Question:
The shortest distance between the lines \( x = y + 2 = 6z - 6 \) and \( x + 1 = 2y = -12z \) is
The shortest distance between the lines \( x = y + 2 = 6z - 6 \) and \( x + 1 = 2y = -12z \) is
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For skew lines, use the formula involving direction ratios and the perpendicular vector to calculate the shortest distance.
Updated On: Jan 12, 2026
- \( \frac{1}{2} \)
- 2
- 1
- \( \frac{3}{2} \)
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The Correct Option is C
Solution and Explanation
The shortest distance between two skew lines can be found using the formula involving the direction ratios and a vector joining the lines. After applying the formula, the shortest distance is found to be 1.
Step 2: Conclusion.
The correct answer is (C), 1.
Step 2: Conclusion.
The correct answer is (C), 1.
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