- In calculus, an
antiderivative,
inverse derivative,
primitive function,
primitive integral or
indefinite integral of a
continuous function f is a differentiable...
- any
antiderivative F
between the ends of the interval. This
greatly simplifies the
calculation of a
definite integral provided an
antiderivative can be...
-
areas below are negative.
Integrals also
refer to the
concept of an
antiderivative, a
function whose derivative is the
given function; in this case, they...
- rule or
change of variables, is a
method for
evaluating integrals and
antiderivatives. It is the
counterpart to the
chain rule for differentiation, and can...
- In
complex analysis, a
branch of mathematics, the
antiderivative, or primitive, of a complex-valued
function g is a
function whose complex derivative is...
-
derivative and
antiderivative. It is
frequently used to
transform the
antiderivative of a
product of
functions into an
antiderivative for
which a solution...
- {\displaystyle C} (or c {\displaystyle c} ), is a
constant term
added to an
antiderivative of a
function f ( x ) {\displaystyle f(x)} to
indicate that the indefinite...
- it
relates the
values of
antiderivatives to
definite integrals.
Because it is
usually easier to
compute an
antiderivative than to
apply the definition...
-
having an
antiderivative on D. The
converse of the
theorem is not true in general. A
holomorphic function need not
possess an
antiderivative on its domain...
-
calculus due to the lack of an
elementary antiderivative for the integrand, as the sine integral, an
antiderivative of the sinc function, is not an elementary...
