Derivative of Gamma Function: Finding the Mistake?

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SUMMARY

The discussion focuses on the calculation of the derivative of the Gamma function, specifically the mistake made in differentiating with respect to the wrong variable. The user initially derived the derivative as (d/dz)Gamma[z] = Gamma[z], which is incorrect. The correct approach involves using logarithmic differentiation, leading to (d/dz)t^(z-1) = t^(z-1) ln t. The user acknowledges this error and expresses difficulty in calculating the resulting integral for integer parameter values.

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I have tried to calculate the derivative of Gamma function and got a strange result, which
is obviously wrong. Can someone find the mistake?

Definition:
Gamma[z]=Integral[t^(z-1)exp(-t)dt]

Derivative:
(d/dz)Gamma[z]=Integral[(d/dz)t^(z-1)exp(-t)dt]=Integral[(z-1)t^(z-2)exp(-t)dt]=
(z-1)*Gamma[z-1]=Gamma[z]

Looks like gamma solves the equation f'=f, but this can't be true, since only
exponential function solves this equation.
 
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Your problem is with (d/dz)t^(z-1). What you computed is really (d/dt)t^(z-1). You need to use logarithmic differentiation: (d/dz)t^(z-1) = t^(z-1) ln t
 
You are right, I derived with respect to the wrong variable. I wanted to calculate the derivative of gamma at least at integer parameter values, but it seems I won't be able to do this, since I can't calculate the resulting integral.
 

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