指數函數積分表

以下是部分指數函數的積分表(書寫時省略了不定積分結果中都含有的任意常數Cn)

\int e^{cx}\;dx={\frac {1}{c}}e^{cx}

\int a^{cx}\;dx={\frac {1}{c\ln a}}a^{cx}\qquad \qquad {\mbox{(}}a>0,{\mbox{ }}a\neq 1{\mbox{)}}

\int xe^{cx}\;dx={\frac {e^{cx}}{c^{2}}}(cx-1)

\int x^{2}e^{cx}\;dx=e^{cx}\left({\frac {x^{2}}{c}}-{\frac {2x}{c^{2}}}+{\frac {2}{c^{3}}}\right)

\int x^{n}e^{cx}\;dx={\frac {1}{c}}x^{n}e^{cx}-{\frac {n}{c}}\int x^{n-1}e^{cx}dx

\int {\frac {e^{cx}\;dx}{x}}=\ln |x|+\sum _{i=1}^{\infty }{\frac {(cx)^{i}}{i\cdot i!}}

\int {\frac {e^{cx}\;dx}{x^{n}}}={\frac {1}{n-1}}\left(-{\frac {e^{cx}}{x^{n-1}}}+c\int {\frac {e^{cx}}{x^{n-1}}}\,dx\right)\qquad \qquad {\mbox{(}}n\neq 1{\mbox{)}}

\int e^{cx}\ln x\;dx={\frac {1}{c}}e^{cx}\ln |x|-\operatorname {Ei} \,(cx)

\int e^{cx}\sin bx\;dx={\frac {e^{cx}}{c^{2}+b^{2}}}(c\sin bx-b\cos bx)

\int e^{cx}\cos bx\;dx={\frac {e^{cx}}{c^{2}+b^{2}}}(c\cos bx+b\sin bx)

\int e^{cx}\sin ^{n}x\;dx={\frac {e^{cx}\sin ^{n-1}x}{c^{2}+n^{2}}}(c\sin x-n\cos x)+{\frac {n(n-1)}{c^{2}+n^{2}}}\int e^{cx}\sin ^{n-2}x\;dx

\int e^{cx}\cos ^{n}x\;dx={\frac {e^{cx}\cos ^{n-1}x}{c^{2}+n^{2}}}(c\cos x+n\sin x)+{\frac {n(n-1)}{c^{2}+n^{2}}}\int e^{cx}\cos ^{n-2}x\;dx

\int xe^{cx^{2}}\;dx={\frac {1}{2c}}\;e^{cx^{2}}

\int {1 \over \sigma {\sqrt {2\pi }}}\,e^{-{\frac {(x-\mu )^{2}}{2\sigma ^{2}}}}\;dx={\frac {1}{2\sigma }}\left(1+{\mbox{erf}}\,{\frac {x-\mu }{\sigma {\sqrt {2}}}}\right)

\int e^{x^{2}}\,dx=\sum _{n=0}^{\infty }{\frac {x^{2n+1}}{n!(2n+1)}}

\int _{-\infty }^{\infty }e^{-ax^{2}}\,dx={\sqrt {\pi  \over a}}

\int _{0}^{\infty }x^{2n}e^{-{\frac {x^{2}}{a^{2}}}}\,dx={\sqrt {\pi }}{(2n)! \over {n!}}{\left({\frac {a}{2}}\right)}^{2n+1}