reserve a,b,k,m,n,s for Nat;
reserve c,c1,c2,c3 for Complex;
reserve i,j,z for Integer;
reserve p for Prime;
reserve x for object;
reserve f,g for complex-valued FinSequence;

theorem
  n is even implies n,0 are_congruent_mod 4 or n,2 are_congruent_mod 4
  proof
    assume n is even;
    then n mod 4 = 0 or n mod 4 = 2 by Th78;
    then n mod 4 = 0 mod 4 or n mod 4 = 2 mod 4;
    hence thesis by NAT_D:64;
  end;
