c=λ(a×b)
a×b=∣i^11j^12k^−11∣
(a×b)=3i^−2j^+k^
c⋅(i^+j^+3k^)=λ(3i^−2j^+k^)⋅(i^+j^+3k^)
⇒λ(4)=8⇒λ=2
c=2(a×b)
Hence, c⋅(a×b)=28
Let c be a vector perpendicular to the vectors a=i^+j^−k^ and b=i^+2j^+k^. If c⋅(i^+j^+3k^)=8, then the value of c⋅(a×b) is equal to
Held on 16 Mar 2021 · Verified 6 Jul 2026.
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