Understanding Skew Lines | Definition and Properties in Three-Dimensional Space

skew lines

Skew lines are two lines in three-dimensional space that do not intersect and are not parallel

Skew lines are two lines in three-dimensional space that do not intersect and are not parallel. In other words, skew lines are non-coplanar lines that do not lie in the same plane and never meet each other, no matter how far they are extended.

Unlike parallel lines, which maintain a constant distance between each other, skew lines can be thought of as moving away from each other as they extend, resulting in an increasing separation between them.

It is important to note that skew lines are only defined in three-dimensional space. In two-dimensional space (a plane), lines can either be parallel or intersect at a single point. However, in three-dimensional space, skew lines have the unique property of never intersecting, even if extended indefinitely.

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