Find the value of z which fulfill the equations below az^2+bz+c=0         a must not be 0...

1. a) Draw a sketch of: {z∈C|Im((3−2i)z)>6}. b) If 2i is a zero of p(z)=az^2+z^3+bz+16, find...

1. a) Draw a sketch of: {z∈C|Im((3−2i)z)>6}. b) If 2i is a zero of p(z)=az^2+z^3+bz+16, find the real numbers a,b. c) Let p(z)=z^4−z^3−2z^2+a+6z, where a is real. Given that 1+i is a zero of p(z): Find value of a, and a real quadratic factor of p(z). Express p(z)as a product of two real quadratic factors to find all four zeros of p(z).

Find all z ∈ C which satisfy the following polynomial equations: (a) z^3 + 27 =...

Find all z ∈ C which satisfy the following polynomial equations: (a) z^3 + 27 = 0. (b) 2z^16 − 1 = 0

2z' +Az+82+26 0 has a soluo n Find the other 2 soluo n and value of...

2z' +Az+82+26 0 has a soluo n Find the other 2 soluo n and value of A, B Gauss elimination 2x-y+z 2, x-2y- 1, 2x+2y+2z-12

Find all solutions to the following equations: (a) z^6 = 1 (b) z^4 = −16 (c)...

Find all solutions to the following equations: (a) z^6 = 1 (b) z^4 = −16 (c) z^6 = −9 (d) z^6 − z^3 − 2 = 0

. 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...

q.1.(a) The following system of linear equations has an infinite number of solutions x+y−25 z=3 x−5 ...

q.1.(a) The following system of linear equations has an infinite number of solutions x+y−25 z=3 x−5 y+165 z=0    4 x−14 y+465 z=3 Solve the system and find the solution in the form x(vector)=ta(vector)+b(vector)→, where t is a free parameter. When you write your solution below, however, only write the part a(vector=⎡⎣⎢ax ay az⎤⎦⎥ as a unit column vector with the first coordinate positive. Write the results accurate to the 3rd decimal place. ax = ay = az =

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.

1.Planes x = 0 and x = 4 carry current K = -10 ̂az A/m and...

1.Planes x = 0 and x = 4 carry current K = -10 ̂az A/m and K = 10 az A/m, respectively. Determine H at (a) (1, 1, 1) (b) (0, - 3, 10)               (c) (-1, -1, -1) (d) (7, 1, 0)   2.. A current distribution gives rise to the vector magnetic potential          A = Z2Yax+X2Y2Z2ay-8XYZ2az Wb/m. Calculate (a) B at (1, -2, 5) (b) The flux through the surface defined by x = 1, 0 <= y<= 5,      0...

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)