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Theorem btwnconn1lem12 24721
Description: Lemma for btwnconn1 24724. Using a long string of invocations of linecgr 24704, we show that  D  =  d. (Contributed by Scott Fenton, 9-Oct-2013.)
Assertion
Ref Expression
btwnconn1lem12  |-  ( ( ( ( N  e.  NN  /\  A  e.  ( EE `  N
)  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE
`  N )  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N
) )  /\  (
d  e.  ( EE
`  N )  /\  b  e.  ( EE `  N )  /\  E  e.  ( EE `  N
) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N )  /\  R  e.  ( EE `  N
) ) )  /\  ( ( ( ( A  =/=  B  /\  B  =/=  C  /\  C  =/=  c )  /\  ( B  Btwn  <. A ,  C >.  /\  B  Btwn  <. A ,  D >. ) )  /\  ( ( D  Btwn  <. A ,  c >.  /\ 
<. D ,  c >.Cgr <. C ,  D >. )  /\  ( C  Btwn  <. A ,  d >.  /\ 
<. C ,  d >.Cgr <. C ,  D >. ) )  /\  ( ( c  Btwn  <. A , 
b >.  /\  <. c ,  b >.Cgr <. C ,  B >. )  /\  ( d 
Btwn  <. A ,  b
>.  /\  <. d ,  b
>.Cgr <. D ,  B >. ) ) )  /\  ( ( E  Btwn  <. C ,  c >.  /\  E  Btwn  <. D , 
d >. )  /\  (
( C  Btwn  <. c ,  P >.  /\  <. C ,  P >.Cgr <. C ,  d
>. )  /\  ( C  Btwn  <. d ,  R >.  /\  <. C ,  R >.Cgr
<. C ,  E >. )  /\  ( R  Btwn  <. P ,  Q >.  /\ 
<. R ,  Q >.Cgr <. R ,  P >. ) ) ) ) )  ->  D  =  d )

Proof of Theorem btwnconn1lem12
StepHypRef Expression
1 simp11 985 . . . . 5  |-  ( ( ( N  e.  NN  /\  A  e.  ( EE
`  N )  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE `  N
)  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N ) )  /\  ( d  e.  ( EE `  N )  /\  b  e.  ( EE `  N
)  /\  E  e.  ( EE `  N ) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N
)  /\  R  e.  ( EE `  N ) ) )  ->  N  e.  NN )
2 simp2l1 1054 . . . . 5  |-  ( ( ( N  e.  NN  /\  A  e.  ( EE
`  N )  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE `  N
)  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N ) )  /\  ( d  e.  ( EE `  N )  /\  b  e.  ( EE `  N
)  /\  E  e.  ( EE `  N ) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N
)  /\  R  e.  ( EE `  N ) ) )  ->  C  e.  ( EE `  N
) )
3 simp2l3 1056 . . . . 5  |-  ( ( ( N  e.  NN  /\  A  e.  ( EE
`  N )  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE `  N
)  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N ) )  /\  ( d  e.  ( EE `  N )  /\  b  e.  ( EE `  N
)  /\  E  e.  ( EE `  N ) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N
)  /\  R  e.  ( EE `  N ) ) )  ->  c  e.  ( EE `  N
) )
4 simp31 991 . . . . 5  |-  ( ( ( N  e.  NN  /\  A  e.  ( EE
`  N )  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE `  N
)  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N ) )  /\  ( d  e.  ( EE `  N )  /\  b  e.  ( EE `  N
)  /\  E  e.  ( EE `  N ) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N
)  /\  R  e.  ( EE `  N ) ) )  ->  P  e.  ( EE `  N
) )
5 simp32 992 . . . . 5  |-  ( ( ( N  e.  NN  /\  A  e.  ( EE
`  N )  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE `  N
)  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N ) )  /\  ( d  e.  ( EE `  N )  /\  b  e.  ( EE `  N
)  /\  E  e.  ( EE `  N ) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N
)  /\  R  e.  ( EE `  N ) ) )  ->  Q  e.  ( EE `  N
) )
6 simp1l3 1050 . . . . . 6  |-  ( ( ( ( A  =/= 
B  /\  B  =/=  C  /\  C  =/=  c
)  /\  ( B  Btwn  <. A ,  C >.  /\  B  Btwn  <. A ,  D >. ) )  /\  ( ( D  Btwn  <. A ,  c >.  /\ 
<. D ,  c >.Cgr <. C ,  D >. )  /\  ( C  Btwn  <. A ,  d >.  /\ 
<. C ,  d >.Cgr <. C ,  D >. ) )  /\  ( ( c  Btwn  <. A , 
b >.  /\  <. c ,  b >.Cgr <. C ,  B >. )  /\  ( d 
Btwn  <. A ,  b
>.  /\  <. d ,  b
>.Cgr <. D ,  B >. ) ) )  ->  C  =/=  c )
76ad2antrl 708 . . . . 5  |-  ( ( ( ( N  e.  NN  /\  A  e.  ( EE `  N
)  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE
`  N )  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N
) )  /\  (
d  e.  ( EE
`  N )  /\  b  e.  ( EE `  N )  /\  E  e.  ( EE `  N
) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N )  /\  R  e.  ( EE `  N
) ) )  /\  ( ( ( ( A  =/=  B  /\  B  =/=  C  /\  C  =/=  c )  /\  ( B  Btwn  <. A ,  C >.  /\  B  Btwn  <. A ,  D >. ) )  /\  ( ( D  Btwn  <. A ,  c >.  /\ 
<. D ,  c >.Cgr <. C ,  D >. )  /\  ( C  Btwn  <. A ,  d >.  /\ 
<. C ,  d >.Cgr <. C ,  D >. ) )  /\  ( ( c  Btwn  <. A , 
b >.  /\  <. c ,  b >.Cgr <. C ,  B >. )  /\  ( d 
Btwn  <. A ,  b
>.  /\  <. d ,  b
>.Cgr <. D ,  B >. ) ) )  /\  ( ( E  Btwn  <. C ,  c >.  /\  E  Btwn  <. D , 
d >. )  /\  (
( C  Btwn  <. c ,  P >.  /\  <. C ,  P >.Cgr <. C ,  d
>. )  /\  ( C  Btwn  <. d ,  R >.  /\  <. C ,  R >.Cgr
<. C ,  E >. )  /\  ( R  Btwn  <. P ,  Q >.  /\ 
<. R ,  Q >.Cgr <. R ,  P >. ) ) ) ) )  ->  C  =/=  c
)
8 simpr1l 1012 . . . . . . 7  |-  ( ( ( E  Btwn  <. C , 
c >.  /\  E  Btwn  <. D ,  d >. )  /\  ( ( C 
Btwn  <. c ,  P >.  /\  <. C ,  P >.Cgr
<. C ,  d >.
)  /\  ( C  Btwn  <. d ,  R >.  /\  <. C ,  R >.Cgr
<. C ,  E >. )  /\  ( R  Btwn  <. P ,  Q >.  /\ 
<. R ,  Q >.Cgr <. R ,  P >. ) ) )  ->  C  Btwn  <. c ,  P >. )
98ad2antll 709 . . . . . 6  |-  ( ( ( ( N  e.  NN  /\  A  e.  ( EE `  N
)  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE
`  N )  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N
) )  /\  (
d  e.  ( EE
`  N )  /\  b  e.  ( EE `  N )  /\  E  e.  ( EE `  N
) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N )  /\  R  e.  ( EE `  N
) ) )  /\  ( ( ( ( A  =/=  B  /\  B  =/=  C  /\  C  =/=  c )  /\  ( B  Btwn  <. A ,  C >.  /\  B  Btwn  <. A ,  D >. ) )  /\  ( ( D  Btwn  <. A ,  c >.  /\ 
<. D ,  c >.Cgr <. C ,  D >. )  /\  ( C  Btwn  <. A ,  d >.  /\ 
<. C ,  d >.Cgr <. C ,  D >. ) )  /\  ( ( c  Btwn  <. A , 
b >.  /\  <. c ,  b >.Cgr <. C ,  B >. )  /\  ( d 
Btwn  <. A ,  b
>.  /\  <. d ,  b
>.Cgr <. D ,  B >. ) ) )  /\  ( ( E  Btwn  <. C ,  c >.  /\  E  Btwn  <. D , 
d >. )  /\  (
( C  Btwn  <. c ,  P >.  /\  <. C ,  P >.Cgr <. C ,  d
>. )  /\  ( C  Btwn  <. d ,  R >.  /\  <. C ,  R >.Cgr
<. C ,  E >. )  /\  ( R  Btwn  <. P ,  Q >.  /\ 
<. R ,  Q >.Cgr <. R ,  P >. ) ) ) ) )  ->  C  Btwn  <. c ,  P >. )
10 btwncolinear5 24696 . . . . . . . 8  |-  ( ( N  e.  NN  /\  ( c  e.  ( EE `  N )  /\  P  e.  ( EE `  N )  /\  C  e.  ( EE `  N ) ) )  ->  ( C  Btwn  <. c ,  P >.  ->  C  Colinear  <. c ,  P >. ) )
111, 3, 4, 2, 10syl13anc 1184 . . . . . . 7  |-  ( ( ( N  e.  NN  /\  A  e.  ( EE
`  N )  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE `  N
)  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N ) )  /\  ( d  e.  ( EE `  N )  /\  b  e.  ( EE `  N
)  /\  E  e.  ( EE `  N ) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N
)  /\  R  e.  ( EE `  N ) ) )  ->  ( C  Btwn  <. c ,  P >.  ->  C  Colinear  <. c ,  P >. ) )
1211adantr 451 . . . . . 6  |-  ( ( ( ( N  e.  NN  /\  A  e.  ( EE `  N
)  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE
`  N )  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N
) )  /\  (
d  e.  ( EE
`  N )  /\  b  e.  ( EE `  N )  /\  E  e.  ( EE `  N
) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N )  /\  R  e.  ( EE `  N
) ) )  /\  ( ( ( ( A  =/=  B  /\  B  =/=  C  /\  C  =/=  c )  /\  ( B  Btwn  <. A ,  C >.  /\  B  Btwn  <. A ,  D >. ) )  /\  ( ( D  Btwn  <. A ,  c >.  /\ 
<. D ,  c >.Cgr <. C ,  D >. )  /\  ( C  Btwn  <. A ,  d >.  /\ 
<. C ,  d >.Cgr <. C ,  D >. ) )  /\  ( ( c  Btwn  <. A , 
b >.  /\  <. c ,  b >.Cgr <. C ,  B >. )  /\  ( d 
Btwn  <. A ,  b
>.  /\  <. d ,  b
>.Cgr <. D ,  B >. ) ) )  /\  ( ( E  Btwn  <. C ,  c >.  /\  E  Btwn  <. D , 
d >. )  /\  (
( C  Btwn  <. c ,  P >.  /\  <. C ,  P >.Cgr <. C ,  d
>. )  /\  ( C  Btwn  <. d ,  R >.  /\  <. C ,  R >.Cgr
<. C ,  E >. )  /\  ( R  Btwn  <. P ,  Q >.  /\ 
<. R ,  Q >.Cgr <. R ,  P >. ) ) ) ) )  ->  ( C  Btwn  <.
