let X be ComplexUnitarySpace; :: thesis: for w, x being Point of X
for r being Real holds
( w in Ball x,r iff ||.(x - w).|| < r )
let w, x be Point of X; :: thesis: for r being Real holds
( w in Ball x,r iff ||.(x - w).|| < r )
let r be Real; :: thesis: ( w in Ball x,r iff ||.(x - w).|| < r )
thus ( w in Ball x,r implies ||.(x - w).|| < r ) :: thesis: ( ||.(x - w).|| < r implies w in Ball x,r ) thus ( ||.(x - w).|| < r implies w in Ball x,r ) ; :: thesis: verum