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

Prove: Let x and y be bounded sequences such that xn ≤ yn for all n...

Prove: Let x and y be bounded sequences such that xn ≤ yn for all n ∈ N. Then lim supn→∞ xn ≤ lim supn→∞ yn and lim infn→∞ xn ≤ lim infn→∞ yn.

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.

Show that lim sup n→∞ (−xn) = −(lim inf n→∞ (xn).

Show that lim sup n→∞ (−xn) = −(lim inf n→∞ (xn).

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.

lim n to infinity 5^n+1/(n+1)! i knew i should use L hospital rule but how i...

lim n to infinity 5^n+1/(n+1)! i knew i should use L hospital rule but how i derivative the top and the bottom

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

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

Prove that lim n^k*x^n=0 as n approaches +infinity. Where -1<x<1 and k is in N.

Prove that lim n^k*x^n=0 as n approaches +infinity. Where -1<x<1 and k is in N.

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! ]

for the following series state whether the divergence test applies either state that lim n-> infinity...

for the following series state whether the divergence test applies either state that lim n-> infinity does not exist, or find n-> infinity approaches If test does not apply, state why 147. n=tan (n)

Let X1, X2, ..., Xn be a random sample (of size n) from U(0,θ). Let Yn...

Let X1, X2, ..., Xn be a random sample (of size n) from U(0,θ). Let Yn be the maximum of X1, X2, ..., Xn. (a) Give the pdf of Yn. (b) Find the mean of Yn. (c) One estimator of θ that has been proposed is Yn. You may note from your answer to part (b) that Yn is a biased estimator of θ. However, cYn is unbiased for some constant c. Determine c. (d) Find the variance of cYn,...