Find the area of a parallelogram whose diagonals are `vec(a)=3hat(i)+hat(j)-2hat(k)` and `vec(b)=hat(i)-3hat(j)+4hat(k)` .

Find a vector of magnitude 6 and perpendicular to both vec(a) = 2hat(i) + 2hat(j) + hat(k) and vec(b) = hat(i) - 2hat(j) + 2hat(k)

A plane is at a distance of 5 units from the origin and perpendicular to the vector 2hat(i) + hat(j) + 2hat(k) . The equation of the plane is a) vec(r ).(2hat(i) + hat(j) -2hat(k))=15 b) vec(r ).(2hat(i)+ hat(j)-hat(k))=15 c) vec(r ).(2hat(i) + hat(j)+ 2hat(k))=15 d) vec(r ).(hat(i) + hat(j) + 2hat(k))=15

The point of intersection of the line vec(r)=7hat(i)+10hat(j)+13hat(k)+s(2hat(i)+3hat(j)+4hat(k)) and vec(r)=3hat(i)+5hat(j)+7hat(k)+t(hat(i)+2hat(j)+3hat(k)) is :