Complex Analysis 1) find an example of a non constant entire function f such that (a)...

Find an example of a non constant entire function f such that supx∈R |f(x)| + supy∈R...

Find an example of a non constant entire function f such that supx∈R |f(x)| + supy∈R |f(iy)| < ∞

Find the constant a such that the function is continuous on the entire real line. f(x)...

Find the constant a such that the function is continuous on the entire real line. f(x) = 8x2,      x ≥ 1 ax − 3,      x < 1

The real part of a f (z) complex function is given as (x,y)=y^3-3x^2y. Show the harmonic...

The real part of a f (z) complex function is given as (x,y)=y^3-3x^2y. Show the harmonic function u(x,y) and find the expressions v(x,y) and f(z). Calculate f'(1+2i) and write x+iy algebraically.

(1) Find all functions f(z) that are analytic in the entire complex plane and satisfy 2|sin(z)|...

(1) Find all functions f(z) that are analytic in the entire complex plane and satisfy 2|sin(z)| ≥ |f(z)|. (2) Find all functions f(z) that are analytic in the entire complex plane and satisfy 2|f(z)| ≥ |sin(z)|.

Problem 1: Find a non-zero function f so that f'(x) = 3f(x). The exponential function f(x)...

Problem 1: Find a non-zero function f so that f'(x) = 3f(x). The exponential function f(x) = e^x has the property that it is its own derivative. (d/dx) e^x = e^x f(x) = e^(3x) f '(x) = e^(3x) * (d/dx) 3x = e^(3x) * 3 = 3e^(3x) = 3 f(x) Problem 2: Let f be your function from Problem 1. Show that if g is another function satisfying g'(x) = 3g(x), then g(x) = A f(x) for some constant A????

Complex analysis For the function f(z)=1/[z^2(3-z)], find all possible Laurent expansions centered at z=0. then find...

Complex analysis For the function f(z)=1/[z^2(3-z)], find all possible Laurent expansions centered at z=0. then find one or more Laurent expansions centered at z=1.

Suppose f is entire, with real and imaginary parts u and v satisfying u(x, y) v(x,...

Suppose f is entire, with real and imaginary parts u and v satisfying u(x, y) v(x, y) = 3 for all z = x + iy. Show that f is constant.

When plotted in the complex plane for , the function f () = cos() + j0.1...

When plotted in the complex plane for , the function f () = cos() + j0.1 sin(2) results in a so-called Lissajous figure that resembles a two-bladed propeller. a. In MATLAB, create two row vectors fr and fi corresponding to the real and imaginary portions of f (), respectively, over a suitable number N samples of . Plot the real portion against the imaginary portion and verify the figure resembles a propeller. b. Let complex constant w = x +...

Please answer part a and b Q.9 a) explain liouville’s theorem with example b) show that...

Please answer part a and b Q.9 a) explain liouville’s theorem with example b) show that f(x+iy) = sin(xy) is not an entire function c) what is uniqueness theorem

Suppose f is entire, with real and imaginary parts u and v satisfying u(x, y) v(x,...

Suppose f is entire, with real and imaginary parts u and v satisfying u(x, y) v(x, y) = 3 for all z = x + iy. Show that f is constant. Be clearly, please. Do not upload same answers from others on Chegg. THANKS