In [59]:
m = 0.3
rho = 1.225
b = 1.7
s = 0.06
g = 9.8
From Pennycuick(1990), we can predict the wingbeat frequency of an equivalent bird with the equation:
$$ f = 1.08 m^{1/3} g^{1/2} b^{-1} S^{-1/4} \rho^{-1/3} $$And we can predict the minimum power/ maximum range speed as:
$$ V = m^{1/2} g^{1/2} b^{-1} \rho^{-1/2} $$
In [39]:
f = 1.08*m**(1.0/3)*g**(1.0/2)*b**(-1)*s**(-1.0/4)*rho**(-1.0/3)
f
Out[39]:
In [38]:
v = 4.77*(m*1.0e3)**(1.0/6)
v
Out[38]:
In [58]:
lam = m**(1.0/6)*s**(1.0/4)*rho**(-1.0/6)
lam
Out[58]:
In [41]:
lam = v/f
lam
Out[41]:
In [57]:
2/lam
Out[57]:
In [ ]:
lam
Birds, have higher Reynold's number (Re), bodies smooth to fly with laminar flow.
In [ ]: