How do you find the radius of convergence of the power series #Sigma x^n/(n!)^(1/n)# from #n=[1,oo)#?

1 Answer
Andrea S.
Feb 1, 2017

The series:

#sum_(n=1)^oo x^n/(n!)^(1/n)#

has radius of convergence #R=1#

Explanation:

We can apply the ratio test:

#abs(a_(n+1)/a_n) = (x^(n+1)/((n+1)!)^(1/n))/(x^n/(n!)^(1/n)) = abs(x^(n+1)/x^n (n!)^(1/n) / ((n+1)!)^(1/n)) = abs(x)/(n+1)^(1/n)#

now consider:

# lim_(n->oo) (n+1)^(1/n) = lim_(n->oo) (e^(ln(n+1)))^(1/n)= lim_(n->oo) e^(ln(n+1)/n)#

As #e^x# is continuous:

# lim_(n->oo) (n+1)^(1/n) = e^(lim_(n->oo) (ln(n+1)/n)) = e^0 = 1#

So we have:

#lim_(n->oo) abs(a_(n+1)/a_n) = abs(x)#

which means that the series is absolutely convergent for #abs(x)<1# and divergent for #abs(x) > 1#, that is the radius of convergence is #R=1#

Related questions
See all questions in Strategies to Test an Infinite Series for Convergence
Impact of this question
11797 views around the world
You can reuse this answer
Creative Commons License