I try to avoid writing \int \frac{1}{x}\,dx=\log|x|+C to my students, since there is a common misunderstanding then, that, applying the fundamental theorem of calculus, \int_{-1}^2\frac{1}{x}\,dx = \log|2|-\log|-1|=\log 2, ...

\displaystyle{\int_{{1}}^{{3}}}\ \frac{{2}}{{x}}\ {\left.{d}{x}\right.}\approx{2.233333} Explanation: We have: \displaystyle{y}=\frac{{2}}{{x}} We want to estimate \displaystyle\int\ {y}\ {\left.{d}{x}\right.} ...

\displaystyle\int{\left(\frac{{3}}{{x}}\right)}{\left.{d}{x}\right.}={3}{\ln{{x}}}+{C}={\ln{{\left({A}{x}^{{3}}\right)}}} Explanation: You should remember a standard special case: \displaystyle\frac{{d}}{{\left.{d}{x}\right.}}{\ln{{x}}}=\frac{{1}}{{x}}\Leftrightarrow\int\frac{{1}}{{x}}{\left.{d}{x}\right.}={\ln{{x}}}+{C} ...

\displaystyle\frac{{1}}{{2}}\times{I}{n}{x}+{c} Explanation: \displaystyle\int\frac{{1}}{{{2}{x}}}\times{\left.{d}{x}\right.} = \displaystyle\frac{{1}}{{2}}\times\int\frac{{1}}{{x}}{\left.{d}{x}\right.} ...

\frac13\log|3x|+C=\frac13\log|x|+\frac13\log(3)+C=\frac13\log|x|+C'

{\frac{\ln(kx)}{k}+C = \frac{\ln(k)}{k}+\frac{\ln(x)}{k}+C = \frac{\ln(x)}{k} + \tilde{C}} So they're the same, they just differ by a constant