Prove barehanded (without using the corresponding result for limsup) that if a sequence {a_n} has a...

Exercise 1. Suppose (a_n) is a sequence and f : N --> N is a bijection....

Exercise 1. Suppose (a_n) is a sequence and f : N --> N is a bijection. Let (b_n) be the sequence where b_n = a_f(n) for all n contained in N. Prove that if a_n converges to L, then b_n also converges to L.

Prove that if a sequence converges to a limit x then very subsequence converges to x.

Prove that if a sequence converges to a limit x then very subsequence converges to x.

Prove the IVT theorem Prove: If f is continuous on [a,b] and f(a),f(b) have different signs...

Prove the IVT theorem Prove: If f is continuous on [a,b] and f(a),f(b) have different signs then there is an r ∈ (a,b) such that f(r) = 0. Using the claims: f is continuous on [a,b] there exists a left sequence (a_n) that is increasing and bounded and converges to r, and left decreasing sequence and bounded (b_n)=r. limf(a_n)= r= limf(b_n), and f(r)=0.

Prove: If x is a sequence of real numbers that converges to L, then any subsequence...

Prove: If x is a sequence of real numbers that converges to L, then any subsequence of x converges to L.

Prove that X is totally bounded if every sequence of X has a convergent subsequence. Please...

Prove that X is totally bounded if every sequence of X has a convergent subsequence. Please directly prove it without using any theorem on totally boundedness.

Let (an)∞n=1 be a monotone sequence. Let (ank )∞k=1 be a subsequence of (an). Prove that...

Let (an)∞n=1 be a monotone sequence. Let (ank )∞k=1 be a subsequence of (an). Prove that (an) converges iff (ank) converges. Also, prove that if the two sequences converge, their limits are the same.

Using the definition of convergence of a sequence, prove that the sequence converges to the proposed...

Using the definition of convergence of a sequence, prove that the sequence converges to the proposed limit. lim (as n goes to infinity) 1/(n^2) = 0

Prove that every bounded sequence has a convergent subsequence.

Prove that every bounded sequence has a convergent subsequence.

Suppose (an) is an increasing sequence of real numbers. Show, if (an) has a bounded subsequence,...

Suppose (an) is an increasing sequence of real numbers. Show, if (an) has a bounded subsequence, then (an) converges; and (an) diverges to infinity if and only if (an) has an unbounded subsequence.

Show that sequence {sn} converges if it is monotone and has a convergent subsequence.

Show that sequence {sn} converges if it is monotone and has a convergent subsequence.