MCQMediumJEE 2023Newton's Law of Gravitation

JEE Physics 2023 Question with Solution

A body is released from a height equal to the radius RR of the earth. The velocity of the body when it strikes the surface of the earth will be

  • A

    2gR\sqrt{2gR}

  • B

    4gR\sqrt{4gR}

  • C

    gR2\sqrt{\dfrac{gR}{2}}

  • D

    gR\sqrt{gR}

Answer

Correct answer:D

Step-by-step solution

Standard Method

Given: A body is released from rest from a height equal to the earth's radius, so its initial distance from the centre of the earth is 2R2R and its final distance is RR.

Find: The velocity with which it strikes the earth's surface.

Use conservation of mechanical energy.

Gravitational potential energy at a distance rr from the centre is

U=GMmrU=-\frac{GMm}{r}

So,

Ui=GMm2R,Uf=GMmRU_i=-\frac{GMm}{2R}, \qquad U_f=-\frac{GMm}{R}

The body starts from rest, so initial kinetic energy is zero. At the surface, if the speed is vv, then

GMm2R=GMmR+12mv2-\frac{GMm}{2R}=-\frac{GMm}{R}+\frac{1}{2}mv^2

Therefore,

12mv2=GMmRGMm2R=GMm2R\frac{1}{2}mv^2=\frac{GMm}{R}-\frac{GMm}{2R}=\frac{GMm}{2R}

Hence,

v2=GMRv^2=\frac{GM}{R}

Using

g=GMR2g=\frac{GM}{R^2}

we get

GM=gR2GM=gR^2

Substituting,

v2=gR2R=gRv^2=\frac{gR^2}{R}=gR

So,

v=gRv=\sqrt{gR}

Therefore, the correct option is D.

Quick Energy Insight

Given: The body falls from r=2Rr=2R to r=Rr=R.

Find: The impact speed.

For large heights, gravitational potential energy must be used in the form GMmr-\frac{GMm}{r}.

The loss in potential energy is

ΔU=(GMmR)(GMm2R)=GMm2R\Delta U=\left(-\frac{GMm}{R}\right)-\left(-\frac{GMm}{2R}\right)=-\frac{GMm}{2R}

So the gain in kinetic energy is

GMm2R\frac{GMm}{2R}

Thus,

12mv2=GMm2R\frac{1}{2}mv^2=\frac{GMm}{2R}

which gives

v2=GMR=gRv^2=\frac{GM}{R}=gR

Hence,

v=gRv=\sqrt{gR}

Therefore, the correct option is D.

For problems involving heights comparable to the earth's radius, constant-gg formulas are not valid.

Common mistakes

  • Using the constant-gg relation v2=2ghv^2=2gh with h=Rh=R is incorrect here because gg changes significantly with height when the height is comparable to the earth's radius. Use gravitational potential energy U=GMmrU=-\frac{GMm}{r} instead.

  • Taking the initial distance from the earth's centre as RR is wrong. The body is released from a height equal to the radius above the surface, so the initial distance is R+R=2RR+R=2R.

  • Using the wrong sign for gravitational potential energy can reverse the energy change. Gravitational potential energy is negative and must be written as U=GMmrU=-\frac{GMm}{r}.

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