c ,  P >.  ->  C  Colinear  <. c ,  P >. ) )
139, 12mpd 14 . . . . 5  |-  ( ( ( ( N  e.  NN  /\  A  e.  ( EE `  N
)  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE
`  N )  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N
) )  /\  (
d  e.  ( EE
`  N )  /\  b  e.  ( EE `  N )  /\  E  e.  ( EE `  N
) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N )  /\  R  e.  ( EE `  N
) ) )  /\  ( ( ( ( A  =/=  B  /\  B  =/=  C  /\  C  =/=  c )  /\  ( B  Btwn  <. A ,  C >.  /\  B  Btwn  <. A ,  D >. ) )  /\  ( ( D  Btwn  <. A ,  c >.  /\ 
<. D ,  c >.Cgr <. C ,  D >. )  /\  ( C  Btwn  <. A ,  d >.  /\ 
<. C ,  d >.Cgr <. C ,  D >. ) )  /\  ( ( c  Btwn  <. A , 
b >.  /\  <. c ,  b >.Cgr <. C ,  B >. )  /\  ( d 
Btwn  <. A ,  b
>.  /\  <. d ,  b
>.Cgr <. D ,  B >. ) ) )  /\  ( ( E  Btwn  <. C ,  c >.  /\  E  Btwn  <. D , 
d >. )  /\  (
( C  Btwn  <. c ,  P >.  /\  <. C ,  P >.Cgr <. C ,  d
>. )  /\  ( C  Btwn  <. d ,  R >.  /\  <. C ,  R >.Cgr
<. C ,  E >. )  /\  ( R  Btwn  <. P ,  Q >.  /\ 
<. R ,  Q >.Cgr <. R ,  P >. ) ) ) ) )  ->  C  Colinear  <. c ,  P >. )
14 simp2l2 1055 . . . . . 6  |-  ( ( ( N  e.  NN  /\  A  e.  ( EE
`  N )  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE `  N
)  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N ) )  /\  ( d  e.  ( EE `  N )  /\  b  e.  ( EE `  N
)  /\  E  e.  ( EE `  N ) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N
)  /\  R  e.  ( EE `  N ) ) )  ->  D  e.  ( EE `  N
) )
15 simp2r1 1057 . . . . . . 7  |-  ( ( ( N  e.  NN  /\  A  e.  ( EE
`  N )  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE `  N
)  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N ) )  /\  ( d  e.  ( EE `  N )  /\  b  e.  ( EE `  N
)  /\  E  e.  ( EE `  N ) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N
)  /\  R  e.  ( EE `  N ) ) )  ->  d  e.  ( EE `  N
) )
16 simpr1r 1013 . . . . . . . 8  |-  ( ( ( E  Btwn  <. C , 
c >.  /\  E  Btwn  <. D ,  d >. )  /\  ( ( C 
Btwn  <. c ,  P >.  /\  <. C ,  P >.Cgr
<. C ,  d >.
)  /\  ( C  Btwn  <. d ,  R >.  /\  <. C ,  R >.Cgr
<. C ,  E >. )  /\  ( R  Btwn  <. P ,  Q >.  /\ 
<. R ,  Q >.Cgr <. R ,  P >. ) ) )  ->  <. C ,  P >.Cgr <. C ,  d
>. )
1716ad2antll 709 . . . . . . 7  |-  ( ( ( ( N  e.  NN  /\  A  e.  ( EE `  N
)  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE
`  N )  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N
) )  /\  (
d  e.  ( EE
`  N )  /\  b  e.  ( EE `  N )  /\  E  e.  ( EE `  N
) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N )  /\  R  e.  ( EE `  N
) ) )  /\  ( ( ( ( A  =/=  B  /\  B  =/=  C  /\  C  =/=  c )  /\  ( B  Btwn  <. A ,  C >.  /\  B  Btwn  <. A ,  D >. ) )  /\  ( ( D  Btwn  <. A ,  c >.  /\ 
<. D ,  c >.Cgr <. C ,  D >. )  /\  ( C  Btwn  <. A ,  d >.  /\ 
<. C ,  d >.Cgr <. C ,  D >. ) )  /\  ( ( c  Btwn  <. A , 
b >.  /\  <. c ,  b >.Cgr <. C ,  B >. )  /\  ( d 
Btwn  <. A ,  b
>.  /\  <. d ,  b
>.Cgr <. D ,  B >. ) ) )  /\  ( ( E  Btwn  <. C ,  c >.  /\  E  Btwn  <. D , 
d >. )  /\  (
( C  Btwn  <. c ,  P >.  /\  <. C ,  P >.Cgr <. C ,  d
>. )  /\  ( C  Btwn  <. d ,  R >.  /\  <. C ,  R >.Cgr
<. C ,  E >. )  /\  ( R  Btwn  <. P ,  Q >.  /\ 
<. R ,  Q >.Cgr <. R ,  P >. ) ) ) ) )  ->  <. C ,  P >.Cgr
<. C ,  d >.
)
18 simp2rr 1025 . . . . . . . 8  |-  ( ( ( ( A  =/= 
B  /\  B  =/=  C  /\  C  =/=  c
)  /\  ( B  Btwn  <. A ,  C >.  /\  B  Btwn  <. A ,  D >. ) )  /\  ( ( D  Btwn  <. A ,  c >.  /\ 
<. D ,  c >.Cgr <. C ,  D >. )  /\  ( C  Btwn  <. A ,  d >.  /\ 
<. C ,  d >.Cgr <. C ,  D >. ) )  /\  ( ( c  Btwn  <. A , 
b >.  /\  <. c ,  b >.Cgr <. C ,  B >. )  /\  ( d 
Btwn  <. A ,  b
>.  /\  <. d ,  b
>.Cgr <. D ,  B >. ) ) )  ->  <. C ,  d >.Cgr <. C ,  D >. )
1918ad2antrl 708 . . . . . . 7  |-  ( ( ( ( N  e.  NN  /\  A  e.  ( EE `  N
)  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE
`  N )  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N
) )  /\  (
d  e.  ( EE
`  N )  /\  b  e.  ( EE `  N )  /\  E  e.  ( EE `  N
) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N )  /\  R  e.  ( EE `  N
) ) )  /\  ( ( ( ( A  =/=  B  /\  B  =/=  C  /\  C  =/=  c )  /\  ( B  Btwn  <. A ,  C >.  /\  B  Btwn  <. A ,  D >. ) )  /\  ( ( D  Btwn  <. A ,  c >.  /\ 
<. D ,  c >.Cgr <. C ,  D >. )  /\  ( C  Btwn  <. A ,  d >.  /\ 
<. C ,  d >.Cgr <. C ,  D >. ) )  /\  ( ( c  Btwn  <. A , 
b >.  /\  <. c ,  b >.Cgr <. C ,  B >. )  /\  ( d 
Btwn  <. A ,  b
>.  /\  <. d ,  b
>.Cgr <. D ,  B >. ) ) )  /\  ( ( E  Btwn  <. C ,  c >.  /\  E  Btwn  <. D , 
d >. )  /\  (
( C  Btwn  <. c ,  P >.  /\  <. C ,  P >.Cgr <. C ,  d
>. )  /\  ( C  Btwn  <. d ,  R >.  /\  <. C ,  R >.Cgr
<. C ,  E >. )  /\  ( R  Btwn  <. P ,  Q >.  /\ 
<. R ,  Q >.Cgr <. R ,  P >. ) ) ) ) )  ->  <. C ,  d
>.Cgr <. C ,  D >. )
201, 2, 4, 2, 15, 2, 14, 17, 19cgrtrand 24616 . . . . . 6  |-  ( ( ( ( N  e.  NN  /\  A  e.  ( EE `  N
)  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE
`  N )  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N
) )  /\  (
d  e.  ( EE
`  N )  /\  b  e.  ( EE `  N )  /\  E  e.  ( EE `  N
) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N )  /\  R  e.  ( EE `  N
) ) )  /\  ( ( ( ( A  =/=  B  /\  B  =/=  C  /\  C  =/=  c )  /\  ( B  Btwn  <. A ,  C >.  /\  B  Btwn  <. A ,  D >. ) )  /\  ( ( D  Btwn  <. A ,  c >.  /\ 
<. D ,  c >.Cgr <. C ,  D >. )  /\  ( C  Btwn  <. A ,  d >.  /\ 
<. C ,  d >.Cgr <. C ,  D >. ) )  /\  ( ( c  Btwn  <. A , 
b >.  /\  <. c ,  b >.Cgr <. C ,  B >. )  /\  ( d 
Btwn  <. A ,  b
>.  /\  <. d ,  b
>.Cgr <. D ,  B >. ) ) )  /\  ( ( E  Btwn  <. C ,  c >.  /\  E  Btwn  <. D , 
d >. )  /\  (
( C  Btwn  <. c ,  P >.  /\  <. C ,  P >.Cgr <. C ,  d
>. )  /\  ( C  Btwn  <. d ,  R >.  /\  <. C ,  R >.Cgr
<. C ,  E >. )  /\  ( R  Btwn  <. P ,  Q >.  /\ 
<. R ,  Q >.Cgr <. R ,  P >. ) ) ) ) )  ->  <. C ,  P >.Cgr
<. C ,  D >. )
21 btwnconn1lem11 24720 . . . . . . 7  |-  ( ( ( ( N  e.  NN  /\  A  e.  ( EE `  N
)  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE
`  N )  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N
) )  /\  (
d  e.  ( EE
`  N )  /\  b  e.  ( EE `  N )  /\  E  e.  ( EE `  N
) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N )  /\  R  e.  ( EE `  N
) ) )  /\  ( ( ( ( A  =/=  B  /\  B  =/=  C  /\  C  =/=  c )  /\  ( B  Btwn  <. A ,  C >.  /\  B  Btwn  <. A ,  D >. ) )  /\  ( ( D  Btwn  <. A ,  c >.  /\ 
<. D ,  c >.Cgr <. C ,  D >. )  /\  ( C  Btwn  <. A ,  d >.  /\ 
<. C ,  d >.Cgr <. C ,  D >. ) )  /\  ( ( c  Btwn  <. A , 
b >.  /\  <. c ,  b >.Cgr <. C ,  B >. )  /\  ( d 
Btwn  <. A ,  b
>.  /\  <. d ,  b
>.Cgr <. D ,  B >. ) ) )  /\  ( ( E  Btwn  <. C ,  c >.  /\  E  Btwn  <. D , 
d >. )  /\  (
( C  Btwn  <. c ,  P >.  /\  <. C ,  P >.Cgr <. C ,  d
>. )  /\  ( C  Btwn  <. d ,  R >.  /\  <. C ,  R >.Cgr
<. C ,  E >. )  /\  ( R  Btwn  <. P ,  Q >.  /\ 
<. R ,  Q >.Cgr <. R ,  P >. ) ) ) ) )  ->  <. D ,  C >.Cgr
<. Q ,  C >. )
221, 14, 2, 5, 2, 21cgrcomlrand 24624 . . . . . 6  |-  ( ( ( ( N  e.  NN  /\  A  e.  ( EE `  N
