Let P(x) be a polynomial of degree n whose roots are i−1,i−2,⋅⋅⋅,i−n (where i2=−1), and let R(x) and S(x) be the polynomials with real coefficients such that P(x)=R(x)+iS(x). Show that the polynomial R has n real roots. (R. Stanojevic) algebrapolynomialalgebra unsolved