let X be Banach_Algebra; for z, w being Element of X holds
( (z rExpSeq ) . 0 = 1. X & (Expan 0 ,z,w) . 0 = 1. X )
let z, w be Element of X; ( (z rExpSeq ) . 0 = 1. X & (Expan 0 ,z,w) . 0 = 1. X )
thus (z rExpSeq ) . 0 =
(1 / (0 ! )) * (z #N 0 )
by Def2
.=
(1 / 1) * (1. X)
by LOPBAN_3:def 13, NEWTON:18
.=
1. X
by LOPBAN_3:43
; (Expan 0 ,z,w) . 0 = 1. X
A1:
0 -' 0 = 0
by XREAL_1:234;
hence (Expan 0 ,z,w) . 0 =
(((Coef 0 ) . 0 ) * (z #N 0 )) * (w #N 0 )
by Def6
.=
((1 / (1 * 1)) * (z #N 0 )) * (w #N 0 )
by A1, Def3, NEWTON:18
.=
((z GeoSeq ) . 0 ) * (w #N 0 )
by LOPBAN_3:43
.=
(1. X) * ((w GeoSeq ) . 0 )
by LOPBAN_3:def 13
.=
(1. X) * (1. X)
by LOPBAN_3:def 13
.=
1. X
by LOPBAN_3:43
;
verum