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

Q1. Express the complex number z=(j-1)(1+j / j+2) in the standard form x+jy.... Q2. Express the...

Q1. Express the complex number z=(j-1)(1+j / j+2) in the standard form x+jy.... Q2. Express the result in polar form j(j+3)(3-j)

. 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...

Using the same complex number p=4+6i, create 'a new personal complex number z= x+ iy =...

Using the same complex number p=4+6i, create 'a new personal complex number z= x+ iy = p e^(i theta) where theta 10. .Then )calculate a) What are r = |z| and θ = arg(z)? (b)Find the two values of √ z in polar form. As in (a), please state which quadrants your answers are in. (c) Find all values of ln(z). How many are there. Also in part (a), identify which 45-degree "pizza slice" your angle is in, if you...

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.

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

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

Write the following numbers in the polar form re^iθ, 0≤θ<2π a) 7−7i r =......8.98............. , θ...

Write the following numbers in the polar form re^iθ, 0≤θ<2π a) 7−7i r =......8.98............. , θ =.........?.................. Write each of the given numbers in the polar form re^iθ, −π<θ≤π a) (2+2i) / (-sqrt(3)+i) r =......sqrt(2)........, θ = .........?..................., .

Fine zw and z/w. Leave answer in polar form. z = 10(cos140 +i sin140) w=7(cos210+i sin210)

Fine zw and z/w. Leave answer in polar form. z = 10(cos140 +i sin140) w=7(cos210+i sin210)

I need to evaluate the double integral:I from 0 to 3, I from 0 to sqrt(9-y^2),...

I need to evaluate the double integral:I from 0 to 3, I from 0 to sqrt(9-y^2), integrand is Sqrt(1+x^2 + y^2)dxdy. I know I need to convert to polar coordinates: x = rcos theta, y = rsin- theta. The integrand becomes sqrt(1+r^2)?????. I know how to integrate that, but I don’t know how to convert the bounds for the integrals. I think for dtheta, because we go from the x-axis to the y-axis, so we go from 0 to pi/2....

Let w be a non-real complex number. Show that every complex number z can be written...

Let w be a non-real complex number. Show that every complex number z can be written in the form ? = ? + ?? (?, ? ∈ ?) Furthermore, prove that a and b are uniquely determined by w and z.

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)