Prove the operator d/dx is hermitian

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baldywaldy
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Hiya :) the title is meant to be prove it isn't hermitian

Homework Statement


Prove the operator d/dx is hermitian


Homework Equations


I know that an operator is hermitian if it satisfies the equation : <m|Ω|n> = <n|Ω|m>*


The Attempt at a Solution


Forgive the lack of latex , I have know idea how to use it and find it baffling.

the intergral of (fm* d/dx fn) dx = the intergral of fm* d fn
={fm* fn - the intergral of fn d fm*} between the limits x=infinity and - infinity.

This is where i get stuck. I just don't know where to go from here, like i said sorry for the lack of latex usage :(.

Thanks for the help :D
 
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I know intergration by parts but i just don't understand how to apply in this situation because there are two functions and an operator