![Integrals Vol. 1: The Indefinite Integral (The Mathematics Series) [Repost]](https://pixhost.icu/avaxhome/32/0c/00670c32_medium.jpg)
Integrals Vol. 1: The Indefinite Integral (The Mathematics Series) [Repost]
![Integrals Vol. 1: The Indefinite Integral (The Mathematics Series) [Repost]](https://pixhost.icu/avaxhome/32/0c/00670c32.jpg)
Integrals Vol. 1: The Indefinite Integral (The Mathematics Series) by Demetrios P. Kanoussis Ph.D
English | March 16, 2018 | ISBN: 1980574901 | 155 pages | PDF | 1.37 Mb
English | March 16, 2018 | ISBN: 1980574901 | 155 pages | PDF | 1.37 Mb
When differentiating a function we find the derivative of the function. The theory of the derivatives and its applications in the investigation of the functions is covered in Differential Calculus. The fundamental problem of Integral Calculus is the inverse problem, i.e. given the derivative of a function to find the function. The solution of this inverse problem, (the integration of a given function), is of great importance in Mathematics, Physics and Engineering in general. However, this problem (integration) is more complicated as compared to the problem of differentiation. In very general terms we may say that integrals are classified as either Indefinite Integrals (functions) or as Definite Integrals (numbers). These two integrals are connected by the so called “Fundamental Theorem of Calculus”.