Line passes through the point and is parallel to z-axis. Line passes through the point and is parallel to y-axis. Let for , the shortest distance between the two lines be . Then the square of the distance of the point from the line is
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Line passes through the point and is parallel to z-axis. Line passes through the point and is parallel to y-axis. Let for , the shortest distance between the two lines be . Then the square of the distance of the point from the line is
Correct answer:C
Standard Method
Given: Line passes through and is parallel to the z-axis, so its direction vector is . Line passes through and is parallel to the y-axis, so its direction vector is .
Find: The square of the distance of the point from line .
Using the shortest distance formula for two skew lines,
Here,
so
and
Take points on and on . Then
Hence,
Given the shortest distance is ,
So,
which gives
Since , we get
Therefore, the point is
Let be the foot of the perpendicular from to line . A general point on is
Then
Since and the direction vector of is ,
Thus,
So,
Now,
Therefore, the square of the distance is . The correct option is C.
Shortcut Using Distance from z-axis Parallel Line
Given: and from the condition .
Find: The square of the distance of from .
Since is parallel to the z-axis and passes through , the distance of any point from depends only on the change in the and coordinates. The -coordinate does not affect the perpendicular distance.
So for point ,
Therefore, the square of the distance is . The correct option is C.
Using the wrong formula for the shortest distance between the two lines. These lines are skew lines with direction vectors and , so the cross-product formula must be used. Do not treat them as intersecting or parallel lines.
Not ordering and correctly after solving . The two values are and , and since , we must take and .
While finding distance from to , including the z-component in the perpendicular distance. Since is parallel to the z-axis, only the horizontal displacement in and matters for the perpendicular distance.
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