if `veca , vecb and vecc` are three non-zero, non- coplanar vectors and `vecb_(1)=vecb-(vecb.veca)/(|veca|^(2))veca,vecb_(2)=vecb+(vecb.veca)/(|veca|^(2))veca,vecc_(1)=vecc-(vecc.veca)/(|veca|^(2))veca+ (vecb.vecc)/(|vecc|^(2))vecb_(1),vecc_(2)=vecc-(vecc.veca)/(|veca|^(2)) veca-(vecbvecc)/(|vecb_(1)|^(2))vecb_(1),vecc_(3)=vecc- (vecc.veca)/(|vecc|^(2))veca + (vecb.vecc)/(|vecc|^(2))vecb_(1), vecc_(4)=vecc - (vecc.veca)/(|vecc|^(2))veca= (vecb.vecc)/(|vecb|^(2))vecb_(1)`, then the set of orthogonal vectors isA. `(veca,vecb_(1),vecc_(3))`B. `(vecca,vecb_(1),vecc_(2))`C. `(veca, vecb_(1),vecc_(1))`D. `(veca,vecb_(2),vecc_(2))`

if `veca , vecb and vecc` are three non-zero, non- coplanar vectors an

1.	if `veca , vecb and vecc` are three non-zero, non- coplanar vectors and `vecb_(1)=vecb-(vecb.veca)/(\|veca\|^(2))veca,vecb_(2)=vecb+(vecb.veca)/(\|veca\|^(2))veca,vecc_(1)=vecc-(vecc.veca)/(\|veca\|^(2))veca+ (vecb.vecc)/(\|vecc\|^(2))vecb_(1),vecc_(2)=vecc-(vecc.veca)/(\|veca\|^(2)) veca-(vecbvecc)/(\|vecb_(1)\|^(2))vecb_(1),vecc_(3)=vecc- (vecc.veca)/(\|vecc\|^(2))veca + (vecb.vecc)/(\|vecc\|^(2))vecb_(1), vecc_(4)=vecc - (vecc.veca)/(\|vecc\|^(2))veca= (vecb.vecc)/(\|vecb\|^(2))vecb_(1)`, then the set of orthogonal vectors isA. `(veca,vecb_(1),vecc_(3))`B. `(vecca,vecb_(1),vecc_(2))`C. `(veca, vecb_(1),vecc_(1))`D. `(veca,vecb_(2),vecc_(2))`
Answer» Correct Answer - c we observe that `veca.vecb_(1)=veca.vecv- ((vecb.veca)/(\|veca\|^(2)))veca. veca=veca.vecb- veca.vecb=0` `veca.vecc_(2)=veca(vecc-(vecc.veca)/(\|veca\|^(2))veca- (vecc.vecb_(1))/(\|vecb_(1)\|^(2))vecb_(1))` `veca.vecc- (veca.vecc)/(\|veca\|^(2))\|veca\|^(2)-(vecc.vecb_(1))/(\|vecb_(1)\|^(2))(veca.vecb_(1))` `veca.vecc-veca.vecc-0 " " (therefore veca.vecb_(1)=0)` `and vecb_(1).vecc_(2)=vecb_(1)(vecc- (vecc.veca)/(\|veca\|^(2))veca- (vecc.vecb_(1))/(\|vecb_(1)\|^(2))vecb_(1))` `vecb_(1).vecc-((vecc.veca)(vecb_(1).veca))/(\|veca\|^(2))- (vecc.vecb_(1))/(\|vecb_(1)\|^(2))vecb_(1).vecb_(1)` `vecb_(1).vecc-0-vecb_(1).vecc` (using `vecb_(1).veca =0)`

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