It's been a long time since I did this, but here goes:
% note that phasors in polar form are not scalar
% a complex number in rectangular form can be a scalar!
% if you're going to do matrix algebra with the numbers,
% they really need to be in rectangular form in order to fit
a = [1 120];
I0 = [1.7478 -90];
% define a conversion function, convert to rectangular form
% you could also use pol2cart(), but you'd also need to convert to radians
p2r = @(x) x(1).*cosd(x(2)) + x(1).*sind(x(2))*1j;
a = p2r(a)
I0 = p2r(I0)
F = [1 1 1; 1 a^2 a; 1 a a^2];
ICC = F*[I0; I0; I0] % answer in rect form
ICCp = [abs(ICC) angle(ICC)/pi*180] % convert to phasor in degrees
Note that this last conversion only works neatly if ICC is a column vector, since ICCp needs to have twice as many columns as ICC.
