Let’s look in more detail at how a satellite is moved from

QUESTION:

Let's look in more detail at how a satellite is moved from one circular orbit to another. FIGURE CP13.68 shows two circular orbits, of radii \(r_{1}\) and \(r_{2}\), and an elliptical orbit that connects them. Points 1 and 2 are at the ends of the semimajor axis of the ellipse.

a. A satellite moving along the elliptical orbit has to satisfy two conservation laws. Use these two laws to prove that the velocities at points 1 and 2 are

\(v_{1}^{\prime}=\sqrt{\frac{2 G M\left(r_{2} / r_{1}\right)}{r_{1}+r_{2}}} \quad \text { and } \quad v_{2}^{\prime}=\sqrt{\frac{2 G M\left(r_{1} / r_{2}\right)}{r_{1}+r_{2}}}\)

The prime indicates that these are the velocities on the elliptical orbit. Both reduce to Equation \(13.22\) if \(r_{1}=r_{2}=r\).

b. Consider a \(hrm{~km}\) above the earth to a geosynchronous orbit \(35,900 \mathrm{~km}\) above the earth. Find the velocity \(v_{1}\) on the inner circular orbit and the velocity \(v_{1}^{\prime}\) at the low point on the elliptical orbit that spans the two circular orbits.

c. How much work must the rocket motor do to transfer the satellite from the circular orbit to the elliptical orbit?

d. Now find the velocity \(v_{2}^{\prime}\) at the high point of the elliptical orbit and the velocity \(v_{2}\) of the outer circular orbit.

e. How much work must the rocket motor do to transfer the satellite from the elliptical orbit to the outer circular orbit?

f. Compute the total work done and compare your answer to the result of Example 13.6.

Equation Transcription:

Text Transcription:

v_1^'=square root 2GM(r_2/r_1)/r_1+r_2

v_2^'=square root 2GM(r_2/r_1)/r_1+r_2

v_1^'

v_2^'

r_1= r_2= r

r_1

r_2