 reserve x for object;
 reserve G for non empty 1-sorted;
 reserve A for Subset of G;
 reserve y,y1,y2,Y,Z for set;
 reserve k for Nat;
 reserve G for Group;
 reserve a,g,h for Element of G;
 reserve A for Subset of G;
reserve G for non empty multMagma,
  A,B,C for Subset of G;
reserve a,b,g,g1,g2,h,h1,h2 for Element of G;
reserve G for Group-like non empty multMagma;
reserve h,g,g1,g2 for Element of G;
reserve A for Subset of G;
reserve H for Subgroup of G;
reserve h,h1,h2 for Element of H;
reserve G,G1,G2,G3 for Group;
reserve a,a1,a2,b,b1,b2,g,g1,g2 for Element of G;
reserve A,B for Subset of G;
reserve H,H1,H2,H3 for Subgroup of G;
reserve h,h1,h2 for Element of H;

theorem
  for H being strict Subgroup of G holds Right_Cosets H = the set of all {a}
    implies H = (1).G
proof
  let H be strict Subgroup of G;
  assume
A1: Right_Cosets H = the set of all {a};
A2: the carrier of H c= {1_G}
  proof
    set a = the Element of G;
    let x be object;
    assume x in the carrier of H;
    then reconsider h = x as Element of H;
A3: h in H;
    reconsider h as Element of G by Th42;
    H * a in Right_Cosets H by Def16;
    then consider b such that
A4: H * a = {b} by A1;
    h * a in H * a by A3,Th104;
    then
A5: h * a = b by A4,TARSKI:def 1;
    1_G in H by Th46;
    then 1_G * a in H * a by Th104;
    then 1_G * a = b by A4,TARSKI:def 1;
    then h = 1_G by A5,GROUP_1:6;
    hence thesis by TARSKI:def 1;
  end;
  1_G in H by Th46;
  then 1_G in the carrier of H;
  then {1_G} c= the carrier of H by ZFMISC_1:31;
  then {1_G} = the carrier of H by A2;
  hence thesis by Def7;
end;
