let A be non empty set ; :: thesis: for x being bound_QC-variable
for v being Element of Valuations_in A
for p being Element of CQC-WFF
for J being interpretation of A holds
( J,v |= All x,p iff (FOR_ALL x,(Valid p,J)) . v = TRUE )
let x be bound_QC-variable; :: thesis: for v being Element of Valuations_in A
for p being Element of CQC-WFF
for J being interpretation of A holds
( J,v |= All x,p iff (FOR_ALL x,(Valid p,J)) . v = TRUE )
let v be Element of Valuations_in A; :: thesis: for p being Element of CQC-WFF
for J being interpretation of A holds
( J,v |= All x,p iff (FOR_ALL x,(Valid p,J)) . v = TRUE )
let p be Element of CQC-WFF ; :: thesis: for J being interpretation of A holds
( J,v |= All x,p iff (FOR_ALL x,(Valid p,J)) . v = TRUE )
let J be interpretation of A; :: thesis: ( J,v |= All x,p iff (FOR_ALL x,(Valid p,J)) . v = TRUE )
hence ( J,v |= All x,p iff (FOR_ALL x,(Valid p,J)) . v = TRUE ) by A1; :: thesis: verum