segments that are notcoplanar. (not in the same plane)
Skew segments in a triangular prism refer to line segments that do not intersect and are not parallel. In the context of a triangular prism, these segments can occur between vertices that are not aligned along the same face or edge. For example, if you take a segment connecting one vertex on the top triangular face to a non-adjacent vertex on the bottom triangular face, these segments are skew to each other. Skew segments highlight the three-dimensional nature of the prism and the spatial relationships between its vertices.
One pair of opposite sides: they may be top and bottom or two sides, or they could both be skew.
There is no such thing as a skew plane - in isolation. It can only be skew with reference to something else.
No. Skew lines do not intersect
Skew lines never intersect. If two lines intersect, then they are known as "intersecting lines", not skew lines.
Skew line segments are lines in space which never intersect.
They can be, and are, "skew". If they are not lines, they cannot be "skew lines".
None of them
Line A is skew to Line B, when line A does not intersect line B and also they are not in the same plane.
One pair of opposite sides: they may be top and bottom or two sides, or they could both be skew.
There is no such thing as a skew plane - in isolation. It can only be skew with reference to something else.
No. Skew lines do not intersect
skew block plug
your face is a skew orthomorphic
No. Skew lines must be in different planes. Skew lines have no common points (they never cross).
Skew lines are non-coplanar, which means they are in different planes. Skew lines are in different planes and they do not intersect.
That is a line segment that is "skewed up". It doesn't work right. It gets tossed in the heap that becomes other / lesser polygons and such and may even become a dreaded "circle".