- In geometry, a
glissette is a
curve determined by
either the
locus of any point, or the
envelope of any line or curve, that is
attached to a
curve that...
-
Caustic including Catacaustic and
Diacaustic Cissoid Conchoid Evolute Glissette Inverse curve Involute Isoptic including Orthoptic Negative pedal curve...
- on the
circle then the
roulette is a cycloid. A
related concept is a
glissette, the
curve described by a
point attached to a
given curve as it slides...
- (1782-1854) Liset,
given name Lissette,
given name Lizette,
given name
Glissette Louisiette All
pages with
titles containing Lisette This disambiguation...
-
Caustic including Catacaustic and
Diacaustic Cissoid Conchoid Evolute Glissette Inverse curve Involute Isoptic including Orthoptic Orthotomic Negative...
- in Durer's
original diagram above) and
therefore the
curve is a point-
glissette formed by a line and one of its
points sliding respectively against a...
- Bouleau" (Birch), Boulianne, des Caleçons, Cimon, Couture, Emmuraillé, de la
Glissette, de l'Étoile (of the star), "de l'Hermine", des Panses, des Roches, du...
-
original on May 7, 2012.
Retrieved May 11, 2012. Besant,
William Henry (1966) [1870].
Notes on
roulettes and
glissettes.
Cambridge University Press. p. 235....
-
volume 11, page 38: "Mathematical Notes",
concerning dynamics, aberration,
glissettes, and
pedal lines.
Besant also
published in
Messenger of Mathematics: 1881:...
