Book:Murray R. Spiegel/Mathematical Handbook of Formulas and Tables/Chapter 14/Integrals Involving Natural Logarithm of x

Integrals Involving $\ln x$

 * $14.525$: Primitive of $\ln x$


 * $14.526$: Primitive of $x \ln x$


 * $14.527$: Primitive of $x^m \ln x$


 * $14.528$: Primitive of $\dfrac {\ln x} x$


 * $14.529$: Primitive of $\dfrac {\ln x} {x^2}$


 * $14.530$: Primitive of $\dfrac {\ln x} x$


 * $14.531$: Primitive of $\dfrac {\ln^n x} x$
 * [If $n = -1$, see $14.532$: Primitive of $\dfrac 1 {x \ln x}$.]


 * $14.532$: Primitive of $\dfrac 1 {x \ln x}$


 * $14.533$: Primitive of $\dfrac 1 {\ln x}$


 * $14.534$: Primitive of $\dfrac {x^m} {\ln x}$


 * $14.535$: Primitive of $\ln^n x$


 * $14.536$: Primitive of $x^m \ln^n x$


 * $14.537$: Primitive of $\ln \left({x^2 + a^2}\right)$


 * $14.537$: Primitive of $\ln \left({x^2 - a^2}\right)$


 * $14.539$: Primitive of $x^m \ln \left({x^2 \pm a^2}\right)$


 * $14.539.1$: Primitive of $x^m \ln \left({x^2 + a^2}\right)$


 * $14.539.2$: Primitive of $x^m \ln \left({x^2 - a^2}\right)$