A particle moved from position `vec r_(1) = 3 hat i + 2 hat j - 6 hat k` to position `vec r_(2) = 14 hat i + 13 hat j + 9 hat k ` under the action of a force `( 4 hat i + hat j + 3 hat k)` newton. Find the work done

A particle moves from position vector vecr_1 = ( 23 hat I + 2 hat j - 6 hat k) to position vector, vec r-2 = ( 14 hat I + 13 hat j+ 9 hat k) in metre under the action of a constant force of vec F = 9 14 hat i+ hat j + 3 hat k) N . Calculat word done by the force.

A particle is displaced from position vec(r )_(1) = (3hat(i) + 2hat(j) + 6hat(k)) to another position vec(r )_(2)= (14hat(i) + 13hat(j) + 9hat(k)) under the impact of a force 5 hat(i)N . The work done will be given by

A body is displaced from vec r_(A) =(2hat i + 4hatj -6hat k) to vecr_(B) = (6hat i -4hat j +3 hat k) under a constant force vec F = (2 hat i + 3 hat j - hat k) . Find the work done.

Find [vec a, vec b, vec c] if vec a = hat i - 2 hat j + 3 hat k , vec b = 2 hat i - 3 hat j + hat k and vec c = 3 hat i + hat j - 2 hat k .

Find the image of the point having position vector hat i+2 hat j+4 hat k in the plane vec r.(2 hat i- hat j+ hat k)+3=0.

A particle moves from position 3hat(i)+2hat(j)-6hat(k) to 14hat(i)+13hat(j)+9hat(k) due to a uniform force of 4hat(i)+hat(j)+3hat(k)N . If the displacement is in meters, then find the work done by the force.

A particle moves from position 3hat(i)+2hat(j)-6hat(k) to 14hat(i)+13hat(j)+9hat(k) due to a uniform force of 4hat(i)+hat(j)+3hat(k)N . If the displacement is in meters, then find the work done by the force.

A particle moves from position 3hat(i)+2hat(j)-6hat(k) to 14hat(i)+13hat(j)+9hat(k) due to a uniform force of 4hat(i)+hat(j)+3hat(k)N . If the displacement is in meters, then find the work done by the force.

The position of a particle is given by vec r = hat i + 2hat j - hat k and its momentum is vec p = 3 hat i + 4 hat j - 2 hat k . The angular momentum is perpendicular to

Find the shortest distance between the lines vec r = (hat i + 2 hat j + hat k) + lambda (hat i - hat j + hat k) and vec r = ( 2 hat i - hat j - hat k) + mu ( 2 hat i + hat J + 2 hat k)