theorem Th3:
  <*p1,f1,p2*> is SFHT of D & <*p2,f2,p3*> is SFHT of D &
  <*p3,f3,p4*> is SFHT of D & <*p4,f4,p5*> is SFHT of D &
  <*p5,f5,p6*> is SFHT of D & <*p6,f6,p7*> is SFHT of D &
  <*p7,f7,p8*> is SFHT of D & <*p8,f8,p9*> is SFHT of D &
  <*p9,f9,p10*> is SFHT of D &
  <*PP_inversion(p2),f2,p3*> is SFHT of D &
  <*PP_inversion(p3),f3,p4*> is SFHT of D &
  <*PP_inversion(p4),f4,p5*> is SFHT of D &
  <*PP_inversion(p5),f5,p6*> is SFHT of D &
  <*PP_inversion(p6),f6,p7*> is SFHT of D &
  <*PP_inversion(p7),f7,p8*> is SFHT of D &
  <*PP_inversion(p8),f8,p9*> is SFHT of D &
  <*PP_inversion(p9),f9,p10*> is SFHT of D
  implies <*p1,PP_composition(f1,f2,f3,f4,f5,f6,f7,f8,f9),p10*> is SFHT of D
  proof
    assume that
A1: <*p1,f1,p2*> is SFHT of D and
A2: <*p2,f2,p3*> is SFHT of D and
A3: <*p3,f3,p4*> is SFHT of D and
A4: <*p4,f4,p5*> is SFHT of D and
A5: <*p5,f5,p6*> is SFHT of D and
A6: <*p6,f6,p7*> is SFHT of D and
A7: <*p7,f7,p8*> is SFHT of D and
A8: <*p8,f8,p9*> is SFHT of D and
A9: <*p9,f9,p10*> is SFHT of D and
A10: <*PP_inversion(p2),f2,p3*> is SFHT of D and
A11: <*PP_inversion(p3),f3,p4*> is SFHT of D and
A12: <*PP_inversion(p4),f4,p5*> is SFHT of D and
A13: <*PP_inversion(p5),f5,p6*> is SFHT of D and
A14: <*PP_inversion(p6),f6,p7*> is SFHT of D and
A15: <*PP_inversion(p7),f7,p8*> is SFHT of D and
A16: <*PP_inversion(p8),f8,p9*> is SFHT of D and
A17: <*PP_inversion(p9),f9,p10*> is SFHT of D;
    <*p1,PP_composition(f1,f2,f3,f4,f5,f6,f7,f8),p9*>
    is SFHT of D by A1,A2,A3,A4,A5,A6,A7,A10,A11,A12,A13,A14,A15,A8,A16,Th2;
    hence thesis by A9,A17,NOMIN_3:25;
  end;
