SOLUTION: Given the function w=z^4.
a) show that the Rauchy Riemann equation hold at all point in the finite z plane
b) prove that u and v are harmonic function
please I want some expla
Algebra.Com
Question 1104083: Given the function w=z^4.
a) show that the Rauchy Riemann equation hold at all point in the finite z plane
b) prove that u and v are harmonic function
please I want some explanation in the answer
thank you very much..
Answer by richwmiller(17219) (Show Source): You can put this solution on YOUR website!
I already told you that there is no such thing as Rauchy Riemann equation. Try Cauchy Riemann equation. If you can't get that correct, then what else did you copy wrong?
RELATED QUESTIONS
Given the function w=z^4.
a) show that the Rauchy Riemann equation hold at all point in... (answered by richwmiller)
1)u×u>=0 and u×u=0 if and only if u=0 prove theorem?
2)Show that there are no vectors u... (answered by lynnlo)
Please help me ㅠㅠ help me
1)u×u>=0 and u×u=0 if and only if u=0 prove... (answered by lynnlo)
1)u×u>=0 and u×u=0 if and only if u=0 prove theorem?
2)Show that there are no vectors u... (answered by lynnlo)
The complex numbers z and w satisfy |z| = |w| = 1 and zw is not equal to -1.
(a) Prove (answered by ikleyn)
Given that z = 10 - 3i and w = 4 + 2i are complex numbers, find: a) zw b) z/w
write the (answered by ikleyn)
The complex numbers z and w satisfy |z| = |w| = 1 and zw is not equal to -1.
(a) Prove... (answered by ikleyn)
The complex numbers z and w satisfy |z| = |w| = 1 and zw is not equal to -1.
(a) Prove... (answered by math_tutor2020)
Let U = {q, r, s, t, u, v, w, x, y, z}
A = {q, s, u, w, y} B = {q, s, y, z} C =... (answered by jim_thompson5910)