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Question

Let L1 and L2 denotes the lines r=i^+λ-i^+2j^+2k^,λand r=μ2i^-j^+2k^,μ respectively. If L3 is a line which is perpendicular to both L1 and L2 and cuts both of them, then which of the following options describe(s) L3?


A

r=13(2i^+k^)+t2i^+2j^-k^,t

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B

r=29(2i^-j^+2k^)+t2i^+2j^-k^,t

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C

r=t2i^+2j^-k^,t

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D

r=29(4i^+j^+k^)+t2i^+2j^-k^,t

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Solution

The correct option is D

r=29(4i^+j^+k^)+t2i^+2j^-k^,t


Explanation for the correct option(s):

Given that L1 and L2 denotes the lines r=i^+λ-i^+2j^+2k^,λand r=μ2i^-j^+2k^,μ respectively.

If L3 is a line which is perpendicular to both L1 and L2 and cuts both of them and we need to find possible equation of L3

Let L3 cuts both lines L1 and L2 at A and B and their general points are given as

A=-λ+1,2λ,2λB=2μ,-μ,2μ

so, direction ratio of line meeting A and B is 2μ+λ-1,-μ-2λ,2μ-2λ

Now, direction ratio of any line which is perpendicular to lines L1 and L2 can be calculated as vector product of both lines =ijk-1222-12=6i+6j-3k

So direction ratios of L3 is 6,6,-3 comparing this with 2μ+λ-1,-μ-2λ,2μ-2λ we get,

λ=19,μ=29 so the required points A and B became

89,29,29,49,-29,49

From given options, we see that for point A and B Lines r=29(2i^-j^+2k^)+t2i^+2j^-k^,t and r=29(4i^+j^+k^)+t2i^+2j^-k^,t satisfy for L3 and If midpoint of points A and B 89,29,29,49,-29,49 which is 23,0,13 satisfying for equation in option (A) as r=13(2i^+k^)+t2i^+2j^-k^,t

Hence, the correct options are (A), (B) and (D)


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