let AS be AffinSpace; for K, M, N being Subset of AS st K,M,N is_coplanar holds
( K,N,M is_coplanar & M,K,N is_coplanar & M,N,K is_coplanar & N,K,M is_coplanar & N,M,K is_coplanar )
let K, M, N be Subset of AS; ( K,M,N is_coplanar implies ( K,N,M is_coplanar & M,K,N is_coplanar & M,N,K is_coplanar & N,K,M is_coplanar & N,M,K is_coplanar ) )
assume
K,M,N is_coplanar
; ( K,N,M is_coplanar & M,K,N is_coplanar & M,N,K is_coplanar & N,K,M is_coplanar & N,M,K is_coplanar )
then
ex X being Subset of AS st
( K c= X & M c= X & N c= X & X is being_plane )
by Def5;
hence
( K,N,M is_coplanar & M,K,N is_coplanar & M,N,K is_coplanar & N,K,M is_coplanar & N,M,K is_coplanar )
by Def5; verum