let a, b be Int_position; :: thesis: for l being Element of NAT

for k1, k2 being Integer holds NIC ((Divide (a,k1,b,k2)),l) = {(l + 1)}

let l be Element of NAT ; :: thesis: for k1, k2 being Integer holds NIC ((Divide (a,k1,b,k2)),l) = {(l + 1)}

let k1, k2 be Integer; :: thesis: NIC ((Divide (a,k1,b,k2)),l) = {(l + 1)}

set i = Divide (a,k1,b,k2);

for s being State of SCMPDS st IC s = l holds

(Exec ((Divide (a,k1,b,k2)),s)) . (IC ) = (IC s) + 1 by SCMPDS_2:52;

hence NIC ((Divide (a,k1,b,k2)),l) = {(l + 1)} by Th1; :: thesis: verum

for k1, k2 being Integer holds NIC ((Divide (a,k1,b,k2)),l) = {(l + 1)}

let l be Element of NAT ; :: thesis: for k1, k2 being Integer holds NIC ((Divide (a,k1,b,k2)),l) = {(l + 1)}

let k1, k2 be Integer; :: thesis: NIC ((Divide (a,k1,b,k2)),l) = {(l + 1)}

set i = Divide (a,k1,b,k2);

for s being State of SCMPDS st IC s = l holds

(Exec ((Divide (a,k1,b,k2)),s)) . (IC ) = (IC s) + 1 by SCMPDS_2:52;

hence NIC ((Divide (a,k1,b,k2)),l) = {(l + 1)} by Th1; :: thesis: verum