(a+2b)=t1c and b+3c=t2a (1)−2×(2)⇒a(1+2t2)+c(−t1−6)=0⇒1+2t2=0⇒t2=−1/2&t1=−6. Since a and c are non-collinear. Putting the value of t1 and t2 in (1) and (2), we get a+2b+6c=0
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
Held on 30 Apr 2004 · Verified 6 Jul 2026.
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