let R be Ring; :: thesis: for V being RightMod of R
for u, v being Vector of V
for W being Submodule of V holds
( u in W iff v + W = (v - u) + W )
let V be RightMod of R; :: thesis: for u, v being Vector of V
for W being Submodule of V holds
( u in W iff v + W = (v - u) + W )
let u, v be Vector of V; :: thesis: for W being Submodule of V holds
( u in W iff v + W = (v - u) + W )
let W be Submodule of V; :: thesis: ( u in W iff v + W = (v - u) + W )
A1: ( ( - u in W implies v + W = (v + (- u)) + W ) & ( v + W = (v + (- u)) + W implies - u in W ) & v + (- u) = v - u ) by Th66;
( - u in W implies u in W )
proof
assume - u in W ; :: thesis: u in W
then - (- u) in W by Th30;
hence u in W by RLVECT_1:30; :: thesis: verum
end;
hence ( u in W iff v + W = (v - u) + W ) by A1, Th30; :: thesis: verum