quiz 26B

QUIZ 2.6B

Theorem 2.6 If f = f(z) is analytic, then in any formula for f, x and y can only occur in the combination x + iy.

Proof We note that x = (¹/₂)(z + ), { 1 }. Hence if w = f(z) = u + iv, we can regard u, v as functions of z, . Now, w is a function of z alone { 2 } . So

+ i ( { 3 } ) = 0 { 4 } u_x = v_y, u_y = -v_x.

equating real, imaginary parts to zero.
Hence f analytic the Cauchy-Riemann equations hold as required.

Match the above boxes 1, 2, 3, 4 with the selections
(a) y = ¹/₂_i(z - ), (b) (c) (d)

My solutions: