integration

Integration is a core concept of calculus that formalizes accumulation. It serves as the inverse operation to differentiation and can represent quantities such as the area under a curve, the total distance from a velocity function, or any accumulated amount over an interval. Indefinite integrals yield families of antiderivatives, while definite integrals produce a number for a given interval.

The most common definition is the Riemann integral, built from limits of sums. Lebesgue integration extends

The Fundamental Theorem of Calculus ties differentiation and integration: if f is continuous on [a,b], then F(x)

Numerical methods approximate integrals when closed-form antiderivatives do not exist. Common methods include the trapezoidal rule,

Integration has applications across science and engineering, from geometry and physics to probability and economics. It