Okay heres the pic. There is a plane with points B,D, and E.those [oints are collinear in the plane. And also outside of the plane is points A, and C. and those points are collinear outside of the plane.thought Line AC intersect at point B of the line BDE.FOr line AC the C is somewhat disatached from A with a breakeage in between leaving a ray of C as well/
Question: Name 4 Coplanar Points
with this same picture
Question: How many planes contain the given point and line?
a. line DB and Point A
b. line BD and point E
c. line AC and point D
d. line EB and point C
you just have to tell the number please help and thanks
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To identify four coplanar points in the given picture, we need to locate four points that lie on the same plane. Based on the information provided, we can identify the following four coplanar points:
1. Point B: It lies on the line BD, which is in the same plane as points D and E.
2. Point D: It lies on the line BD, which is in the same plane as points B and E.
3. Point E: It lies on the line BD, which is in the same plane as points B and D.
4. Point C: It lies on the line AC, which is in the same plane as points A and the ray C.
Now let's determine how many planes contain the given point and line combinations:
a. Line DB and Point A: In this case, we have a line (DB) and a point (A). Since a line can be contained in infinite planes, the answer is infinite.
b. Line BD and Point E: Similar to the previous case, we have a line (BD) and a point (E). The answer is also infinite.
c. Line AC and Point D: In this case, we have a line (AC) and a point (D). Again, the answer is infinite.
d. Line EB and Point C: In this case, we have a line (EB) and a point (C). Similar to the previous cases, the answer is infinite.
Therefore, for all the given point and line combinations, the number of planes containing them is infinite.