双曲函数积分表

以下是部份双曲函数的积分表(书写时省略了不定积分结果中都含有的任意常数Cn)

\int \sinh c x d x = \frac{1}{c} \cosh c x

\int \cosh c x d x = \frac{1}{c} \sinh c x

\int \sinh^{2} c x d x = \frac{1}{4 c} \sinh 2 c x - \frac{x}{2}

\int \cosh^{2} c x d x = \frac{1}{4 c} \sinh 2 c x + \frac{x}{2}

\int \sinh^{n} c x d x = \frac{1}{c n} \sinh^{n - 1} c x \cosh c x - \frac{n - 1}{n} \int \sinh^{n - 2} c x d x (for n > 0)

\int \sinh^{n} c x d x = \frac{1}{c (n + 1)} \sinh^{n + 1} c x \cosh c x - \frac{n + 2}{n + 1} \int \sinh^{n + 2} c x d x (for n < 0, n \neq - 1)

\int \cosh^{n} c x d x = \frac{1}{c n} \sinh c x \cosh^{n - 1} c x + \frac{n - 1}{n} \int \cosh^{n - 2} c x d x (for n > 0)

\int \cosh^{n} c x d x = - \frac{1}{c (n + 1)} \sinh c x \cosh^{n + 1} c x - \frac{n + 2}{n + 1} \int \cosh^{n + 2} c x d x (for n < 0, n \neq - 1)

\int \frac{d x}{\sinh c x} = \frac{1}{c} \ln | \tanh \frac{c x}{2} |

\int \frac{d x}{\sinh c x} = \frac{1}{c} \ln | \frac{\cosh c x - 1}{\sinh c x} |

\int \frac{d x}{\sinh c x} = \frac{1}{c} \ln | \frac{\sinh c x}{\cosh c x + 1} |

\int \frac{d x}{\sinh c x} = \frac{1}{2 c} \ln | \frac{\cosh c x - 1}{\cosh c x + 1} |

\int \frac{d x}{\cosh c x} = \frac{2}{c} \arctan e^{c x}

\int \frac{d x}{\sinh^{n} c x} = \frac{\cosh c x}{c (n - 1) \sinh^{n - 1} c x} - \frac{n - 2}{n - 1} \int \frac{d x}{\sinh^{n - 2} c x} (for n \neq 1)

\int \frac{d x}{\cosh^{n} c x} = \frac{\sinh c x}{c (n - 1) \cosh^{n - 1} c x} + \frac{n - 2}{n - 1} \int \frac{d x}{\cosh^{n - 2} c x} (for n \neq 1)

\int \frac{\cosh^{n} c x}{\sinh^{m} c x} d x = \frac{\cosh^{n - 1} c x}{c (n - m) \sinh^{m - 1} c x} + \frac{n - 1}{n - m} \int \frac{\cosh^{n - 2} c x}{\sinh^{m} c x} d x (for m \neq n)

\int \frac{\cosh^{n} c x}{\sinh^{m} c x} d x = - \frac{\cosh^{n + 1} c x}{c (m - 1) \sinh^{m - 1} c x} + \frac{n - m + 2}{m - 1} \int \frac{\cosh^{n} c x}{\sinh^{m - 2} c x} d x (for m \neq 1)

\int \frac{\cosh^{n} c x}{\sinh^{m} c x} d x = - \frac{\cosh^{n - 1} c x}{c (m - 1) \sinh^{m - 1} c x} + \frac{n - 1}{m - 1} \int \frac{\cosh^{n - 2} c x}{\sinh^{m - 2} c x} d x (for m \neq 1)

\int \frac{\sinh^{m} c x}{\cosh^{n} c x} d x = \frac{\sinh^{m - 1} c x}{c (m - n) \cosh^{n - 1} c x} + \frac{m - 1}{m - n} \int \frac{\sinh^{m - 2} c x}{\cosh^{n} c x} d x (for m \neq n)

\int \frac{\sinh^{m} c x}{\cosh^{n} c x} d x = \frac{\sinh^{m + 1} c x}{c (n - 1) \cosh^{n - 1} c x} + \frac{m - n + 2}{n - 1} \int \frac{\sinh^{m} c x}{\cosh^{n - 2} c x} d x (for n \neq 1)

\int \frac{\sinh^{m} c x}{\cosh^{n} c x} d x = - \frac{\sinh^{m - 1} c x}{c (n - 1) \cosh^{n - 1} c x} + \frac{m - 1}{n - 1} \int \frac{\sinh^{m - 2} c x}{\cosh^{n - 2} c x} d x (for n \neq 1)

\int x \sinh c x d x = \frac{1}{c} x \cosh c x - \frac{1}{c^{2}} \sinh c x

\int x \cosh c x d x = \frac{1}{c} x \sinh c x - \frac{1}{c^{2}} \cosh c x

\int \tanh c x d x = \frac{1}{c} \ln | \cosh c x |

\int \coth c x d x = \frac{1}{c} \ln | \sinh c x |

\int \tanh^{n} c x d x = - \frac{1}{c (n - 1)} \tanh^{n - 1} c x + \int \tanh^{n - 2} c x d x (for n \neq 1)

\int \coth^{n} c x d x = - \frac{1}{c (n - 1)} \coth^{n - 1} c x + \int \coth^{n - 2} c x d x (for n \neq 1)

\int \sinh b x \sinh c x d x = \frac{1}{b^{2} - c^{2}} (b \sinh c x \cosh b x - c \cosh c x \sinh b x) (for b^{2} \neq c^{2})

\int \cosh b x \cosh c x d x = \frac{1}{b^{2} - c^{2}} (b \sinh b x \cosh c x - c \sinh c x \cosh b x) (for b^{2} \neq c^{2})

\int \cosh b x \sinh c x d x = \frac{1}{b^{2} - c^{2}} (b \sinh b x \sinh c x - c \cosh b x \cosh c x) (for b^{2} \neq c^{2})

\int \sinh (a x + b) \sin (c x + d) d x = \frac{a}{a^{2} + c^{2}} \cosh (a x + b) \sin (c x + d) - \frac{c}{a^{2} + c^{2}} \sinh (a x + b) \cos (c x + d)

\int \sinh (a x + b) \cos (c x + d) d x = \frac{a}{a^{2} + c^{2}} \cosh (a x + b) \cos (c x + d) + \frac{c}{a^{2} + c^{2}} \sinh (a x + b) \sin (c x + d)

\int \cosh (a x + b) \sin (c x + d) d x = \frac{a}{a^{2} + c^{2}} \sinh (a x + b) \sin (c x + d) - \frac{c}{a^{2} + c^{2}} \cosh (a x + b) \cos (c x + d)

\int \cosh (a x + b) \cos (c x + d) d x = \frac{a}{a^{2} + c^{2}} \sinh (a x + b) \cos (c x + d) + \frac{c}{a^{2} + c^{2}} \cosh (a x + b) \sin (c x + d)

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