The missing points are listed below:
- R
- P
- X
- W
- S
- Q
- X
- P
What points in a parallelepiped are coplanar?
The picture attached aside shows us a right-angled parallelepiped and the Euclidean geometry indicates that a plane is generated by three non-colinear points, that is, three points that cannot be contained by a line.
Therefore, coplanar points are points that can be contained by one and same plane. Parallelepipeds are solids with eight vertices and twelve sides, each of them corresponding to a plane.
In this problem we must determine what fourth point is contained by the same plane that comprises the other three. Now we show the corresponding answers:
- Q, P, S → R
- W, Z, S → P
- W, Z, Y → X
- Q, X, P → W
- Y, Z, R → S
- R, Y, X → Q
- Q, R, Y → X
- W, X, Q → P
To learn more on coplanar points: https://brainly.com/question/1593959
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