let P be POINT of BK-model-Plane; :: thesis: T2_to_BK (BK_to_T2 P) = P
consider p being Element of BK_model such that
A1: P = p and
A2: BK_to_T2 P = BK_to_REAL2 p by Def01;
consider u being non zero Element of (TOP-REAL 3) such that
A3: Dir u = p and
A4: u . 3 = 1 and
A5: BK_to_REAL2 p = |[(u . 1),(u . 2)]| by BKMODEL2:def 2;
reconsider Q = BK_to_T2 P as POINT of TarskiEuclid2Space ;
consider v being non zero Element of (TOP-REAL 3) such that
A6: T2_to_BK Q = Dir v and
A7: v `3 = 1 and
A8: Tn2TR Q = |[(v `1),(v `2)]| by A2, Def02;
( u . 1 = v `1 & u . 2 = v `2 ) by A8, A5, A2, FINSEQ_1:77;
then A9: ( u `1 = v `1 & u `2 = v `2 ) by EUCLID_5:def 1, EUCLID_5:def 2;
u = |[(u `1),(u `2),(u `3)]| by EUCLID_5:3
.= |[(v `1),(v `2),(v `3)]| by A4, A7, A9, EUCLID_5:def 3
.= v by EUCLID_5:3 ;
hence T2_to_BK (BK_to_T2 P) = P by A1, A6, A3; :: thesis: verum