The line passes through the point and is perpendicular to the plane . Then the shortest distance between the line and the line
is:
- A
- B
- C
- D
The line passes through the point and is perpendicular to the plane . Then the shortest distance between the line and the line
is:
Correct answer:D
Standard Method
Given: The line passes through and is perpendicular to the plane .
Find: The shortest distance between and .
Since is perpendicular to the plane, its direction ratios are the normal vector of the plane. Therefore,
and
Take a point on and a point on . Then
The direction vectors of the two lines are
Their cross product is
So,
Now,
Hence the shortest distance between the skew lines is
Therefore, the shortest distance is . The solution states option C, but the working clearly gives , which matches option D.

Using the plane equation directly as the line equation is incorrect. Because the line is perpendicular to the plane, its direction ratios come from the plane's normal vector ; the line still must be written through the point .
Choosing the shortest distance formula for parallel lines is wrong here. These two lines are skew lines, so use instead.
Errors in the cross product sign are common. A wrong sign in changes the numerator or denominator. Expand the determinant carefully and then take magnitude at the end.
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