reserve c for Complex;
reserve r for Real;
reserve m,n for Nat;
reserve f for complex-valued Function;
reserve f,g for differentiable Function of REAL,REAL;
reserve L for non empty ZeroStr;
reserve x for Element of L;

theorem Th34:
  for L being non empty ZeroStr holds (0_.L) || n = 0_.L
  proof
    let L be non empty ZeroStr;
    let m be Element of NAT;
    m = n or m <> n;
    hence thesis by Th32,FUNCT_7:32;
  end;
