A particle is projected vertivally upwards from the surface of earth `(radius R_e)` with a kinetic energy equal to half of the minimum value needed for it to escape. The height to which it rises above the surface of earth is ……

A particle is projected vertivally upwards from the surface of earth `

1.	A particle is projected vertivally upwards from the surface of earth `(radius R_e)` with a kinetic energy equal to half of the minimum value needed for it to escape. The height to which it rises above the surface of earth is ……
Answer» Let `upsilon_(e)` be the escape velocity of Earth. A particle can escape when its total energy `(KE + PE)` becomes zero at infinity. So `(1)/(2) m upsilon_(e)^(2) + (-(GMm)/(R )) = 0` or `(1)/(2) m upsilon_(e)^(2) = (GMm)/(R )` Supplied `KE = (1)/(2) xx (1)/(2) m upsilon_(e)^(2) = (GMm)/(2R)` Let the particle rises to a height `h`, then `(1)/(2) xx (1)/(2) m upsilon_(e)^(2) = (GMm)(R + h)` `(GMm)/(2R) = (GMm)/(R + h)` or `h = R`

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A particle is projected vertivally upwards from the surface of earth `(radius R_e)` with a kinetic energy equal to half of the minimum value needed for it to escape. The height to which it rises above the surface of earth is ……

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