Satellites and Binding Energy EX 4

(a) The initial energy is

${\displaystyle E={\frac {1}{2}}U=-{\frac {1}{2}}{Gm_{E}m_{s} \over r}=-{\frac {1}{2}}{(6.67\times 10^{-11})(6\times 10^{24})(50) \over 2\times 6.4\times 10^{6}}=-7.8\times 10^{8}J}$

(b) First we have to determine the energy of the satellite in the new orbit. It is 20% less than its initial energy. Here we have to think carefully because the energy is negative. What does it mean to loose 20%? Imagine that you owe $100 and you lose some additional money. Your debt will increase! If you lose 20% of your money you may say that your debt increases by 20% to $120 or by a factor of 1.2. Similarly, the energy in the new orbit will be ${\displaystyle E=1.2\times (-7.8\times 10^{8})=-9.4\times 10^{8}J}$. We will use the equation for the energy and isolate ${\displaystyle r}$ from this equation:

${\displaystyle E=-{\frac {1}{2}}{Gm_{E}m_{s} \over r}}$

${\displaystyle r=-{\frac {1}{2}}{Gm_{E}m_{s} \over E}}$

${\displaystyle r=-{\frac {1}{2}}{(6.67\times 10^{-11})(6\times 10^{24})(50) \over -9.4\times 10^{8}}=1.1\times 10^{7}m}$

Note that the satellite descended from the initial distance of ${\displaystyle r=2R_{E}=1.28\times 10^{7}m}$.

(c) The speed of the satellite depends on the distance. From the Newton's law

${\displaystyle {Gm_{E} \over r}=v^{2}}$

we expect that as r decreases the speed should increase. We can use this relationship to find the speed in the new orbit ${\displaystyle v_{new}}$ or we can use ${\displaystyle K=-E}$. Remember that for a circular orbit

${\displaystyle K={\frac {1}{2}}{Gm_{E}m_{s} \over r}=\left\vert E\right\vert }$

The second relationship is simpler to use: ${\displaystyle K=9.4\times 10^{8}J}$, which gives a speed of ${\displaystyle {\frac {1}{2}}m{v_{new}}^{2}=9.4\times 10^{8}={\frac {1}{2}}(50){v_{new}}^{2}}$. This equation yields ${\displaystyle v_{new}=6.13km/s}$.

The velocity in the initial orbit ${\displaystyle v_{old}}$ can be determined similarly using ${\displaystyle {\frac {1}{2}}m{v_{old}}^{2}=7.8\times 10^{8}}$. This equation yields ${\displaystyle v_{old}=5.56km/s}$. The percentage change in speed is approximately 10%. The speed increased by 10%.