let E, D be non empty set ; for d being Element of D
for i being Nat
for h being Function of D,E
for T being Tuple of i,D
for F being BinOp of D
for H being BinOp of E st ( for d1, d2 being Element of D holds h . (F . d1,d2) = H . (h . d1),(h . d2) ) holds
h * (F [:] T,d) = H [:] (h * T),(h . d)
let d be Element of D; for i being Nat
for h being Function of D,E
for T being Tuple of i,D
for F being BinOp of D
for H being BinOp of E st ( for d1, d2 being Element of D holds h . (F . d1,d2) = H . (h . d1),(h . d2) ) holds
h * (F [:] T,d) = H [:] (h * T),(h . d)
let i be Nat; for h being Function of D,E
for T being Tuple of i,D
for F being BinOp of D
for H being BinOp of E st ( for d1, d2 being Element of D holds h . (F . d1,d2) = H . (h . d1),(h . d2) ) holds
h * (F [:] T,d) = H [:] (h * T),(h . d)
let h be Function of D,E; for T being Tuple of i,D
for F being BinOp of D
for H being BinOp of E st ( for d1, d2 being Element of D holds h . (F . d1,d2) = H . (h . d1),(h . d2) ) holds
h * (F [:] T,d) = H [:] (h * T),(h . d)
let T be Tuple of i,D; for F being BinOp of D
for H being BinOp of E st ( for d1, d2 being Element of D holds h . (F . d1,d2) = H . (h . d1),(h . d2) ) holds
h * (F [:] T,d) = H [:] (h * T),(h . d)
let F be BinOp of D; for H being BinOp of E st ( for d1, d2 being Element of D holds h . (F . d1,d2) = H . (h . d1),(h . d2) ) holds
h * (F [:] T,d) = H [:] (h * T),(h . d)
let H be BinOp of E; ( ( for d1, d2 being Element of D holds h . (F . d1,d2) = H . (h . d1),(h . d2) ) implies h * (F [:] T,d) = H [:] (h * T),(h . d) )
assume A1:
for d1, d2 being Element of D holds h . (F . d1,d2) = H . (h . d1),(h . d2)
; h * (F [:] T,d) = H [:] (h * T),(h . d)