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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

this
framework
to
a
broader
class
of
functions.
Improper
integrals
generalize
to
unbounded
domains
or
unbounded
integrands
and
require
convergence
tests.
=
∫_a^x
f(t)
dt
is
an
antiderivative
of
f,
and
∫_a^b
f(x)
dx
=
F(b)
−
F(a).
Simpson's
rule,
and
Gaussian
quadrature.
In
multiple
dimensions,
iterated
integrals
and
coordinate
changes
(polar,
cylindrical,
spherical)
enable
volume
and
mass
calculations.
emerged
in
the
17th
century
with
Newton
and
Leibniz
and
was
later
formalized
by
Riemann
and
Lebesgue.