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प्रश्न
Two particles of equal mass 'm' go around a circle of radius R under the action of their mutual gravitational attraction. The speed of each particle with respect to its centre of mass is ______.
विकल्प
`sqrt((Gm)/(4R))`
`sqrt((Gm)/(3R))`
`sqrt((Gm)/(2R))`
`sqrt((Gm)/(R))`
उत्तर
Two particles of equal mass 'm' go around a circle of radius R under the action of their mutual gravitational attraction. The speed of each particle with respect to its centre of mass is `underlinebb(sqrt((Gm)/(4R)))`.
Explanation:
As two masses revolve about the common centre of mass O.
∴ Mutual gravitational attraction = centripetal force
`(Gm^2)/(2R)^2 = momega^2R`
⇒ `(Gm)/(4R^3) = omega^2`
⇒ `omega = sqrt((Gm)/(4R^3))`
If the velocity of the two particles with respect to the centre of gravity is v. then,
v = ωR
v = `sqrt((Gm)/(4R^3)) xx R = sqrt((Gm)/(4R))`
