In this chapter, we will reverse the process of differentiation. While differential calculus deals with rates of change, integral calculus deals with accumulation. We will explore the indefinite integral (anti-derivative) and the definite integral (area under a curve).
A function ( F(x) ) is called an antiderivative of ( f(x) ) if [ \fracddx \left[ F(x) \right] = f(x) ] for all ( x ) in the domain of ( f ). Integrals -Zambak-
The end-of-chapter problems are split between pure mathematical puzzles and real-world applications, ensuring a well-rounded competency. In this chapter, we will reverse the process