In solid geometry, skew lines are two lines that do not intersect but are not parallel. Equivalently, they are lines that are not both in the same plane. A simple example of a pair of skew lines is the pair of lines through opposite edges of a regular tetrahedron (or other non-degenerate tetrahedron). Lines that are coplanar either intersect or are parallel, so skew lines exist only in three or more dimensions.
Line A is skew to Line B, when line A does not intersect line B and also they are not in the same plane.
Skew line segments are lines in space which never intersect.
A line and a plane that do not intersect are always skew. Skew refers to two or more lines or planes that are not parallel and do not intersect. Since a line and a plane are different-dimensional objects, they will never intersect and will always be skew.
Answer is a skew lines do not lie in the same place
Sometimes.
They could be if they are both skew to the same line.
That's true.
They are skew line. Skew line are two lines that do not intersect but are not parallel.Another definition is skew lines are straight lines that are not in the same plane and do not intersect.Either way, skew lines are the answer to your question since they are noncoplanar and do not intersect.
skew
to skew somebody
Skew is an alteration in the construction of the fabric. It is an oblique or angled slant that is not parallel or intersecting a specified line.
Yes, but not all of them, some of them are either parallel or perpendicular.