NVAEasyJEE 2023Potential Energy & Conservative Forces

JEE Physics 2023 Question with Solution

A 0.4kg0.4 \, \text{kg} mass takes 8s8 \, \text{s} to reach the ground when dropped from a certain height PP above the surface of Earth. The loss of potential energy in the last second of fall is _____ J\text{J}. (Take g=10m/s2g = 10 \, \text{m/s}^2)

Answer

Correct answer:300

Step-by-step solution

Standard Method

Given: Mass m=0.4kgm = 0.4 \, \text{kg}, time of fall n=8n = 8 seconds, and g=10m/s2g = 10 \, \text{m/s}^2.

Find: The loss of potential energy in the last second of fall.

The distance travelled in the nthn^{\text{th}} second of free fall is

hn=u+12g(2n1)h_n = u + \frac{1}{2} g(2n - 1)

Here u=0u = 0, so for n=8n = 8,

h8=12×10×(2×81)h_8 = \frac{1}{2} \times 10 \times (2 \times 8 - 1) h8=12×10×15=75mh_8 = \frac{1}{2} \times 10 \times 15 = 75 \, \text{m}

The loss of potential energy in the last second is

ΔPE=mgh8\Delta PE = mgh_8

Substituting the values,

ΔPE=0.4×10×75=300J\Delta PE = 0.4 \times 10 \times 75 = 300 \, \text{J}

Therefore, the loss of potential energy in the last second of fall is 300J300 \, \text{J}.

Using distance in the eighth second

Given: The body is dropped from rest, so u=0u = 0.

Find: Distance covered in the eighth second, then the corresponding potential energy loss.

For uniformly accelerated motion, the distance covered in the nthn^{\text{th}} second is used directly because the decrease in height during that one-second interval determines the loss in gravitational potential energy.

Using

hn=u+12g(2n1)h_n = u + \frac{1}{2} g(2n - 1)

we get for the eighth second,

h8=0+12×10×15=75mh_8 = 0 + \frac{1}{2} \times 10 \times 15 = 75 \, \text{m}

Now the gravitational potential energy lost in that interval is

ΔPE=mg×75\Delta PE = mg \times 75 ΔPE=0.4×10×75=300J\Delta PE = 0.4 \times 10 \times 75 = 300 \, \text{J}

Hence, the numerical value of the answer is 300.

Common mistakes

  • Using the total height of fall instead of the distance covered in the last second is incorrect because the question asks for the potential energy lost only during the final one-second interval. First find the distance travelled in the eighth second, then multiply by mgmg.

  • Applying s=12gt2s = \frac{1}{2}gt^2 directly for t=8st = 8 \, \text{s} gives the total distance fallen, not the distance in the last second. To get the last-second distance, either use the nthn^{\text{th}}-second formula or subtract the distances at 8s8 \, \text{s} and 7s7 \, \text{s}.

  • Forgetting that the body is dropped from rest leads to taking u0u \neq 0, which changes the nthn^{\text{th}}-second distance formula. Here the word dropped means u=0u = 0.

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