Find the area of a parallelogram whose adjacent sides are given by the vectors `overset(to)(a) = 3 hat(i) + 5 hat(j) - 2 hat(k) and overset(to)( b) = 2 hat(i) + hat(j) + 3 hat(k)`.

Find the angle between vec(P) = - 2hat(i) +3 hat(j) +hat(k) and vec(Q) = hat(i) +2hat(j) - 4hat(k)

Angle between the vectors vec(a)=-hat(i)+2hat(j)+hat(k) and vec(b)=xhat(i)+hat(j)+(x+1)hat(k)

The unit vactor parallel to the resultant of the vectors vec(A)=4hat(i)+3hat(j)+6hat(k) and vec(B)=-hat(i)+3hat(j)-8hat(k) is :-

Find the components of vector vec(a)=3hat(i)+4hat(j) along the direction of vectors hat(i)+hat(j) & hat(i)-hat(j)

Find the equation of the sphere whose centre has the position vector 3hat(i)+6hat(j)-4hat(k) and which touches the plane r*(2hat(i)-2hat(j)-hat(k))=10 .

Following forces start acting on a particle at rest at the origin of the co-ordinate system simultaneously vec(F)_(1)=-4hat(i)+5hat(j)+5hat(k), vec(F)_(2)=-5hat(i)+8hat(j)+6 hat(k), vec(F)_(3)=-3 hat(i)+4 hat(j)-7hat(k) and vec(F)_(4)=12hat(i)-3hat(j)-2hat(k) then the particle will move-

If vec(A) =2hat(i)-2hat(j) and vec(B)=2hat(k) then vec(A).vec(B) ……

Find a unit vector perpendicular to both the vectors (2hat(i)+3hat(j)+hat(k)) and (hat(i)-hat(j)-2hat(k)) .

Statemen-I The locus of a point which is equidistant from the point whose position vectors are 3hat(i)-2hat(j)+5hat(k) and (hat(i)+2hat(j)-hat(k)), is r.(hat(i)-2hat(j)+3hat(k))=8. Statement-II The locus of a point which is equidistant from the points whose position vectors are a and b is |r-(a+b)/(2)|*(a-b)=0 .

Find the unit vector perpendicular the plane rcdot(2hat(i)+hat(j)+2hat(k))=5 .