How Do You Calculate Definite And Indefinite Integrals?
Derivatives and Integrals are integral in the fields of mathematics and science, used to find the relations between variables such as distance, velocity, and acceleration. This article will teach you the basics of finding the definite and indefinite integrals of functions. The general equations for the indefinite integral and the definite integral of a function f(x) can be seen at the left. F(x) represents the function for which F'(x) (the derivative of F(x)) is equivalent to f(x), while C represents the constant needed in order to make the antiderivative of f(x) equal to the actual function being used whose derivative is equal to f(x) (for example, in a problem involving distance and velocity, if the starting distance is equal to a value not equal to 0, a constant would need to be added to the equation of the antiderivative of velocity for it to be equivalent to the equation for distance). In the case of the definite integral, the integral is being found on the interval (a,b), where a
