Primitive of Inverse Hyperbolic Cosine of x over a over x

Theorem

 * $\ds \int \frac {\cosh^{-1} \dfrac x a \rd x} x = \begin {cases}

\ds \frac {\ln^2 \paren {\dfrac {2 x} a} } 2 + \sum_{k \mathop \ge 0} \frac {\paren {2 k + 1}!} {2^{2 k} \paren {k!}^2 \paren {2 k + 1}^3 \paren {2 k}^2} \paren {\frac a x}^{2 k} + C & : \cosh^{-1} \dfrac x a > 0 \\ \ds \frac {-\ln^2 \paren {\dfrac {2 x} a} } 2 - \sum_{k \mathop \ge 0} \frac {\paren {2 k + 1}!} {2^{2 k} \paren {k!}^2 \paren {2 k + 1}^3 \paren {2 k}^2} \paren {\frac a x}^{2 k} + C & : \cosh^{-1} \dfrac x a < 0 \\ \end {cases}$

Also see

 * Primitive of $\dfrac {\sinh^{-1} \frac x a} x$


 * Primitive of $\dfrac {\tanh^{-1} \frac x a} x$


 * Primitive of $\dfrac {\coth^{-1} \frac x a} x$


 * Primitive of $\dfrac {\sech^{-1} \frac x a} x$


 * Primitive of $\dfrac {\csch^{-1} \frac x a} x$