let n be non zero Element of NAT ; for k being Element of NAT holds (cos (((2 * PI) * k) / n)) + ((sin (((2 * PI) * k) / n)) * <i>) is CRoot of n,1
let k be Element of NAT ; (cos (((2 * PI) * k) / n)) + ((sin (((2 * PI) * k) / n)) * <i>) is CRoot of n,1
((cos (((2 * PI) * k) / n)) + ((sin (((2 * PI) * k) / n)) * <i>)) |^ n =
(cos (n * (((2 * PI) * k) / n))) + ((sin (n * (((2 * PI) * k) / n))) * <i>)
by Th31
.=
(cos ((2 * PI) * k)) + ((sin (n * (((2 * PI) * k) / n))) * <i>)
by XCMPLX_1:87
.=
(cos (((2 * PI) * k) + 0)) + ((sin (((2 * PI) * k) + 0)) * <i>)
by XCMPLX_1:87
.=
(cos . (((2 * PI) * k) + 0)) + ((sin (((2 * PI) * k) + 0)) * <i>)
by SIN_COS:def 19
.=
(cos . (((2 * PI) * k) + 0)) + ((sin . (((2 * PI) * k) + 0)) * <i>)
by SIN_COS:def 17
.=
(cos . (((2 * PI) * k) + 0)) + ((sin . 0) * <i>)
by SIN_COS2:10
.=
1
by SIN_COS:30, SIN_COS2:11
;
hence
(cos (((2 * PI) * k) / n)) + ((sin (((2 * PI) * k) / n)) * <i>) is CRoot of n,1
by COMPTRIG:def 2; verum