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A finite wing area of 1.5 ft2 and aspect ratio of 6 is tested in a subsonic wind tunnel at a velocity of 180 ft/s at standard sea-level conditions. At an angle of attack of −1°, the measured lift and drag are 0 and 0.181 lb, respectively. At an angle of attack of 2°, the lift and drag are measured as 5.0 and 0.23 lb, respectively. Calculate the span efficiency factor and the infinite-wing lift slope.

Respuesta :

Answer:

Lift slope = 0.55/deg

Span efficiency factor = 1.72 Am

Explanation:

S = 1.5

AR = 6

V = 180

∝ = -1    L = 0    D= 0.181

∝ = 2    L = 5    D = 0.23

Cd = [tex]\frac{0.181}{0.5X0.00237X180^{2}X1.5 } = 0.00314[/tex]

∝ = 2

Cl = [tex]\frac{5}{0.5X0.00237X180^{2}X1.5 } = 0.0868[/tex]  

Cd = [tex]\frac{0.23}{0.5X0.00237X180^{2}X1.5 } = 0.00399[/tex]  

Cd = [tex]Cd_{0} + \frac{Cl^{2}}{\pi eX 6}[/tex]

0.00399 = 0.00314 +  [tex]\frac{0.166^{2} }{\pi e X6}[/tex]

e = 1.72 Am

Lift slope = a = [tex]\frac{dCl}{d\alpha } = \frac{0.166-0}{2 - (-2)} = 0.55/deg[/tex]

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