let D be non empty set ; :: thesis:
let f1, f2, f3, f4, f5, f6, f7, f8, f9, f10 be BinominativeFunction of D; :: thesis:
let p1, p2 be PartialPredicate of D; :: thesis:
let q1, q2, q3, q4, q5, q6, q7, q8, q9 be total PartialPredicate of D; :: thesis:
assume that
A1: ( <*p1,f1,q1*> is SFHT of D & <*q1,f2,q2*> is SFHT of D & <*q2,f3,q3*> is SFHT of D & <*q3,f4,q4*> is SFHT of D & <*q4,f5,q5*> is SFHT of D & <*q5,f6,q6*> is SFHT of D & <*q6,f7,q7*> is SFHT of D & <*q7,f8,q8*> is SFHT of D & <*q8,f9,q9*> is SFHT of D ) and
A2: <*q9,f10,p2*> is SFHT of D ; :: thesis:
A3: <*(PP_inversion q9),f10,p2*> is SFHT of D by NOMIN_3:19;
<*p1,(PP_composition (f1,f2,f3,f4,f5,f6,f7,f8,f9)),q9*> is SFHT of D by A1, Th12;
hence <*p1,(PP_composition (f1,f2,f3,f4,f5,f6,f7,f8,f9,f10)),p2*> is SFHT of D by A2, A3, NOMIN_3:25; :: thesis: