Determine the form of the function of the imaginary part (conjugate function, v(x,y)) of the following function u(x,y) so that it is a complex function:
Determine the residuals for the following complex functions:
calculate the following integral:
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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.
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:
The complex conjugate of (1+i) is (1−i). In general to obtain the complex conjugate reverse the sign of the imaginary part. (Geometrically this corresponds to finding the "mirror image" point in the complex plane by reflecting through the x-axis. The complex conjugate of a complex number z is written with a bar over it: z⎯⎯ and read as "z bar". Notice that if z=a+ib, then (z)(z⎯⎯)=|z|2=a2+b2 which is also the square of the distance of the point z from the...
Create a class called Complex for performing arithmetic with complex numbers. Complex numbers have the form: realPart + imaginaryPart * i where i is √-1 Use double variables to represent the private data of the class. Provide a constructor that enables an object of this class to be initialized when it’s declared. The constructor should contain default values of (1,1) i.e. 1 for the real part and 1 for the imaginary part. Provide public member functions that perform the following...
C++ Complex Class!
Create a class called Complex for performing arithmetic with complex numbers. Write a program to test your class. Complex numbers have the form realPart + imaginaryPart * i where i is Squareroot -1 Use double variables to represent the private data of the class. Provide a constructor that enables an object of this class to be initialized when ifs declared. The constructor should contain default values in case no initializers are provided. Provide public member functions that...
C++
Create a class called Complex for performing arithmetic with complex numbers. Write a program to test your class. Complex numbers have the form realPart + j imaginaryPart Use double variables to represent the private data of the class. Provide a constructor that enables an object of this class to be initialized when it is declared. The constructor should contain default values in case no initializers are provided. Provide public member functions that perform the following tasks: Adding two Complex...
Define a class named COMPLEX for complex numbers, which has two private data members of type double (named real and imaginary) and the following public methods: 1- A default constructor which initializes the data members real and imaginary to zeros. 2- A constructor which takes two parameters of type double for initializing the data members real and imaginary. 3- A function "set" which takes two parameters of type double for changing the values of the data members real and imaginary....
Show that the real and imaginary parts of the complex-valued function f(x) = cot z are - sin 2.c sinh 2g u(I,y) v(x,y) = cos 2x - cosh 2y cos 2x - cosh 2y (cot 2 = 1/tan 2)
complex anaylsis
Only need help on (ii) and (iii), please answer
both and cite
theorems used
a one Consider the real valued function ulx,y). with x and y are real variables For Cach definition of ulx,y) below, find whether there Cette exists real-valued function v(x,y) such that f(2)= u(x,y) ti vex,y) is a function analytic in some DEC. If such such v(x,y) and determine the domain analyticity o for fcz). It such a not exist, prove that it does not...
ANSWER ALL QUESTIONS QUESTION 1 (20 MARKS) a. Use basic arithmetic operations of complex numbers to evaluate- (C01:P01 - 10 marks) * ** * is harmonic. Find the conjugate function of b. Show that " v(x,y). (C01:P01 - 10 marks)