Astrodynamics/Basic Rocketry

This section of the introduction will cover the basic ideas and theory of how rockets fly and leave the atmosphere as well as introduce the rocket equation.

The Ideal Rocket Equation
Rockets are momentum exchange devices the function by expelling some fluid (usually very hot gas or plasma) which "pushes" the rocket via Newtons third law of motion. Rockets are technically all around us ranging from simple water bottle rocket, to fireworks, to more sophisticated rockets like the Saturn V. The Tsiolkovsky Rocket Equation, derived below, is basic and fundamental principle of how rockets fly and shows the maximum change in velocity, $$\Delta V$$ (Delta V), that can be achieved by a rocket provided no external forces act on it.

$$\Delta V = v_{e} \ln{\left(\frac{m_{0}}{m_{f}}\right)} = I_{SP} g_{0} \ln{\left(\frac{m_{0}}{m_{f}}\right)}$$

Where,


 * $$v_{e}$$ is the effective exhaust velocity (out of the nozzle) equal to $$I_{SP} g_{0}$$.
 * $$I_{SP}$$ is the specific impulse of measuring in seconds. It's a measure of solid rocket fuel efficiency specifically the impulse created per unit weight (on Earth) of propellant.
 * $$g_{0}$$ is the standard gravity on Earth near ground level.
 * $$m_{0}$$ is the mass of the rocket before firing it's engines. Commonly the initial total mass is used (wet mass).
 * $$m_{f}$$ is the mass of the rocket after the engines stop burning. Commonly the final total mass is used (dry mass).

The Rocket Equation states that with a faster exhaust velocity the greater finally velocity of the rocket; however, due to the natural logarithm there is an exponential increase in the initial mass of the rocket. Therefore, it is not beneficial to increase the mass of rocket as it will have negligible return and instead the uses of stages (multiple rocket stacked on top of each other) is more beneficial. Further, it's important to state that it might be misleading thinking that more efficient rockets (higher $$I_{SP}$$) are better at launch, since the rocket may not lift of the ground if the thrust force propelling it up is too small. This is due to the fact that the equation functions with no external forces acting on it.

Although the Rocket Equation has it's limitations it is a useful resources for explaining future topics such as transfers. However, to elaborate on reason why the efficiency might be misleading it's worth noticing that in the derivation we have found the $$F=ma$$ equation. Hence, the instantaneous thrust force on the rocket in 1D is shown below. As can be seen if the ISP is high and the rocket motor is efficient it will not mean much if the mass flow rate, $$\dot{m}$$, is low and the thrust cannot surpass gravity and aerodynamical drag.

$$T = v_{e} \dot{m} = g_{0} I_{SP} \dot{m}$$

Rocket Staging
The rocket's propulsion system can only consist of one fuel tank and one engine, however, such a system cannot be used to get into earth's orbit, as for that we would need a very long fuel tank, which is impractical since it would lower the engine's thrust to weight ratio(Except for the hypothetical spaceplane single stage to orbit or SSTO designs like Skylon). Such a problem is solved by adding multiple stages, with each stage consisting of a propellant tank and an engine, along with a separation system(Sometimes along with other things like an electronic guidance system or parachutes). When the propellant of one stage runs out, that section is removed, thus reducing onboard dry mass. Staging can be used for reasons such as:
 * Reducing onboard dry mass
 * Using engines more fit to the situation(Certain engines are optimized for certain altitudes, so they can be put on different stages)

This makes staging an expensive, but effective method to go to earth's orbit and beyond. There are also efforts to make stages reusable to reduce the cost of using these rockets.