set A = [.0,1.];
deffunc H₁( Element of [.0,1.], Element of [.0,1.]) -> Element of [.0,1.] = In (((1 - $1) + ($1 * $2)),[.0,1.]);
ex f being Function of [:[.0,1.],[.0,1.]:],[.0,1.] st
for x, y being Element of [.0,1.] holds f . (x,y) = H₁(x,y) from BINOP_1:sch 4();
then consider f being BinOp of [.0,1.] such that
A1: for x, y being Element of [.0,1.] holds f . (x,y) = H₁(x,y) ;
take f ; :: thesis: for x, y being Element of [.0,1.] holds f . (x,y) = (1 - x) + (x * y)
let a, b be Element of [.0,1.]; :: thesis: f . (a,b) = (1 - a) + (a * b)
f . (a,b) = H₁(a,b) by A1;
hence f . (a,b) = (1 - a) + (a * b) by SUBSET_1:def 8, ReichenbachIn01; :: thesis: verum