Let a , b and c be three non-zero vectors such that no two of these are collinear. If the vector a +2 b is collinear with c and b +3 c is collinear with a ( λ being some non-zero scalar), then a +2 b +6 c equals

Question

Let a , b and c be three non-zero vectors such that no two of these are collinear. If the vector a +2 b is collinear with c and b +3 c is collinear with a ( λ being some non-zero scalar), then a +2 b +6 c equals (A) λ a (B) λ b (C) λ c (D) 0

Tardigrade Admin · Accepted Answer

If a +2 b is collinear with c, then a+2 b=t c .....(i) Also, if b+3 c is collinear with a, then b+3 c =λ a ⇒ b =λ a-3 c....(ii) On putting the value of b in Eq. (i) we get a+2(λ a-3 c) =t c ⇒ (a-6 c) =t c-2 λ a On comparing, we get 1=-2 λ and -6=t ⇒ λ =-(1/2) and t =-6 From Eq. (i) a+2 b =-6 c ⇒ a+2 b+6 c =0

Q. Let $a, b$ and $c$ be three non-zero vectors such that no two of these are collinear. If the vector $a + 2 b$ is collinear with $c$ and $b + 3 c$ is collinear with $a$ ( $λ$ being some non-zero scalar), then $a + 2 b + 6 c$ equals

$λa$

$λb$

$λ c$

$0$

Q. Let a,b and c be three non-zero vectors such that no two of these are collinear. If the vector a+2b is collinear with c and b+3c is collinear with a ( λ being some non-zero scalar), then a+2b+6c equals

λa

λb

λc

0

Q. Let $a, b$ and $c$ be three non-zero vectors such that no two of these are collinear. If the vector $a + 2 b$ is collinear with $c$ and $b + 3 c$ is collinear with $a$ ( $λ$ being some non-zero scalar), then $a + 2 b + 6 c$ equals

$λa$

$λb$

$λ c$

$0$