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

Complex Analysis: Solve the following complex equation: z^8 + 1 = 0 (There should be 8...

Complex Analysis: Solve the following complex equation: z^8 + 1 = 0 (There should be 8 distinct solutions/roots)

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

Evaluate 3(cos 60 + i sin 60) x 4(cos 15 + i sin 15). Write the...

Evaluate 3(cos 60 + i sin 60) x 4(cos 15 + i sin 15). Write the answer as a complex number in standard form a + bi. Round decimals to the tenths place. (The angles are in degree form, just couldn't use degree symbol and the x is for multiplication not a variable.

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 Analysis: Use Rouche's Theorem and Argument Principle to determine the number of roots of p(z)=z^4-2z^3+13z^2-2z+36...

Complex Analysis: Use Rouche's Theorem and Argument Principle to determine the number of roots of p(z)=z^4-2z^3+13z^2-2z+36 which lie in each quadrant of the plane. (Hint: Consider |z|=5 and |z|=1)

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

What are the phases and absolute values of the following complex numbers? z = (1-i)^6 z = i^(1/4) (all of them) z = (1+i)^(3)/(1-i)^(4)

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)

Complex Analysis 2. Find the linear transformation which carries the circle |z| = 2 into |z...

Complex Analysis 2. Find the linear transformation which carries the circle |z| = 2 into |z + 1| = 1, the point −2i into the origin, and the point i into −1.

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.

. 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...