No because contour lines are used in the outlining of different regions and different places vary. So it really depends on the place
No, parallel lines cannot ever intersect. The have identical slopes. Therefore, they will always remain parallel.
The lines are said to be parallel - one example is railway tracks.
Yes it is because they must have the same distance between them to be considered contour
Parallel lines never intersect and always remain equal distance from each other.
Yes.
parallel lines
Parallel lines
Parallel lines are ALWAYS coplanar.
Contour lines that are evenly spaced and parallel indicate a plateau. The closer the contour lines are to each other, the steeper the terrain; the farther apart they are, the flatter the land. In the case of a plateau, contour lines would likely be spaced evenly and relatively close together, indicating a flat or gently sloping landform.
No, it may not always be easy to walk up a slope represented by curved contour lines. The closer the contour lines are together, the steeper the slope. Walking up a slope with curved contour lines could be more challenging if the slope is steep.
That is the correct spelling of "parallel lines" (coplanar lines always a fixed distance apart).
Parallel lines in Euclidean space are always coplanar.
no
Parallel lines cannot intersect in the Euclidean plane. Intersecting lines are not parallel.
They are parallel lines
They are parallel lines
Yes, two lines that lie in parallel to the same line are always parallel to each other. This is based on the Transitive Property of Parallel Lines, which states that if line A is parallel to line B, and line B is parallel to line C, then line A is parallel to line C. Thus, if two lines are both parallel to a third line, they must be parallel to each other.