assume not BK_model misses absolute ; :: thesis: contradiction
then consider x being object such that
A1: x in BK_model /\ absolute by XBOOLE_0:def 1;
A2: ( x in BK_model & x in absolute ) by A1, XBOOLE_0:def 4;
x in { P where P is Point of (ProjectiveSpace (TOP-REAL 3)) : for u being Element of (TOP-REAL 3) st not u is zero & P = Dir u holds
qfconic (1,1,(- 1),0,0,0,u) = 0 } by A2, PASCAL:def 2;
then consider P being Point of (ProjectiveSpace (TOP-REAL 3)) such that
A3: x = P and
A4: for u being Element of (TOP-REAL 3) st not u is zero & P = Dir u holds
qfconic (1,1,(- 1),0,0,0,u) = 0 ;
consider u being Element of (TOP-REAL 3) such that
A5: not u is zero and
A6: P = Dir u by ANPROJ_1:26;
consider Q being Point of (ProjectiveSpace (TOP-REAL 3)) such that
A7: x = Q and
A8: for u being Element of (TOP-REAL 3) st not u is zero & Q = Dir u holds
qfconic (1,1,(- 1),0,0,0,u) is negative by A2;
( qfconic (1,1,(- 1),0,0,0,u) = 0 & qfconic (1,1,(- 1),0,0,0,u) is negative ) by A3, A4, A5, A6, A7, A8;
hence contradiction ; :: thesis: verum