Integral of a partial derivative.

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SUMMARY

The discussion centers on the integral of a partial derivative, specifically the expression \(\int^{∞}_{∞} \frac{\delta^{n}}{\delta a}f(a,b,c)da\) and its relation to \(\int^{∞}_{∞} f(a,b,c)da\). The user seeks to rewrite the former in terms of the latter for \(n=1, 2, 3\). A key insight provided is that the integral of a derivative yields the original function, which clarifies the user's confusion regarding the transformation of the integral.

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Mento
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Hi! :smile:

I have the following integral

[itex]\int^{∞}_{∞} \frac{\delta^{n}}{\delta a}f(a,b,c)da[/itex]

there is any way to rewrite it in terms of:

[itex]\int^{∞}_{∞} f(a,b,c)da[/itex]

I want to evaluate it for the case of n=1,2 and 3.

Thanks you so much.
 
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An integral of a derivative is the function itself. I am confused as to what you want.
 

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