+ All Categories
Home > Documents > b) 1) Show that an analytic function with constant imaginary part is constant. 2) Derive...

b) 1) Show that an analytic function with constant imaginary part is constant. 2) Derive...

Date post: 19-Apr-2018
Category:
Upload: trinhthu
View: 218 times
Download: 3 times
Share this document with a friend
13
Transcript
Page 1: b) 1) Show that an analytic function with constant imaginary part is constant. 2) Derive Cauchy-Riemann equations in polar co-ordinates.
Page 2: b) 1) Show that an analytic function with constant imaginary part is constant. 2) Derive Cauchy-Riemann equations in polar co-ordinates.
Page 3: b) 1) Show that an analytic function with constant imaginary part is constant. 2) Derive Cauchy-Riemann equations in polar co-ordinates.
Page 4: b) 1) Show that an analytic function with constant imaginary part is constant. 2) Derive Cauchy-Riemann equations in polar co-ordinates.
Page 5: b) 1) Show that an analytic function with constant imaginary part is constant. 2) Derive Cauchy-Riemann equations in polar co-ordinates.
Page 6: b) 1) Show that an analytic function with constant imaginary part is constant. 2) Derive Cauchy-Riemann equations in polar co-ordinates.
Page 7: b) 1) Show that an analytic function with constant imaginary part is constant. 2) Derive Cauchy-Riemann equations in polar co-ordinates.
Page 8: b) 1) Show that an analytic function with constant imaginary part is constant. 2) Derive Cauchy-Riemann equations in polar co-ordinates.
Page 9: b) 1) Show that an analytic function with constant imaginary part is constant. 2) Derive Cauchy-Riemann equations in polar co-ordinates.
Page 10: b) 1) Show that an analytic function with constant imaginary part is constant. 2) Derive Cauchy-Riemann equations in polar co-ordinates.
Page 11: b) 1) Show that an analytic function with constant imaginary part is constant. 2) Derive Cauchy-Riemann equations in polar co-ordinates.
Page 12: b) 1) Show that an analytic function with constant imaginary part is constant. 2) Derive Cauchy-Riemann equations in polar co-ordinates.
Page 13: b) 1) Show that an analytic function with constant imaginary part is constant. 2) Derive Cauchy-Riemann equations in polar co-ordinates.

Recommended