vertex |
trihexagonal |
In geometry|lang=en terms the difference between vertex and trihexagonal
is that
vertex is (geometry) the common point of the two rays of the angle, or its equivalent structure in polyhedra (meeting of edges) and higher order polytopes while
trihexagonal is (geometry) pertaining to a semiregular tiling of the euclidean plane with two triangles and two hexagons alternating on each vertex.
As a noun vertex
is the highest point of something.
As an adjective trihexagonal is
(geometry) pertaining to a semiregular tiling of the euclidean plane with two triangles and two hexagons alternating on each vertex.
hexagon |
trihexagonal |
As a noun hexagon
is hexagon.
As an adjective trihexagonal is
(geometry) pertaining to a semiregular tiling of the euclidean plane with two triangles and two hexagons alternating on each vertex.
triangle |
trihexagonal |
As a proper noun triangle
is the area comprising the cities of used with "the" except when attributive.
As an adjective trihexagonal is
(geometry) pertaining to a semiregular tiling of the euclidean plane with two triangles and two hexagons alternating on each vertex.
tiling |
trihexagonal |
As a noun tiling
is a covering of tiles.
As a verb tiling
is .
As an adjective trihexagonal is
(geometry) pertaining to a semiregular tiling of the euclidean plane with two triangles and two hexagons alternating on each vertex.
semiregular |
trihexagonal |
In geometry|lang=en terms the difference between semiregular and trihexagonal
is that
semiregular is (geometry) while
trihexagonal is (geometry) pertaining to a semiregular tiling of the euclidean plane with two triangles and two hexagons alternating on each vertex.
As adjectives the difference between semiregular and trihexagonal
is that
semiregular is somewhat regular; occasional while
trihexagonal is (geometry) pertaining to a semiregular tiling of the euclidean plane with two triangles and two hexagons alternating on each vertex.