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

Geo Hons = ??? - Writeacher, Monday, September 12, 2011

Kidding bro

I'm not sure i just took the thing and it said it was c it depends on what class you are in.

To find the answer to the first question, which asks for 4 coplanar points, we need to identify points that lie on the same plane. From the given information, we have:

1. Points B, D, and E are collinear in the plane.
2. Points A and C are collinear outside of the plane.

To identify coplanar points, we need to consider the points that lie on the same plane. In this case, we have points B, D, and E that are collinear in the plane. Therefore, the three coplanar points are B, D, and E.

As for the second question, which asks how many planes contain the given point and line, we need to consider each option individually:

a. line DB and Point A: In this case, since point A is outside of the plane, the line DB cannot lie entirely on a single plane. Therefore, the answer is 0 planes.

b. line BD and point E: Similar to the previous option, since point E is outside the plane, the line BD cannot lie entirely on a plane. Again, the answer is 0 planes.

c. line AC and point D: In this case, point D is collinear with points B and E, which lie on the plane. Therefore, line AC and point D can lie on the same plane. Hence, the answer is 1 plane.

d. line EB and point C: Since point C is outside the plane, the line EB cannot lie entirely on a plane. Thus, the answer is 0 planes.

In summary, the number of planes that contain the given point and line is:

a. 0 planes
b. 0 planes
c. 1 plane
d. 0 planes

C is correct Ms. Alexander H.