I can't solve 200! with Matlab. When I use the factorial
function I get an answer of just inf
. How can I find this?
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1Do you need a precise answer or an approximation?– wvdzOct 19, 2014 at 18:06
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2Actually I want to compare stirling's approximation and real result use with matlab for my assignment– FatihOct 19, 2014 at 19:51
3 Answers
In R2012a, and later, using the Symbolic Math toolbox and sym/factorial:
factorial(sym(200))
which returns the exact value of 200!
788657867364790503552363213932185062295135977687173263294742533244359449963403342920304284011984623904177212138919638830257642790242637105061926624952829931113462857270763317237396988943922445621451664240254033291864131227428294853277524242407573903240321257405579568660226031904170324062351700858796178922222789623703897374720000000000000000000000000000000000000000000000000
This matches the answer returned by Wolfram Alpha.
The factorial of n
is given exactly by gamma(n+1)
, where gamma
is Euler's gamma function. The problem is that the actual result in this case exceeds realmax
, so gamma(201)
outputs inf
. To solve that, use variable-precision arithmetic (function vpa
, which is part of the Symbolic Toolbox):
>> gamma(vpa(200)+1)
ans =
7.8865786736479050355236321393219*10^374
This computes the result with an accuracy of d
decimal digits, where d
is set by the function digits
(thanks to @horchler for reminding me of that). By default that's 32 digits. To increase that number,
>> digits(60);
>> gamma(vpa(200, 20)+1)
ans =
7.88657867364790503552363213932185062295135977687173263294743*10^374
Alternatively, you could use vpa
with the factorial definition:
>> prod(vpa(1:200, 50))
ans =
7.8865786736479050355236321393219*10^374
A third possibility is to directly use factorial(vpa(200))
. However, this may not work for old Matlab versions, such as R2010b, in which factorial
doesn't seem to accept a symbolic input.
-
1FYI,
factorial(vpa(200))
works in newer versions. You should indicate that the results produced byvpa
are an approximation and depends on the value ofdigits
.– horchlerOct 19, 2014 at 19:41
Approximation:
You can find a value using Stirling's approximation. It is very accurate for large factorials.
The forumla is
ln(n!) = nln(n) - n +O(ln(n))
Precise Answer:
Use this function called fact. It calculates factorial above 170.
Example:
fact(double(200))
Answer: 788657867364790503552363213932185062295135977687173263294742533244359449963403342920304284011984623904177212138919638830257642790242637105061926624952829931113462857270763317237396988943922445621451664240254033291864131227428294853277524242407573903240321257405579568660226031904170324062351700858796178922222789623703897374720000000000000000000000000000000000000000000000000
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1Looking at the code for that
fact
function, it seems like it's nothing more thansym/factorial
. Since the code appears to be pre-R2012a, I'm guessing that the slightly awkward method used was necessary to evaluate symbolic factorials prior tosym/factorial
being explicitly exposed.– horchlerOct 20, 2014 at 2:33 -
You should probably link to the actual formula, not the relationship: upload.wikimedia.org/math/5/0/0/…– rayryengNov 16, 2014 at 16:51