Find the square roots to 39 - 80i in Cartesian form by solving z2 = 39 - 80i (*) for z = x + iy with x, y E R. To do thi

[answerhappygod]

Find The Square Roots To 39 80i In Cartesian Form By Solving Z2 39 80i For Z X Iy With X Y E R To Do Thi 1 (76.07 KiB) Viewed 46 times

Find the square roots to 39 - 80i in Cartesian form by solving z2 = 39 - 80i (*) for z = x + iy with x, y E R. To do this, first find three equations in x, y, two equations from equating real and imaginary parts and a third equation by taking the modulus of both sides in (*). Note 39 – 80i| is an integer. - Complete these three equations by filling in the boxes below. x² - y² = = 2xy = Use the equations to find x² + y² 數字 數字 數字 Square roots = = 數字 Hence find the two square roots in Cartesian form as the components of a Matlab vector. For example, to enter the numbers 1+2i and 3 + 4i enter [1+2i; 3+4i]. & P