If `vecA, vecB, vecC` are non-coplanar vectors then `(vecA.vecBxxvecC)/(vecCxxvecA.vecB)+(vecB.vecAxxvecC)/(vecC.vecAxxvecB)=`

If veca, vecba and vecc are non- coplanar vecotrs, then prove that |(veca.vecd)(vecbxxvecc)+(vecb.vecd)(veccxxveca)+(vecc.vecd)(vecaxxvecb) is independent of vecd where vecd is a unit vector.

If [veca, vecb, vecc]=1 then the value of (veca.(vecbxxvecc))/((veccxxveca).vecb)+(vecb.(veccxxveca))/((vecaxxvecb).vecc)+(vecc.(vecaxxvecb))/((veccxxvecb).veca) is________

If veca, vecb and vecc are three non-coplanar non-zero vectors, then prove that (veca.veca) vecb xx vecc + (veca.vecb) vecc xx veca + (veca.vecc)veca xx vecb = [vecb vecc veca] veca

If veca+vecb ,vecc are any three non- coplanar vectors then the equation [vecbxxvecc veccxxveca vecaxxvecb]x^(2) + [veca+vecbvecb+veccvecc+veca] x+1 +[vecb-veccvecc -vecc-vecaveca -vecb] =0 has roots

If veca, vecb and vecc 1 are three non-coplanar vectors, then (veca + vecb + vecc). [(veca + vecb) xx (veca + vecc)] equals

If the vectors veca, vecb, and vecc are coplanar show that |(veca,vecb,vecc),(veca.veca, veca.vecb,veca.vecc),(vecb.veca,vecb.vecb,vecb.vecc)|=0

If veca, vecb, vecc are vectors such that |vecb|=|vecc| then {(veca+vecb)xx(veca+vecc)}xx(vecbxxvecc).(vecb+vecc)=

If veca, vecb, vecc are three non - coplanar vector such that vecaxx(vecbxxvecc)=(vecb+vecc)/(sqrt2) , then the angle between veca and vecb is ……………. .

If veca , vecb , vecc are three non-coplanar vector and vecp , vecq vecr are defind by the relations vecp=(vecbxxvecc)/([vecavecbvecc]) , vecq=(veccxxveca)/([vecavecbvecc]) , vecr=(vecaxxvecb)/([vecavecbvecc]) , then vecp.(veca+vecb)+vecq.(vecb+vecc)+vecr.(vecc+veca) =............