set Y = (D,phi) AddFormulaTo X;
set psi = xnot phi;
defpred S1[] means xnot phi is X,D -provable ;
( ( not S1[] implies (D,phi) AddFormulaTo X = X \/ {phi} ) & ( S1[] implies (D,phi) AddFormulaTo X = X \/ {(xnot phi)} ) )
by Def73;
then
( X null {phi} c= (D,phi) AddFormulaTo X or X null {(xnot phi)} c= (D,phi) AddFormulaTo X )
;
hence
for b1 being set st b1 = X \ ((D,phi) AddFormulaTo X) holds
b1 is empty
; verum