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Let us analyse the problem to see how this can happen. The satellite is kept in orbit "being balanced" by two forces in the equation $\frac{mv^2}{r}=\frac{GMm}{r^2}$ From this we get $v=\sqrt\frac{GM}{r}$ therefore the angular momentum is $L=pr=mvr=m(\sqrt{GM})r^{1/2}$. This equation shows that, as long as the mass of the satellite does not change, putting it on a higher orbit will not necessarely keep the angular momentum fixed. The angular momentum can remain the same by taking into account the fact that the satellite mass is reduced by fuel consumption in order to be placed to a higher orbit. Therefore, if $r\rightarrow \alpha r$ and $m\rightarrow \frac m{\alpha^{1/2}}$ where $\alpha\gt1$ then the satellite will keep the same angular momentum. |
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