I have this problem where I need to rewrite the logarithmic form of Stirling's series ln &#x20

Kapalci

Kapalci

Answered question

2022-06-22

I have this problem where I need to rewrite the logarithmic form of Stirling's series
ln ( z ! ) = 1 2 ln ( 2 π ) + ( z + 1 2 ) ln ( z ) z + 1 12 z 1 360 z 3 + 1 1260 z 5 . . .

Answer & Explanation

Esteban Johnson

Esteban Johnson

Beginner2022-06-23Added 15 answers

We have
log ( z ! ) 1 2 log ( 2 π ) + ( z + 1 2 ) log z z + 1 12 z 1 360 z 3 + .
Taking the exponential of both sides gives
z ! exp ( 1 2 log ( 2 π ) + ( z + 1 2 ) log z z + 1 12 z 1 360 z 3 + ) = exp ( log ( 2 π z z + 1 / 2 e z ) ) exp ( 1 12 z 1 360 z 3 + ) = 2 π z z + 1 / 2 e z exp ( 1 12 z 1 360 z 3 + ) .
To finish the derivation, we use the Maclaurin series of the exponential:
exp ( 1 12 z 1 360 z 3 + ) = 1 + ( 1 12 z 1 360 z 3 + ) + ( 1 12 z 1 360 z 3 + ) 2 2 + = 1 + 1 12 z + 1 288 z 2 139 51840 z 3 .

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