Tool to find primitives of functions. Integration of a function is the calculation of all its primitives, the inverse of the derivative.
Primitives Functions - dCode
Tag(s) : Functions, Symbolic Computation
dCode is free and its tools are a valuable help in games, maths, geocaching, puzzles and problems to solve every day!
A suggestion ? a feedback ? a bug ? an idea ? Write to dCode!
The primitive (or indefinite integral, or antederivative) of a function $ f $ defined over an interval $ I $ is a function $ F $ (usually noted in uppercase), itself defined and differentiable over $ I $, which derivative is $ f $, ie. $ F'(x) = f(x) $.
Example: The primitive of $ f(x) = x^2+\sin(x) $ is the function $ F(x) = \frac{1}{3}x^3-\cos(x) + C $ (with $ C $ a constant).
Computing the antiderivatives of a function involves finding another function which, when derived, gives the original function.
The easiest way to calculate a function primitive is to know the list of common primitives and apply them.
dCode knows all functions and their primitives. Enter the function and its variable to integrate and dCode do the computation of the primitive function.
There is no direct formula for calculating a primitive from a function. It is generally possible to express primitives for the usual functions (or combinations of functions) but there is no uniqueness of the primitive (therefore an infinity of solutions) and some primitives cannot be expressed as a combination of usual functions.
The usual primitives to know: (with $ C $ any constant)
Function | Primitive |
---|---|
constant $$ \int a \, \rm dx $$ | $$ ax + C $$ |
power $$ \int x^n \, \rm dx $$ | $$ \frac{x^{n+1}}{n+1} + C \qquad n \ne -1 $$ |
negative power $$ \int \frac{1}{x^n} = \int x^{-n} \, \rm dx $$ | $$ \frac{x^{-n+1}}{-n+1} + C \qquad n \ne 1 $$ |
inverse $$ \int \frac{1}{x} \, \rm dx $$ | $$ \ln \left| x \right| + C \qquad x \ne 0 $$ |
$$ \int \frac{1}{x-a} \, \rm dx $$ | $$ \ln | x-a | + C \qquad x \ne a $$ |
$$ \int \frac{1}{(x-a)^n} \, \rm dx $$ | $$-\frac{1}{(n-1)(x-a)^{n-1}} + C \qquad n \ne 1 , x \ne a $$ |
$$ \int \frac{1}{1+x^2} \, \rm dx $$ | $$ \operatorname{arctan}(x) + C $$ |
$$ \int \frac{1}{a^2+x^2} \, \rm dx $$ | $$ \frac{1}{a}\operatorname{arctan}{ \left( \frac{x}{a} \right) } + C \qquad a \ne 0 $$ |
$$ \int \frac{1}{1-x^2} \, \rm dx $$ | $$ \frac{1}{2} \ln { \left| \frac{x+1}{x-1} \right| } + C $$ |
$$ \int \frac{1}{\sqrt{1-x^2}} \, \rm dx $$ | $$ \operatorname{arcsin} (x) + C $$ |
$$ \int \frac{-1}{\sqrt{1-x^2}} \, \rm dx $$ | $$ \operatorname{arccos} (x) + C $$ |
$$ \int \frac{x}{\sqrt{x^2-1}} \, \rm dx $$ | $$ \sqrt{x^2-1} + C $$ |
natural logarithm $$ \int \ln (x)\,\rm dx $$ | $$ x \ln (x) - x + C $$ |
logarithm base b $$ \int \log_b (x)\,\rm dx $$ | $$ x \log_b (x) - x \log_b (e) + C $$ |
exponential $$ \int e^x\,\rm dx $$ | $$ e^x + C $$ |
$$ \int a^x\,\rm dx $$ | $$ \frac{a^x}{\ln (a)} + C \qquad a > 0 , a \ne 1 $$ |
sine $$ \int \sin(x)\,\rm dx $$ | $$ -\cos(x) + C $$ |
cosine $$ \int \cos(x)\,\rm dx $$ | $$ \sin(x) + C $$ |
tangent $$ \int \tan(x)\,\rm dx $$ | $$ -\ln|\cos(x)| + C $$ |
hyperbolic sine $$ \int \sinh(x)\,\rm dx $$ | $$ \cosh(x) + C $$ |
hyperbolic cosine $$ \int \cosh(x)\,\rm dx $$ | $$ \sinh(x) + C $$ |
hyperbolic tangent $$ \int \tanh(x)\,\rm dx $$ | $$ \ln(\cosh(x)) + C $$ |
Another list to know to calculate primitives of functions combining usual functions and their derivatives
Function | Primitive |
---|---|
fraction of functions $$ \frac{u^{\prime}}{u} $$ | $$ \ln{|u|} $$ |
exponential of functions $$ \exp(u) \times u^{\prime} $$ | $$ \exp(u) $$ |
power of functions $$ u^{a} \times u^{\prime} $$ | $$ \frac{u^{a+1}}{a+1} $$ |
sine of functions $$ \sin(u) \times u^{\prime} $$ | $$ -\cos(u) $$ |
cosine of functions $$ \cos(u) \times u^{\prime} $$ | $$ \sin(u) $$ |
logarithm of functions $$ u^{\prime} \times \ln{|u|} $$ | $$ u \times \ln{|u|} -u $$ |
Primitives are useful in many areas of mathematics and physics. Used in conjunction with integration, they solve problems related to the determination of areas under curves, the modeling of continuous phenomena, the analysis of growth and change, as well as the resolution of Differential equations.
The value $ C $ is any constant. The presence of a constant in a primitive has no influence on the value of its derivative. So there are an infinite number of possible primitives, adding $ + C $ does not change the derivative, most of the time taking $ C = 0 $ simplifies the calculations.
dCode retains ownership of the "Primitives Functions" source code. Except explicit open source licence (indicated Creative Commons / free), the "Primitives Functions" algorithm, the applet or snippet (converter, solver, encryption / decryption, encoding / decoding, ciphering / deciphering, breaker, translator), or the "Primitives Functions" functions (calculate, convert, solve, decrypt / encrypt, decipher / cipher, decode / encode, translate) written in any informatic language (Python, Java, PHP, C#, Javascript, Matlab, etc.) and all data download, script, or API access for "Primitives Functions" are not public, same for offline use on PC, mobile, tablet, iPhone or Android app!
Reminder : dCode is free to use.
The copy-paste of the page "Primitives Functions" or any of its results, is allowed (even for commercial purposes) as long as you credit dCode!
Exporting results as a .csv or .txt file is free by clicking on the export icon
Cite as source (bibliography):
Primitives Functions on dCode.fr [online website], retrieved on 2024-12-21,