reserve n for Element of NAT;
reserve i for Integer;
reserve G,H,I for Group;
reserve A,B for Subgroup of G;
reserve N for normal Subgroup of G;
reserve a,a1,a2,a3,b,b1 for Element of G;
reserve c,d for Element of H;
reserve f for Function of the carrier of G, the carrier of H;
reserve x,y,y1,y2,z for set;
reserve A1,A2 for Subset of G;
reserve N for normal Subgroup of G;
reserve S,T1,T2 for Element of G./.N;
reserve g,h for Homomorphism of G,H;
reserve h1 for Homomorphism of H,I;

theorem
  for G,H being strict Group holds Ker 1:(G,H) = G
proof
  let G,H be strict Group;
  now
    let a be Element of G;
    1:(G,H).a = 1_H;
    hence a in Ker 1:(G,H) by Th41;
  end;
  hence thesis by GROUP_2:62;
end;
