Using the definition of complex derivative, evaluate f(z) expression using derivative operation based on limiting case as lim_{triangle z ->0}

arenceabigns

arenceabigns

Answered question

2021-09-15

3) Answer the following questions considering the complex functions given below.
a) Using the definition of complex derivative, evaluate f(z) expression using derivative operation based on limiting case as limz0
a.1 f(z)=1z2,(z0)

Answer & Explanation

wheezym

wheezym

Skilled2021-09-16Added 103 answers

Step 1
a.1 We have the definition complex derivative -
f(z)=limz0f(z+z)f(z)z
Given, f(z)=1z2,(z0)
Then,
f(z)=limz01(z+z)21z2z
=limz0z2(z+z)2(z+z)2z2z
=limz01z202(z+z)1(z+z)21+zz(z+z)1
=1z2×2zz2+0
=1z2×2z
=2z3
Hence,  (1z2)1=2z3,z0
Step 2
Given, f(z)=zz+1,(z1)
Then,  f(z)=limz0z+zz+z+1zz+1z
=limz0(z+z)(z+1)z(z+z+1)(z+z+1)(z+1)z  (00  form)
=limz01z+1(z+1)1z1(z+z+1)1+z1

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