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

Find the real and imaginary roots for x^3+x^2+1. Do not use decimal approximations. Leave in RADICAL...

Find the real and imaginary roots for x^3+x^2+1. Do not use decimal approximations. Leave in RADICAL form.

. 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...

Find the polynomial with real coefficients of the smallest possible degree for which 4i and 1+i...

Find the polynomial with real coefficients of the smallest possible degree for which 4i and 1+i are zeros and in which the coefficient of the highest power is 1.

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.

(i) Verify that 2 is a primitive root modulo 29. (ii) Find all the primitive roots...

(i) Verify that 2 is a primitive root modulo 29. (ii) Find all the primitive roots modulo 29. Explain how you know you have found them all. (iii) Find all the incongruent solutions to x6 ≡ 5(mod 29).

Find an example of a function f that is (i) continuous on (1, 4), (ii) not...

Find an example of a function f that is (i) continuous on (1, 4), (ii) not uniformly continuous on (1, 4) and (iii) uniformly continuous (2, 4)

Find all solutions of the following questions (i) cosh(5z) = 0 (ii) 2cos(z) = isin(z) (iii)...

Find all solutions of the following questions (i) cosh(5z) = 0 (ii) 2cos(z) = isin(z) (iii) (z-i)^4= (z+i)^4

1) a) Let z=x4 +x2y,   x=s+2t−u,   y=stu2: Find: ( I ) ∂z ∂s ( ii )...

1) a) Let z=x4 +x2y,   x=s+2t−u,   y=stu2: Find: ( I ) ∂z ∂s ( ii ) ∂z ∂t ( iii ) ∂z ∂u when s = 4, t = 2 and u = 1 1) b>  Let ⃗v = 〈3, 4〉 and w⃗ = 〈5, −12〉. Find a vector (there’s more than one!) that bisects the angle between ⃗v and w⃗.

Find the limits, if exists 1. lim?→−6 ?^2 − ? + 4/6 − ? = 2....

Find the limits, if exists 1. lim?→−6 ?^2 − ? + 4/6 − ? = 2. lim?→5 2? − 10 /(? − 5)(? + 3) = 3. lim?→−4 ?(?) , ?? ?(?) = { 2? + 5, ? < −1 /13 − ? 2 , ? ≥ −1 4. lim?→∞ 4?^3 − 5 /4?^2 + 3? − 1 = Part II. Find the derivative of the function. 1. ? = 12?^3 + 2?^2 − ? + 3 2. ?(?) =...

For each part, find all possible solutions to the given equations (if any exist). i )...

For each part, find all possible solutions to the given equations (if any exist). i ) x = 7 mod 9, x =3 mod 4 ii) 3x^2 +1 = 0 mod 10 iii) 3x+7 = 9 mod 10