1
$\begingroup$

I really appreciate it if someone help me solving this integral:

$$ \int \frac 1x \cdot \operatorname{Erfc}^n x\, dx,$$

where $\operatorname{Erfc}$ is the complementary error function, defined as $\operatorname{Erfc}=\frac 2{\sqrt \pi}\int_x^{+\infty}e^{-t^2}dt$.

thank you

  • 1
    What $n$? What makes you think a primitive exists, involving only usual functions?2012-03-28
  • 0
    Is $n$ an integer? Real? Complex?! You really should be specific...2012-03-28
  • 0
    n is a real number2012-03-28
  • 0
    Do you need the indefinite integral (as stated), or the definite integral, e.g., from 0 to $\infty$?2012-08-11

1 Answers 1