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This page lists some of the most common antiderivatives; a more complete list can be found in the List of integrals.

We use C for an arbitrary constant of integration that can only be determined if something about the value of the integral at some point is known. Thus each function has an infinitude of antiderivatives.

These formulas only state in another form the assertions in the table of derivatives.

1 Rules for integration of general functions

2 Integrals of simple functions

2.1 Rational functions

more integrals: List of integrals of rational functions

2.2 Logarithms

more integrals: List of integrals of logarithmic functions

2.3 Exponential functions

more integrals: List of integrals of exponential functions

2.4 Irrational function s

more integrals: List of integrals of irrational functions

2.5 Trigonometric functions

more integrals: List of integrals of trigonometric functions and List of integrals of arc functionsThe following is a list of integrals ( antiderivative functions) of arc functions. For a complete list of Integral functions, please see table of integrals and list of integrals. .

2.6 Hyperbolic functionIn mathematics, the hyperbolic functions are analogs of the ordinary trigonometric, or circular, functions. They are: sinh, cosh and tanh csch, sech and coth : :: hyperbolic sine pronounced "shine" or "sinch") : :: hyperbolic cosine pronounced "cosh") : :s

more integrals: List of integrals of hyperbolic functionsThe following is a list of integrals ( antiderivative functions) of hyperbolic functions. For a complete list of Integral functions, please see table of integrals and list of integrals. also: : : also: : : also: : also: : also: : : : : : also: : also: : :

3 Definite integrals

There are some functions whose antiderivatives cannot be expressed in closed form. However, the values of the definite integrals of these functions over some common intervals can be calculated. A few useful definite integrals are given below.