If the square of the shortest distance between the lines and is , where and are co-prime numbers, then is equal to:
- A
- B
- C
- D
If the square of the shortest distance between the lines and is , where and are co-prime numbers, then is equal to:
Correct answer:B
Standard Method
Given: The lines are and .
Find: The value of if the square of the shortest distance is .
Write the lines in vector form using points and direction vectors:
So, take
and points
The shortest distance between two skew lines is
Compute the cross product:
Hence,
Now,
Then,
So,
Therefore,
Thus, and , so
Therefore, the correct option is B.
Checking the discrepancy in the scraped solution
The first provided approach contains a sign error in the cross product. It states
but the correct computation is
Using the incorrect vector gives a wrong dot product and hence the wrong value . The second provided approach correctly concludes that the shortest distance squared is , which gives .
Using the wrong sign in the cross product. The middle component of carries a negative sign because of the determinant expansion. Recompute the cross product carefully as , not .
Squaring the distance formula incorrectly. First find from the scalar triple product expression, then square only at the end. Directly manipulating the unsimplified form often leads to the wrong fraction.
Taking direction ratios incorrectly from the symmetric form. For , the direction vector is and the point is . Mixing point coordinates with direction ratios gives an incorrect setup.
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