Let veca,vecb,vecc be three linearly ind...

Let `veca,vecb,vecc` be three linearly independent vectors, then `([veca+2vecb-vecc 2veca+vecb+vecc4veca-vecb+5vecc])/([vecavecbvecc])`

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If veca,vecb,vecc are linearly independent vectors, then ((veca+2vecb)xx(2vecb+vecc).(5vecc+veca))/(veca.(vecbxxvecc)) is equal to

If veca,vecb,vecc are linearly independent vectors, then ((veca+2vecb)xx(2vecb+vecc).(5vecc+veca))/(veca.(vecbxxvecc)) is equal to

If veca, vecb, vecc are three non-coplanar vectors, then [veca+ vecb + vecc veca - vecc veca-vecb] is equal to :

If a,b,c are linearly independent, then ([[veca+2vecb,2vecb+vecc,5vecc+veca] ])/([vecavecbvecc])

If veca, vecb, vecc are any three non coplanar vectors, then (veca+vecb+vecc).(vecb+vecc)xx(vecc+veca)

If veca, vecb, vecc are any three non coplanar vectors, then (veca+vecb+vecc).(vecb+vecc)xx(vecc+veca)

Prove that [veca+vecb vecb+vecc vecc+veca]=2[vecavecbvecc]

If veca, vecb, vecc are any three non coplanar vectors, then [(veca+vecb+vecc, veca-vecc, veca-vecb)] is equal to

If veca, vecb, vecc are any three non coplanar vectors, then [(veca+vecb+vecc, veca-vecc, veca-vecb)] is equal to

If veca, vecb, vecc are non-null non coplanar vectors, then [(veca-2vecb+vecc, vecb-2vecc+veca, vecc-2veca+vecb)]=

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