)  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE
`  N )  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N
) )  /\  (
d  e.  ( EE
`  N )  /\  b  e.  ( EE `  N )  /\  E  e.  ( EE `  N
) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N )  /\  R  e.  ( EE `  N
) ) )  /\  ( ( ( ( A  =/=  B  /\  B  =/=  C  /\  C  =/=  c )  /\  ( B  Btwn  <. A ,  C >.  /\  B  Btwn  <. A ,  D >. ) )  /\  ( ( D  Btwn  <. A ,  c >.  /\ 
<. D ,  c >.Cgr <. C ,  D >. )  /\  ( C  Btwn  <. A ,  d >.  /\ 
<. C ,  d >.Cgr <. C ,  D >. ) )  /\  ( ( c  Btwn  <. A , 
b >.  /\  <. c ,  b >.Cgr <. C ,  B >. )  /\  ( d 
Btwn  <. A ,  b
>.  /\  <. d ,  b
>.Cgr <. D ,  B >. ) ) )  /\  ( ( E  Btwn  <. C ,  c >.  /\  E  Btwn  <. D , 
d >. )  /\  (
( C  Btwn  <. c ,  P >.  /\  <. C ,  P >.Cgr <. C ,  d
>. )  /\  ( C  Btwn  <. d ,  R >.  /\  <. C ,  R >.Cgr
<. C ,  E >. )  /\  ( R  Btwn  <. P ,  Q >.  /\ 
<. R ,  Q >.Cgr <. R ,  P >. ) ) ) ) )  ->  <. C ,  D >.Cgr
<. C ,  Q >. )
231, 2, 4, 2, 14, 2, 5, 20, 22cgrtrand 24616 . . . . 5  |-  ( ( ( ( N  e.  NN  /\  A  e.  ( EE `  N
)  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE
`  N )  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N
) )  /\  (
d  e.  ( EE
`  N )  /\  b  e.  ( EE `  N )  /\  E  e.  ( EE `  N
) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N )  /\  R  e.  ( EE `  N
) ) )  /\  ( ( ( ( A  =/=  B  /\  B  =/=  C  /\  C  =/=  c )  /\  ( B  Btwn  <. A ,  C >.  /\  B  Btwn  <. A ,  D >. ) )  /\  ( ( D  Btwn  <. A ,  c >.  /\ 
<. D ,  c >.Cgr <. C ,  D >. )  /\  ( C  Btwn  <. A ,  d >.  /\ 
<. C ,  d >.Cgr <. C ,  D >. ) )  /\  ( ( c  Btwn  <. A , 
b >.  /\  <. c ,  b >.Cgr <. C ,  B >. )  /\  ( d 
Btwn  <. A ,  b
>.  /\  <. d ,  b
>.Cgr <. D ,  B >. ) ) )  /\  ( ( E  Btwn  <. C ,  c >.  /\  E  Btwn  <. D , 
d >. )  /\  (
( C  Btwn  <. c ,  P >.  /\  <. C ,  P >.Cgr <. C ,  d
>. )  /\  ( C  Btwn  <. d ,  R >.  /\  <. C ,  R >.Cgr
<. C ,  E >. )  /\  ( R  Btwn  <. P ,  Q >.  /\ 
<. R ,  Q >.Cgr <. R ,  P >. ) ) ) ) )  ->  <. C ,  P >.Cgr
<. C ,  Q >. )
24 simp12 986 . . . . . . . . . 10  |-  ( ( ( N  e.  NN  /\  A  e.  ( EE
`  N )  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE `  N
)  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N ) )  /\  ( d  e.  ( EE `  N )  /\  b  e.  ( EE `  N
)  /\  E  e.  ( EE `  N ) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N
)  /\  R  e.  ( EE `  N ) ) )  ->  A  e.  ( EE `  N
) )
25 simp13 987 . . . . . . . . . 10  |-  ( ( ( N  e.  NN  /\  A  e.  ( EE
`  N )  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE `  N
)  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N ) )  /\  ( d  e.  ( EE `  N )  /\  b  e.  ( EE `  N
)  /\  E  e.  ( EE `  N ) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N
)  /\  R  e.  ( EE `  N ) ) )  ->  B  e.  ( EE `  N
) )
26 simp2r2 1058 . . . . . . . . . 10  |-  ( ( ( N  e.  NN  /\  A  e.  ( EE
`  N )  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE `  N
)  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N ) )  /\  ( d  e.  ( EE `  N )  /\  b  e.  ( EE `  N
)  /\  E  e.  ( EE `  N ) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N
)  /\  R  e.  ( EE `  N ) ) )  ->  b  e.  ( EE `  N
) )
27 simp1rr 1021 . . . . . . . . . . . 12  |-  ( ( ( ( A  =/= 
B  /\  B  =/=  C  /\  C  =/=  c
)  /\  ( B  Btwn  <. A ,  C >.  /\  B  Btwn  <. A ,  D >. ) )  /\  ( ( D  Btwn  <. A ,  c >.  /\ 
<. D ,  c >.Cgr <. C ,  D >. )  /\  ( C  Btwn  <. A ,  d >.  /\ 
<. C ,  d >.Cgr <. C ,  D >. ) )  /\  ( ( c  Btwn  <. A , 
b >.  /\  <. c ,  b >.Cgr <. C ,  B >. )  /\  ( d 
Btwn  <. A ,  b
>.  /\  <. d ,  b
>.Cgr <. D ,  B >. ) ) )  ->  B  Btwn  <. A ,  D >. )
2827ad2antrl 708 . . . . . . . . . . 11  |-  ( ( ( ( N  e.  NN  /\  A  e.  ( EE `  N
)  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE
`  N )  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N
) )  /\  (
d  e.  ( EE
`  N )  /\  b  e.  ( EE `  N )  /\  E  e.  ( EE `  N
) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N )  /\  R  e.  ( EE `  N
) ) )  /\  ( ( ( ( A  =/=  B  /\  B  =/=  C  /\  C  =/=  c )  /\  ( B  Btwn  <. A ,  C >.  /\  B  Btwn  <. A ,  D >. ) )  /\  ( ( D  Btwn  <. A ,  c >.  /\ 
<. D ,  c >.Cgr <. C ,  D >. )  /\  ( C  Btwn  <. A ,  d >.  /\ 
<. C ,  d >.Cgr <. C ,  D >. ) )  /\  ( ( c  Btwn  <. A , 
b >.  /\  <. c ,  b >.Cgr <. C ,  B >. )  /\  ( d 
Btwn  <. A ,  b
>.  /\  <. d ,  b
>.Cgr <. D ,  B >. ) ) )  /\  ( ( E  Btwn  <. C ,  c >.  /\  E  Btwn  <. D , 
d >. )  /\  (
( C  Btwn  <. c ,  P >.  /\  <. C ,  P >.Cgr <. C ,  d
>. )  /\  ( C  Btwn  <. d ,  R >.  /\  <. C ,  R >.Cgr
<. C ,  E >. )  /\  ( R  Btwn  <. P ,  Q >.  /\ 
<. R ,  Q >.Cgr <. R ,  P >. ) ) ) ) )  ->  B  Btwn  <. A ,  D >. )
29 simp2ll 1022 . . . . . . . . . . . 12  |-  ( ( ( ( A  =/= 
B  /\  B  =/=  C  /\  C  =/=  c
)  /\  ( B  Btwn  <. A ,  C >.  /\  B  Btwn  <. A ,  D >. ) )  /\  ( ( D  Btwn  <. A ,  c >.  /\ 
<. D ,  c >.Cgr <. C ,  D >. )  /\  ( C  Btwn  <. A ,  d >.  /\ 
<. C ,  d >.Cgr <. C ,  D >. ) )  /\  ( ( c  Btwn  <. A , 
b >.  /\  <. c ,  b >.Cgr <. C ,  B >. )  /\  ( d 
Btwn  <. A ,  b
>.  /\  <. d ,  b
>.Cgr <. D ,  B >. ) ) )  ->  D  Btwn  <. A ,  c
>. )
3029ad2antrl 708 . . . . . . . . . . 11  |-  ( ( ( ( N  e.  NN  /\  A  e.  ( EE `  N
)  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE
`  N )  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N
) )  /\  (
d  e.  ( EE
`  N )  /\  b  e.  ( EE `  N )  /\  E  e.  ( EE `  N
) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N )  /\  R  e.  ( EE `  N
) ) )  /\  ( ( ( ( A  =/=  B  /\  B  =/=  C  /\  C  =/=  c )  /\  ( B  Btwn  <. A ,  C >.  /\  B  Btwn  <. A ,  D >. ) )  /\  ( ( D  Btwn  <. A ,  c >.  /\ 
<. D ,  c >.Cgr <. C ,  D >. )  /\  ( C  Btwn  <. A ,  d >.  /\ 
<. C ,  d >.Cgr <. C ,  D >. ) )  /\  ( ( c  Btwn  <. A , 
b >.  /\  <. c ,  b >.Cgr <. C ,  B >. )  /\  ( d 
Btwn  <. A ,  b
>.  /\  <. d ,  b
>.Cgr <. D ,  B >. ) ) )  /\  ( ( E  Btwn  <. C ,  c >.  /\  E  Btwn  <. D , 
d >. )  /\  (
( C  Btwn  <. c ,  P >.  /\  <. C ,  P >.Cgr <. C ,  d
>. )  /\  ( C  Btwn  <. d ,  R >.  /\  <. C ,  R >.Cgr
<. C ,  E >. )  /\  ( R  Btwn  <. P ,  Q >.  /\ 
<. R ,  Q >.Cgr <. R ,  P >. ) ) ) ) )  ->  D  Btwn  <. A , 
c >. )
311, 24, 25, 14, 3, 28, 30btwnexchand 24649 . . . . . . . . . 10  |-  ( ( ( ( N  e.  NN  /\  A  e.  ( EE `  N
)  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE
`  N )  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N
) )  /\  (
d  e.  ( EE
`  N )  /\  b  e.  ( EE `  N )  /\  E  e.  ( EE `  N
) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N )  /\  R  e.  ( EE `  N
) ) )  /\  ( ( ( ( A  =/=  B  /\  B  =/=  C  /\  C  =/=  c )  /\  ( B  Btwn  <. A ,  C >.  /\  B  Btwn  <. A ,  D >. ) )  /\  ( ( D  Btwn  <. A ,  c >.  /\ 
<. D ,  c >.Cgr <. C ,  D >. )  /\  ( C  Btwn  <. A ,  d >.  /\ 
<. C ,  d >.Cgr <. C ,  D >. ) )  /\  ( ( c  Btwn  <. A , 
b >.  /\  <. c ,  b >.Cgr <. C ,  B >. )  /\  ( d 
Btwn  <. A ,  b
>.  /\  <. d ,  b
