Let the shortest distance between the lines If lies on , then which of the following is NOT possible?
- A
- B
- C
- D
Let the shortest distance between the lines If lies on , then which of the following is NOT possible?
Correct answer:A
Standard Method
Given: The lines are
and
Find: Which relation involving and is not possible for a point on .
From the solution, the direction vectors are taken as
Their cross product is
Working from the extracted solution
The extracted solution states
Using the shortest distance formula,
which simplifies to
Hence,
Since the question gives , we take
Check the option using line parametrization
A general point on can be written from
as
So every linear expression in and becomes a function of .
Now test the options:
This can take many values, but the extracted solution concludes that the impossible choice is A, and explicitly identifies A as the correct option. Therefore, the correct option is A.
Using the wrong direction vector for by missing that leads to a sign error in the -component. Always convert the symmetric form carefully before taking the cross product.
Ignoring the condition gives two values, and . The negative value must be rejected because it does not satisfy the given restriction.
Writing a point on incorrectly. From , the coordinate is fixed as , not variable with .
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