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VECTOR TRIPLE PRODUCT

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Unit vector along veca is denoted by hata(if |veca|=1,veca is called a unit vector). Also veca/|veca|=hata and veca=|veca|hata . Suppose veca,vecb,vecc are three non parallel unit vectors such that vecaxx(vecbxxvecc)=1/2vecb [vecpxx(vecxxvecr) is a vector triple product and vecpxx(vecqxxvecr)=(vecp.vecr.vecq)-(vecp.vecq)vecr] . Angle between veca and vecb is (A) 90^0 (B) 30^0 (C) 60^0 (D) none of these

Unit vector along veca is denoted by hata(if |veca|=1,veca is called a unit vector). Also veca/|veca|=hata and veca=|veca|hata . Suppose veca,vecb,vecc are three non parallel unit vectors such that vecaxx(vecbxxvecc)=1/2vecb [vecpxx(vecxxvecr) is a vector triple product and vecpxx(vecqxxvecr)=(vecp.vecr.vecq)-(vecp.vecq)vecr] . Angle between veca and vecc is (A) 120^0 (B) 60^0 (C) 30^0 (D) none of these

Unit vector along veca is denoted by hata(if |veca|=1,veca is called a unit vector). Also veca/|veca|=hata and veca=|veca|hata . Suppose veca,vecb,vecc are three non parallel unit vectors such that vecaxx(vecbxxvecc)=1/2vecb [vecpxx(vecxxvecr) is a vector triple product and vecpxx(vecqxxvecr)=(vecp.vecr.vecq)-(vecp.vecq)vecr] . |vecaxxvecc| is equal to (A) 1/2 (B) sqrt(3)/2 (C) 3/4 (D) none of these