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dintégrale

Dintégrale is not a recognized term in standard mathematical terminology. In French, the integral concept is conveyed with l’intégrale, and more specifically l’intégrale définie for the definite integral and l’intégrale indéfinie for the antiderivative. The string dintégrale can appear as a typographical error, a contraction in a nonstandard text, or as a coined name in a particular work. Because it does not denote a formal, widely accepted object, its meaning is entirely dependent on context.

When interpreted as a reference to the traditional integral, the topic covers two closely related ideas. The

Notational conventions include ∫ f(x) dx for an indefinite integral, and ∫_a^b f(x) dx for a definite

In scholarly writing, it is advisable to treat dintégrale as a potential misspelling or idiosyncratic term

See also: integral, calculus, definite integral, indefinite integral, Fundamental Theorem of Calculus, numerical integration.

indefinite
integral,
or
antiderivative,
of
a
function
f
is
another
function
F
such
that
F′
=
f.
The
definite
integral
calculates
the
net
accumulation
of
f
over
an
interval
[a,
b],
often
interpreted
as
the
signed
area
between
the
curve
y
=
f(x)
and
the
x-axis.
The
Fundamental
Theorem
of
Calculus
ties
these
concepts
together:
differentiation
and
integration
are
inverse
processes.
integral.
Practical
computation
employs
analytical
methods
and
numerical
techniques
such
as
the
trapezoidal
rule,
Simpson’s
rule,
or
Gaussian
quadrature,
especially
when
antiderivatives
are
unavailable
in
closed
form.
and
to
confirm
the
intended
meaning
from
the
author.
For
standard
treatment,
refer
to
l’intégrale
in
its
indefinite
and
definite
senses,
or
to
related
concepts
like
the
Riemann
and
Lebesgue
integrals.