference, not just a rounding issue. Commented Aug 23, 2018 at 10:04
• @jdweng holy, how could I missed that, thanks! The wrong number came from octave, guess I missed something (used num2str(factorial(95))) to get the result. Commented Aug 23, 2018 at 10:12