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What (who) is skew-angular triangle - definition

POLYGON WHOSE VERTICES DO NOT LIE IN A PLANE

Regular skew polygon; Space polygon; Saddle polygon; Regular skew pentagon; Regular skew decagon; Regular skew dodecagon

Skew lines

LINES IN 3D THAT DO NOT INTERSECT AND NEITHER DO THEY POINT THE SAME DIRECTION

Skew line; Skew straight lines; Skew flats; Distance between two skew lines; Nearest distance between skew lines

In three-dimensional geometry, skew lines are two lines that do not intersect and are not parallel. A simple example of a pair of skew lines is the pair of lines through opposite edges of a regular tetrahedron.

https://en.wikipedia.org/wiki/Skew_lines

Clock skew

PHENOMENON OF A SYNCHRONOUS DIGITAL CIRCUIT'S CLOCK SIGNAL ARRIVING OVER MULTIPLE PATHS AT DIFFERENT TIMES

Timing skew; Clock shear

Clock skew (sometimes called timing skew) is a phenomenon in synchronous digital circuit systems (such as computer systems) in which the same sourced clock signal arrives at different components at different times due to gate or, in more advanced semiconductor technology, wire signal propagation delay. The instantaneous difference between the readings of any two clocks is called their skew.

https://en.wikipedia.org/wiki/Clock_skew

equilateral

$An equilateral triangle. It has equal sides (<math>a = b = c</math>), equal angles (<math>\alpha = \beta =\gamma</math>), and equal altitudes (<math>h_a = h_b = h_c</math>).$

GEOMETRIC SHAPE WITH THREE SIDES OF EQUAL LENGTH

Equilateral triangles; Equalangular triangle; Equiangular triangle; Equilateral Triangles; Equilateral Triangle; Regular Triangle; Regular triangle; Equalateral triangle; Equilateral; Isopleuron

[?i:kw?'lat(?)r(?)l, ??kw?-]

¦ adjective having all its sides of the same length.

Origin

C16: from Fr. equilateral or late L. aequilateralis, from aequilaterus 'equal-sided' (based on L. latus, later- 'side').

Wikipedia

Skew polygon

In geometry, a skew polygon is a polygon whose vertices are not all coplanar. Skew polygons must have at least four vertices. The interior surface (or area) of such a polygon is not uniquely defined.

Skew infinite polygons (apeirogons) have vertices which are not all colinear.

A zig-zag skew polygon or antiprismatic polygon has vertices which alternate on two parallel planes, and thus must be even-sided.

Regular skew polygons in 3 dimensions (and regular skew apeirogons in two dimensions) are always zig-zag.

https://en.wikipedia.org/wiki/Skew polygon