What are the phases and absolute values of the following complex numbers? z = (1-i)^6 z...

Complex Variable Evaluate the following: A) ∫_∣z−i∣=2    (2z+6)/(z^2+4) dz B) ∫_∣z∣=2    1/(​(z−1)^2(z−3)) ​dz (...

Complex Variable Evaluate the following: A) ∫_∣z−i∣=2    (2z+6)/(z^2+4) dz B) ∫_∣z∣=2    1/(​(z−1)^2(z−3)) ​dz ( details please) C) ∫_∣z∣=1 ​e^(4/z) dz

Complex Variables: (a) Describe all complex numbers 'z' such that e^z = 1. (b) Let 'w'...

Complex Variables: (a) Describe all complex numbers 'z' such that e^z = 1. (b) Let 'w' be a complex number. Let 'a' be a complex number such that e^a = w. Describe all complex numbers 'z' such that e^z = w.

1. Let Z[i] denote the set of all ‘complex numbers with integer coefficients’:the set of all...

1. Let Z[i] denote the set of all ‘complex numbers with integer coefficients’:the set of all a + bi such that a and b are integers. We say that z is composite if there exist two complex integers v and w such that z=vw and |v|>1 and |w|>1. Then z is prime if it is not composite A) Prove that every complex integer z, |z| > 1, can be expressed as a product of prime complex integers.

The complex function f(z) = 1/(z^4 - 1) has poles at +-1 and +-i, which may...

The complex function f(z) = 1/(z^4 - 1) has poles at +-1 and +-i, which may or may not contribute to the closed curve integral around C of f(z)dz. In turn, the closed curve C that you use depends on the 2nd letter of your first name! Specifically, convert that letter to its numerical position in the Roman alphabet (A=1, B=2, ..., Z=26), then divide by 4. Don't worry about fractions, just save the REMAINDER which will be an integer...

Find all the complex number z such that z^2=i

Find all the complex number z such that z^2=i

. In this question, i ? C is the imaginary unit, that is, the complex number...

. In this question, i ? C is the imaginary unit, that is, the complex number satisfying i^2 = ?1. (a) Verify that 2 ? 3i is a root of the polynomial f(z) = z^4 ? 7z^3 + 27z^2 ? 47z + 26 Find all the other roots of this polynomial. (b) State Euler’s formula for e^i? where ? is a real number. (c) Use Euler’s formula to prove the identity cos(2?) = cos^2 ? ? sin^2 ? (d) Find...

Basic complex analysis 1.3.3(a) solve for Z. cos(Z)=(3/4)+(i/4)

Basic complex analysis 1.3.3(a) solve for Z. cos(Z)=(3/4)+(i/4)

Estimate the absolute deviation (absolute uncertainty) for the following calculation. The numbers in parenthesis are absolute...

Estimate the absolute deviation (absolute uncertainty) for the following calculation. The numbers in parenthesis are absolute standard deviations. Give answer to two significant figures. y = 84.1 ( 0.6 ) x 1.09( 0.07 ) Although not entirely justifiable, the answer needs to be given to 2 sig. figs!! EDIT** This is all i was given as a question

Convert the following complex number to polar form, z= -(sqrt(3))/3+(i/3)

Convert the following complex number to polar form, z= -(sqrt(3))/3+(i/3)

If z=4e^(i pi/4) and w=3e^(i pi/3) find a) zw b) z/w c) z^3 d) The complex...

If z=4e^(i pi/4) and w=3e^(i pi/3) find a) zw b) z/w c) z^3 d) The complex fourth root of w