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Question

A vector a=αi^+2j^+βk^α,βR lies in the plane of the vectors,b=i^+j^ and c=i^-j^+4k^. If a bisects the angle between b and c, then


A

a·i^+3=0

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B

a·k^+4=0

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C

a·i^+1=0

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D

a·k^+2=0

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Solution

The correct option is D

a·k^+2=0


Explanation for given data:

Step-1: Express the given data.

Given, a=αi^+2j^+βk^α,βR...........i,

b=i^+j^ and c=i^-j^+4k^. and a bisects the angle between b and c.

We know that If a vector bisect the angle between two vector then a=λb^+c^ora=μb^-c^

Step-2: Consider a=λb^+c^

a=λi^+j^2+i^-j^+4k^12+-12+42

a=λi^+j^2+i^-j^+4k^32

a=λ3i^+3j^+i^-j^+4k^32

a=λ324i^+2j^+4k^............ii

Compare equation i&ii.

2=2λ32

λ=32

Put value of λ in equation ii.

a=4i^+2j^+4k^............iii

Not follow the any option.

Step-3: Consider a=μb^-c^

a=μi^+j^2-i^-j^+4k^12+-12+42

a=μi^+j^2-i^-j^+4k^32

a=μ3i^+3j^-i^+j^-4k^32

a=μ322i^+4j^-4k^............iv

Compare equation i&iv.

2=4μ32

μ=322

Put value of μ in equation iv.

a=i^+2j^-2k^

Taking Dot product with

a·k^=i^+2j^-2k^·k^

a·k^=-2

a·k^+2=0

Hence, option D is correct.


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