In this blog we are going to discuss about the topic Antiderivative . In calculus antiderivative is define as the function that is opposite to the derivative function. It define as the function f which gives the derivative F that means f ' = F. It is calculate by doing the opposite functioning of differntiation.
Antiderivative is also define as the integration function that is also known as the indefinite integration. It is defined by a simple example as if we take a function f = sin (a) then the derivative of function f is define as the f' = cos (a) and when we find he antiderivative of f' that is equal to f that means antiderivative of function f' = f that means antiderivative of cos (a) is define as
ʃ cos (a) d a = sin (a) + c.
As we know that differentiation and integration are opposite process and differentiation is another name of anti derivation . It follows all the rules of integration as If there is define the limit of the function ʃp q f (a) d a = f (q) – f (P) . there are also some properties of antiderivative that are as follows:ʃ a n d a = a n+1 / (n +1) + c. here c is the constant value .
There is one thing have to know before finding the antiderivative that there is several integrals of a function that are different to each other on the basis of their constant term that is generated at the time of integration.
Topic on Cumulative Frequency defines all the related problems of cumulative frequency define into the calculus in a very simple way. ISEET Chemistry syllabus define all the topics of chemistry that helps the student to secure good marks in the chemistry and In the next session we will discuss about How to Solve Antiderivative.
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