>.Cgr <. D ,  B >. ) ) )  /\  ( ( E  Btwn  <. C ,  c >.  /\  E  Btwn  <. D , 
d >. )  /\  (
( C  Btwn  <. c ,  P >.  /\  <. C ,  P >.Cgr <. C ,  d
>. )  /\  ( C  Btwn  <. d ,  R >.  /\  <. C ,  R >.Cgr
<. C ,  E >. )  /\  ( R  Btwn  <. P ,  Q >.  /\ 
<. R ,  Q >.Cgr <. R ,  P >. ) ) ) ) )  ->  B  Btwn  <. A , 
c >. )
32 simp3ll 1026 . . . . . . . . . . 11  |-  ( ( ( ( A  =/= 
B  /\  B  =/=  C  /\  C  =/=  c
)  /\  ( B  Btwn  <. A ,  C >.  /\  B  Btwn  <. A ,  D >. ) )  /\  ( ( D  Btwn  <. A ,  c >.  /\ 
<. D ,  c >.Cgr <. C ,  D >. )  /\  ( C  Btwn  <. A ,  d >.  /\ 
<. C ,  d >.Cgr <. C ,  D >. ) )  /\  ( ( c  Btwn  <. A , 
b >.  /\  <. c ,  b >.Cgr <. C ,  B >. )  /\  ( d 
Btwn  <. A ,  b
>.  /\  <. d ,  b
>.Cgr <. D ,  B >. ) ) )  -> 
c  Btwn  <. A , 
b >. )
3332ad2antrl 708 . . . . . . . . . 10  |-  ( ( ( ( N  e.  NN  /\  A  e.  ( EE `  N
)  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE
`  N )  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N
) )  /\  (
d  e.  ( EE
`  N )  /\  b  e.  ( EE `  N )  /\  E  e.  ( EE `  N
) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N )  /\  R  e.  ( EE `  N
) ) )  /\  ( ( ( ( A  =/=  B  /\  B  =/=  C  /\  C  =/=  c )  /\  ( B  Btwn  <. A ,  C >.  /\  B  Btwn  <. A ,  D >. ) )  /\  ( ( D  Btwn  <. A ,  c >.  /\ 
<. D ,  c >.Cgr <. C ,  D >. )  /\  ( C  Btwn  <. A ,  d >.  /\ 
<. C ,  d >.Cgr <. C ,  D >. ) )  /\  ( ( c  Btwn  <. A , 
b >.  /\  <. c ,  b >.Cgr <. C ,  B >. )  /\  ( d 
Btwn  <. A ,  b
>.  /\  <. d ,  b
>.Cgr <. D ,  B >. ) ) )  /\  ( ( E  Btwn  <. C ,  c >.  /\  E  Btwn  <. D , 
d >. )  /\  (
( C  Btwn  <. c ,  P >.  /\  <. C ,  P >.Cgr <. C ,  d
>. )  /\  ( C  Btwn  <. d ,  R >.  /\  <. C ,  R >.Cgr
<. C ,  E >. )  /\  ( R  Btwn  <. P ,  Q >.  /\ 
<. R ,  Q >.Cgr <. R ,  P >. ) ) ) ) )  ->  c  Btwn  <. A , 
b >. )
341, 24, 25, 3, 26, 31, 33btwnexch3and 24644 . . . . . . . . 9  |-  ( ( ( ( N  e.  NN  /\  A  e.  ( EE `  N
)  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE
`  N )  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N
) )  /\  (
d  e.  ( EE
`  N )  /\  b  e.  ( EE `  N )  /\  E  e.  ( EE `  N
) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N )  /\  R  e.  ( EE `  N
) ) )  /\  ( ( ( ( A  =/=  B  /\  B  =/=  C  /\  C  =/=  c )  /\  ( B  Btwn  <. A ,  C >.  /\  B  Btwn  <. A ,  D >. ) )  /\  ( ( D  Btwn  <. A ,  c >.  /\ 
<. D ,  c >.Cgr <. C ,  D >. )  /\  ( C  Btwn  <. A ,  d >.  /\ 
<. C ,  d >.Cgr <. C ,  D >. ) )  /\  ( ( c  Btwn  <. A , 
b >.  /\  <. c ,  b >.Cgr <. C ,  B >. )  /\  ( d 
Btwn  <. A ,  b
>.  /\  <. d ,  b
>.Cgr <. D ,  B >. ) ) )  /\  ( ( E  Btwn  <. C ,  c >.  /\  E  Btwn  <. D , 
d >. )  /\  (
( C  Btwn  <. c ,  P >.  /\  <. C ,  P >.Cgr <. C ,  d
>. )  /\  ( C  Btwn  <. d ,  R >.  /\  <. C ,  R >.Cgr
<. C ,  E >. )  /\  ( R  Btwn  <. P ,  Q >.  /\ 
<. R ,  Q >.Cgr <. R ,  P >. ) ) ) ) )  ->  c  Btwn  <. B , 
b >. )
35 opeq1 3796 . . . . . . . . . . . . . 14  |-  ( B  =  b  ->  <. B , 
b >.  =  <. b ,  b >. )
3635breq2d 4035 . . . . . . . . . . . . 13  |-  ( B  =  b  ->  (
c  Btwn  <. B , 
b >. 
<->  c  Btwn  <. b ,  b >. ) )
3736biimpac 472 . . . . . . . . . . . 12  |-  ( ( c  Btwn  <. B , 
b >.  /\  B  =  b )  ->  c  Btwn  <. b ,  b
>. )
38 axbtwnid 24567 . . . . . . . . . . . . 13  |-  ( ( N  e.  NN  /\  c  e.  ( EE `  N )  /\  b  e.  ( EE `  N
) )  ->  (
c  Btwn  <. b ,  b >.  ->  c  =  b ) )
391, 3, 26, 38syl3anc 1182 . . . . . . . . . . . 12  |-  ( ( ( N  e.  NN  /\  A  e.  ( EE
`  N )  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE `  N
)  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N ) )  /\  ( d  e.  ( EE `  N )  /\  b  e.  ( EE `  N
)  /\  E  e.  ( EE `  N ) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N
)  /\  R  e.  ( EE `  N ) ) )  ->  (
c  Btwn  <. b ,  b >.  ->  c  =  b ) )
4037, 39syl5 28 . . . . . . . . . . 11  |-  ( ( ( N  e.  NN  /\  A  e.  ( EE
`  N )  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE `  N
)  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N ) )  /\  ( d  e.  ( EE `  N )  /\  b  e.  ( EE `  N
)  /\  E  e.  ( EE `  N ) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N
)  /\  R  e.  ( EE `  N ) ) )  ->  (
( c  Btwn  <. B , 
b >.  /\  B  =  b )  ->  c  =  b ) )
4140exp3a 425 . . . . . . . . . 10  |-  ( ( ( N  e.  NN  /\  A  e.  ( EE
`  N )  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE `  N
)  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N ) )  /\  ( d  e.  ( EE `  N )  /\  b  e.  ( EE `  N
)  /\  E  e.  ( EE `  N ) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N
)  /\  R  e.  ( EE `  N ) ) )  ->  (
c  Btwn  <. B , 
b >.  ->  ( B  =  b  ->  c  =  b ) ) )
4241adantr 451 . . . . . . . . 9  |-  ( ( ( ( N  e.  NN  /\  A  e.  ( EE `  N
)  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE
`  N )  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N
) )  /\  (
d  e.  ( EE
`  N )  /\  b  e.  ( EE `  N )  /\  E  e.  ( EE `  N
) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N )  /\  R  e.  ( EE `  N
) ) )  /\  ( ( ( ( A  =/=  B  /\  B  =/=  C  /\  C  =/=  c )  /\  ( B  Btwn  <. A ,  C >.  /\  B  Btwn  <. A ,  D >. ) )  /\  ( ( D  Btwn  <. A ,  c >.  /\ 
<. D ,  c >.Cgr <. C ,  D >. )  /\  ( C  Btwn  <. A ,  d >.  /\ 
<. C ,  d >.Cgr <. C ,  D >. ) )  /\  ( ( c  Btwn  <. A , 
b >.  /\  <. c ,  b >.Cgr <. C ,  B >. )  /\  ( d 
Btwn  <. A ,  b
>.  /\  <. d ,  b
>.Cgr <. D ,  B >. ) ) )  /\  ( ( E  Btwn  <. C ,  c >.  /\  E  Btwn  <. D , 
d >. )  /\  (
( C  Btwn  <. c ,  P >.  /\  <. C ,  P >.Cgr <. C ,  d
>. )  /\  ( C  Btwn  <. d ,  R >.  /\  <. C ,  R >.Cgr
<. C ,  E >. )  /\  ( R  Btwn  <. P ,  Q >.  /\ 
<. R ,  Q >.Cgr <. R ,  P >. ) ) ) ) )  ->  ( c  Btwn  <. B ,  b >.  -> 
( B  =  b  ->  c  =  b ) ) )
4334, 42mpd 14 . . . . . . . 8  |-  ( ( ( ( N  e.  NN  /\  A  e.  ( EE `  N
)  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE
`  N )  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N
) )  /\  (
d  e.  ( EE
`  N )  /\  b  e.  ( EE `  N )  /\  E  e.  ( EE `  N
) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N )  /\  R  e.  ( EE `  N
) ) )  /\  ( ( ( ( A  =/=  B  /\  B  =/=  C  /\  C  =/=  c )  /\  ( B  Btwn  <. A ,  C >.  /\  B  Btwn  <. A ,  D >. ) )  /\  ( ( D  Btwn  <. A ,  c >.  /\ 
<. D ,  c >.Cgr <. C ,  D >. )  /\  ( C  Btwn  <. A ,  d >.  /\ 
<. C ,  d >.Cgr <. C ,  D >. ) )  /\  ( ( c  Btwn  <. A , 
b >.  /\  <. c ,  b >.Cgr <. C ,  B >. )  /\  ( d 
Btwn  <. A ,  b
>.  /\  <. d ,  b
>.Cgr <. D ,  B >. ) ) )  /\  ( ( E  Btwn  <. C ,  c >.  /\  E  Btwn  <. D , 
d >. )  /\  (
( C  Btwn  <. c ,  P >.  /\  <. C ,  P >.Cgr <. C ,  d
>. )  /\  ( C  Btwn  <. d ,  R >.  /\  <. C ,  R >.Cgr
<. C ,  E >. )  /\  ( R  Btwn  <. P ,  Q >.  /\ 
<. R ,  Q >.Cgr <. R ,  P >. ) ) ) ) )  ->  ( B  =  b  ->  c  =  b ) )
44 simp1 955 . . . . . . . . . . 11  |-  ( ( ( N  e.  NN  /\  A  e.  ( EE
`  N )  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE `  N
