Prove that the sequence cos(nπ/3) does not converge. let epsilon>0 find a N so that |An|...

Prove that the sequence cos(nπ/3) does not converge.

Prove that the sequence cos(nπ/3) does not converge.

Let ( xn) and (yn) be sequence with xn converge to x and yn converge to...

Let ( xn) and (yn) be sequence with xn converge to x and yn converge to y. prove that for dn=((xn-x)^2+(yn-y)^2)^(1/2), dn converge to 0.

let f(x) = 3x3 - 2 and let epsilon>0 be given Find a delta so that...

let f(x) = 3x3 - 2 and let epsilon>0 be given Find a delta so that |x -1 |<=delta implies |f(x) -1|<=epsilon

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.

Prove that if for epsilon >0 there exists a positive integer n such that for all...

Prove that if for epsilon >0 there exists a positive integer n such that for all n>N we have p_n is an element of (x+(-epsilon),x+epsilon) then p_1,p_2, ... p_n converges to x.

Prove that {n^3} does not converge to any number. please give me detailed proof, thanks

Prove that {n^3} does not converge to any number. please give me detailed proof, thanks

Mathematical Real Analysis Convergence Sequence Conception Question: By the definition: for all epsilon >0 there exists...

Mathematical Real Analysis Convergence Sequence Conception Question: By the definition: for all epsilon >0 there exists a N such that for all n>N absolute an-a < epsilon Question: assume bn ----->b and b is not 0.  prove that lim n to infinity 1/ bn = 1/ b . Please Tell me why here we need to have N1 and N2 and Find the Max(N1,N2) but other example we don't. Solve the question step by step as well

Find an example of a sequence, {xn}, that does not converge, but has a convergent subsequence....

Find an example of a sequence, {xn}, that does not converge, but has a convergent subsequence. Explain why {xn} (the divergent sequence) must have an infinite number of convergent subsequences.

3. Prove by contrapositive: Let n ∈ N. If n^3−5n−10>0,then n ≥ 3. 4. Prove: Letx∈Z....

3. Prove by contrapositive: Let n ∈ N. If n^3−5n−10>0,then n ≥ 3. 4. Prove: Letx∈Z. Then5x−11 is even if and only if x is odd. 4. Prove: Letx∈Z. Then 5x−11 is even if and only if x is odd.

Find a sequence of positive Lebesgue integrable functions on [0,1] which do not converge pointwise (it...

Find a sequence of positive Lebesgue integrable functions on [0,1] which do not converge pointwise (it means that there is no point x0 so that fn(x0 ) is a convergent sequence) but its integrals do converge to zero.