Integration is a fundamental concept in calculus integration is used in physics, engineering, economics, biology, and many other fields

Integration is a fundamental concept in calculus  integration is used in physics, engineering, economics, biology, and many other fields

Integration is a fundamental concept in calculus, primarily used to find the total or accumulated quantity, such as areas, volumes, or accumulated change, from smaller parts. It is often thought of as the reverse of differentiation.

Definite Integration: It helps calculate the area under a curve (for example, the area under a graph of a function between two points). If you have a function, the integral tells you how much "space" is under that function within a certain range.

Indefinite Integration: This is the process of finding a general formula that describes the accumulated quantity for a function. The result includes an arbitrary constant, since there can be many functions that differ only by a constant (the "constant of integration").

In practical applications, integration is used in physics, engineering, economics, biology, and many other fields to model real-world phenomena like motion, growth, and accumulation of quantities over time.