)  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N ) )  /\  ( d  e.  ( EE `  N )  /\  b  e.  ( EE `  N
)  /\  E  e.  ( EE `  N ) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N
)  /\  R  e.  ( EE `  N ) ) )  ->  ( N  e.  NN  /\  A  e.  ( EE `  N
)  /\  B  e.  ( EE `  N ) ) )
45 simp2l 981 . . . . . . . . . . 11  |-  ( ( ( N  e.  NN  /\  A  e.  ( EE
`  N )  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE `  N
)  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N ) )  /\  ( d  e.  ( EE `  N )  /\  b  e.  ( EE `  N
)  /\  E  e.  ( EE `  N ) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N
)  /\  R  e.  ( EE `  N ) ) )  ->  ( C  e.  ( EE `  N )  /\  D  e.  ( EE `  N
)  /\  c  e.  ( EE `  N ) ) )
46 simp2r 982 . . . . . . . . . . 11  |-  ( ( ( N  e.  NN  /\  A  e.  ( EE
`  N )  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE `  N
)  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N ) )  /\  ( d  e.  ( EE `  N )  /\  b  e.  ( EE `  N
)  /\  E  e.  ( EE `  N ) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N
)  /\  R  e.  ( EE `  N ) ) )  ->  (
d  e.  ( EE
`  N )  /\  b  e.  ( EE `  N )  /\  E  e.  ( EE `  N
) ) )
4744, 45, 463jca 1132 . . . . . . . . . 10  |-  ( ( ( N  e.  NN  /\  A  e.  ( EE
`  N )  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE `  N
)  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N ) )  /\  ( d  e.  ( EE `  N )  /\  b  e.  ( EE `  N
)  /\  E  e.  ( EE `  N ) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N
)  /\  R  e.  ( EE `  N ) ) )  ->  (
( N  e.  NN  /\  A  e.  ( EE
`  N )  /\  B  e.  ( EE `  N ) )  /\  ( C  e.  ( EE `  N )  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N
) )  /\  (
d  e.  ( EE
`  N )  /\  b  e.  ( EE `  N )  /\  E  e.  ( EE `  N
) ) ) )
48 simpl 443 . . . . . . . . . . 11  |-  ( ( ( ( ( A  =/=  B  /\  B  =/=  C  /\  C  =/=  c )  /\  ( B  Btwn  <. A ,  C >.  /\  B  Btwn  <. A ,  D >. ) )  /\  ( ( D  Btwn  <. A ,  c >.  /\ 
<. D ,  c >.Cgr <. C ,  D >. )  /\  ( C  Btwn  <. A ,  d >.  /\ 
<. C ,  d >.Cgr <. C ,  D >. ) )  /\  ( ( c  Btwn  <. A , 
b >.  /\  <. c ,  b >.Cgr <. C ,  B >. )  /\  ( d 
Btwn  <. A ,  b
>.  /\  <. d ,  b
>.Cgr <. D ,  B >. ) ) )  /\  ( ( E  Btwn  <. C ,  c >.  /\  E  Btwn  <. D , 
d >. )  /\  (
( C  Btwn  <. c ,  P >.  /\  <. C ,  P >.Cgr <. C ,  d
>. )  /\  ( C  Btwn  <. d ,  R >.  /\  <. C ,  R >.Cgr
<. C ,  E >. )  /\  ( R  Btwn  <. P ,  Q >.  /\ 
<. R ,  Q >.Cgr <. R ,  P >. ) ) ) )  -> 
( ( ( A  =/=  B  /\  B  =/=  C  /\  C  =/=  c )  /\  ( B  Btwn  <. A ,  C >.  /\  B  Btwn  <. A ,  D >. ) )  /\  ( ( D  Btwn  <. A ,  c >.  /\ 
<. D ,  c >.Cgr <. C ,  D >. )  /\  ( C  Btwn  <. A ,  d >.  /\ 
<. C ,  d >.Cgr <. C ,  D >. ) )  /\  ( ( c  Btwn  <. A , 
b >.  /\  <. c ,  b >.Cgr <. C ,  B >. )  /\  ( d 
Btwn  <. A ,  b
>.  /\  <. d ,  b
>.Cgr <. D ,  B >. ) ) ) )
49 simprl 732 . . . . . . . . . . 11  |-  ( ( ( ( ( A  =/=  B  /\  B  =/=  C  /\  C  =/=  c )  /\  ( B  Btwn  <. A ,  C >.  /\  B  Btwn  <. A ,  D >. ) )  /\  ( ( D  Btwn  <. A ,  c >.  /\ 
<. D ,  c >.Cgr <. C ,  D >. )  /\  ( C  Btwn  <. A ,  d >.  /\ 
<. C ,  d >.Cgr <. C ,  D >. ) )  /\  ( ( c  Btwn  <. A , 
b >.  /\  <. c ,  b >.Cgr <. C ,  B >. )  /\  ( d 
Btwn  <. A ,  b
>.  /\  <. d ,  b
>.Cgr <. D ,  B >. ) ) )  /\  ( ( E  Btwn  <. C ,  c >.  /\  E  Btwn  <. D , 
d >. )  /\  (
( C  Btwn  <. c ,  P >.  /\  <. C ,  P >.Cgr <. C ,  d
>. )  /\  ( C  Btwn  <. d ,  R >.  /\  <. C ,  R >.Cgr
<. C ,  E >. )  /\  ( R  Btwn  <. P ,  Q >.  /\ 
<. R ,  Q >.Cgr <. R ,  P >. ) ) ) )  -> 
( E  Btwn  <. C , 
c >.  /\  E  Btwn  <. D ,  d >. ) )
5048, 49jca 518 . . . . . . . . . 10  |-  ( ( ( ( ( A  =/=  B  /\  B  =/=  C  /\  C  =/=  c )  /\  ( B  Btwn  <. A ,  C >.  /\  B  Btwn  <. A ,  D >. ) )  /\  ( ( D  Btwn  <. A ,  c >.  /\ 
<. D ,  c >.Cgr <. C ,  D >. )  /\  ( C  Btwn  <. A ,  d >.  /\ 
<. C ,  d >.Cgr <. C ,  D >. ) )  /\  ( ( c  Btwn  <. A , 
b >.  /\  <. c ,  b >.Cgr <. C ,  B >. )  /\  ( d 
Btwn  <. A ,  b
>.  /\  <. d ,  b
>.Cgr <. D ,  B >. ) ) )  /\  ( ( E  Btwn  <. C ,  c >.  /\  E  Btwn  <. D , 
d >. )  /\  (
( C  Btwn  <. c ,  P >.  /\  <. C ,  P >.Cgr <. C ,  d
>. )  /\  ( C  Btwn  <. d ,  R >.  /\  <. C ,  R >.Cgr
<. C ,  E >. )  /\  ( R  Btwn  <. P ,  Q >.  /\ 
<. R ,  Q >.Cgr <. R ,  P >. ) ) ) )  -> 
( ( ( ( A  =/=  B  /\  B  =/=  C  /\  C  =/=  c )  /\  ( B  Btwn  <. A ,  C >.  /\  B  Btwn  <. A ,  D >. ) )  /\  ( ( D  Btwn  <. A ,  c >.  /\ 
<. D ,  c >.Cgr <. C ,  D >. )  /\  ( C  Btwn  <. A ,  d >.  /\ 
<. C ,  d >.Cgr <. C ,  D >. ) )  /\  ( ( c  Btwn  <. A , 
b >.  /\  <. c ,  b >.Cgr <. C ,  B >. )  /\  ( d 
Btwn  <. A ,  b
>.  /\  <. d ,  b
>.Cgr <. D ,  B >. ) ) )  /\  ( E  Btwn  <. C , 
c >.  /\  E  Btwn  <. D ,  d >. ) ) )
51 btwnconn1lem7 24716 . . . . . . . . . 10  |-  ( ( ( ( N  e.  NN  /\  A  e.  ( EE `  N
)  /\  B  e.  ( EE `  N ) )  /\  ( C  e.  ( EE `  N )  /\  D  e.  ( EE `  N
)  /\  c  e.  ( EE `  N ) )  /\  ( d  e.  ( EE `  N )  /\  b  e.  ( EE `  N
)  /\  E  e.  ( EE `  N ) ) )  /\  (
( ( ( A  =/=  B  /\  B  =/=  C  /\  C  =/=  c )  /\  ( B  Btwn  <. A ,  C >.  /\  B  Btwn  <. A ,  D >. ) )  /\  ( ( D  Btwn  <. A ,  c >.  /\ 
<. D ,  c >.Cgr <. C ,  D >. )  /\  ( C  Btwn  <. A ,  d >.  /\ 
<. C ,  d >.Cgr <. C ,  D >. ) )  /\  ( ( c  Btwn  <. A , 
b >.  /\  <. c ,  b >.Cgr <. C ,  B >. )  /\  ( d 
Btwn  <. A ,  b
>.  /\  <. d ,  b
>.Cgr <. D ,  B >. ) ) )  /\  ( E  Btwn  <. C , 
c >.  /\  E  Btwn  <. D ,  d >. ) ) )  ->  C  =/=  d )
5247, 50, 51syl2an 463 . . . . . . . . 9  |-  ( ( ( ( N  e.  NN  /\  A  e.  ( EE `  N
)  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE
`  N )  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N
) )  /\  (
d  e.  ( EE
`  N )  /\  b  e.  ( EE `  N )  /\  E  e.  ( EE `  N
) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N )  /\  R  e.  ( EE `  N
) ) )  /\  ( ( ( ( A  =/=  B  /\  B  =/=  C  /\  C  =/=  c )  /\  ( B  Btwn  <. A ,  C >.  /\  B  Btwn  <. A ,  D >. ) )  /\  ( ( D  Btwn  <. A ,  c >.  /\ 
<. D ,  c >.Cgr <. C ,  D >. )  /\  ( C  Btwn  <. A ,  d >.  /\ 
<. C ,  d >.Cgr <. C ,  D >. ) )  /\  ( ( c  Btwn  <. A , 
b >.  /\  <. c ,  b >.Cgr <. C ,  B >. )  /\  ( d 
Btwn  <. A ,  b
>.  /\  <. d ,  b
>.Cgr <. D ,  B >. ) ) )  /\  ( ( E  Btwn  <. C ,  c >.  /\  E  Btwn  <. D , 
d >. )  /\  (
( C  Btwn  <. c ,  P >.  /\  <. C ,  P >.Cgr <. C ,  d
>. )  /\  ( C  Btwn  <. d ,  R >.  /\  <. C ,  R >.Cgr
<. C ,  E >. )  /\  ( R  Btwn  <. P ,  Q >.  /\ 
<. R ,  Q >.Cgr <. R ,  P >. ) ) ) ) )  ->  C  =/=  d
)
53 simp2rl 1024 . . . . . . . . . . . 12  |-  ( ( ( ( A  =/= 
B  /\  B  =/=  C  /\  C  =/=  c
)  /\  ( B  Btwn  <. A ,  C >.  /\  B  Btwn  <. A ,  D >. ) )  /\  ( ( D  Btwn  <. A ,  c >.  /\ 
<. D ,  c >.Cgr <. C ,  D >. )  /\  ( C  Btwn  <. A ,  d >.  /\ 
<. C ,  d >.Cgr <. C ,  D >. ) )  /\  ( ( c  Btwn  <. A , 
b >.  /\  <. c ,  b >.Cgr <. C ,  B >. )  /\  ( d 
Btwn  <. A ,  b
>.  /\  <. d ,  b
>.Cgr <. D ,  B >. ) ) )  ->  C  Btwn  <. A ,  d
>. )
