JEE Mains · Maths · STD 12 - 11. three dimension geometry
A line \('l'\) passing through origin is perpendicular to the lines \(l_{1}: \overrightarrow{ r }=(3+ t ) \hat{ i }+(-1+2 t ) \hat{ j }+(4+2 t ) \hat{ k }\) ; \(l_{2}: \overrightarrow{ r }=(3+2 s ) \hat{ i }+(3+2 s ) \hat{ j }+(2+ s ) \hat{ k }\) . If the co-ordinates of the point in the first octant on \({ }^{\prime} l_{2}^{\prime}\) at a distance of \(\sqrt{17}\) from the point of intersection of \(^{\prime} l^{\prime}\) and \({ }^{\prime} l_{1}^{\prime}\) are \(( a , b , c ),\) then \(18( a+ b + c )\) is equal to ........ .
- A \(22\)
- B \(11\)
- C \(44\)
- D \(33\)
Answer & Solution
Correct Answer
(C) \(44\)
Step-by-step Solution
Detailed explanation
\(\ell_{1}: \overrightarrow{ r }=(3+ t ) \hat{ i }+(-1+2 t ) \hat{ j }+(4+2 t ) \hat{ k }\) \(\ell_{2}: \overrightarrow{ r }=(3+2 s ) \hat{ i }+(3+2 s ) \hat{ j }+(4+ s ) \hat{ k }\) \(DR\) of \(\ell_{1} \equiv(1,2,2)\) \(DR\) of \(\ell_{2} \equiv(2,2,1)\) \(DR\) of \(\ell\)…
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