Prove that (n + 1)! < nn whenever n > 3. Conclude that lim as n...

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.

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.

7.5. Prove the following:(a) lim n→∞ an = a = ⇒ lim n→∞ |an|=|a|. (b) limn→∞an=0...

7.5. Prove the following:(a) lim n→∞ an = a = ⇒ lim n→∞ |an|=|a|. (b) limn→∞an=0 ⇐ ⇒ lim n→∞|an|=0

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! ]

1. if lim x->infinity+ (5+2X)/(9-6X)=?? 2. what is the value for the same equation if lim...

1. if lim x->infinity+ (5+2X)/(9-6X)=?? 2. what is the value for the same equation if lim x approaches to negative infinity??? 3. if lim x approaches to positive infinity then evaluate the equation (4X+7)/(5X^2-3X+10) 4. What would be the value of the above mentioned equation is lim x approaches to negative infinity

Prove that a sequence (un such that n>=1) absolutely converges if the limit as n approaches...

Prove that a sequence (un such that n>=1) absolutely converges if the limit as n approaches infinity of n2un=L>0

Prove directly from the definition of the limit (b) lim (n−2)/(n+12)=1 c) lim n√8 = 1....

Prove directly from the definition of the limit (b) lim (n−2)/(n+12)=1 c) lim n√8 = 1. (Hint: recall the formula for x^n − 1).

Let Nn be the integer whose decimal expansion consists of n consecutive ones. Prove that (Nn,Nm)...

Let Nn be the integer whose decimal expansion consists of n consecutive ones. Prove that (Nn,Nm) = N(n,m). Example: N3= 111 N6=111111. please prove by induction and using a general case

Prove, using mathematical induction, that (1 + 1/ 2)^ n ≥ 1 + n /2 ,whenever...

Prove, using mathematical induction, that (1 + 1/ 2)^ n ≥ 1 + n /2 ,whenever n is a positive integer.

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