Answer to Question #278931 in Mechanics | Relativity for Ridwan

Question #278931

a particle in a central force field discribed by the spiral orbit r=r0e^(theta). how to show that the force law is inverse cube and that (theta) veries logrithmically with t?.

Expert's answer

"r=r_0e^{b\\theta},"

"u=\\frac 1r=\\frac{e^{-b\\theta}}{r_0},"

"\\frac{d^2u}{d\\theta^2}+u=\\frac{F}{mr_0^2u^2},"

"(b^2 \\frac{e^{-b\\theta}}{r_0}+\\frac{e^{-b\\theta}}{r_0})\\cdot \\frac 1{r^2}=\\frac F{mr_0^2},"

"(1+b^2)\\frac{e^{-b\\theta}}{r_0}\\cdot \\frac 1{r^2}=\\frac F{mr_0^2},"

"(1+b^2)\\frac 1{r^3}=\\frac F{mr_0^2},"

"F\\sim \\frac 1{r^3}."

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Answer to Question #278931 in Mechanics | Relativity for Ridwan

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