Determine an elliptic cylinder such that the length of its major axis length is 5/3 times of its minor axis. Find the complex potential , F(z)

Ramsey

Ramsey

Answered question

2021-09-07

Determine an elliptic cylinder such that the length of its major axis length is 5/3 times of its minor axis. Find the complex potential , F(z) , and complex velocity, W(z) , for a uniform flow stream (at zero angle of attack) past the cylinder without circulation. You can use a=1 , and U=20 for your baseline flow parameters.

Answer & Explanation

Demi-Leigh Barrera

Demi-Leigh Barrera

Skilled2021-09-08Added 97 answers

Step 1
To find the complex potential ,complex velocity for a uniform flow stream.
Step 2
given that major axis is 53 times of minor axis
given a=1andU=20
if a=1 then b=53
in the z-plane the complex potential for uniform flow post a circular cylinder of radius a+b2 is given by
W(z)=U(z+(a+b)24z)(A)
now the transformation
Z=12(z+z2c2)(B)
where c2=a2b2
equation (B) maps the region outside an ellipse with a,b being the major and minor axis in the z plane on the region outside a circle being at origin
putting z from (B) in (A)
W(z)=U2{z+z2c2+(a+b)24(z+z2c2)}
=U2{z+z2c2+(a+b)2(z+z2c2)4c2}
=U(a+b)2{z+z2c2a+b+zz2c2ab}
put z=ccoshZ
z+z2c2=ccoshZ+csinhZ=ceiZ
zz2+c2=ccoshZcsinhZ=ceiZ
now
W(z)=U(a+b)2ft{ei(ZZ0)+ei(ZZ0)right}
=U(a+b)cosh(ZZ0)
W(z)=20(1+53)cosh(ZZ0)
W(z)=1603cosh(ZZ0)
  where  z=ccoshZ
Z0=12ln{a+bab}

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