5453ad2antrl 708 . . . . . . . . . . 11  |-  ( ( ( ( N  e.  NN  /\  A  e.  ( EE `  N
)  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE
`  N )  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N
) )  /\  (
d  e.  ( EE
`  N )  /\  b  e.  ( EE `  N )  /\  E  e.  ( EE `  N
) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N )  /\  R  e.  ( EE `  N
) ) )  /\  ( ( ( ( A  =/=  B  /\  B  =/=  C  /\  C  =/=  c )  /\  ( B  Btwn  <. A ,  C >.  /\  B  Btwn  <. A ,  D >. ) )  /\  ( ( D  Btwn  <. A ,  c >.  /\ 
<. D ,  c >.Cgr <. C ,  D >. )  /\  ( C  Btwn  <. A ,  d >.  /\ 
<. C ,  d >.Cgr <. C ,  D >. ) )  /\  ( ( c  Btwn  <. A , 
b >.  /\  <. c ,  b >.Cgr <. C ,  B >. )  /\  ( d 
Btwn  <. A ,  b
>.  /\  <. d ,  b
>.Cgr <. D ,  B >. ) ) )  /\  ( ( E  Btwn  <. C ,  c >.  /\  E  Btwn  <. D , 
d >. )  /\  (
( C  Btwn  <. c ,  P >.  /\  <. C ,  P >.Cgr <. C ,  d
>. )  /\  ( C  Btwn  <. d ,  R >.  /\  <. C ,  R >.Cgr
<. C ,  E >. )  /\  ( R  Btwn  <. P ,  Q >.  /\ 
<. R ,  Q >.Cgr <. R ,  P >. ) ) ) ) )  ->  C  Btwn  <. A , 
d >. )
55 simp3rl 1028 . . . . . . . . . . . 12  |-  ( ( ( ( A  =/= 
B  /\  B  =/=  C  /\  C  =/=  c
)  /\  ( B  Btwn  <. A ,  C >.  /\  B  Btwn  <. A ,  D >. ) )  /\  ( ( D  Btwn  <. A ,  c >.  /\ 
<. D ,  c >.Cgr <. C ,  D >. )  /\  ( C  Btwn  <. A ,  d >.  /\ 
<. C ,  d >.Cgr <. C ,  D >. ) )  /\  ( ( c  Btwn  <. A , 
b >.  /\  <. c ,  b >.Cgr <. C ,  B >. )  /\  ( d 
Btwn  <. A ,  b
>.  /\  <. d ,  b
>.Cgr <. D ,  B >. ) ) )  -> 
d  Btwn  <. A , 
b >. )
5655ad2antrl 708 . . . . . . . . . . 11  |-  ( ( ( ( N  e.  NN  /\  A  e.  ( EE `  N
)  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE
`  N )  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N
) )  /\  (
d  e.  ( EE
`  N )  /\  b  e.  ( EE `  N )  /\  E  e.  ( EE `  N
) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N )  /\  R  e.  ( EE `  N
) ) )  /\  ( ( ( ( A  =/=  B  /\  B  =/=  C  /\  C  =/=  c )  /\  ( B  Btwn  <. A ,  C >.  /\  B  Btwn  <. A ,  D >. ) )  /\  ( ( D  Btwn  <. A ,  c >.  /\ 
<. D ,  c >.Cgr <. C ,  D >. )  /\  ( C  Btwn  <. A ,  d >.  /\ 
<. C ,  d >.Cgr <. C ,  D >. ) )  /\  ( ( c  Btwn  <. A , 
b >.  /\  <. c ,  b >.Cgr <. C ,  B >. )  /\  ( d 
Btwn  <. A ,  b
>.  /\  <. d ,  b
>.Cgr <. D ,  B >. ) ) )  /\  ( ( E  Btwn  <. C ,  c >.  /\  E  Btwn  <. D , 
d >. )  /\  (
( C  Btwn  <. c ,  P >.  /\  <. C ,  P >.Cgr <. C ,  d
>. )  /\  ( C  Btwn  <. d ,  R >.  /\  <. C ,  R >.Cgr
<. C ,  E >. )  /\  ( R  Btwn  <. P ,  Q >.  /\ 
<. R ,  Q >.Cgr <. R ,  P >. ) ) ) ) )  ->  d  Btwn  <. A , 
b >. )
571, 24, 2, 15, 26, 54, 56btwnexch3and 24644 . . . . . . . . . 10  |-  ( ( ( ( N  e.  NN  /\  A  e.  ( EE `  N
)  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE
`  N )  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N
) )  /\  (
d  e.  ( EE
`  N )  /\  b  e.  ( EE `  N )  /\  E  e.  ( EE `  N
) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N )  /\  R  e.  ( EE `  N
) ) )  /\  ( ( ( ( A  =/=  B  /\  B  =/=  C  /\  C  =/=  c )  /\  ( B  Btwn  <. A ,  C >.  /\  B  Btwn  <. A ,  D >. ) )  /\  ( ( D  Btwn  <. A ,  c >.  /\ 
<. D ,  c >.Cgr <. C ,  D >. )  /\  ( C  Btwn  <. A ,  d >.  /\ 
<. C ,  d >.Cgr <. C ,  D >. ) )  /\  ( ( c  Btwn  <. A , 
b >.  /\  <. c ,  b >.Cgr <. C ,  B >. )  /\  ( d 
Btwn  <. A ,  b
>.  /\  <. d ,  b
>.Cgr <. D ,  B >. ) ) )  /\  ( ( E  Btwn  <. C ,  c >.  /\  E  Btwn  <. D , 
d >. )  /\  (
( C  Btwn  <. c ,  P >.  /\  <. C ,  P >.Cgr <. C ,  d
>. )  /\  ( C  Btwn  <. d ,  R >.  /\  <. C ,  R >.Cgr
<. C ,  E >. )  /\  ( R  Btwn  <. P ,  Q >.  /\ 
<. R ,  Q >.Cgr <. R ,  P >. ) ) ) ) )  ->  d  Btwn  <. C , 
b >. )
58 btwncolinear2 24693 . . . . . . . . . . . 12  |-  ( ( N  e.  NN  /\  ( C  e.  ( EE `  N )  /\  b  e.  ( EE `  N )  /\  d  e.  ( EE `  N
) ) )  -> 
( d  Btwn  <. C , 
b >.  ->  C  Colinear  <. d ,  b >. )
)
591, 2, 26, 15, 58syl13anc 1184 . . . . . . . . . . 11  |-  ( ( ( N  e.  NN  /\  A  e.  ( EE
`  N )  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE `  N
)  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N ) )  /\  ( d  e.  ( EE `  N )  /\  b  e.  ( EE `  N
)  /\  E  e.  ( EE `  N ) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N
)  /\  R  e.  ( EE `  N ) ) )  ->  (
d  Btwn  <. C , 
b >.  ->  C  Colinear  <. d ,  b >. )
)
6059adantr 451 . . . . . . . . . 10  |-  ( ( ( ( N  e.  NN  /\  A  e.  ( EE `  N
)  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE
`  N )  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N
) )  /\  (
d  e.  ( EE
`  N )  /\  b  e.  ( EE `  N )  /\  E  e.  ( EE `  N
) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N )  /\  R  e.  ( EE `  N
) ) )  /\  ( ( ( ( A  =/=  B  /\  B  =/=  C  /\  C  =/=  c )  /\  ( B  Btwn  <. A ,  C >.  /\  B  Btwn  <. A ,  D >. ) )  /\  ( ( D  Btwn  <. A ,  c >.  /\ 
<. D ,  c >.Cgr <. C ,  D >. )  /\  ( C  Btwn  <. A ,  d >.  /\ 
<. C ,  d >.Cgr <. C ,  D >. ) )  /\  ( ( c  Btwn  <. A , 
b >.  /\  <. c ,  b >.Cgr <. C ,  B >. )  /\  ( d 
Btwn  <. A ,  b
>.  /\  <. d ,  b
>.Cgr <. D ,  B >. ) ) )  /\  ( ( E  Btwn  <. C ,  c >.  /\  E  Btwn  <. D , 
d >. )  /\  (
( C  Btwn  <. c ,  P >.  /\  <. C ,  P >.Cgr <. C ,  d
>. )  /\  ( C  Btwn  <. d ,  R >.  /\  <. C ,  R >.Cgr
<. C ,  E >. )  /\  ( R  Btwn  <. P ,  Q >.  /\ 
<. R ,  Q >.Cgr <. R ,  P >. ) ) ) ) )  ->  ( d  Btwn  <. C ,  b >.  ->  C  Colinear  <. d ,  b
>. ) )
6157, 60mpd 14 . . . . . . . . 9  |-  ( ( ( ( N  e.  NN  /\  A  e.  ( EE `  N
)  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE
`  N )  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N
) )  /\  (
d  e.  ( EE
`  N )  /\  b  e.  ( EE `  N )  /\  E  e.  ( EE `  N
) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N )  /\  R  e.  ( EE `  N
) ) )  /\  ( ( ( ( A  =/=  B  /\  B  =/=  C  /\  C  =/=  c )  /\  ( B  Btwn  <. A ,  C >.  /\  B  Btwn  <. A ,  D >. ) )  /\  ( ( D  Btwn  <. A ,  c >.  /\ 
<. D ,  c >.Cgr <. C ,  D >. )  /\  ( C  Btwn  <. A ,  d >.  /\ 
<. C ,  d >.Cgr <. C ,  D >. ) )  /\  ( ( c  Btwn  <. A , 
b >.  /\  <. c ,  b >.Cgr <. C ,  B >. )  /\  ( d 
Btwn  <. A ,  b
>.  /\  <. d ,  b
>.Cgr <. D ,  B >. ) ) )  /\  ( ( E  Btwn  <. C ,  c >.  /\  E  Btwn  <. D , 
d >. )  /\  (
( C  Btwn  <. c ,  P >.  /\  <. C ,  P >.Cgr <. C ,  d
>. )  /\  ( C  Btwn  <. d ,  R >.  /\  <. C ,  R >.Cgr
<. C ,  E >. )  /\  ( R  Btwn  <. P ,  Q >.  /\ 
<. R ,  Q >.Cgr <. R ,  P >. ) ) ) ) )  ->  C  Colinear  <. d ,  b >. )
62 simp33 993 . . . . . . . . . 10  |-  ( ( ( N  e.  NN  /\  A  e.  ( EE
`  N )  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE `  N
)  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N ) )  /\  ( d  e.  ( EE `  N )  /\  b  e.  ( EE `  N
)  /\  E  e.  ( EE `  N ) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N
)  /\  R  e.  ( EE `  N ) ) )  ->  R  e.  ( EE `  N
) )
63 simpr2r 1015 . . . . . . . . . . . . . 14  |-  ( ( ( E  Btwn  <. C , 
c >.  /\  E  Btwn  <. D ,  d >. )  /\  ( ( C 
Btwn  <. c ,  P >.  /\  <. C ,  P >.Cgr
<. C ,  d >.
