Solving Problems with Attractive Inverse Cubed Force

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The discussion revolves around solving a physics problem involving a particle under an attractive inverse cubed force, defined as F = -K/r^3. Participants are tasked with finding the potential energy function V(r), which is derived as V(r) = -K/2r^2 + L^2/2mr^2, and plotting it against r. The qualitative motion is analyzed using the effective potential method, while further calculations involve determining the energy (E) and angular momentum (L) for circular orbits, as well as the time period of the orbit. There is also a query regarding the period of small oscillations after a slight perturbation of the orbit. Clarifications on the definitions of terms like potential energy, energy, and angular momentum are requested for better understanding.
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I have a problem for this question, please help me

A particle of mass m is moving in an attractive inverse cubed force given by

F = -K/r^3, where K>0

a) Find V(r) and plot V(r) versus r.
b) Discuss the motion qualitatively by the method of effective potential.
C) Find E and L when the particle is moving in a circular orbit.
d) Find the time period of the orbit.
e) If the orbit is perturbed slightly, what will be the period of small oscillations?
 
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What, exactly, have you done so far?
 
I don't know a shape of V(r) versus r
 
<i>I don't know a shape of V(r) versus r</i>

V is potential energy? Then V(r) is the integral of the force with respect to displacement.

Edit: make that the negative integral of the force etc.
 
Last edited:
I find V(r) = -k/2r^2 + L^2/2mr^2
a part of r^2 of two terms are equal. Which total graph of V(r)
 
I could interpret V(r) as velocity or potential energy. Also I have no idea what "E"and "L" are. Please be sure you define all terms.
 

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