how to find complex polynomial solution

syms w
CDP1 = T_6*(1i*w).^6 + T_5*(1i*w).^5 + T_4*(1i*w).^4 + T_3*(1i*w).^3 + T_2*(1i*w).^2 + T_1*(1i*w) + T_0;
CDP2 = Tp_4*(1i*w)^.4 + Tp_3*(1i*w).^3 + Tp_2*(1i*w).^2 + Tp_1*(1i*w) + Tp_0;
CDP = CDP1*(1i*w).^1.4 + CDP2;
sol = double(solve(CDP))

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halil hasan il 30 Lug 2019

I think

if I can replace equvalent of i powers, to a powerless i ; it may solve my problem.

Walter Roberson il 30 Lug 2019

w^10 is okay. You then multiply by i and raise the result to 0.9 or 4.9. By the power law, (A*B)^C is A^C*B^C so (i*w^10)^0.9 is i^0.9 * (w^10)^0.9 and that second part is not polynomial

In the case where w is nonnegative real if you are willing to treat 0.9 as 9/10 exactly (which it is not) then you could multiply out to get w^9. But if that is what you want then you need to code it: with the 1i in there, matlab would never compute it that way. You would be getting a different branch of 0.9 power.

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