Let a straight line pass through the point and be perpendicular to the lines If the line intersects the -plane at the point , then the distance between the points and is:
- A
- B
- C
- D
Let a straight line pass through the point and be perpendicular to the lines If the line intersects the -plane at the point , then the distance between the points and is:
Correct answer:C
Standard Method
Given: The line passes through and is perpendicular to the two lines with direction ratios and .
Find: The distance , where is the point where intersects the -plane.
Since is perpendicular to both given lines, its direction vector is the cross product of their direction vectors.
Using determinant form,
So a convenient set of direction ratios for is .
Therefore, the line through is
To find its intersection with the -plane, set .
Substituting into the parametric equations,
Hence,
Now use the distance formula:
Therefore, the distance between and is . The correct option is C.
The first approach in the source gives and writes , but this is inconsistent with the line equation and the distance formula. The second approach correctly gives and hence .
Using the direction ratios of directly as one of the given lines is incorrect. Since is perpendicular to both lines, its direction vector must be obtained from the cross product of the two given direction vectors.
While finding the intersection with the -plane, students may forget that the condition is . Setting or would correspond to different coordinate planes.
After getting the parameter value, substituting it incorrectly into and can lead to the wrong point . Use the same parameter consistently in all three parametric equations.
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