MCQEasyJEE 2023Impulse & Momentum

JEE Physics 2023 Question with Solution

100 balls each of mass mm moving with speed vv simultaneously strike a wall normally and are reflected back with the same speed, in time tt. The total force exerted by the balls on the wall is:

  • A

    100mvt\frac{100mv}{t}

  • B

    200mvt\frac{200mv}{t}

  • C

    200mvtt\frac{200mvt}{t}

  • D

    mv100t\frac{mv}{100t}

Answer

Correct answer:B

Step-by-step solution

Standard Method

Given: 100 balls, each of mass mm, move normally toward the wall with speed vv and rebound with the same speed in time tt.

Find: The total force exerted by the balls on the wall.

The solution uses the rate of change of momentum.

Initial momentum of all the balls together:

Pi=100mvP_i = 100mv

Final momentum of all the balls together is in the opposite direction:

Pf=100mvP_f = -100mv

Hence, change in momentum is:

Δp=PfPi=100mv100mv=200mv\Delta p = P_f - P_i = -100mv - 100mv = -200mv

Therefore, the magnitude of force is:

F=Δpt=200mvtF = \left|\frac{\Delta p}{t}\right| = \frac{200mv}{t}

So, the total force exerted by the balls on the wall is 200mvt\frac{200mv}{t}. The correct option is B.

The solution also shows an option label C, but the worked result clearly matches option 200mvt\frac{200mv}{t}, which is option B in the provided options.

A ball of mass m moves rightward with speed v toward a vertical wall, with x and y axes shown beside the wall.

Momentum Change View

Given: Reflection is normal and the speed before and after collision is the same.

Find: Total force on the wall due to all the balls.

For one ball, if motion toward the wall is taken as positive, then:

pi=mv,pf=mvp_i = mv, \qquad p_f = -mv

So for one ball:

Δp=pfpi=mvmv=2mv\Delta p = p_f - p_i = -mv - mv = -2mv

For 100 balls:

Δptotal=100(2mv)=200mv\Delta p_{\text{total}} = 100(-2mv) = -200mv

Now use:

Ftotal=ΔptotaltF_{\text{total}} = \frac{\Delta p_{\text{total}}}{t}

Hence, magnitude of the force is:

Ftotal=200mvt|F_{\text{total}}| = \frac{200mv}{t}

Therefore, the total force exerted by the balls on the wall is 200mvt\frac{200mv}{t}.

Common mistakes

  • Using only mvmv as the momentum change. This is wrong because the balls reverse direction, so momentum changes from +mv+mv to mv-mv. Use Δp=mvmv=2mv\Delta p = -mv - mv = -2mv for each ball.

  • Forgetting to multiply by 100 balls. The force found for one ball is not the total force. After finding the momentum change for one ball, multiply by the total number of balls.

  • Ignoring magnitude and keeping the negative sign as the final answer. The negative sign only indicates direction of force relative to the chosen axis. The question asks for the total force, so report the magnitude 200mvt\frac{200mv}{t}.

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