let x be Real; :: thesis: ( x > 0 implies for n being Element of NAT holds (power F_Complex) . ([**x,0**],n) = [**(x to_power n),0**] )
defpred S1[ Element of NAT ] means (power F_Complex) . ([**x,0**],$1) = [**(x to_power $1),0**];
assume A1: x > 0 ; :: thesis: for n being Element of NAT holds (power F_Complex) . ([**x,0**],n) = [**(x to_power n),0**]
A2: now
let n be Element of NAT ; :: thesis: ( S1[n] implies S1[n + 1] )
assume S1[n] ; :: thesis: S1[n + 1]
then (power F_Complex) . ([**x,0**],(n + 1)) = [**(x to_power n),0**] * [**x,0**] by GROUP_1:def 7
.= [**((x to_power n) * (x to_power 1)),0**] by POWER:25
.= [**(x to_power (n + 1)),0**] by A1, POWER:27 ;
hence S1[n + 1] ; :: thesis: verum
end;
(power F_Complex) . ([**x,0**],0) = 1r + (0 * <i>) by COMPLFLD:8, GROUP_1:def 7
.= [**(x to_power 0),0**] by POWER:24 ;
then A3: S1[ 0 ] ;
thus for n being Element of NAT holds S1[n] from NAT_1:sch 1(A3, A2); :: thesis: verum