Aerodynamic problems are classified by the flow environment or properties of the flow, including
flow speed,
compressibility, and viscosity.
External aerodynamics is the study of flow around solid objects of various shapes. Evaluating the
lift and
drag on an
airplane or the
shock waves that form in front of the nose of a
rocket are examples of external aerodynamics.
Internal aerodynamics is the study of flow through passages in solid objects. For instance, internal aerodynamics encompasses the study of the airflow through a
jet engine or through an
air conditioning pipe. Aerodynamic problems can also be classified according to whether the
flow speed is below, near or above the
speed of sound. A problem is called subsonic if all the speeds in the problem are less than the speed of sound,
transonic if speeds both below and above the speed of sound are present (normally when the characteristic speed is approximately the speed of sound), supersonic when the characteristic flow speed is greater than the speed of sound, and hypersonic when the flow speed is much greater than the speed of sound. Aerodynamicists disagree over the precise definition of hypersonic flow; a rough definition considers flows with
Mach numbers above 5 to be hypersonic. The influence of viscosity on the flow dictates a third classification. Some problems may encounter only very small viscous effects, in that case viscosity can be considered to be negligible. The approximations to these problems are called
inviscid flows. Flows for which viscosity cannot be neglected are called viscous flows.
Incompressible aerodynamics An incompressible flow is a flow in which density is constant in both time and space. Although all real fluids are compressible, a flow is often approximated as incompressible if the effect of the density changes cause only small changes to the calculated results. This is more likely to be true when the flow speeds are significantly lower than the speed of sound. Effects of compressibility are more significant at speeds close to or above the speed of sound. The Mach number is used to evaluate whether the incompressibility can be assumed, otherwise the effects of compressibility must be included.
Subsonic flow Subsonic (or low-speed) aerodynamics describes fluid motion in flows which are much lower than the speed of sound everywhere in the flow. There are several branches of subsonic flow but one special case arises when the flow is
inviscid,
incompressible and
irrotational. This case is called
potential flow and allows the
differential equations which describe the flow to be a simplified version of the equations of
fluid dynamics, thus making available to the aerodynamicist a range of quick and easy solutions.{{cite book|last=Katz|first=Joseph|title=Low-speed aerodynamics: From wing theory to panel methods|series=McGraw-Hill series in aeronautical and aerospace engineering|year=1991|publisher=McGraw-Hill In solving a subsonic problem, one decision to be made by the aerodynamicist is whether to incorporate the effects of compressibility. Compressibility is a description of the amount of change of
density in the flow. When the effects of compressibility on the solution are small, the assumption that density is constant may be made. The problem is then an incompressible low-speed aerodynamics problem. When the density is allowed to vary, the flow is called compressible. In air, compressibility effects are usually ignored when the Mach number in the flow does not exceed 0.3 (about 335 feet (102 m) per second or 228 miles (366 km) per hour at 60 °F (16 °C)). Above Mach 0.3, the problem flow should be described using compressible aerodynamics.
Compressible aerodynamics According to the theory of aerodynamics, a flow is considered to be compressible if the
density changes along a
streamline. This means that–unlike incompressible flow–changes in density are considered. In general, this is the case where the Mach number in part or all of the flow exceeds 0.3. The Mach 0.3 value is rather arbitrary, but it is used because gas flows with a Mach number below that value demonstrate changes in density of less than 5%. Furthermore, that maximum 5% density change occurs at the
stagnation point (the point on the object where flow speed is zero), while the density changes around the rest of the object will be significantly lower. Transonic, supersonic, and hypersonic flows are all compressible flows.
Transonic flow The term Transonic refers to a range of flow velocities just below and above the local
speed of sound (generally taken as
Mach 0.8–1.2). It is defined as the range of speeds between the
critical Mach number, when some parts of the airflow over an aircraft become
supersonic, and a higher speed, typically near
Mach 1.2, when all of the airflow is supersonic. Between these speeds, some of the airflow is supersonic, while some of the airflow is not supersonic.
Supersonic flow Supersonic aerodynamic problems are those involving flow speeds greater than the speed of sound. Calculating the lift on the
Concorde during cruise can be an example of a supersonic aerodynamic problem. Supersonic flow behaves very differently from subsonic flow. Fluids react to differences in pressure; pressure changes are how a fluid is "told" to respond to its environment. Therefore, since
sound is in fact, an infinitesimal pressure difference propagating through a fluid, the
speed of sound in that fluid can be considered the fastest speed that "information" can travel in the flow. This difference most obviously manifests itself in the case of a fluid striking an object. In front of that object, the fluid builds up a
stagnation pressure as impact with the object brings the moving fluid to rest. In fluid traveling at subsonic speed, this pressure disturbance can propagate upstream, changing the flow pattern ahead of the object and giving the impression that the fluid "knows" the object is there by seemingly adjusting its movement and is flowing around it. In a supersonic flow, however, the pressure disturbance cannot propagate upstream. Thus, when the fluid finally reaches the object it strikes it and the fluid is forced to change its properties –
temperature,
density,
pressure, and
Mach number—in an extremely violent and
irreversible fashion called a
shock wave. The presence of shock waves, along with the compressibility effects of high-flow velocity (see
Reynolds number) fluids, is the central difference between the supersonic and subsonic aerodynamics regimes.
Hypersonic flow In aerodynamics, hypersonic speeds are speeds that are highly supersonic. In the 1970s, the term generally came to refer to speeds of Mach 5 (5 times the speed of sound) and above. The hypersonic regime is a subset of the supersonic regime. Hypersonic flow is characterized by high temperature flow behind a shock wave, viscous interaction, and chemical dissociation of gas. ==Associated terminology==