The following is a list of

indefinite integral In calculus, an antiderivative, inverse derivative, primitive function, primitive integral or indefinite integral of a function is a differentiable function whose derivative is equal to the original function . This can be stated symbolicall ...

s (

antiderivative In calculus, an antiderivative, inverse derivative, primitive function, primitive integral or indefinite integral of a function is a differentiable function whose derivative is equal to the original function . This can be stated symbolically ...

s) of expressions involving the

inverse trigonometric function In mathematics, the inverse trigonometric functions (occasionally also called arcus functions, antitrigonometric functions or cyclometric functions) are the inverse functions of the trigonometric functions (with suitably restricted domains). Spec ...

s. For a complete list of integral formulas, see

lists of integrals Integration is the basic operation in integral calculus. While differentiation has straightforward rules by which the derivative of a complicated function can be found by differentiating its simpler component functions, integration does no ...

. * The inverse trigonometric functions are also known as the "arc functions". * ''C'' is used for the arbitrary

constant of integration In calculus, the constant of integration, often denoted by C (or c), is a constant term added to an antiderivative of a function f(x) to indicate that the indefinite integral of f(x) (i.e., the set of all antiderivatives of f(x)), on a connected ...

that can only be determined if something about the value of the integral at some point is known. Thus each function has an infinite number of antiderivatives. * There are three common notations for inverse trigonometric functions. The arcsine function, for instance, could be written as ''sin⁻¹'', ''asin'', or, as is used on this page, ''arcsin''. * For each inverse trigonometric integration formula below there is a corresponding formula in the

list of integrals of inverse hyperbolic functions The following is a list of indefinite integrals (antiderivatives) of expressions involving the inverse hyperbolic functions. For a complete list of integral formulas, see lists of integrals. * In all formulas the constant is assumed to be nonzero ...

Arcsine function integration formulas

\int\arcsin(x)\,dx=
  x\arcsin(x)+
 +C

\int\arcsin(ax)\,dx=
x\arcsin(ax)+
  \frac+C

\int x\arcsin(ax)\,dx=
  \frac-
  \frac+
  \frac+C

\int x^2\arcsin(ax)\,dx=
  \frac+
  \frac+C

\int x^m\arcsin(ax)\,dx=
  \frac\,-\,
  \frac\int \frac\,dx\quad(m\ne-1)

\int\arcsin(ax)^2\,dx=
  -2x+x\arcsin(ax)^2+
  \frac+C

\int\arcsin(ax)^n\,dx=
  x\arcsin(ax)^n\,+\,
  \frac\,-\,
  n\,(n-1)\int\arcsin(ax)^\,dx

\int\arcsin(ax)^n\,dx=
  \frac\,+\,
  \frac\,-\,
  \frac\int\arcsin(ax)^\,dx\quad(n\ne-1,-2)

Arccosine function integration formulas

\int\arccos(x)\,dx=
  x\arccos(x)-
  +C

\int\arccos(ax)\,dx=
  x\arccos(ax)-
  \frac+C

\int x\arccos(ax)\,dx=
  \frac-
  \frac-
  \frac+C

\int x^2\arccos(ax)\,dx=
  \frac-
  \frac+C

\int x^m\arccos(ax)\,dx=
  \frac\,+\,
  \frac\int \frac\,dx\quad(m\ne-1)

\int\arccos(ax)^2\,dx=
  -2x+x\arccos(ax)^2-
  \frac+C

\int\arccos(ax)^n\,dx=
  x\arccos(ax)^n\,-\,
  \frac\,-\,
  n\,(n-1)\int\arccos(ax)^\,dx

\int\arccos(ax)^n\,dx=
  \frac\,-\,
  \frac\,-\,
  \frac\int\arccos(ax)^\,dx\quad(n\ne-1,-2)

Arctangent function integration formulas

\int\arctan(x)\,dx=
  x\arctan(x)-
  \frac+C

\int\arctan(ax)\,dx=
  x\arctan(ax)-
  \frac+C

\int x\arctan(ax)\,dx=
  \frac+
  \frac-\frac+C

\int x^2\arctan(ax)\,dx=
  \frac+
  \frac-\frac+C

\int x^m\arctan(ax)\,dx=
  \frac-
  \frac\int \frac\,dx\quad(m\ne-1)

Arccotangent function integration formulas

\int\arccot(x)\,dx=
  x\arccot(x)+
  \frac+C

\int\arccot(ax)\,dx=
  x\arccot(ax)+
  \frac+C

\int x\arccot(ax)\,dx=
  \frac+
  \frac+\frac+C

\int x^2\arccot(ax)\,dx=
  \frac-
  \frac+\frac+C

\int x^m\arccot(ax)\,dx=
  \frac+
  \frac\int \frac\,dx\quad(m\ne-1)

Arcsecant function integration formulas

\int\arcsec(x)\,dx= x\arcsec(x) \, - \,
 \ln\left(\left, x\+\sqrt\right)\,+\,C=
  x\arcsec(x)-\operatorname, x, +C

\int\arcsec(ax)\,dx=
  x\arcsec(ax)-
  \frac\,\operatorname, ax, +C

\int x\arcsec(ax)\,dx=
  \frac-
  \frac\sqrt+C

\int x^2\arcsec(ax)\,dx=
  \frac\,-\,
  \frac\,-\,
  \frac\sqrt\,+\,C

\int x^m\arcsec(ax)\,dx=
  \frac\,-\,
  \frac\int \frac\,dx\quad(m\ne-1)

Arccosecant function integration formulas

\int\arccsc(x)\,dx= 
  x\arccsc(x) \, + \,
 \ln\left(\left, x\+\sqrt\right)\,+\,C=
  x\arccsc(x)\,+\,
 \operatorname, x, \,+\,C

\int\arccsc(ax)\,dx=
  x\arccsc(ax)+
  \frac\,\operatorname\,\sqrt+C

\int x\arccsc(ax)\,dx=
  \frac+
  \frac\sqrt+C

\int x^2\arccsc(ax)\,dx=
  \frac\,+\,
  \frac\,\operatorname\,\sqrt\,+\,
  \frac\sqrt\,+\,C

\int x^m\arccsc(ax)\,dx=
  \frac\,+\,
  \frac\int \frac\,dx\quad(m\ne-1)

References

{{Lists of integrals Arc functions