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Hello /sci/ I need help with the problem in the picture. I need to show that this equality is true with the given value Gamma(1/2)=sqrt(pi).
Now where do I even begin with this? I've only found a post at
http://math.stackexchange.com/questions/1154366/gamma-function-proof-of-gamma-%CE%931-2-sqrt-pi
but it doesn't really help me. Any hints here please? Thanks.
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>>8083291
With your given value, n is 0. Just plug in and remember 0! is defined as 1.
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Does the recursion formula not work for non-integers?
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Induction.
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>>8083291
At a glance I'd: take the definition of the gamma function, integrate by parts n-times, the final integral should just be the standard Gaussian integral.
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It depends on what you've got to work with OP. Any identities, etc.? Like the ones in wikipedia or that article you point to?
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Okay guys thanks for the replies.
I won't lie, this is pretty tough. I have found a suitable source:
http://www.jekyll.math.byuh.edu/courses/m321/handouts/gammaproperties.pdf
At page 3 this problem is worked, though the last step differs from mine. If all fails, I will just copy it. Perhaps you could help me trying to combine this last step?
I have also thought about gaussian integrals and one identity I often see is Γ(n+1)=nΓ(n). Besides that, we haven't got anything to work with.
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>>8083319
Yes, that's why we like to use gamma to extend factorials
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>>8083339
The last line of that example is equivalent to the formula you posted in the OP
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>>8083342
Oh I see, thanks. Is the gamma function of any importance later on? If yes, then I need to put more effort into this.
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>>8083349
It's just an interesting function. It can be used as a nice example for things like analytic continuation in complex analysis, but it's not vital for anything.
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>>8083358
I understand. Well, I'm off then. Thank you all for the effort!
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