Antiderivative of an even function

filter54321
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Is the antiderivative of an even function even? Specifically, given an even function g(x)=g(-x) will the following function be even? Odd?

For constant a>0, r a dummy variable

h(x,t) = Definite Integral [ g(r) dr, FROM x-at TO x+at]

Asking whether or not h(x,t)=h(-x,t)


This is the last bit to a larger PDE problem and it's not coming to me...
 
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Ignore the first part. Sine/cosine is a simple counterexample. Still wondering about the second part.

Thanks
 
If the function is even, yes. [x-at,x+at] and [-x-at,-x+at] cover mirror images of the real line.
 
[tex]h(x,t) = \int_{x-at}^{x+at}g(r)\,dr[/tex]

and [itex]g[/itex] is even

[tex]h(x,-t) = \int_{x+at}^{x-at}g(r)\,dr = -h(x,t)[/tex]

[tex]h(-x,-t) = \int_{-x+at}^{-x-at}g(r)\,dr[/tex]

Let [itex]s = -r[/itex], [itex]ds = -dr[/itex]

[tex]h(-x,-t) = -\int_{x-at}^{x+at}g(-s)\,ds = -h(x,t)[/tex]

So

[tex]h(-x,t) = -h(-x,-t) = h(x,t)[/tex]
 

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