Let N be the foot of perpendicular from the point P on the line passing through the points and . Then the distance of N from the plane is:
- A
- B
- C
- D
Let N be the foot of perpendicular from the point P on the line passing through the points and . Then the distance of N from the plane is:
Correct answer:B
Standard Method
Given: Point , and the line passing through and as used in the solution.
Find: The distance of the foot of perpendicular from the plane.
First find the direction vector of the line:
So the parametric equations are:
Now,
For the foot of the perpendicular, use projection:
Substitute in the line:
Hence,
Now use the plane form written in the solution:
Distance from to the plane is:
Therefore, the distance of from the plane is , so the correct option is B.
Note: The solution uses and plane , while the question text shows and . The extracted answer follows the solution, which is the primary source.
Projection and point-to-plane distance
Given: A point and a line through two points, then a plane.
Find: First the foot of perpendicular on the line, then its distance from the plane.
The method has two stages:
For the line through and ,
From to ,
The projection parameter is:
Compute the numerator:
Compute the denominator:
Hence,
So the foot point is:
Now for the plane , the distance formula gives:
Substitute , , , and :
Therefore, the required distance is and the correct option is B.
Using the given line points directly without forming the direction vector correctly. This is wrong because the foot of perpendicular depends on the line direction. First compute and then use projection.
Applying the point-to-plane distance formula before finding the foot point . This is wrong because the plane distance is asked for , not for . First determine on the line, then substitute its coordinates in the plane formula.
Forgetting the absolute value in the numerator of the distance formula. This is wrong because distance cannot be negative. Always use .
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