If `veca= vecP + vecq, vecP xx vecb = vec0 and vecq. vecb =0` then prove that `(vecbxx(veca xx vecb))/(vecb.vecb)=vecq`

If `veca= vecP + vecq, vecP xx vecb = vec0 and vecq. vecb =0` then pro

1.	If `veca= vecP + vecq, vecP xx vecb = vec0 and vecq. vecb =0` then prove that `(vecbxx(veca xx vecb))/(vecb.vecb)=vecq`
Answer» `veca=vecp+vecq` ` or vecaxxvecb = vecpxxvecb+vecq xxvecb` `or veca xx vecb =vecq xx vecb " " ( vecp xx vecb = vec0)` `or vecb xx (veca xx vecb)= vecb xx (vecq xx vecb)` `(vecb.vecb)vecq - (vecb.vecq) vecb` ` = (vecb.vecb)vecq " " ( vecb. vecq =0)` `or (vecb xx (veca xx vecb))/(vecb.vecb) = vecq`

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If `veca= vecP + vecq, vecP xx vecb = vec0 and vecq. vecb =0` then prove that `(vecbxx(veca xx vecb))/(vecb.vecb)=vecq`

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