- Source: Camber (aerodynamics)
In aeronautics and aeronautical engineering, camber is the asymmetry between the two acting surfaces of an airfoil, with the top surface of a wing (or correspondingly the front surface of a propeller blade) commonly being more convex (positive camber). An airfoil that is not cambered is called a symmetric airfoil. The benefits of cambering were discovered and first utilized by George Cayley in the early 19th century.
Overview
Camber is usually designed into an airfoil to raise its maximum lift coefficient CLmax. This minimizes the stalling speed of aircraft using the airfoil. An aircraft with wings using a cambered airfoil will have a lower stalling speed than an aircraft with a similar wing loading and wings using a symmetric airfoil.
One recent cambered design is called the supercritical airfoil. It is used for near-supersonic flight and produces a higher lift-to-drag ratio at near supersonic flight than traditional airfoils. Supercritical airfoils employ a flattened upper surface, highly cambered (curved) aft section, and greater leading-edge radius as compared to traditional airfoil shapes. These changes delay the onset of wave drag.
Definition
An airfoil is said to have a positive camber if its upper surface (or in the case of a driving turbine or propeller blade its forward surface) is the more convex. Camber is a complex property that can be more fully characterized by an airfoil's camber line, the curve Z(x) that is halfway between the upper and lower surfaces, and thickness function T(x), which describes the thickness of the airfoils at any given point. The upper and lower surfaces can be defined as follows:
Z
upper
(
x
)
=
Z
(
x
)
+
1
2
T
(
x
)
{\displaystyle Z_{\text{upper}}(x)=Z(x)+{\frac {1}{2}}T(x)}
Z
lower
(
x
)
=
Z
(
x
)
−
1
2
T
(
x
)
{\displaystyle Z_{\text{lower}}(x)=Z(x)-{\frac {1}{2}}T(x)}
= Example – An airfoil with reflexed camber line
=An airfoil where the camber line curves back up near the trailing edge is called a reflexed camber airfoil. Such an airfoil is useful in certain situations, such as with tailless aircraft, because the moment about the aerodynamic center of the airfoil can be 0. A camber line for such an airfoil can be defined as follows (note that the lines over the variables indicates that they have been nondimensionalized by dividing through by the chord):
Z
¯
(
x
)
=
a
[
(
b
−
1
)
x
¯
3
−
b
x
¯
2
+
x
¯
]
{\displaystyle {\overline {Z}}(x)=a\left[\left(b-1\right){\overline {x}}^{3}-b{\overline {x}}^{2}+{\overline {x}}\right]}
An airfoil with a reflexed camber line is shown at right. The thickness distribution for a NACA 4-series airfoil was used, with a 12% thickness ratio. The equation for this thickness distribution is:
T
¯
(
x
)
=
t
0.2
(
0.2969
x
¯
−
0.1260
x
¯
−
0.3516
x
¯
2
+
0.2843
x
¯
3
−
0.1015
x
¯
4
)
{\displaystyle {\overline {T}}(x)={\frac {t}{0.2}}\left(0.2969{\sqrt {\overline {x}}}-0.1260{\overline {x}}-0.3516{\overline {x}}^{2}+0.2843{\overline {x}}^{3}-0.1015{\overline {x}}^{4}\right)}
Where t is the thickness ratio.
See also
Chord
NACA airfoil
Aerodynamic drag
Zero-lift axis
References
Sources
Desktop Aerodynamics Digital Textbook. Retrieved 9/7/08.
Theory of Wing Sections, Ira H.Abbott and Albert E.Von Doenhoff (Dover Publications-1959) ISBN 0-486-60586-8
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