)  /\  ( C  Btwn  <. d ,  R >.  /\  <. C ,  R >.Cgr
<. C ,  E >. )  /\  ( R  Btwn  <. P ,  Q >.  /\ 
<. R ,  Q >.Cgr <. R ,  P >. ) ) )  ->  <. C ,  R >.Cgr <. C ,  E >. )
6463ad2antll 709 . . . . . . . . . . . . 13  |-  ( ( ( ( N  e.  NN  /\  A  e.  ( EE `  N
)  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE
`  N )  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N
) )  /\  (
d  e.  ( EE
`  N )  /\  b  e.  ( EE `  N )  /\  E  e.  ( EE `  N
) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N )  /\  R  e.  ( EE `  N
) ) )  /\  ( ( ( ( A  =/=  B  /\  B  =/=  C  /\  C  =/=  c )  /\  ( B  Btwn  <. A ,  C >.  /\  B  Btwn  <. A ,  D >. ) )  /\  ( ( D  Btwn  <. A ,  c >.  /\ 
<. D ,  c >.Cgr <. C ,  D >. )  /\  ( C  Btwn  <. A ,  d >.  /\ 
<. C ,  d >.Cgr <. C ,  D >. ) )  /\  ( ( c  Btwn  <. A , 
b >.  /\  <. c ,  b >.Cgr <. C ,  B >. )  /\  ( d 
Btwn  <. A ,  b
>.  /\  <. d ,  b
>.Cgr <. D ,  B >. ) ) )  /\  ( ( E  Btwn  <. C ,  c >.  /\  E  Btwn  <. D , 
d >. )  /\  (
( C  Btwn  <. c ,  P >.  /\  <. C ,  P >.Cgr <. C ,  d
>. )  /\  ( C  Btwn  <. d ,  R >.  /\  <. C ,  R >.Cgr
<. C ,  E >. )  /\  ( R  Btwn  <. P ,  Q >.  /\ 
<. R ,  Q >.Cgr <. R ,  P >. ) ) ) ) )  ->  <. C ,  R >.Cgr
<. C ,  E >. )
65 btwnconn1lem5 24714 . . . . . . . . . . . . . 14  |-  ( ( ( ( N  e.  NN  /\  A  e.  ( EE `  N
)  /\  B  e.  ( EE `  N ) )  /\  ( C  e.  ( EE `  N )  /\  D  e.  ( EE `  N
)  /\  c  e.  ( EE `  N ) )  /\  ( d  e.  ( EE `  N )  /\  b  e.  ( EE `  N
)  /\  E  e.  ( EE `  N ) ) )  /\  (
( ( ( A  =/=  B  /\  B  =/=  C  /\  C  =/=  c )  /\  ( B  Btwn  <. A ,  C >.  /\  B  Btwn  <. A ,  D >. ) )  /\  ( ( D  Btwn  <. A ,  c >.  /\ 
<. D ,  c >.Cgr <. C ,  D >. )  /\  ( C  Btwn  <. A ,  d >.  /\ 
<. C ,  d >.Cgr <. C ,  D >. ) )  /\  ( ( c  Btwn  <. A , 
b >.  /\  <. c ,  b >.Cgr <. C ,  B >. )  /\  ( d 
Btwn  <. A ,  b
>.  /\  <. d ,  b
>.Cgr <. D ,  B >. ) ) )  /\  ( E  Btwn  <. C , 
c >.  /\  E  Btwn  <. D ,  d >. ) ) )  ->  <. E ,  C >.Cgr <. E ,  c
>. )
6647, 50, 65syl2an 463 . . . . . . . . . . . . 13  |-  ( ( ( ( N  e.  NN  /\  A  e.  ( EE `  N
)  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE
`  N )  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N
) )  /\  (
d  e.  ( EE
`  N )  /\  b  e.  ( EE `  N )  /\  E  e.  ( EE `  N
) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N )  /\  R  e.  ( EE `  N
) ) )  /\  ( ( ( ( A  =/=  B  /\  B  =/=  C  /\  C  =/=  c )  /\  ( B  Btwn  <. A ,  C >.  /\  B  Btwn  <. A ,  D >. ) )  /\  ( ( D  Btwn  <. A ,  c >.  /\ 
<. D ,  c >.Cgr <. C ,  D >. )  /\  ( C  Btwn  <. A ,  d >.  /\ 
<. C ,  d >.Cgr <. C ,  D >. ) )  /\  ( ( c  Btwn  <. A , 
b >.  /\  <. c ,  b >.Cgr <. C ,  B >. )  /\  ( d 
Btwn  <. A ,  b
>.  /\  <. d ,  b
>.Cgr <. D ,  B >. ) ) )  /\  ( ( E  Btwn  <. C ,  c >.  /\  E  Btwn  <. D , 
d >. )  /\  (
( C  Btwn  <. c ,  P >.  /\  <. C ,  P >.Cgr <. C ,  d
>. )  /\  ( C  Btwn  <. d ,  R >.  /\  <. C ,  R >.Cgr
<. C ,  E >. )  /\  ( R  Btwn  <. P ,  Q >.  /\ 
<. R ,  Q >.Cgr <. R ,  P >. ) ) ) ) )  ->  <. E ,  C >.Cgr
<. E ,  c >.
)
67 opeq2 3797 . . . . . . . . . . . . . . . . . . 19  |-  ( R  =  C  ->  <. C ,  R >.  =  <. C ,  C >. )
6867breq1d 4033 . . . . . . . . . . . . . . . . . 18  |-  ( R  =  C  ->  ( <. C ,  R >.Cgr <. C ,  E >.  <->  <. C ,  C >.Cgr <. C ,  E >. ) )
6968anbi1d 685 . . . . . . . . . . . . . . . . 17  |-  ( R  =  C  ->  (
( <. C ,  R >.Cgr
<. C ,  E >.  /\ 
<. E ,  C >.Cgr <. E ,  c >. )  <-> 
( <. C ,  C >.Cgr
<. C ,  E >.  /\ 
<. E ,  C >.Cgr <. E ,  c >. ) ) )
7069biimpac 472 . . . . . . . . . . . . . . . 16  |-  ( ( ( <. C ,  R >.Cgr
<. C ,  E >.  /\ 
<. E ,  C >.Cgr <. E ,  c >. )  /\  R  =  C )  ->  ( <. C ,  C >.Cgr <. C ,  E >.  /\  <. E ,  C >.Cgr <. E ,  c
>. ) )
71 simp2r3 1059 . . . . . . . . . . . . . . . . . 18  |-  ( ( ( N  e.  NN  /\  A  e.  ( EE
`  N )  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE `  N
)  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N ) )  /\  ( d  e.  ( EE `  N )  /\  b  e.  ( EE `  N
)  /\  E  e.  ( EE `  N ) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N
)  /\  R  e.  ( EE `  N ) ) )  ->  E  e.  ( EE `  N
) )
72 cgrid2 24626 . . . . . . . . . . . . . . . . . 18  |-  ( ( N  e.  NN  /\  ( C  e.  ( EE `  N )  /\  C  e.  ( EE `  N )  /\  E  e.  ( EE `  N
) ) )  -> 
( <. C ,  C >.Cgr
<. C ,  E >.  ->  C  =  E )
)
731, 2, 2, 71, 72syl13anc 1184 . . . . . . . . . . . . . . . . 17  |-  ( ( ( N  e.  NN  /\  A  e.  ( EE
`  N )  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE `  N
)  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N ) )  /\  ( d  e.  ( EE `  N )  /\  b  e.  ( EE `  N
)  /\  E  e.  ( EE `  N ) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N
)  /\  R  e.  ( EE `  N ) ) )  ->  ( <. C ,  C >.Cgr <. C ,  E >.  ->  C  =  E )
)
74 opeq1 3796 . . . . . . . . . . . . . . . . . . . 20  |-  ( C  =  E  ->  <. C ,  C >.  =  <. E ,  C >. )
75 opeq1 3796 . . . . . . . . . . . . . . . . . . . 20  |-  ( C  =  E  ->  <. C , 
c >.  =  <. E , 
c >. )
7674, 75breq12d 4036 . . . . . . . . . . . . . . . . . . 19  |-  ( C  =  E  ->  ( <. C ,  C >.Cgr <. C ,  c >.  <->  <. E ,  C >.Cgr <. E , 
c >. ) )
7776biimpar 471 . . . . . . . . . . . . . . . . . 18  |-  ( ( C  =  E  /\  <. E ,  C >.Cgr <. E ,  c >. )  ->  <. C ,  C >.Cgr
<. C ,  c >.
)
78 cgrid2 24626 . . . . . . . . . . . . . . . . . . 19  |-  ( ( N  e.  NN  /\  ( C  e.  ( EE `  N )  /\  C  e.  ( EE `  N )  /\  c  e.  ( EE `  N
) ) )  -> 
( <. C ,  C >.Cgr
<. C ,  c >.  ->  C  =  c ) )
791, 2, 2, 3, 78syl13anc 1184 . . . . . . . . . . . . . . . . . 18  |-  ( ( ( N  e.  NN  /\  A  e.  ( EE
`  N )  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE `  N
)  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N ) )  /\  ( d  e.  ( EE `  N )  /\  b  e.  ( EE `  N
)  /\  E  e.  ( EE `  N ) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N
)  /\  R  e.  ( EE `  N ) ) )  ->  ( <. C ,  C >.Cgr <. C ,  c >.  ->  C  =  c )
)
8077, 79syl5 28 . . . . . . . . . . . . . . . . 17  |-  ( ( ( N  e.  NN  /\  A  e.  ( EE
`  N )  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE `  N
)  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N ) )  /\  ( d  e.  ( EE `  N )  /\  b  e.  ( EE `  N
)  /\  E  e.  ( EE `  N ) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N
)  /\  R  e.  ( EE `  N ) ) )  ->  (
( C  =  E  /\  <. E ,  C >.Cgr
<. E ,  c >.
)  ->  C  =  c ) )
8173, 80syland 467 . . . . . . . . . . . . . . . 16  |-  ( ( ( N  e.  NN  /\  A  e.  ( EE
`  N )  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE `  N
)  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N ) )  /\  ( d  e.  ( EE `  N )  /\  b  e.  ( EE `  N
)  /\  E  e.  ( EE `  N ) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N
)  /\  R  e.  ( EE `  N ) ) )  ->  (
( <. C ,  C >.Cgr
<. C ,  E >.  /\ 
<. E ,  C >.Cgr <. E ,  c >. )  ->  C  =  c ) )
8270, 81syl5 28 . . . . . . . . . . . . . . 15  |-  ( ( ( N  e.  NN  /\  A  e.  ( EE
`  N )  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE `  N
)  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N ) )  /\  ( d  e.  ( EE `  N )  /\  b  e.  ( EE `  N
)  /\  E  e.  ( EE `  N ) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N
)  /\  R  e.  ( EE `  N ) ) )  ->  (
( ( <. C ,  R >.Cgr <. C ,  E >.  /\  <. E ,  C >.Cgr
<. E ,  c >.
