# Chord (aeronautics)

In aeronautics, a chord is the imaginary straight line joining the leading edge and trailing edge of an aerofoil. The chord length is the distance between the trailing edge and the point where the chord intersects the leading edge. The point on the leading edge used to define the chord may be either the surface point of minimum radius or the surface point that maximizes chord length.

The wing, horizontal stabilizer, vertical stabilizer and propeller of an aircraft are all based on aerofoil sections, and the term chord or chord length is also used to describe their width. The chord of a wing, stabilizer and propeller is determined by measuring the distance between leading and trailing edges in the direction of the airflow. (If a wing has a rectangular planform, rather than tapered or swept, then the chord is simply the width of the wing measured in the direction of airflow.) The term chord is also applied to the width of wing flaps, ailerons and rudder on an aircraft.

The term is also applied to aerofoils in gas turbine engines such as turbojet, turboprop, or turbofan engines for aircraft propulsion.

Most wings are not rectangular, so they have different chords at different positions. Usually, the chord length is greatest where the wing joins the aircraft's fuselage (called the root chord) and decreases along the wing toward the wing's tip (the tip chord). Most jet aircraft use a tapered swept wing design. To provide a characteristic figure that can be compared among various wing shapes, the mean aerodynamic chord (abbreviated MAC) is used, although it is complex to calculate. The mean aerodynamic chord is important in determining the amount of aerodynamic lift that a particular wing design will generate.

## Standard mean chord

Standard mean chord (SMC) is defined as wing area divided by wing span:

${\mbox{SMC}}={\frac {S}{b}},$ where S is the wing area and b is the span of the wing. Thus, the SMC is the chord of a rectangular wing with the same area and span as those of the given wing. This is a purely geometric figure and is rarely used in aerodynamics.

## Mean aerodynamic chord

Mean aerodynamic chord (MAC) is defined as:

${\mbox{MAC}}={\frac {2}{S}}$ $\int _{0}^{\frac {b}{2}}c(y)^{2}dy,$ where y is the coordinate along the wing span and c is the chord at the coordinate y. Other terms are as for SMC.

The MAC is a two-dimensional representation of the whole wing. The pressure distribution over the entire wing can be reduced to a single lift force on and a moment around the aerodynamic center of the MAC. Therefore, not only the length but also the position of MAC is often important. In particular, the position of center of gravity (CG) of an aircraft is usually measured relative to the MAC, as the percentage of the distance from the leading edge of MAC to CG with respect to MAC itself.

Note that the figure to the right implies that the MAC occurs at a point where leading or trailing edge sweep changes. In general, this is not the case. Any shape other than a simple trapezoid requires evaluation of the above integral.

The ratio of the length (or span) of a rectangular-planform wing to its chord is known as the aspect ratio, an important indicator of the lift-induced drag the wing will create. (For wings with planforms that are not rectangular, the aspect ratio is calculated as the square of the span divided by the wing planform area.) Wings with higher aspect ratios will have less induced drag than wings with lower aspect ratios. Induced drag is most significant at low airspeeds. This is why gliders have long slender wings.

## Tapered wing

Knowing the area (Sw), taper ratio ($\lambda$ ) and the span (b) of the wing, the chord at any position on the span can be calculated by the formula:

$c(y)={\frac {2\,S_{w}}{(1+\lambda )b}}\left[1-{\frac {1-\lambda }{b}}|y|\right],$ where

$\lambda ={\frac {C_{\rm {Tip}}}{C_{\rm {Root}}}}$ NOTE: This formula only works if y=0 is the port wingtip and y=b is the starboard wingtip. Typically, y=0 represents the midspan location.

Note 2: The formula as presented does not work regardless of whether one uses y = 0 -> port tip or not, and the note is not consistent with the use of the absolute value of y in the formula. The formula should read

$c(y)={\frac {2\,S_{w}}{(1+\lambda )b}}\left[1-{\frac {1-\lambda }{b}}|2y|\right],$ 