let V be RealUnitarySpace; :: thesis: for W1, W2 being Subspace of V holds
( W1 + W2 = UNITSTR(# the carrier of V, the ZeroF of V, the U7 of V, the Mult of V, the scalar of V #) iff for v being VECTOR of V ex v1, v2 being VECTOR of V st
( v1 in W1 & v2 in W2 & v = v1 + v2 ) )
let W1, W2 be Subspace of V; :: thesis: ( W1 + W2 = UNITSTR(# the carrier of V, the ZeroF of V, the U7 of V, the Mult of V, the scalar of V #) iff for v being VECTOR of V ex v1, v2 being VECTOR of V st
( v1 in W1 & v2 in W2 & v = v1 + v2 ) )
thus ( W1 + W2 = UNITSTR(# the carrier of V, the ZeroF of V, the U7 of V, the Mult of V, the scalar of V #) implies for v being VECTOR of V ex v1, v2 being VECTOR of V st
( v1 in W1 & v2 in W2 & v = v1 + v2 ) ) by RLVECT_1:1, Th1; :: thesis: ( ( for v being VECTOR of V ex v1, v2 being VECTOR of V st
( v1 in W1 & v2 in W2 & v = v1 + v2 ) ) implies W1 + W2 = UNITSTR(# the carrier of V, the ZeroF of V, the U7 of V, the Mult of V, the scalar of V #) )
assume A1: for v being VECTOR of V ex v1, v2 being VECTOR of V st
( v1 in W1 & v2 in W2 & v = v1 + v2 ) ; :: thesis: W1 + W2 = UNITSTR(# the carrier of V, the ZeroF of V, the U7 of V, the Mult of V, the scalar of V #)
now :: thesis: for u being VECTOR of V holds u in W1 + W2
let u be VECTOR of V; :: thesis: u in W1 + W2
ex v1, v2 being VECTOR of V st
( v1 in W1 & v2 in W2 & u = v1 + v2 ) by A1;
hence u in W1 + W2 by Th1; :: thesis: verum
end;
hence W1 + W2 = UNITSTR(# the carrier of V, the ZeroF of V, the U7 of V, the Mult of V, the scalar of V #) by Lm12; :: thesis: verum