Points L, J, and K are collinear.
The answer is D.
Further explanation
Given a line and a planar surface with points A, B, D, J, K, and L. We summarize the graph as follows:
- At the line, points L, J, and K are collinear.
- On the planar surface, points A, B, D, and J are coplanar.
- Points L, J, and K are noncollinear with points A, B, and D.
- Points A, B, D, and J are noncollinear.
- Points L and K are noncoplanar with points A, B, D, and J.
- Point J represents the intersection between the line and the planar surface because the position of J is in the line and also on the plane. The line goes through the planar surface at point J.
Notes:
- Collinear represents points that lie on a straight line. Any two points are always collinear because we can continuosly connect them with a straight line. A collinear relationship can take place from three points or more, but they don’t have to be.
- Coplanar represents a group of points that lie on the same plane, i.e. a planar surface that elongate without end in all directions. Any two or three points are always coplanar, but four or more points might or might not be coplanar.
Learn more
- Which points are coplanar and noncollinear brainly.com/question/4165000
- What are three collinear points on line l
- https://brainly.com/question/5795008
- Comparing collinear points and coplanar points. https://brainly.com/question/1593959
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