let R be good Ring; :: thesis: for i1 being Element of NAT holds (product" (JumpParts (InsCode (goto i1,R)))) . 1 = NAT
let i1 be Element of NAT ; :: thesis: (product" (JumpParts (InsCode (goto i1,R)))) . 1 = NAT
dom (product" (JumpParts (InsCode (goto i1,R)))) = {1} by Th14, Th38;
then A1: 1 in dom (product" (JumpParts (InsCode (goto i1,R)))) by TARSKI:def 1;
A2: InsCode (goto i1,R) = 6 by RECDEF_2:def 1;
hereby :: according to TARSKI:def 3,XBOOLE_0:def 10 :: thesis: NAT c= (product" (JumpParts (InsCode (goto i1,R)))) . 1
let x be set ; :: thesis: ( x in (product" (JumpParts (InsCode (goto i1,R)))) . 1 implies x in NAT )
assume x in (product" (JumpParts (InsCode (goto i1,R)))) . 1 ; :: thesis: x in NAT
then x in pi (JumpParts (InsCode (goto i1,R))),1 by A1, CARD_3:93;
then consider g being Function such that
A3: g in JumpParts (InsCode (goto i1,R)) and
A4: x = g . 1 by CARD_3:def 6;
consider I being Instruction of (SCM R) such that
A5: g = JumpPart I and
A6: InsCode I = InsCode (goto i1,R) by A3;
consider i2 being Element of NAT such that
A7: I = goto i2,R by A2, A6, Th22;
g = <*i2*> by A5, A7, RECDEF_2:def 2;
then x = i2 by A4, FINSEQ_1:def 8;
hence x in NAT ; :: thesis: verum
end;
let x be set ; :: according to TARSKI:def 3 :: thesis: ( not x in NAT or x in (product" (JumpParts (InsCode (goto i1,R)))) . 1 )
assume x in NAT ; :: thesis: x in (product" (JumpParts (InsCode (goto i1,R)))) . 1
then reconsider x = x as Element of NAT ;
( JumpPart (goto x,R) = <*x*> & InsCode (goto i1,R) = InsCode (goto x,R) ) by A2, RECDEF_2:def 1, RECDEF_2:def 2;
then A8: <*x*> in JumpParts (InsCode (goto i1,R)) ;
<*x*> . 1 = x by FINSEQ_1:def 8;
then x in pi (JumpParts (InsCode (goto i1,R))),1 by A8, CARD_3:def 6;
hence x in (product" (JumpParts (InsCode (goto i1,R)))) . 1 by A1, CARD_3:93; :: thesis: verum