A) (? 3, 2, 1)
B) (1, 2, 2)
C) (4, 5, 3)
D) None of these
Correct Answer: D
Solution :
Let AD be perpendicular and D be foot of perpendicular which divide BC in ratio \[\lambda \,\,:\,\,1,\] then \[D\,\left( \frac{10\lambda -9}{\lambda +1},\frac{4}{\lambda +1},\frac{-\lambda +5}{\lambda +1} \right)\] ?..(i)
The direction ratio of AD are \[\frac{10\lambda -9}{\lambda +1},\frac{4}{\lambda +1},\frac{-\lambda +5}{\lambda +1}\] and direction ratio of BC are 19, ? 4 and ? 6. Since \[AD\,\,\bot \,\,BC\] \[\Rightarrow \,\,19\,\left( \frac{10\lambda -9}{\lambda +1} \right)-4\,\left( \frac{4}{\lambda +1} \right)-6\,\left( \frac{-\lambda +5}{\lambda +1} \right)=0\] \[\Rightarrow \,\,\lambda =\frac{31}{28}\]. Hence on putting the value of \[\lambda \] in (i), we get required foot of the perpendicular i.e.\[\left( \frac{58}{59},\frac{112}{59},\frac{109}{59} \right)\]. Trick: The line passing through these points is \[\frac{x+9}{19}=\frac{y-4}{-4}=\frac{z-5}{-6}.\] Now co-ordinates of the foot lie on this line, so they must satisfy the given line. But here no point satisfies the line, hence answer is .
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