Understanding Isentropic Flow in Jet Engines

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Exploring the principles of isentropic flow through nozzles and its relevance in jet engine technology. Discusses the concept of reverse reaction, Newton's laws, subsonic to supersonic flow regimes, stagnation point locations, and isentropic relations in a comprehensive manner. Highlights the significance of variable area passages in maximizing force generation.


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  1. Isentropic flow through Nozzles

  2. The main idea of jet engine is reverse reaction The reverse reaction is mainly depend on Newton laws which state that any action have equal another reaction equal in Magnitude and opposite in direction The force acting on the body to move is equal The change in momentum The momentum = mass of the body * velocity To get a maximum force you should increase 1- mass 2- velocity

  3. Subsonic, incompressible Subsonic, compressible Supersonic

  4. Stagnation Point Locations

  5. Isentropic relation in tubular form ? 1 ?? ?1 = 1 +? 1 ?? ?1 = 1 +? 1 ? 1 ?? ?1 = 1 +? 1 ? 1 2 2 2 ?1 ?1 ?1 2 2 2

  6. One-Dimensional Isentropic Flow Property Relations for Isentropic Flow of Ideal Gases ? ?? ? = ? + 1 2 ? 1 1 ?? ? =? + 1 ?? ? = ? + 1 2 ? 1 2

  7. Stagnation Properties If the process is also reversible, the stagnation state is called the isentropic stagnation state. Stagnation enthalpy is the same for isentropic and actual stagnation states Actual stagnation pressure P0,act is lower than P0 due to increase in entropy s as a result of fluid friction. Nonetheless, stagnation processes are often approximated to be isentropic, and isentropic properties are referred to as stagnation properties

  8. Isentropic Flow Through Variable area passages There are two types of variable area passage Nozzle Diffuser Nozzle : Any Device or passage when the flow go through it the flow velocity increases Accelerate the flow Diffuser : Any Device or passage when the flow go through it velocity decreases De- accelerate the flow the flow u u u u 1 2 1 2

  9. Isentropic Flow Through Variable area passages Converging or converging-diverging nozzles are found in many engineering applications Steam and gas turbines, aircraft and spacecraft propulsion, industrial blast nozzles, torch nozzles Here, we will study the effects of back pressure (pressure at discharge) on the exit velocity, mass flow rate, and pressure distribution along the nozzle

  10. Isentropic Flow Through Nozzles Converging Nozzles Under steady flow conditions, mass flow rate is constant ? ?? ? ?.= ??? = ? ? ??? = ? ? ? ?? ? ?? ? = V= ? ? = M ???

  11. Substituting T and P from the expressions ?? ? = ? 1 +? 1 ? 1 ?2 2 ?? ? = 1 +? 1 ?? ? = 1 +? 1 2 ?2 ?1 2 2 Mass flow rate is a function of stagnation properties, flow area, and Mach No ? ?.= ? ? ? ?? ? ? ? ?? ??? ?+1 ?. = 1 + ? 1 ?2/2 2 ? 1

  12. Isentropic Flow Through Nozzles Converging Nozzles The maximum mass flow rate through a nozzle with a given throat area A* is fixed by the P0 and T0 and occurs at Ma = 1 ?+1 2 ? 1 2 ? ? = ? ?? ??? ? + 1 This principal is important for chemical processes, medical devices, flow meters, and anywhere the mass flux of a gas must be known and controlled.

  13. Isentropic Flow Through Nozzles Converging Nozzles ?? ?1 = 1 +? 1 2 ?1 2 ? ?? ?1 = 1 +? 1 ? 1 2 ?1 2 1 ?? ?1 = 1 +? 1 ? 1 2 ?1 2

  14. If the exit pressure is equal to the reservoir pressure nothing happens. There will only be flow if there is a pressure difference. If the exit pressure is slightly less then the reservoir pressure, the flow begins to move but only slowly. The lower the exit pressure, the higher the velocity up until the velocity at the throat goes sonic. We can see this effect by plotting the local pressure versus location in the nozzle.

  15. Isentropic Flow Through Nozzles Converging Nozzles State 1: Pb = P0, there is no flow, and pressure is constant. State 2: Pb < P0, pressure along nozzle decreases. State 3: Pb =P* , flow at exit is sonic, creating maximum flow rate called choked flow. State 4: Pb < Pb, there is no change in flow or pressure distribution in comparison to state 3 State 5: Pb =0, same as state 4. ? ?? ? = 1 +? 1 ? 1 2 ? 2

  16. ? ?? ?1 = 1 +? 1 ? 1 2 ?1 2 ? ?? ? = ? + 1 2 ? 1 17

  17. Nozzle Performance Another method of expressing nozzle performance is with a velocity coefficient, which is defined as Sometimes a discharge coefficient is used and is defined as

  18. Diffuser Performance Most of the propulsion industry uses the total-pressure recovery factor as a measure of diffuser performance.

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