reserve A for QC-alphabet;
reserve a,b,b1,b2,c,d for object,
  i,j,k,n for Nat,
  x,y,x1,x2 for bound_QC-variable of A,
  P for QC-pred_symbol of k,A,
  ll for CQC-variable_list of k,A,
  l1 ,l2 for FinSequence of QC-variables(A),
  p for QC-formula of A,
  s,t for QC-symbol of A;
reserve Sub for CQC_Substitution of A;
reserve finSub for finite CQC_Substitution of A;
reserve e for Element of vSUB(A);
reserve S,S9,S1,S2,S19,S29,T1,T2 for Element of QC-Sub-WFF(A);
reserve B for Element of [:QC-Sub-WFF(A),bound_QC-variables(A):];
reserve SQ for second_Q_comp of B;

theorem Th26:
  S is Sub_atomic implies ((@S`1).1)`1 <> 0 & ((@S`1).1)`1 <> 1 &
  ((@S`1).1)`1 <> 2 & ((@S`1).1)`1 <> 3
proof
  assume S is Sub_atomic;
  then ex k being Nat st (@S`1).1 is QC-pred_symbol of k,A by Th25;
  hence thesis by QC_LANG1:17;
end;
