How do you test the series #Sigma (sqrt(n+2)-sqrtn)/n# from n is #[1,oo)# for convergence?

1 Answer
Andrea S.
Feb 5, 2017

The series:

#sum_(n=1)^oo (sqrt(n+2)-sqrt(n))/n#

is convergent.

Explanation:

Rationalize the numerator of #a_n#:

#a_n = (sqrt(n+2)-sqrt(n))/n = ((sqrt(n+2)-sqrt(n))/n)((sqrt(n+2)+sqrt(n))/(sqrt(n+2)+sqrt(n))) = (n+2-n)/(n(sqrt(n+2)+sqrt(n))) = 2/(n(sqrt(n+2)+sqrt(n)) #

Now if we decrease the denominator we obtain a sequence that is greater:

#a_n = 2/(n(sqrt(n+2)+sqrt(n))) < 2/(n(sqrt(n)+sqrt(n))) = 2/(2nsqrtn) =1/n^(3/2)#

We know that the series:

#sum_(n=1)^oo 1/n^(3/2)#

is convergent based on the p-series test, so the series:

#sum_(n=1)^oo (sqrt(n+2)-sqrt(n))/n#

is also convergent.

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