find the solutions to z^2 =3-4i

find all solutions e^(2z) = -4i

find all solutions e^(2z) = -4i

Find all solutions to Z^3 = 2 + j2

Find all solutions to Z^3 = 2 + j2

find the square root of -3-4i

find the square root of -3-4i

A. Find the real zeros of k(z) = z − z^3. z = ____ B.  Find the...

A. Find the real zeros of k(z) = z − z^3. z = ____ B.  Find the real zeros of f(x) = −2√x^2-25. (All under root). x = _____ C. Find the real zeros of w(x) = (5x^2 + 13x + 9) / (x + 2). x = _____ If there are multiple solutions, separate the answers with commas (,). If the answer is not an integer, enter it as a fraction in simplest form. If there is no real solution,...

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

Use Euler’s formula to solve 2sin 3x − 2cos 3x = √6 Write z = 4i...

Use Euler’s formula to solve 2sin 3x − 2cos 3x = √6 Write z = 4i − 3 in the polar coordinate form.

1a) i) Find the real and imaginary part of: 1/(-4-4i)^6 ii) Find the fifth roots of...

1a) i) Find the real and imaginary part of: 1/(-4-4i)^6 ii) Find the fifth roots of 32i principle argument. iii) Find the principle argument of z=cis(13Pi/6) z=-cis(3Pi/4)

1.49 Two particular solutions of the equation 4f''(z)+f(z)=4f'(z) are f1(z)=ez/2 and f2(z)=zez/2. a) Show that any...

1.49 Two particular solutions of the equation 4f''(z)+f(z)=4f'(z) are f1(z)=ez/2 and f2(z)=zez/2. a) Show that any linear combination Af1(z) + Bf2(z) is also a valid solution to the differential equation. b) Find the particular solution that satisfies the conditions f(2)=14e and f'(2)=12e.

1. a) Express z = −i−sqrt(3) in the form r cis θ, where θ= Argz, and...

1. a) Express z = −i−sqrt(3) in the form r cis θ, where θ= Argz, and then use de Moivre’s theorem to find the two square roots of −4i. b) Consider: i) p(z)=iz^2+z^3+2iz−2z^2+2z. Given that z=2−2i is a zero of this polynomial, find all of its zeros. ii) p(z)=z^3−2z^2+9z−18. Factorise into linear factors.

(a) Let f(z) = z^2. R is bounded by y = x, y= -x and x...

(a) Let f(z) = z^2. R is bounded by y = x, y= -x and x = 1. Find the image of R under the mapping f. (b)Find the all values of (-i)^(i) (c)Find the all values of (1-i)^(4i)