let P1, P2 be Subset of (TOP-REAL 2); :: thesis: for a, b, c, d being real number
for f1, f2 being FinSequence of (TOP-REAL 2)
for p1, p2 being Point of (TOP-REAL 2) st a < b & c < d & p1 = |[a,c]| & p2 = |[b,d]| & f1 = <*|[a,c]|,|[a,d]|,|[b,d]|*> & f2 = <*|[a,c]|,|[b,c]|,|[b,d]|*> & P1 = L~ f1 & P2 = L~ f2 holds
( P1 is_an_arc_of p1,p2 & P2 is_an_arc_of p1,p2 & not P1 is empty & not P2 is empty & rectangle a,b,c,d = P1 \/ P2 & P1 /\ P2 = {p1,p2} )
let a, b, c, d be real number ; :: thesis: for f1, f2 being FinSequence of (TOP-REAL 2)
for p1, p2 being Point of (TOP-REAL 2) st a < b & c < d & p1 = |[a,c]| & p2 = |[b,d]| & f1 = <*|[a,c]|,|[a,d]|,|[b,d]|*> & f2 = <*|[a,c]|,|[b,c]|,|[b,d]|*> & P1 = L~ f1 & P2 = L~ f2 holds
( P1 is_an_arc_of p1,p2 & P2 is_an_arc_of p1,p2 & not P1 is empty & not P2 is empty & rectangle a,b,c,d = P1 \/ P2 & P1 /\ P2 = {p1,p2} )
let f1, f2 be FinSequence of (TOP-REAL 2); :: thesis: for p1, p2 being Point of (TOP-REAL 2) st a < b & c < d & p1 = |[a,c]| & p2 = |[b,d]| & f1 = <*|[a,c]|,|[a,d]|,|[b,d]|*> & f2 = <*|[a,c]|,|[b,c]|,|[b,d]|*> & P1 = L~ f1 & P2 = L~ f2 holds
( P1 is_an_arc_of p1,p2 & P2 is_an_arc_of p1,p2 & not P1 is empty & not P2 is empty & rectangle a,b,c,d = P1 \/ P2 & P1 /\ P2 = {p1,p2} )
let p1, p2 be Point of (TOP-REAL 2); :: thesis: ( a < b & c < d & p1 = |[a,c]| & p2 = |[b,d]| & f1 = <*|[a,c]|,|[a,d]|,|[b,d]|*> & f2 = <*|[a,c]|,|[b,c]|,|[b,d]|*> & P1 = L~ f1 & P2 = L~ f2 implies ( P1 is_an_arc_of p1,p2 & P2 is_an_arc_of p1,p2 & not P1 is empty & not P2 is empty & rectangle a,b,c,d = P1 \/ P2 & P1 /\ P2 = {p1,p2} ) )
assume that
A1: a < b and
A2: c < d and
A3: p1 = |[a,c]| and
A4: p2 = |[b,d]| and
A5: f1 = <*|[a,c]|,|[a,d]|,|[b,d]|*> and
A6: f2 = <*|[a,c]|,|[b,c]|,|[b,d]|*> and
A7: P1 = L~ f1 and
A8: P2 = L~ f2 ; :: thesis: ( P1 is_an_arc_of p1,p2 & P2 is_an_arc_of p1,p2 & not P1 is empty & not P2 is empty & rectangle a,b,c,d = P1 \/ P2 & P1 /\ P2 = {p1,p2} )
|[a,c]| `2 = c by EUCLID:56;
then A9: ( |[a,c]| <> |[a,d]| or |[a,d]| <> |[b,d]| ) by A2, EUCLID:56;
A10: P1 = (LSeg |[a,c]|,|[a,d]|) \/ (LSeg |[a,d]|,|[b,d]|) by A1, A2, A5, A6, A7, Th58;
A11: (LSeg |[a,c]|,|[a,d]|) /\ (LSeg |[a,d]|,|[b,d]|) = {|[a,d]|} by A1, A2, Th44;
|[b,c]| `2 = c by EUCLID:56;
then A12: ( |[a,c]| <> |[b,c]| or |[b,c]| <> |[b,d]| ) by A2, EUCLID:56;
A13: P2 = (LSeg |[a,c]|,|[b,c]|) \/ (LSeg |[b,c]|,|[b,d]|) by A1, A2, A5, A6, A8, Th58;
(LSeg |[a,c]|,|[b,c]|) /\ (LSeg |[b,c]|,|[b,d]|) = {|[b,c]|} by A1, A2, Th42;
hence ( P1 is_an_arc_of p1,p2 & P2 is_an_arc_of p1,p2 & not P1 is empty & not P2 is empty & rectangle a,b,c,d = P1 \/ P2 & P1 /\ P2 = {p1,p2} ) by A1, A2, A3, A4, A5, A6, A7, A8, A9, A10, A11, A12, A13, Th58, TOPREAL1:18; :: thesis: verum