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Question

The ratio of kinetic energy of a planet at perigee and apogee during its motion around the sun in an elliptical orbit of eccentricity eis?


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Solution

Step 1: Given data

eccentricity=e

Step 2: To Find

We have to determine the ratio of the kinetic energy of a planet at perigee and apogee.

Step 3: Calculate the ratio of the kinetic energy of a planet at perigee and apogee

Let,

ra be the distance at apogee.

rp is the distance at perigee.

Denote the distances in terms of semi-major axes and eccentricity (using the concepts of the ellipse).

If a is the length of the semi-major axis then,

ra=a(1+e) (for apogee), and rp=a(1e) (for perigee)

By the law of conservation of momentum, we will equate the angular momentum of the planet which has mass m and velocities of apogee and perigee as va and vp.

mvara=mvprp (on canceling the common terms)
vavp=rpra (we have taken the ratio of velocities and distances)
vavp=1-e1+e ...(1)

We know kinetic energy is given by:
12mv2 (m is the mass and v is the velocity of the moving planet)

The ratio of the kinetic energies from apogee and perigee is:
KpKa=12mv2p12mv2a
KpKa=(1+e)2(1e)2(on substituting the values of velocities from equation one)
Hence, the ratio of kinetic energies is KpKa=(1+e)2(1e)2.


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