If two distinct lines intersect, it is not necessarily true that they are perpendicular to each other. While intersecting lines can form various angles, including right angles, they can also intersect at acute or obtuse angles. Additionally, it is not true that the lines must lie on the same plane; in three-dimensional space, lines can intersect at various angles without being coplanar. Thus, the only certainty with two distinct intersecting lines is that they meet at a single point.
False. If two lines intersect, they do so at exactly one point, provided they are not parallel. In Euclidean geometry, two distinct lines can either intersect at a single point or be parallel and never intersect at all.
If this is a 2-D graph and both of the lines are straight, then yes this statement is true. Otherwise it is not necessarily true.
false
always. if two lines intersect, then exactly one plane contains the lines.
True
False. If two lines intersect, they do so at exactly one point, provided they are not parallel. In Euclidean geometry, two distinct lines can either intersect at a single point or be parallel and never intersect at all.
If this is a 2-D graph and both of the lines are straight, then yes this statement is true. Otherwise it is not necessarily true.
Yes. Parallel Lines are also two coplanar lines that do not intersect.
true
They never intersect.
false they intersect at a single point
True.
they intersect at some point
false
always. if two lines intersect, then exactly one plane contains the lines.
This is true. If three straight lines are drawn, they can only intersect at two points. That is, each line will only intersect with another once.
True