In the context of Euclidean straight lines it would mean parallel lines. In the context of a curve and a line (or another curve) it would mean the line and the curve do not meet at any point, but not a lot more can be deduced about them.
zigzag lines, vertical lines, horizontal lines, right curve, over curve,left curve, under curve, scallop lines, left slanting lines, right slanting lines
If only one curves, then eventually the curve will intersect with the other line, even if it is way down into infinity ona graph. If both lines curve at the same angles at the same rate however, staying equidistant from each other, they are still parallel and will never intersect.
the answer is parallel lines
parallel lines are slanted lines
If it is curving, it's not a line.
Curve line?
Well, no. They are perpendicular lines.
Well, no. They are perpendicular lines.
In the context of Euclidean straight lines it would mean parallel lines. In the context of a curve and a line (or another curve) it would mean the line and the curve do not meet at any point, but not a lot more can be deduced about them.
They are asymptote lines in which as a curve gets closer and closer to them they will never intersect with each other.
no it is not a type of leaf IT IS A SET OF LINES THAT NEVER INTERSECT AND NEVER CURVE AND GO ON FOREVER.
It is not illegal, in any state, to turn left (or in fact, U turn) across single parallel yellow lines--however, crossing double parallel yellow lines is an infraction.
In Euclidean geometry parallel lines are always the same distance apart. In non-Euclidean geometry parallel lines are not what we think of a parallel. They curve away from or toward each other. Said another way, in Euclidean geometry parallel lines can never cross. In non-Euclidean geometry they can.
zigzag lines, vertical lines, horizontal lines, right curve, over curve,left curve, under curve, scallop lines, left slanting lines, right slanting lines
If only one curves, then eventually the curve will intersect with the other line, even if it is way down into infinity ona graph. If both lines curve at the same angles at the same rate however, staying equidistant from each other, they are still parallel and will never intersect.
In its normal orientation the parallel sides of a trapezium are horizontal. In that case it will have no perpendicular lines. But turn the figure through 90 degrees and it has two!In its normal orientation the parallel sides of a trapezium are horizontal. In that case it will have no perpendicular lines. But turn the figure through 90 degrees and it has two!In its normal orientation the parallel sides of a trapezium are horizontal. In that case it will have no perpendicular lines. But turn the figure through 90 degrees and it has two!In its normal orientation the parallel sides of a trapezium are horizontal. In that case it will have no perpendicular lines. But turn the figure through 90 degrees and it has two!