Sholve the simultasneous vector equations for `vecx aedn vecy: vecx+veccxxvecy=veca and vecy+veccxxvecx=vecb, vec!=0A. `vecx=(vecbxxvecc+veca+(vecc.veca)vecc)/(1+ vecc.vecc)`B. `vecx=(veccxxvecb+vecb+(vecc.veca)vecc)/(1+vecc.vecc)`C. `vecy=(vecaxxvecc+vecb+(vecc.vecb)vecc)/(1+vecc.vecc)`D. none of these

Sholve the simultasneous vector equations for `vecx aedn vecy: vecx+ve

1.	Sholve the simultasneous vector equations for `vecx aedn vecy: vecx+veccxxvecy=veca and vecy+veccxxvecx=vecb, vec!=0A. `vecx=(vecbxxvecc+veca+(vecc.veca)vecc)/(1+ vecc.vecc)`B. `vecx=(veccxxvecb+vecb+(vecc.veca)vecc)/(1+vecc.vecc)`C. `vecy=(vecaxxvecc+vecb+(vecc.vecb)vecc)/(1+vecc.vecc)`D. none of these
Answer» Correct Answer - b `vecx +vecc xx vecy = veca` `vecy +vecc xx vecx =vecb` taking cross with `vecc` , we have `vecc xx vecy + vecc xx (vecc xx vecx) =vecc xx vecb` ` Rightarrow (veca - vecx) + (vecc .vecx)vecc- (vecc.vecc)vecx = vecc xx vecb` Also `vecx + vecc xx vecy= veca` ` Rightarrow vecc. vecx + vecc.(vecc xx vecy) =vecc. veca` ` or vecc . vecx + 0 = vecc.vcea` ` Rightarrow veca- vecx + (vcec - veca) vecc -(vecc-vecc)vecx = vecc xx vecb` `or vecx ( 1 + (vecc.vecc)) = vecb xx vecc + veca + (vecc .veca). vecc` `or vecc= (vecb xx vecc + veca + (vecc . vecb) vecc)/ (1+vecc.vecc)` similarly on taking cross product of Eq (i) , we find ` vecy = (veca xx vecc + vecb + (vecc. veca) vecc)/ (1 + vecc .vecc)`

Discussion

No Comment Found

Related InterviewSolutions

If `veca=a_(1)hati+a_(2)hatj+a_(3)hatk, vecb= b_(1)hati+b_(2)hatj + b_(3)hatk, vecc=c_(1)hati+c_(2)hatj+c_(3)hatk and [3veca+vecb 3vecb+vecc 3vecc + veca] =lambda|{:(veca.hati,veca.hatj,veca.hatk),(vecb.hati,veca.hatj,hatb.hatk),(vecc.hati,vecc.hatj,vecc.hatk):}| " then find the value of " lambda/4`
`veca, vecb and vecc` are unit vecrtors such that `|veca + vecb+ 3vecc|=4` Angle between `veca and vecb is theta_(1)` , between `vecb and vecc is theta_(2)` and between `veca and vecb` varies `[pi//6, 2pi//3]` . Then the maximum value of `cos theta_(1)+3cos theta_(2)` isA. 3B. 4C. `2sqrt2`D. 6
The volume of a tetrahedron fomed by the coterminus edges `veca , vecb and vecc is 3` . Then the volume of the parallelepiped formed by the coterminus edges `veca +vecb, vecb+vecc and vecc + veca` isA. 6B. 18C. 36D. 9
Let `vecb=4hati+3hatj and vecc` be two vectors perpendicular to each other in the xy-plane. Find all vetors in te same plane having projection 1 and 2 along `vecb and vecc` respectively.
Let `veca and vecb` be unit vectors that are perpendicular to each other l. then `[veca+ (veca xx vecb) vecb + (veca xx vecb) veca xx vecb]` will always be equal toA. 1B. 0C. `-1`D. none of these
Vectors `vecx,vecy,vecz` each of magnitude `sqrt(2)` make angles of `60^0` with each other. If `vecxxx(vecyxx(veczxxvecx)=vecb nd vecxxxvecy=vecc, find vecx, vecy, vecz` in terms of `veca,vecb and vecc`.A. `1/2 [(veca + vecc)xxvecb- vecb -veca]`B. `1/2 [(veca - vecc)xxvecb+ vecb +veca]`C. `1/2 [(veca - vecb)xxvecc+ vecb +veca]`D. `1/2[(veca-vecc)xx veca + vecb -veca]`
Vectors `vecx,vecy,vecz` each of magnitude `sqrt(2)` make angles of `60^0` with each other. If `vecxxx(vecyxx(veczxxvecx)=vecb nd vecxxxvecy=vecc, find vecx, vecy, vecz` in terms of `veca,vecb and vecc`.A. `1/2[(veca-vecc) xx vecc-vecb+veca]`B. `1/2[(veca-vecb) xx vecc+vecb-veca]`C. `1/2[veccxx(veca-vecb) + vecb +veca]`D. none of these
Let `veca=hati+4hatj+2hatk,vecb=3hati-2hatj+7hatk and veca=2hati-2hatj+4hatk` . Find a vector `vecd` which perpendicular to both `veca and vecb and vecc.vecd=15`.
The value of a so thast the volume of parallelpiped formed by vectors `hati+ahatj+hatk, hatj+ahatk, ahati+hatk` becomes minimum is (A) `sqrt93)` (B) 2 (C) `1/sqrt(3)` (D) 3
If `vecr and vecs` are non-zero constant vectors and the scalar b is chosen such that `|vecr+bvecs|` is minimum, then the value of `|bvecs|^(2)+|vecr+bvecs|^(2)` is equal toA. `2|vecr|^(2)`B. `|vecr|^(2)//2`C. `3|vecr|^(2)`D. `|vecr|^(2)`

Discussion

No Comment Found

Related InterviewSolutions

Reply to Comment