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Question

The potential energy of a particle in a certain field has the form U=ar2−br, where a and b are postive constants, r is the distance from the centre of the field.

A
the value of r0 corresponding to the equilibrium position of the particle is ab
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B
Particle is in unstable equiltibrium.
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C
the minimum attractive force is b227a3
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D
the value of r0 corresponding to the equilibrium position of the particle is 2ab
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Solution

The correct options are
C the minimum attractive force is b227a3
D the value of r0 corresponding to the equilibrium position of the particle is 2ab
U=ar2br

F=dUdr

U= ar2br1

dUdr=[a(2)r21b(1)r11)]

=[2ar3+br2]

F=2ar3br2
At equilibrium,
F=0
Hence,
2ar30br20=0

1r20(2ar0b)=0

2ar0b=0

2ar0=br0=2ab
Hence, option (d) is correct

For option (b)

U=ar2br =ar2br1

dUdr=a(2)r21b(1)r11

=2ar3+br2

d2Udr2=2a(3)(r)4+(2)br3

d2Udr2=6ar42br3

at r0=2ab

=6a(2a)4×b42b(2a)3×b3

=6ab416a42b48a3

=b4a3(3814)

=b4a3(328)=18b4a3

This is positive value, so it is in stable equilibrium.Hence option (b) is incorrect.


For option (c)
We have F=2ar3br2
for maximum or minimum value of force,
dFdr=0

dFdr=2a(3)r4(2)br3=0=6ar4+2br3=0

rm=3ab

d2Fdr=ddr(6ar4+2br3) =6(4)ar5+2(3)br4

=6r4(4arb)

4arb is positive for rm=3ab which says it is a local minima.
We have rm=3ab. So,

Frm=2ar30bb20=2a×b3(3a)3b(3a)2×b2=2ab327a3b39a2

=b27a3
this tells us that it is an attractive force.

For detailed solution watch the next video.


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