- In
Euclidean geometry,
equipollence is a
binary relation between directed line segments. Two
segments are said to be
equipollent when they have the same...
-
cardinality is
often called equinumerosity (equalness-of-number). The
terms equipollence (equalness-of-strength) and
equipotence (equalness-of-power) are sometimes...
-
Affine space Deformation (mechanics)
Displacement field (mechanics)
Equipollence (geometry)
Motion vector Position vector Radial velocity **** displacement...
- is a
binary relation that is reflexive,
symmetric and transitive. The
equipollence relation between line
segments in
geometry is a
common example of an...
- compétences. ([Belgian federalism] is
based on a
unique combination of
equipollence, of exclusivity, and of
international extension of competences.) Suinen...
-
Bellavitis abstracted the
basic idea when he
established the
concept of
equipollence.
Working in a
Euclidean plane, he made
equipollent any pair of parallel...
- as well as a
French translation of
Giusto Bellavitis main
paper on
equipollences into
which Laisant added a
chapter on hyperbolas. He
published two works...
- of the same length, orientation, and
great circle.
These relations of
equipollence produce 3D
vector space and
elliptic space, respectively.
Access to elliptic...
-
necessary to
justify a conclusion.
Ancient Gr****
skeptics argued for
equipollence, the view that
reasons for and
against claims are
equally balanced. This...
-
names of
geometers that will endure, is the
invention of the
method of
equipollences, a new
method of
analytic geometry that is both
philosophical and fruitful...
