8.23 *** A particle of mass m moves with angular momentum & in the field of a fixed force center with = - = /2+1/1/3 k r3 324 F(r) = -- where k and λ are positive. (a) Write down the transformed radial equation (8.41) and prove that the orbit has the form r(ø) = C 1 + € cos(Bo) Chapter 8 Two-Body Central-Force Problems where c, ß, and € are positive constants. (b) Find c and ß in terms of the given parameters, and describe the orbit for the case that 0 < € < 1. (c) For what values of ß is the orbit closed? What happens to your results as λ → 0?

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8.23*** A particle of mass m moves with angular momentum & in the field of a fixed force center with k 14/12 324 F(r) r(p) = + where k and are positive. (a) Write down the transformed radial equation (8.41) and prove that the orbit has the form = بدال C 1 + € cos(Bo) Chapter 8 Two-Body Central-Force Problems where c, ß, and € are positive constants. (b) Find c and ß in terms of the given parameters, and describe the orbit for the case that 0 << < 1. (c) For what values of ß is the orbit closed? What happens to your results as λ → 0?