 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;

theorem
  {g} * {g1,g2} = {g * g1, g * g2}
proof
  thus {g} * {g1,g2} c= {g * g1, g * g2}
  proof
    let x be object;
    assume x in {g} * {g1,g2};
    then consider h1,h2 such that
A1: x = h1 * h2 and
A2: h1 in {g} and
A3: h2 in {g1,g2};
A4: h2 = g1 or h2 = g2 by A3,TARSKI:def 2;
    h1 = g by A2,TARSKI:def 1;
    hence thesis by A1,A4,TARSKI:def 2;
  end;
  let x be object;
A5: g2 in {g1,g2 } by TARSKI:def 2;
  assume x in {g * g1,g * g2};
  then
A6: x = g * g1 or x = g * g2 by TARSKI:def 2;
  g in {g} & g1 in {g1,g2} by TARSKI:def 1,def 2;
  hence thesis by A6,A5;
end;
