- In mathematics, an
integral is the
continuous analog of a sum,
which is used to
calculate areas, volumes, and
their generalizations. Integration, the process...
-
access to such
equipment necessary for "realizing
Intégrales as they were
originally conceived."
Intégrales is
scored for 2 piccolos, 1 oboe, 1 E-flat clarinet...
- In politics,
integralism,
integrationism or
integrism (French: intégrisme) is an
interpretation of
Catholic social teaching that
argues the principle...
- said to be
integral over a
subring A of B if b is a root of some
monic polynomial over A. If A, B are fields, then the
notions of "
integral over" and of...
- calculus), a
volume integral (∭) is an
integral over a 3-dimensional domain; that is, it is a
special case of
multiple integrals.
Volume integrals are especially...
- In
integral calculus, an
elliptic integral is one of a
number of
related functions defined as the
value of
certain integrals,
which were
first studied...
- the
Darboux integral is
constructed using Darboux sums and is one
possible definition of the
integral of a function.
Darboux integrals are equivalent...
-
Integral theory as
developed by Ken
Wilber is a
synthetic metatheory aiming to
unify a
broad spectrum of
Western theories and
models and
Eastern meditative...
- mathematics,
integral equations are
equations in
which an
unknown function appears under an
integral sign. In
mathematical notation,
integral equations may...
- In mathematics,
there are two
types of
Euler integral: The
Euler integral of the
first kind is the beta
function B ( z 1 , z 2 ) = ∫ 0 1 t z 1 − 1 ( 1...
