Let A and B be nonempty sets. Prove that if f is an injection, then f(A...

Let A and B be nonempty sets. Prove that if f is an injection, then f(A...

Let A and B be nonempty sets. Prove that if f is an injection, then f(A − B) = f(A) − f(B)

Let A be open and nonempty and f : A → R. Prove that f is...

Let A be open and nonempty and f : A → R. Prove that f is continuous at a if and only if f is both upper and lower semicontinuous at a.

Let A be a nonempty set. Prove that the set S(A) = {f : A →...

Let A be a nonempty set. Prove that the set S(A) = {f : A → A | f is one-to-one and onto } is a group under the operation of function composition.

Let A, B, C be sets and let f : A → B and g :...

Let A, B, C be sets and let f : A → B and g : f (A) → C be one-to-one functions. Prove that their composition g ◦ f , defined by g ◦ f (x) = g(f (x)), is also one-to-one.

Let A⊆R be a nonempty set, which is bounded above. Let B={a-5:a∈ A}. Prove that sup(B)=sup(A)-5

Let A⊆R be a nonempty set, which is bounded above. Let B={a-5:a∈ A}. Prove that sup(B)=sup(A)-5

Suppose A and B are nonempty sets of real numbers, and that for every x ∈...

Suppose A and B are nonempty sets of real numbers, and that for every x ∈ A, and every y ∈ B, we have x < y. Prove that A ≤ inf(B).

Let A and B be sets. Prove that A ⊆ B if and only if A...

Let A and B be sets. Prove that A ⊆ B if and only if A − B = ∅.

Let A and B be sets. Prove that (A∪B)\(A∩B) = (A\B)∪(B\A)

Let A and B be sets. Prove that (A∪B)\(A∩B) = (A\B)∪(B\A)

Suppose S and T are nonempty sets of real numbers such that for each x ∈...

Suppose S and T are nonempty sets of real numbers such that for each x ∈ s and y ∈ T we have x<y. a) Prove that sup S and int T exist b) Let M = sup S and N= inf T. Prove that M<=N

let A be a nonempty subset of R that is bounded below. Prove that inf A...

let A be a nonempty subset of R that is bounded below. Prove that inf A = -sup{-a: a in A}