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C++ //add as many comments as possible 5. A complex number consists of two components: the real component and the imaginary component. An example of a complex number is 2+3i, where 2 is the real component and 3 is the imaginary component of the data. Define a class MyComplexClass. It has two data values of float type: real and imaginary This class has the following member functions A default constructor that assigns 0.0 to both its real and imaginary data...
Express the real and imaginary parts of the following numbers in terms of the real andimaginary parts of u and ε, where the notation is μ=μ'+jμ", ε=ε' +jε'' (ω, μ', μ'', ε', ε"∈R), for
Real and Imaginary parts. 2. [10 marks Find all solutions to the equations 2 a) (b) e1. (24-1)sin(7T2) 0.
Represent the powers z, z2, z3, and 24 graphically. 2- 211 + V31) 2 Imaginary axis Imaginary axis 1 2 Real axis Real axis о Imaginary axis 10 Imaginary axis 1 0 2 0 1 2 1 Real axis Real axis -2 O O
find the real and imaginary part(u and v) of the complex function lnz a) Find the real and imaginary parts (u and v) of the complex functions: - CZ Find out whether the functions in (a) satisfy the Cauchy-Riemann equations.
I 5) (10 pts) Calculate the following a) Find the real and imaginary parts of e8**) b) Find the real and imaginary parts of c) Write in polar form: 1+1
Problem 1 a) b) Plot real part, imaginary part and absolute value of for -2st3 2. You can use MATLAB to plot the functions but show your derivations and justify your plot.
1. if the real part of an analytic function, f(z), is given find the imaginary part, v(x, y) and f(z) as a function of x. (step by step) 2. Evaluate the following complex integral (step by step) 1. If the real part of an analytic function, f(z), is given as 2 - 12 (x2 + y2)2 find the imaginary part, v(x,y), and f(z) as a function of z. 2. Evaluate the following complex integral:
using synthetic division please using complex zeros 2. Find all 6 solutions (real and imaginary) to the equation. x6 = 64
(10 pts) Calculate the following a) Find the real and imaginary parts of e 3+nj b) Find the real and imaginary parts of ez? c) Write in polar form: 1+j