1. Find the limit as n goes to infinity of xn over n factoiral.

Let {xn} be a non-decreasing sequence and assume that xn goes to x as n goes...

Let {xn} be a non-decreasing sequence and assume that xn goes to x as n goes to infinity. Show that for all, n in N (naturals), xn < x. Formulate and prove an analogous result for a non-increasing sequences.

If lim Xn as n->infinity = L and lim Yn as n->infinity = M, and L<M...

If lim Xn as n->infinity = L and lim Yn as n->infinity = M, and L<M then there exists N in naturals such that Xn<Yn for all n>=N

1a) Evaluate the limit as x goes to infinity using l'hopitals rule (x^-1/3)/sin(1/x) 1b) Evaluate the...

1a) Evaluate the limit as x goes to infinity using l'hopitals rule (x^-1/3)/sin(1/x) 1b) Evaluate the improper integral (if convergent find it's value) (secx-tanx)dx where a= 0 and b=pi/2

limit to infinity: (n!)/(n^n) using squeeze theorem explained

limit to infinity: (n!)/(n^n) using squeeze theorem explained

I'm trying to solve for sequence and series question. The sequence goes from n=2 to infinity...

I'm trying to solve for sequence and series question. The sequence goes from n=2 to infinity and an = 1/n(ln(n))4/3. I've been trying to figure out using limit form of comparison test. However, when I used 1/n or 1/ln(n) as ab I get convergence and 1/n and 1/ln(n) are both divergent by proof.

Calculate the limit if n approaches Infinity: lim [(5cosn+3sinn+lnn^7)/n - 1/(7^n) - (100^n)/n! ]

Calculate the limit if n approaches Infinity: lim [(5cosn+3sinn+lnn^7)/n - 1/(7^n) - (100^n)/n! ]

Prove that if (xn) is a sequence of real numbers, then lim sup|xn| = 0 as...

Prove that if (xn) is a sequence of real numbers, then lim sup|xn| = 0 as n approaches infinity. if and only if the limit of (xN) exists and xn approaches 0.

Define a sequence (xn)n≥1 recursively by x1 = 1 and xn = 1 + 1 /(xn−1)...

Define a sequence (xn)n≥1 recursively by x1 = 1 and xn = 1 + 1 /(xn−1) for n > 0. Prove that limn→∞ xn = x exists and find its value.

using theorem "the sequential characterization of limit" show lim(c/x^2) =0 as x goes to infinity for...

using theorem "the sequential characterization of limit" show lim(c/x^2) =0 as x goes to infinity for all c in R.

Define a sequence (xn)n≥1 recursively by x1 = 1, x2 = 2, and xn = ((xn−1)+(xn−2))/...

Define a sequence (xn)n≥1 recursively by x1 = 1, x2 = 2, and xn = ((xn−1)+(xn−2))/ 2 for n > 2. Prove that limn→∞ xn = x exists and find its value.