set d = <%8,5,0,1%>;
set e = <%(8 * (10 |^ 0)),(5 * (10 |^ 1)),(0 * (10 |^ 2)),(1 * (10 |^ 3))%>;
A1: Sum <%(8 * (10 |^ 0)),(5 * (10 |^ 1)),(0 * (10 |^ 2)),(1 * (10 |^ 3))%> = (Sum <%(8 * (10 |^ 0)),(5 * (10 |^ 1)),(0 * (10 |^ 2))%>) + (Sum <%(1 * (10 |^ 3))%>) by AFINSQ_2:55
.= ((Sum <%(8 * (10 |^ 0)),(5 * (10 |^ 1))%>) + (Sum <%(0 * (10 |^ 2))%>)) + (Sum <%(1 * (10 |^ 3))%>) by AFINSQ_2:55
.= (((8 * (10 |^ 0)) + (5 * (10 |^ 1))) + (Sum <%(0 * (10 |^ 2))%>)) + (Sum <%(1 * (10 |^ 3))%>) by AFINSQ_2:54
.= (((8 * (10 |^ 0)) + (5 * (10 |^ 1))) + (0 * (10 |^ 2))) + (Sum <%(1 * (10 |^ 3))%>) by AFINSQ_2:53
.= (((8 * (10 |^ 0)) + (5 * (10 |^ 1))) + (0 * (10 |^ 2))) + (1 * (10 |^ 3)) by AFINSQ_2:53
.= (((8 * 1) + (5 * (10 |^ 1))) + (0 * (10 |^ 2))) + (1 * (10 |^ 3)) by NEWTON:4
.= ((8 + (5 * 10)) + (0 * (10 |^ 2))) + (1 * (10 |^ 3)) by NEWTON:5
.= (58 + (0 * (10 * 10))) + (1 * ((10 * 10) * 10)) by POLYEQ_5:2
.= 1058 ;
A2: dom <%8,5,0,1%> = 4 by AFINSQ_1:84
.= dom <%(8 * (10 |^ 0)),(5 * (10 |^ 1)),(0 * (10 |^ 2)),(1 * (10 |^ 3))%> by AFINSQ_1:84 ;
now :: thesis: for i being Nat st i in dom <%8,5,0,1%> holds
<%(8 * (10 |^ 0)),(5 * (10 |^ 1)),(0 * (10 |^ 2)),(1 * (10 |^ 3))%> . i = (<%8,5,0,1%> . i) * (10 |^ i)
let i be Nat; :: thesis: ( i in dom <%8,5,0,1%> implies <%(8 * (10 |^ 0)),(5 * (10 |^ 1)),(0 * (10 |^ 2)),(1 * (10 |^ 3))%> . i = (<%8,5,0,1%> . i) * (10 |^ i) )
assume i in dom <%8,5,0,1%> ; :: thesis: <%(8 * (10 |^ 0)),(5 * (10 |^ 1)),(0 * (10 |^ 2)),(1 * (10 |^ 3))%> . i = (<%8,5,0,1%> . i) * (10 |^ i)
then i in 4 by AFINSQ_1:84;
then i in {0,1,2,3} by CARD_1:52;
then ( i = 0 or i = 1 or i = 2 or i = 3 ) by ENUMSET1:def 2;
hence <%(8 * (10 |^ 0)),(5 * (10 |^ 1)),(0 * (10 |^ 2)),(1 * (10 |^ 3))%> . i = (<%8,5,0,1%> . i) * (10 |^ i) ; :: thesis: verum
end;
then A3: value (<%8,5,0,1%>,10) = 1058 by A1, A2, NUMERAL1:def 1;
(len <%8,5,0,1%>) - 1 = 4 - 1 by AFINSQ_1:84;
then A4: <%8,5,0,1%> . ((len <%8,5,0,1%>) - 1) <> 0 ;
now :: thesis: for i being Nat st i in dom <%8,5,0,1%> holds
( 0 <= <%8,5,0,1%> . i & <%8,5,0,1%> . i < 10 )
let i be Nat; :: thesis: ( i in dom <%8,5,0,1%> implies ( 0 <= <%8,5,0,1%> . i & <%8,5,0,1%> . i < 10 ) )
assume i in dom <%8,5,0,1%> ; :: thesis: ( 0 <= <%8,5,0,1%> . i & <%8,5,0,1%> . i < 10 )
then i in 4 by AFINSQ_1:84;
then i in {0,1,2,3} by CARD_1:52;
then ( i = 0 or i = 1 or i = 2 or i = 3 ) by ENUMSET1:def 2;
hence ( 0 <= <%8,5,0,1%> . i & <%8,5,0,1%> . i < 10 ) ; :: thesis: verum
end;
hence digits (1058,10) = <%8,5,0,1%> by A3, A4, NUMERAL1:def 2; :: thesis: verum