In the project on page 344 we expressed the power needed by bird during its flapping mode as P ( v , x , m ) A v 3 + B ( m g / x ) 2 v where A and B are constants specific to a species of bird, v is the velocity of the bird, m is the mass of the bird, and x is the fraction of the flying time spent in flapping mode. Calculate ∂ P /∂ v , ∂ P /∂ x , and ∂ P /∂ m and interpret them.
In the project on page 344 we expressed the power needed by bird during its flapping mode as P ( v , x , m ) A v 3 + B ( m g / x ) 2 v where A and B are constants specific to a species of bird, v is the velocity of the bird, m is the mass of the bird, and x is the fraction of the flying time spent in flapping mode. Calculate ∂ P /∂ v , ∂ P /∂ x , and ∂ P /∂ m and interpret them.
Solution Summary: The author calculates the values of partial v, if P(v,x,m)=Av
In the project on page 344 we expressed the power needed by bird during its flapping mode as
P
(
v
,
x
,
m
)
A
v
3
+
B
(
m
g
/
x
)
2
v
where A and B are constants specific to a species of bird, v is the velocity of the bird, m is the mass of the bird, and x is the fraction of the flying time spent in flapping mode. Calculate ∂P/∂v, ∂P/∂x, and ∂P/∂m and interpret them.
a
->
f(x) = f(x) = [x] show that whether f is continuous function or not(by using theorem)
Muslim_maths
Use Green's Theorem to evaluate F. dr, where
F = (√+4y, 2x + √√)
and C consists of the arc of the curve y = 4x - x² from (0,0) to (4,0) and the line segment from (4,0) to
(0,0).
Evaluate
F. dr where F(x, y, z) = (2yz cos(xyz), 2xzcos(xyz), 2xy cos(xyz)) and C is the line
π 1
1
segment starting at the point (8,
'
and ending at the point (3,
2
3'6
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