A force `vec(F) = 4hat(i) + 3hat(j) - 2hat(k)` is passing through the origin. Its moment about point (1,1,0) is

Consider a particle on which constant forces vec(F) = hat(i) + 2hat(j) + 3hat(k)" " "N" and vec(F_(2)) = 4hat(i) - 5hat(j) - 2hat(k)" " "N" act together resulting in a displacement from position vec(r_(1)) = 20hat(i) + 15 hat(j) " " "cm to" " "vec(r_(2)) = 7hat(k)" "cm" . The total work done on the particle is

The velocity of a particle of mass m is vec(v) = 5 hat(i) + 4 hat(j) + 6 hat(k)" " "when at" " " vec(r) = - 2 hat(i) + 4 hat (j) + 6 hat(k). The angular momentum of the particle about the origin is

A force vec F = prop hat i + 3 hat j + 6 hat k is acting at a point vec r = 2 hat i - 6 hat j - 12 hat k . The value of prop for which angular momentum about origin is conserved is.

A force vec(F)=3hat(i)+chat(j) +2hat(k) acting on a particle causes a displacement vec(d)=-4hat(i)+2hat(j)+3hat(k) . If the work done is 6j . Find the value of 'c' ?

A particle acted upon by constant forces 5hat(i) + hat(j) - 2hat(k) and 2hat(i) + hat(j) - 2hat(k) is displaced from the point 2hat(i) + 2hat(j) - 4hat(k)" " "to point" " " 6hat(i) + 4hat(j) - 2hat(k). The total work done by the forces in SI unit is

If vec(a) = hat(i) + 2hat(j) - 3hat(k) and vec(b) = 3hat(i) - hat(j) + 2hat(k) find the angle between the vectors 2vec(a) + vec(b) and vec(a) + 2vec(b) .

Find the vector which is orthogonal to the vector 3hat(i) + 2hat(j) + 6hat(k) and is co-planar with the vectors 2hat(i) + hat(j) + hat(k) and hat(i) - hat(j) + hat(k)

The moment of the force, vec F = 4 hat i + 5 hat j - 6 hat k at (2,0,-3), about the point (2,-2,-2) is given by

Find the vector equation of the plane passing through the origin and containing the line bar(r) = (hat(i) + 4hat(j) + hat(k)) + lambda(hat(i) + 2hat(j) + hat(k))

Find the vector equation of the line passing through 2 hat(i) + hat(j) - hat(k) and parallel to the line joining points - hat(i) + hat(j) + 4hat(k) and hat(i) + 2hat(j) + 2hat(k) .