The square of the distance of the image of the point in the line , from the origin is:
- A
- B
- C
- D
The square of the distance of the image of the point in the line , from the origin is:
Correct answer:A
Standard Method
Given: The point is and the line is
Find: The square of the distance of the image of in the given line from the origin.
The direction ratios of the line are and a point on the line is . So the line in vector form is
Let the foot of the perpendicular from to the line be
Then
Since is perpendicular to the line direction,
Therefore,
Substituting ,
The image point is the reflection of in , so
Now the square of the distance of from the origin is
Therefore, the square of the distance is . Hence, the correct option is A.
Coordinate Reflection Method
Given: is a point on the line. Find: The image of in the line and its squared distance from the origin.
Using the perpendicular condition from the solution,
where . So,
Hence,
and the image point is
So the distance from the origin is
Therefore, the square of the distance is .
Students often treat the given line as a plane mirror without first finding the foot of the perpendicular from the point to the line. This is wrong because reflection in a line in 3D requires the midpoint relation through the perpendicular foot. First find the projection point on the line, then reflect the point.
A common error is writing the point on the line incorrectly from the symmetric form. In , the point is and direction ratios are . Misreading these gives the wrong projection point.
Some students compute the distance from the origin to the foot of the perpendicular instead of to the image point. This is incorrect because the question asks for the image of the point in the line. After finding the foot , calculate the reflected point and then its distance from the origin.
Get unlimited AI-adaptive practice, mastery tracking, and an AI tutor that explains every step — free to start.