MHT CET · Physics · Rotational Motion
A particle of mass ' \(m\) ' is rotating in a circular path of radius ' \(r\) '. Its angular momentum is ' \(L\) '. The centripetal force acting on it is ' \(F\) '. The relation between ' \(F\) ', ' \(L\) ', ' \(r\) ' and ' \(m\) ' is
- A \(\mathrm{F}=\frac{\mathrm{L}}{\mathrm{mr}^2}\)
- B \(\mathrm{L}=\mathrm{m}^2 \mathrm{Fr}^2\)
- C \(\frac{\mathrm{L}^2}{\mathrm{~m}}=\mathrm{Fr}^3\)
- D \(\frac{\mathrm{F}}{\mathrm{L}^3}=\mathrm{mr}^2\)
Answer & Solution
Correct Answer
(C) \(\frac{\mathrm{L}^2}{\mathrm{~m}}=\mathrm{Fr}^3\)
Step-by-step Solution
Detailed explanation
Angular momentum,
\(\mathrm{L}=\mathrm{rp} \sin \theta=\mathrm{rp} \quad\) for U.C.M. \(\quad\left[\because \theta=.90^{\circ}\right]\)
\(\therefore \quad \frac{\mathrm{L}^2}{\mathrm{mr}^3}=\frac{\mathrm{r}^2 \mathrm{~m}^2 \mathrm{v}^2}{\mathrm{mr}^3}=\frac{\mathrm{mv}^2}{\mathrm{r}}\)
Given, Centripetal force, \(F=\frac{m^2}{r}\)
\(\frac{\mathrm{L}^2}{\mathrm{mr}^3}=\mathrm{F} \Rightarrow \frac{\mathrm{~L}^2}{\mathrm{~m}}=\mathrm{Fr}^3\)
\(\mathrm{L}=\mathrm{rp} \sin \theta=\mathrm{rp} \quad\) for U.C.M. \(\quad\left[\because \theta=.90^{\circ}\right]\)
\(\therefore \quad \frac{\mathrm{L}^2}{\mathrm{mr}^3}=\frac{\mathrm{r}^2 \mathrm{~m}^2 \mathrm{v}^2}{\mathrm{mr}^3}=\frac{\mathrm{mv}^2}{\mathrm{r}}\)
Given, Centripetal force, \(F=\frac{m^2}{r}\)
\(\frac{\mathrm{L}^2}{\mathrm{mr}^3}=\mathrm{F} \Rightarrow \frac{\mathrm{~L}^2}{\mathrm{~m}}=\mathrm{Fr}^3\)
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