Let Y be a subspace of X and let S be a subset of Y. Show...

Determine if the subset W={[x y]∈R2∣ x+y ≥0} is a subspace of R2.

Determine if the subset W={[x y]∈R2∣ x+y ≥0} is a subspace of R2.

For any subset S ⊂ V show that span(S) is the smallest subspace of V containing...

For any subset S ⊂ V show that span(S) is the smallest subspace of V containing S. (Hint: This is asking you to prove several things. Look over the proof that U1+. . .+Um is the smallest subspace containing U1, . . . , Um.)

For a nonempty subset S of a vector space V , define span(S) as the set...

For a nonempty subset S of a vector space V , define span(S) as the set of all linear combinations of vectors in S. (a) Prove that span(S) is a subspace of V . (b) Prove that span(S) is the intersection of all subspaces that contain S, and con- clude that span(S) is the smallest subspace containing S. Hint: let W be the intersection of all subspaces containing S and show W = span(S). (c) What is the smallest subspace...

Let X, Y be metric spaces, with Y complete. Let S ⊂ X and let f...

Let X, Y be metric spaces, with Y complete. Let S ⊂ X and let f : S → Y be uniformly continuous. (a) Suppose p ∈ S closure and (pn) is a sequence in S with pn → p. Show that (f(pn)) converges in y to some point yp.

Suppose K is a nonempty compact subset of a metric space X and x∈X. Show, there...

Suppose K is a nonempty compact subset of a metric space X and x∈X. Show, there is a nearest point p∈K to x; that is, there is a point p∈K such that, for all other q∈K, d(p,x)≤d(q,x). [Suggestion: As a start, let S={d(x,y):y∈K} and show there is a sequence (qn) from K such that the numerical sequence (d(x,qn)) converges to inf(S).] Let X=R^2 and T={(x,y):x^2+y^2=1}. Show, there is a point z∈X and distinct points a,b∈T that are nearest points to...

Let ? = ?2(?) and ? be the subset of ? consisting of functions satisfying the...

Let ? = ?2(?) and ? be the subset of ? consisting of functions satisfying the differential equation ?′′ + 3?′ − 2? = 0. Show that S is a subspace of ?.

Let X be a subset of the integers from 1 to 1997 such that |X|≥34. Show...

Let X be a subset of the integers from 1 to 1997 such that |X|≥34. Show that there exists distinct a,b,c∈X and distinct x,y,z∈X such that a+b+c=x+y+z and {a,b,c}≠{x,y,z}.

Show that a subset Y of X is closed if Y is complete.

Show that a subset Y of X is closed if Y is complete.

Let W be the subset of R^R consisting of all functions of the form x ?→a...

Let W be the subset of R^R consisting of all functions of the form x ?→a · cos(x − b), for real numbers a and b. Show that W is a subspace of R^R and find its dimension.

let A be a subset of Rn and let x be a point in Rn. Show...

let A be a subset of Rn and let x be a point in Rn. Show that x is a limit point of A if and only if every open ball about x contains a point of A that is not equal to x