Find the vector equation of the following planes in non-parametric from:
(i) ` vecr=( lambda -2 mu) hati+(3- mu) hatj+(2 lambda +mu) hat k`
(ii) ` vecr=(2 hati+2 hatj- hatk)+ lambda ( hati+2 hatj+3 hatk)+mu(5 hati -2 hatj +7 hatk)`

Find the vectore equation of the following plane in scalar product from : vecr=(hat i- hatj)+ lambda( hati+ hat k)+ mu ( hati-2 hatj+3 hatk)

Find the vector equation of the following planes in scalar product from ( vec r. vec n =d) : (i) vecr=(2 hati- hatk)+ lambda hati+ mu( hati- 2 hatj- hatk) (ii) vecr=(1+s-t) hat i +(2-s) hatj+(3-2s+2t) hatk (iii) vecr=hati- hatj+ lambda ( hati + hatj+ hatk) + mu(4 hati-2 hatj +3 hatk)

Find the vector equation of the following plane in scalar product from vecr.= (hati - hatj) + lambda(hati + 2hatj - hatk) + mu (-hati + hatj + 2hatk) ,

Find the vector equation of the following plane in scalar product form : vec r=(hati+hatj)+lambda(hati+2hatj-hatk)+mu(-hati+hatj-2hatk)

The angle between the line vecr=( hati+2 hatj- hatk)+ lambda( hati- hatj+ hatk) and the plane vecr. (2 hati- hatj+ hatk)=4 is __

Find the cartesian from of the equation of the foolowing planes: (i) vecr=( hat i- hatj)+s(- hati+ hat j+2 hat k)+t( hati+2 hatj+ hatk) (ii) vecr= (1+s+t) hat i+(2-s+t) hatj+(3-2s+2t) hatk

Find the angle between the lines vecr = (2hati - hatj +3hatk) + lambda(hati + hatj + 2hatk) and vec r = (hati - 3hatj)+mu(2hatj - hatk)

Show that the vectors hati -2 hatj+3hatk , -2hati+3hatj-4hatk and hati -3hatj +5hatk are coplanar.

Vectors Perpendicular to hati - hatj- hatk and in the plane of hati + hatj + hatk and - hati + hatj + hatk are

Find the equation of a line passing through the point P(2,-1,3) and perpendicular to the lines vecr=(hati+hatj-hatk)+lambda(2hati-2hatj+hatk) and vec r=(2hati-hatj-3hatk)+mu(hati+2hatj+2hatk) .