Answer is a skew lines do not lie in the same place
*They do not intersect.
*They are not parallel
* * * * *
In the 2 dimensional Euclidean plane (the one that is studied at school) , skew lines MUST intersect.
Skew lines cannot lie in the same plane.
They can be, and are, "skew". If they are not lines, they cannot be "skew lines".
SKEW LINES are neither parallel nor intersecting.
Skew lines are non-coplanar, which means they are in different planes. Skew lines are in different planes and they do not intersect.
they are skew lines.
Skew lines are nonintersecting, nonparallel lines - in other words, lines that aren't part of the same plane.
Answer this question... Which of the following is a true statement about skew lines?
Answer is a skew lines do not lie in the same place
That's true.
They can be, and are, "skew". If they are not lines, they cannot be "skew lines".
No. Skew lines do not intersect
Skew lines never intersect. If two lines intersect, then they are known as "intersecting lines", not skew lines.
Coplanarity is equivalent to the statement that the pair of lines determined by the four points are not skew, and can be equivalently stated in vector form as
skew lines are noncoplanar lines, which means they aren't parallel and they also don't intersect skew lines do not intersect and are not coplanar
No. Skew lines must be in different planes. Skew lines have no common points (they never cross).
No. Skew lines are lines in different planes that are parallel.
Correct! Skew lines can never by be parallel.
SKEW LINES are neither parallel nor intersecting.