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

Find all the complex roots. Leave your answers in polar form with the argument in degrees....

Find all the complex roots. Leave your answers in polar form with the argument in degrees. The complex fourth roots of negative 49 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.