Problem 4. Find all complex solutions to the equation 26 – 5iz² = 6
Find all solutions to the equation x' +27 = 0 over the Complex Numbers. Do all parts (a)-(d): (a) Graph complex number -27+0.i as a vector in trigonometric form (b) Use De Moivre's Theorem to find one cube root of -27 (c) Graph all three solutions as vectors (in trigonometric form) on the xy-plane (d) Lastly, convert each solution from trigonometric form reise to standard form a +bi
Find all solutions to the equation x' +27 = 0 over the Complex Numbers. Do all parts (a)-(d): (a) Graph complex number -27+0.i as a vector in trigonometric form (b) Use De Moivre's Theorem to find one cube root of -27 (c) Graph all three solutions as vectors (in trigonometric form) on the xy-plane (d) Lastly, convert each solution from trigonometric form reise to standard form a +bi
using synthetic division please using complex zeros 2. Find all 6 solutions (real and imaginary) to the equation. x6 = 64
Use DeMoivre's formula to find all solutions in the complex number system to the following equation. Give the answers in trigonometric form and standard form: x²+1=0
4. (15 points) Find all the complex solutions of the equation +(V3-3i)(1+2)40. Express the results in Cartesian form (you may express your answer as a function of k, eg. z = eik cos (kπ/2) + isin(kn/2), k = 0, 1, 2, 3, without explicitly evaluating the expression for each k). 2- 4. (15 points) Find all the complex solutions of the equation +(V3-3i)(1+2)40. Express the results in Cartesian form (you may express your answer as a function of k, eg....
Find all real solutions of the equation (2 – 6)? = 4. 21 = and 12 with i < 22
Find complex-valued solutions, z, for this equation: in cartesian coordinates. nates (CC) or in polar co
Without solving, determine whether the solutions of the equation are real numbers or complex, but not real numbers. (x + 3)2 = 6 What are the solutions? O complex, but not real numbers O real numbers
5 marks] Find all solutions of 2610. Write all solutions in polar coordinates Simplify your answer Plot the locations of all solutions on the complex plane Refer to Q17 of Notes. Question 17 3 6 5 marks] Find all solutions of 2610. Write all solutions in polar coordinates Simplify your answer Plot the locations of all solutions on the complex plane Refer to Q17 of Notes. Question 17 3 6