What is the integral of the error function?

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Answer 1 · 2016-02-20T01:39:40

$int"erf"(x)dx = x"erf"(x)+e^(-x^2)/sqrt(pi)+C$

We will use the definition of the error function:

$"erf"(x) = 2/sqrt(pi)int_0^xe^(-t^2)dt$

Let $u = "erf"(x)$ and $dv = dt$

$du = 2/sqrt(pi)e^(-x^2)$ and $v = x$

By the integration by parts formula $intudv = uv - intvdu$

$int"erf"(x)dx = x"erf"(x) - int2/sqrt(pi)xe^(-x^2)dx$

To evaluate the remaining integral, let $u = -x^2$

Then $du = -2xdx$ and so

$-int2/sqrt(pi)xe^(-x^2)dx = 1/sqrt(pi)inte^udu$

$=1/sqrt(pi)e^u + C$

$=e^(-x^2)/sqrt(pi)+C$

Putting it all together, we get our final result:

$int"erf"(x)dx = x"erf"(x)+e^(-x^2)/sqrt(pi)+C$