
 👍 0
 👎 0
posted by Reiny
Respond to this Question
Similar Questions

Algebra 2
I need steps on how to complete this please i am so confused and lost. :( Consider the infinite geometric series x e n=1 4(1/3) n1. In this image, the lower limit of the summation notation is "n=1". a. Write the first four terms
asked by Sammy on March 10, 2015 
math
for what values of x does the series converge absolutely and for what values does it converge conditionally? from n=0 to infinity an=(1)^n(4x+1)^n
asked by sarah on December 3, 2008 
mAtHS
The series (4x3)+(4x3)^2+(4x3)^3................................is given for which values of X will the series converge??
asked by OwamIII on January 28, 2014 
mAtHS
The series (4x3)+(4x3)^2+(4x3)^3................................is given for which values of X will the series converge??
asked by OwamIII on January 28, 2014 
Calc II
Use the comparison or limit comparison test to decide if the following series converge. Series from n=1 to infinity of (4sin n) / ((n^2)+1) and the series from n=1 to infinity of (4sin n) / ((2^n) +1). For each series which
asked by Lauren on November 7, 2012 
Calculus
For what values of k does the series ∑n=1 to infinity (11/(2k^2 + 3))^n converge? I think this is k < 2 and k > 2.
asked by Anonymous on February 15, 2018 
math
how is this series 3+ 9/4 +27/16 +81/64... is converge to 12? i represent the series as 3^(n+1)/4^n n starts from 0 to infinity, is this correct formula
asked by eng on July 16, 2010 
Series
For what values of p>0 does the series a) Riemann Sum [n=1 to infinity] 1/ [n(ln n)^p] converge and for what values does it diverge?
asked by Janice on November 11, 2006 
Calc
Does 1/ln(x+1) converge or diverge? I've tried the nth term test, limit comparison test, and integral test. All I get is inconclusive. The other tests I have (geometric series, pseries, telescoping series, alternating series, and
asked by Mischa on March 22, 2007 
Calculus
For what values of p>0 does the series Riemann Sum [n=1 to infinity] 1/ [n(ln n) (ln(ln n))^p] converge and for what values does it diverge? You need to let the summation start at n = 3 to avoid the singularity at n = 1 (although
asked by Janice on November 13, 2006