The vector ⃗C, directed along the internal bisector of the angle between the vectors ⃗a=7^i−4^j−4^k and ⃗b=−2^i−^j+2^k with |⃗c|=5√6, is
Options:
A .  
±(53(^i−7^j+2^k)
B .  
53(5^i−5^j+2^k)
C .  
53(^i−7^j+2^k)
D .  
53(−5^i−5^j+2^k)
Answer: Option A : A The required vector ⃗C is given by ⃗C=λ(^a+^b)=λ(⃗a|⃗a|+⃗b|⃗b|)=λ{19(7^i−4^j−4^k)+13(−2^i−^j+2^k)} ⇒⃗c=λ9(^i−7^j+2^k)⇒|⃗c|=±λ9√1+49+4=±λ9√54 But |⃗c|=5√6 (given) ∴±λ9√54=5√6⇒λ=±15 Hence, ⃗c=±159(^i−7^j+2^k)=±53(^i−7^j+2^k)
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