Solution

The weight of a body is defined as the product of mass and acceleration due to gravitational force. It means that weight of a body is simply equal to the gravitational pull (force) on the body. Since acceleration due to gravity is “g” in the lift (whether accelerating or not), the weight of the person is “mg”. The weight of the person does not change - though the net force on the person has changed.

What is meant here that terms such as “lesser weight”, “greater weight” or “weightlessness” in accelerated motion, are actually loose expressions. These are states, corresponding to change in the “net force” and not the change in the “weight”. The weight remains “mg”.

Strictly speaking, we must use relative terms of weight, only if gravitational force on the body has changed. In accelerated motion, we can, however, be not incorrect to say that we experience the “feeling” of weightlessness or lesser or greater weight.

Hence, option (a) is correct.

Solution

The weight of the block is mg = 5 x 10 = 50 N. Since spring balance records lesser weight, it means that spring force (F) is less than the weight of the block. It means that lift is accelerating in downward direction such that :

Figure 1

Free body diagram

∑ F y = m g - F = m a ⇒ F = m ( g - a ) ∑ F y = m g - F = m a ⇒ F = m ( g - a )

An acceleration in downward direction means :

(i) lift is moving down with increasing speed

(ii) lift is moving up with decreasing speed

Hence, options (b) and (c) are correct.

Solution

The motion of the box takes place in relation to the person, who is accelerating down with acceleration “g”. Here, we analyze the problem in the inertial frame of the ground. The forces on the box are (i) its weight, "mg", acting downward and (ii) normal force, "N", acting downward. As the bodies are falling freely under the gravity, the acceleration of each of them is equal to "g" i.e. acceleration due to gravity.

Now, the free body diagram of the box is shown in the figure.

Figure 2

Free body diagram

∑ F y = m g - N = m a ⇒ N = m ( g - a ) ∑ F y = m g - N = m a ⇒ N = m ( g - a )

As a = g,

⇒ N = m ( g - g ) = 0 ⇒ N = m ( g - g ) = 0

Alternatively, we can analyze the situation in the non-inertial frame of person, who is falling freely under gravity. In this non-inertial reference, box is stationary. The forces on the box in this reference are (i) weight of box, "mg", acting downward (ii) normal force, "N", acting upward and (iii) pseudo force, "mg", applied in the upward direction opposite to the direction of acceleration of the frame of reference.

∑ F y = N + m g - m g = 0 ⇒ N = 0 ∑ F y = N + m g - m g = 0 ⇒ N = 0

Hence, option (d) is correct.

Solution

It is convenient to carry out force analysis of block “A”. For, it is acted by only two forces as compared to three forces for block “B”. Since normal forces are equal and opposite in accordance with Newton’s third law, it is same whether we determine normal force with respect to “A” or “B”.

Free body diagram of “A” Free body diagram of “A”

Figure 4

Free body diagram

∑ F y = m g - N = m a ⇒ N = m ( g - a ) ⇒ N = 1 x ( 10 - 3 ) = 7 Newton ∑ F y = m g - N = m a ⇒ N = m ( g - a ) ⇒ N = 1 x ( 10 - 3 ) = 7 Newton

Alternatively, using the reference of lift, the forces on the block "A" are (i) its weight, "mg", acting downward (ii) Normal force, "N", acting upward and (iii) pseudo force "ma" acting upwards in the direction opposite to that of the acceleration of the lift. In this non-inertial frame, however, the block is stationary. Hence,

∑ F y = N + m a - m g = 0 ⇒ N = m ( g - a ) ⇒ N = 1 x ( 10 - 3 ) = 7 Newton ∑ F y = N + m a - m g = 0 ⇒ N = m ( g - a ) ⇒ N = 1 x ( 10 - 3 ) = 7 Newton

Hence, option (c) is correct.

Solution

The motion of the ball (say A) is not taking place in contact with lift. The moment it is let go, the only force on the ball is due to gravity. The question, therefore, reduces to motions of two objects, which are moving towards each other to cover a linear distance of 2.4 m, starting with zero speeds. Considering downward direction as positive, the relative acceleration of the ball (A) with respect to lift floor (B) is :

a AB = a A - a B ⇒ a AB = 10 - ( - 2 ) = 12 m / s 2 a AB = a A - a B ⇒ a AB = 10 - ( - 2 ) = 12 m / s 2

Now applying equation for constant acceleration with initial velocity zero,

y = 1 2 a t 2 ⇒ 2.4 = 1 2 x 12 x t 2 ⇒ t 2 = 4.8 12 = 0.4 ⇒ t = 0.63 s y = 1 2 a t 2 ⇒ 2.4 = 1 2 x 12 x t 2 ⇒ t 2 = 4.8 12 = 0.4 ⇒ t = 0.63 s

Hence, option (c) is correct.

Solution

The balance reads the spring force. The free body diagram is :

Figure 5

Free body diagram

∑ F y = N - m g = m a ⇒ N = m ( a + g ) ⇒ m = 48 ( 2 + 10 ) = 4 kg ∑ F y = N - m g = m a ⇒ N = m ( a + g ) ⇒ m = 48 ( 2 + 10 ) = 4 kg

Hence, option (d) is correct.