If the vectors are co-planar,
∣a+b+2b+1b+2a+2b+c2b2b−b−c−b1−b∣=0
Now R1↔R1−R2,R3↔R3−R2
So ∣a+1b+11a+c2b0−c−b1∣=0
⇒(a+1)2b−(a+c)(2b+1)−c(−2b)=0
⇒2ab+2b−2ab−a−2bc−c+2bc=0
⇒2b−a−c=0⇒2b=a+c
Let the vectors (2+a+b)i^+(a+2b+c)j^−(b+c)k^,(1+b)i^+2bj^−bk^ and (2+b)i^+2bj^+(1−b)k^,∀a,b,c∈R be co-planar. Then which of the following is true?
Held on 25 Jul 2021 · Verified 6 Jul 2026.
2b=a+c
3c=a+b
a=b+2c
2a=b+c
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