Given a complex valued function can be written as f(z) = w = u(x,y) +iv(x,y), where w is the real part of w and v is the imaginary part of v.

pancha3

pancha3

Answered question

2021-09-14

1. Given a complex valued function can be written as f(z)=w=u(x,y)+iv(x,y), where w is the real part of w and v is the imaginary part of v. Using algebraic manipulation figure out what wu and v is if
f(z)=z(1ei(z+z))
Here z denotes the complex conjugate of z.
2. Using the concept of limits figure out what the second derivative of f(z)=z(1z) is.
3. Use the theorems of Limits that have been discussed before to show that
limz1i[x+i(2x+y)]=1+i.[Hint: Use  z=x+iy]

Answer & Explanation

aprovard

aprovard

Skilled2021-09-15Added 94 answers

Step 1 The given function is f(z)=z(1ei(z+z))
Substitute z=x+iy  and  z=xiy in the above function and simplify as follows.
Step 2
f(z)=(xiy)(1ei(x+iy+xiy))
=(xiy)(1ei2x)
=xiy(xiy)ei2x
=xiy(xiy)(cos(2x)+isin(2x))
=xiy[xcos(2x)+ixsin(2x)iycos(2x)+ysin(2x)]
=xiyxcos(2x)ixsin(2x)+iycos(2x)ysin(2x)
=[xxcos(2x)ysin(2x)]+i[yxsin(2x)+ycos(2x)]
=u(x,y)+iv(x,y)
Thus, u(x,y)=xxcos(2x)ysin(2x)  and  v(x,y)=ycos(2x)yxsin(2x)

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