)  /\  R  =  C )  ->  C  =  c ) )
8382exp3a 425 . . . . . . . . . . . . . 14  |-  ( ( ( N  e.  NN  /\  A  e.  ( EE
`  N )  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE `  N
)  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N ) )  /\  ( d  e.  ( EE `  N )  /\  b  e.  ( EE `  N
)  /\  E  e.  ( EE `  N ) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N
)  /\  R  e.  ( EE `  N ) ) )  ->  (
( <. C ,  R >.Cgr
<. C ,  E >.  /\ 
<. E ,  C >.Cgr <. E ,  c >. )  ->  ( R  =  C  ->  C  =  c ) ) )
8483adantr 451 . . . . . . . . . . . . 13  |-  ( ( ( ( N  e.  NN  /\  A  e.  ( EE `  N
)  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE
`  N )  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N
) )  /\  (
d  e.  ( EE
`  N )  /\  b  e.  ( EE `  N )  /\  E  e.  ( EE `  N
) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N )  /\  R  e.  ( EE `  N
) ) )  /\  ( ( ( ( A  =/=  B  /\  B  =/=  C  /\  C  =/=  c )  /\  ( B  Btwn  <. A ,  C >.  /\  B  Btwn  <. A ,  D >. ) )  /\  ( ( D  Btwn  <. A ,  c >.  /\ 
<. D ,  c >.Cgr <. C ,  D >. )  /\  ( C  Btwn  <. A ,  d >.  /\ 
<. C ,  d >.Cgr <. C ,  D >. ) )  /\  ( ( c  Btwn  <. A , 
b >.  /\  <. c ,  b >.Cgr <. C ,  B >. )  /\  ( d 
Btwn  <. A ,  b
>.  /\  <. d ,  b
>.Cgr <. D ,  B >. ) ) )  /\  ( ( E  Btwn  <. C ,  c >.  /\  E  Btwn  <. D , 
d >. )  /\  (
( C  Btwn  <. c ,  P >.  /\  <. C ,  P >.Cgr <. C ,  d
>. )  /\  ( C  Btwn  <. d ,  R >.  /\  <. C ,  R >.Cgr
<. C ,  E >. )  /\  ( R  Btwn  <. P ,  Q >.  /\ 
<. R ,  Q >.Cgr <. R ,  P >. ) ) ) ) )  ->  ( ( <. C ,  R >.Cgr <. C ,  E >.  /\ 
<. E ,  C >.Cgr <. E ,  c >. )  ->  ( R  =  C  ->  C  =  c ) ) )
8564, 66, 84mp2and 660 . . . . . . . . . . . 12  |-  ( ( ( ( N  e.  NN  /\  A  e.  ( EE `  N
)  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE
`  N )  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N
) )  /\  (
d  e.  ( EE
`  N )  /\  b  e.  ( EE `  N )  /\  E  e.  ( EE `  N
) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N )  /\  R  e.  ( EE `  N
) ) )  /\  ( ( ( ( A  =/=  B  /\  B  =/=  C  /\  C  =/=  c )  /\  ( B  Btwn  <. A ,  C >.  /\  B  Btwn  <. A ,  D >. ) )  /\  ( ( D  Btwn  <. A ,  c >.  /\ 
<. D ,  c >.Cgr <. C ,  D >. )  /\  ( C  Btwn  <. A ,  d >.  /\ 
<. C ,  d >.Cgr <. C ,  D >. ) )  /\  ( ( c  Btwn  <. A , 
b >.  /\  <. c ,  b >.Cgr <. C ,  B >. )  /\  ( d 
Btwn  <. A ,  b
>.  /\  <. d ,  b
>.Cgr <. D ,  B >. ) ) )  /\  ( ( E  Btwn  <. C ,  c >.  /\  E  Btwn  <. D , 
d >. )  /\  (
( C  Btwn  <. c ,  P >.  /\  <. C ,  P >.Cgr <. C ,  d
>. )  /\  ( C  Btwn  <. d ,  R >.  /\  <. C ,  R >.Cgr
<. C ,  E >. )  /\  ( R  Btwn  <. P ,  Q >.  /\ 
<. R ,  Q >.Cgr <. R ,  P >. ) ) ) ) )  ->  ( R  =  C  ->  C  =  c ) )
8685necon3d 2484 . . . . . . . . . . 11  |-  ( ( ( ( N  e.  NN  /\  A  e.  ( EE `  N
)  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE
`  N )  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N
) )  /\  (
d  e.  ( EE
`  N )  /\  b  e.  ( EE `  N )  /\  E  e.  ( EE `  N
) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N )  /\  R  e.  ( EE `  N
) ) )  /\  ( ( ( ( A  =/=  B  /\  B  =/=  C  /\  C  =/=  c )  /\  ( B  Btwn  <. A ,  C >.  /\  B  Btwn  <. A ,  D >. ) )  /\  ( ( D  Btwn  <. A ,  c >.  /\ 
<. D ,  c >.Cgr <. C ,  D >. )  /\  ( C  Btwn  <. A ,  d >.  /\ 
<. C ,  d >.Cgr <. C ,  D >. ) )  /\  ( ( c  Btwn  <. A , 
b >.  /\  <. c ,  b >.Cgr <. C ,  B >. )  /\  ( d 
Btwn  <. A ,  b
>.  /\  <. d ,  b
>.Cgr <. D ,  B >. ) ) )  /\  ( ( E  Btwn  <. C ,  c >.  /\  E  Btwn  <. D , 
d >. )  /\  (
( C  Btwn  <. c ,  P >.  /\  <. C ,  P >.Cgr <. C ,  d
>. )  /\  ( C  Btwn  <. d ,  R >.  /\  <. C ,  R >.Cgr
<. C ,  E >. )  /\  ( R  Btwn  <. P ,  Q >.  /\ 
<. R ,  Q >.Cgr <. R ,  P >. ) ) ) ) )  ->  ( C  =/=  c  ->  R  =/=  C ) )
877, 86mpd 14 . . . . . . . . . 10  |-  ( ( ( ( N  e.  NN  /\  A  e.  ( EE `  N
)  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE
`  N )  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N
) )  /\  (
d  e.  ( EE
`  N )  /\  b  e.  ( EE `  N )  /\  E  e.  ( EE `  N
) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N )  /\  R  e.  ( EE `  N
) ) )  /\  ( ( ( ( A  =/=  B  /\  B  =/=  C  /\  C  =/=  c )  /\  ( B  Btwn  <. A ,  C >.  /\  B  Btwn  <. A ,  D >. ) )  /\  ( ( D  Btwn  <. A ,  c >.  /\ 
<. D ,  c >.Cgr <. C ,  D >. )  /\  ( C  Btwn  <. A ,  d >.  /\ 
<. C ,  d >.Cgr <. C ,  D >. ) )  /\  ( ( c  Btwn  <. A , 
b >.  /\  <. c ,  b >.Cgr <. C ,  B >. )  /\  ( d 
Btwn  <. A ,  b
>.  /\  <. d ,  b
>.Cgr <. D ,  B >. ) ) )  /\  ( ( E  Btwn  <. C ,  c >.  /\  E  Btwn  <. D , 
d >. )  /\  (
( C  Btwn  <. c ,  P >.  /\  <. C ,  P >.Cgr <. C ,  d
>. )  /\  ( C  Btwn  <. d ,  R >.  /\  <. C ,  R >.Cgr
<. C ,  E >. )  /\  ( R  Btwn  <. P ,  Q >.  /\ 
<. R ,  Q >.Cgr <. R ,  P >. ) ) ) ) )  ->  R  =/=  C
)
88 simpr2l 1014 . . . . . . . . . . . 12  |-  ( ( ( E  Btwn  <. C , 
c >.  /\  E  Btwn  <. D ,  d >. )  /\  ( ( C 
Btwn  <. c ,  P >.  /\  <. C ,  P >.Cgr
<. C ,  d >.
)  /\  ( C  Btwn  <. d ,  R >.  /\  <. C ,  R >.Cgr
<. C ,  E >. )  /\  ( R  Btwn  <. P ,  Q >.  /\ 
<. R ,  Q >.Cgr <. R ,  P >. ) ) )  ->  C  Btwn  <. d ,  R >. )
8988ad2antll 709 . . . . . . . . . . 11  |-  ( ( ( ( N  e.  NN  /\  A  e.  ( EE `  N
)  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE
`  N )  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N
) )  /\  (
d  e.  ( EE
`  N )  /\  b  e.  ( EE `  N )  /\  E  e.  ( EE `  N
) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N )  /\  R  e.  ( EE `  N
) ) )  /\  ( ( ( ( A  =/=  B  /\  B  =/=  C  /\  C  =/=  c )  /\  ( B  Btwn  <. A ,  C >.  /\  B  Btwn  <. A ,  D >. ) )  /\  ( ( D  Btwn  <. A ,  c >.  /\ 
<. D ,  c >.Cgr <. C ,  D >. )  /\  ( C  Btwn  <. A ,  d >.  /\ 
<. C ,  d >.Cgr <. C ,  D >. ) )  /\  ( ( c  Btwn  <. A , 
b >.  /\  <. c ,  b >.Cgr <. C ,  B >. )  /\  ( d 
Btwn  <. A ,  b
>.  /\  <. d ,  b
>.Cgr <. D ,  B >. ) ) )  /\  ( ( E  Btwn  <. C ,  c >.  /\  E  Btwn  <. D , 
d >. )  /\  (
( C  Btwn  <. c ,  P >.  /\  <. C ,  P >.Cgr <. C ,  d
>. )  /\  ( C  Btwn  <. d ,  R >.  /\  <. C ,  R >.Cgr
<. C ,  E >. )  /\  ( R  Btwn  <. P ,  Q >.  /\ 
<. R ,  Q >.Cgr <. R ,  P >. ) ) ) ) )  ->  C  Btwn  <. d ,  R >. )
90 btwncolinear4 24695 . . . . . . . . . . . . 13  |-  ( ( N  e.  NN  /\  ( d  e.  ( EE `  N )  /\  R  e.  ( EE `  N )  /\  C  e.  ( EE `  N ) ) )  ->  ( C  Btwn  <. d ,  R >.  ->  R  Colinear  <. C , 
d >. ) )
911, 15, 62, 2, 90syl13anc 1184 . . . . . . . . . . . 12  |-  ( ( ( N  e.  NN  /\  A  e.  ( EE
`  N )  /\  B  e.  ( EE `  N ) )  /\  ( ( C  e.  ( EE `  N
)  /\  D  e.  ( EE `  N )  /\  c  e.  ( EE `  N ) )  /\  ( d  e.  ( EE `  N )  /\  b  e.  ( EE `  N
)  /\  E  e.  ( EE `  N ) ) )  /\  ( P  e.  ( EE `  N )  /\  Q  e.  ( EE `  N
)  /\  R  e.  ( EE `  N ) ) )  ->  ( C  Btwn  <. d ,  R >.  ->  R  Colinear  <. C , 
d >. ) )
9291adantr 451 . . . . . . . . . . 11  |-  ( ( ( ( N  e.  NN  /\  A  e.  ( EE