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  </channel><item rdf:about="https://www.johndcook.com/blog/2010/08/16/how-to-compute-log-factorial/">
    <title>How to compute log factorial</title>
    <dc:date>2018-11-20T22:37:42+00:00</dc:date>
    <link>https://www.johndcook.com/blog/2010/08/16/how-to-compute-log-factorial/</link>
    <dc:creator>arsyed</dc:creator><dc:subject>tips numeric gamma logarithm factorial</dc:subject>
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    <title>How to calculate binomial probabilities</title>
    <dc:date>2018-11-20T22:09:25+00:00</dc:date>
    <link>https://www.johndcook.com/blog/2008/04/24/how-to-calculate-binomial-probabilities/</link>
    <dc:creator>arsyed</dc:creator><dc:subject>tips numeric probability binomial factorial gamma</dc:subject>
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<item rdf:about="http://www.johndcook.com/blog/2011/06/10/stirling-approximation/?">
    <title>Simpler version of Stirling’s approximation (John Cook)</title>
    <dc:date>2011-06-14T20:47:40+00:00</dc:date>
    <link>http://www.johndcook.com/blog/2011/06/10/stirling-approximation/?</link>
    <dc:creator>arsyed</dc:creator><dc:subject>math approximation stirling factorial</dc:subject>
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<item rdf:about="http://www.johndcook.com/blog/2010/08/16/how-to-compute-log-factorial/">
    <title>How to compute log factorial (John Cook)</title>
    <dc:date>2010-08-18T19:01:30+00:00</dc:date>
    <link>http://www.johndcook.com/blog/2010/08/16/how-to-compute-log-factorial/</link>
    <dc:creator>arsyed</dc:creator><description><![CDATA["In summary, one way to compute log factorial is to pre-compute log(n!) for n = 1, 2, 3, … 256 and store the results in an array. For values of n ≤ 256, look up the result from the table. For n > 256, return

(x – 1/2) log(x) – x + (1/2) log(2 π) + 1/(12 x)

with x = n + 1."
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<dc:subject>math numeric approximation logarithm factorial</dc:subject>
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    <title>Evolution of a Python programmer.py</title>
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    <link>http://gist.github.com/289467</link>
    <dc:creator>arsyed</dc:creator><dc:subject>python programming factorial humor</dc:subject>
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    <title>The gamma function (John Cook)</title>
    <dc:date>2009-01-15T10:15:05+00:00</dc:date>
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    <dc:creator>arsyed</dc:creator><dc:subject>math factorial gamma function plots</dc:subject>
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<item rdf:about="http://programming.reddit.com/info/1xzt7/comments/c1y1kg">
    <title>How to calculate binomial coefficients (efficiently) (reddit.com)</title>
    <dc:date>2007-06-21T23:23:18+00:00</dc:date>
    <link>http://programming.reddit.com/info/1xzt7/comments/c1y1kg</link>
    <dc:creator>arsyed</dc:creator><description><![CDATA[Nice method of trading additions for multiplications in calculating factorials.
]]></description>
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