Monoidal natural transformation

The torques or moments acting on an airfoil moving through a fluid can be accounted for by the net lift applied at some point on the airfoil, and a separate net pitching moment about that point whose magnitude varies with the choice of where the lift is chosen to be applied. The aerodynamic center is the point at which the pitching moment coefficient for the airfoil does not vary with lift coefficient (i.e. angle of attack), so this choice makes analysis simpler .^[1]

${\displaystyle \frac{d{C}_m}{d{C}_L}=0}$ where ${\displaystyle C_L}$ is the aircraft lift coefficient.

The concept of the aerodynamic center (AC) is important in aerodynamics. It is fundamental in the science of stability of aircraft in flight.

For symmetric airfoils in subsonic flight the aerodynamic center is located approximately 25% of the chord from the leading edge of the airfoil. This point is described as the quarter-chord point. This result also holds true for 'thin-airfoils'. For non-symmetric (cambered) airfoils the quarter-chord is only an approximation for the aerodynamic center.

A similar concept is that of center of pressure. The location of the center of pressure varies with changes of lift coefficient and angle of attack. This makes the center of pressure unsuitable for use in analysis of longitudinal static stability. Read about movement of centre of pressure.

Role of aerodynamic center in aircraft stability

For longitudinal static stability: ${\displaystyle \frac{d{C}_m}{d\alpha }<0}$     and    ${\displaystyle \frac{d{C}_z}{d\alpha }>0}$

For directional static stability:   ${\displaystyle \frac{d{C}_n}{d\beta }>0}$     and    ${\displaystyle \frac{d{C}_y}{d\beta }>0}$

Where:

${\displaystyle C_z=C_{L}cos(\alpha )+C_{d}sin(\alpha )}$

${\displaystyle C_x=C_{L}sin(\alpha )-C_{d}cos(\alpha )}$

For A Force Acting Away at the Aerodynamic Center, which is away from the reference point:

${\displaystyle X_{AC}=X_{ref}+c\frac{d{C}_m}{d{C}_z}}$

Which for Small Angles ${\displaystyle cos(\alpha )=1}$ and ${\displaystyle sin(\alpha )}$=${\displaystyle \alpha }$, ${\displaystyle \beta }=0$, ${\displaystyle C_z=C_L-C_d*\alpha }$, ${\displaystyle C_z=C_L}$ simplifies to:

${\displaystyle X_{AC}=X_{ref}+c\frac{d{C}_m}{d{C}_L}}$

${\displaystyle Y_{AC}=Y_{ref}}$

${\displaystyle Z_{AC}=Z_{ref}}$

General Case: From the definition of the AC it follows that

${\displaystyle X_{AC}=X_{ref}+c\frac{d{C}_m}{d{C}_z}+c\frac{d{C}_n}{d{C}_y}}$

.

${\displaystyle Y_{AC}=Y_{ref}+c\frac{d{C}_l}{d{C}_z}+c\frac{d{C}_n}{d{C}_x}}$

.

${\displaystyle Z_{AC}=Z_{ref}+c\frac{d{C}_l}{d{C}_y}+c\frac{d{C}_m}{d{C}_x}}$

The Static Margin can then be used to quantify the AC:

${\displaystyle SM=\frac{X_{AC}-X_{CG}}{c}}$

where:

${\displaystyle C_n}$ = yawing moment coefficient

${\displaystyle C_m}$ = pitching moment coefficient

${\displaystyle C_l}$ = rolling moment coefficient

${\displaystyle C_x}$ = X-force ~= Drag

${\displaystyle C_y}$ = Y-force ~= Side Force

${\displaystyle C_z}$ = Z-force ~= Lift

ref = reference point (about which moments were taken)

c = reference length

S = reference area

q = dynamic pressure

${\displaystyle \alpha }$ = angle of attack

${\displaystyle \beta }$ = sideslip angle

SM = Static Margin

References

See also

• Aircraft flight mechanics
• Flight dynamics
• Longitudinal static stability
• Thin-airfoil theory
• Joukowsky transform