Let the force experienced by the weighing scale needle be F,

Given,

Mass of the man = 70 kg

Acceleration due to gravity, g = 10 m/s²

A. If the lift if moving upwards with a uniform velocity,

The acceleration of the lift ‘a’ is zero,

Using the Newton’s second law of motion, The net force is thus gravitational force acting downward,

F – m× g=0

⇒ F= m×g =70 kg × 10 m/s²

⇒ F=700 N

The apparent weight m’ shown on the weighing machine is that of mass which is calculated as,

⇒ m’= 70 kg

which is same as the original weight of the man.

B. If the lift is moving downwards

Given,

Acceleration of the lift, ‘a’=5 m/s²

The motion is in the same direction as the acceleration due to gravity,

Using the Newton’s second law of motion, the net force thus is,

F + mg = ma

⇒ F = m× (a-g) = 70 kg× (5– 10) m/s²

⇒ F = 70 kg× (-5 m/s²) = -350 N

Thus, the apparent weight of the man is,

C. If the lift is moving upwards,

Given,

Acceleration of the lift, ‘a’= 5 m/s²

The motion is in the opposite direction as the acceleration due to gravity,

Using the Newton’s second law of motion, the net force thus is,

F – mg = ma

⇒ F = m (a+g) = 70 kg × (5+10) m/s²

⇒ F = 70 kg × 15 m/s² =1050 N

The apparent weight of the am on the weighing machine thus is,

D. When the lift is moving downward freely under gravity,

The acceleration of the lift, ‘a’ = g= 10 m/s²

Using the Newton’s second law of motion, the net force thus is,

F + mg = mg

⇒ F = 0 N

Thus, the body is under the state of free fall with a reading of zero in the weighing machine.