let R be good Ring; :: thesis:
let a be Data-Location of R; :: thesis:
let i1 be Element of NAT ; :: thesis:
let k be natural number ; :: thesis:
X1: JumpPart (IncAddr (a =0_goto i1),k) = k + (JumpPart (a =0_goto i1)) by AMISTD_2:def 14;
then A1: dom (JumpPart (IncAddr (a =0_goto i1),k)) = dom (JumpPart (a =0_goto i1)) by VALUED_1:def 2;
A2: dom (JumpPart (a =0_goto (i1 + k))) = dom <*(i1 + k)*> by RECDEF_2:def 2
.= Seg 1 by FINSEQ_1:55
.= dom <*i1*> by FINSEQ_1:55
.= dom (JumpPart (a =0_goto i1)) by RECDEF_2:def 2 ;
A3: for x being set st x in dom (JumpPart (a =0_goto i1)) holds
(JumpPart (IncAddr (a =0_goto i1),k)) . x = (JumpPart (a =0_goto (i1 + k))) . x

let x be set ; :: thesis:
assume A4: x in dom (JumpPart (a =0_goto i1)) ; :: thesis:
then x in dom <*i1*> by RECDEF_2:def 2;
then A6: x = 1 by FINSEQ_1:111;
reconsider f = (JumpPart (a =0_goto i1)) . x as Element of NAT by ORDINAL1:def 13;
A8: (JumpPart (IncAddr (a =0_goto i1),k)) . x = k + f by A4, X1, A1, VALUED_1:def 2;
f = <*i1*> . x by RECDEF_2:def 2
.= i1 by A6, FINSEQ_1:57 ;
hence (JumpPart (IncAddr (a =0_goto i1),k)) . x = <*(i1 + k)*> . x by A6, A8, FINSEQ_1:57
.= (JumpPart (a =0_goto (i1 + k))) . x by RECDEF_2:def 2 ;
:: thesis:

end;

X: InsCode (IncAddr (a =0_goto i1),k) = InsCode (a =0_goto i1) by AMISTD_2:def 14
.= 7 by RECDEF_2:def 1
.= InsCode (a =0_goto (i1 + k)) by RECDEF_2:def 1 ;
Y: AddressPart (IncAddr (a =0_goto i1),k) = AddressPart (a =0_goto i1) by AMISTD_2:def 14
.= <*a*> by RECDEF_2:def 3
.= AddressPart (a =0_goto (i1 + k)) by RECDEF_2:def 3 ;
JumpPart (IncAddr (a =0_goto i1),k) = JumpPart (a =0_goto (i1 + k)) by A1, A2, A3, FUNCT_1:9;
hence IncAddr (a =0_goto i1),k = a =0_goto (i1 + k) by X, Y, COMPOS_1:7; :: thesis: