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

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. let epsilon>0 find a N so that |An| < epsilon for n>N

prove that a sequence converges if and only if all subsequences converge to the same limit

prove that a sequence converges if and only if all subsequences converge to the same limit

Does the sequence (Cos2n/20n) converge or diverge?

Does the sequence (Cos2n/20n) converge or diverge?

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.

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

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.

1.- Prove the following: a.- Apply the definition of convergent sequence, Ratio Test or Squeeze Theorem...

1.- Prove the following: a.- Apply the definition of convergent sequence, Ratio Test or Squeeze Theorem to prove that a given sequence converges. b.- Use the Divergence Criterion for Sub-sequences to prove that a given sequence does not converge. Subject: Real Analysis

find the nth term of the following sequence, does it converge? {2/1, 6/10, 12/100, 60/1000....}

find the nth term of the following sequence, does it converge? {2/1, 6/10, 12/100, 60/1000....}

Use L’Hopital’s Rule to determine if the following sequences converge or diverge. If the sequence converges,...

Use L’Hopital’s Rule to determine if the following sequences converge or diverge. If the sequence converges, what does it converge to? (a) an = (n^2+3n+5)/(n^2+e^n) (b) bn = (sin(n −1 ))/( n−1) (c) cn = ln(n)/ √n

Show that if sequence (an) converges, then all the rearrangement of (an) converges, and converge to...

Show that if sequence (an) converges, then all the rearrangement of (an) converges, and converge to the same limit