The Root and Ratio TestsThe Root and Ratio Tests
Here we will discuss the most popular tests of convergence known for
series. They are to be used only on positive series.
The Root Test:
Then we have the following:
be a positive
series. Assume that
. 
, then the series
is convergent or;
, then the series is divergent or;
, then the series
may be convergent or it may be divergent. In other words, we do
not have a definite conclusion.
The Ratio Test:
Then we have the following:
be a positive
series such that 
for any 
. Assume that
. , then the series is convergent or;
, then the series is divergent or;
, then the series
may be convergent or it may be divergent. In other words, we do
not have a definite conclusion.
Remark: What do we mean when we say we do not have a definite conclusion? Simply that one may come up with series for which L=1
(in both tests) and they are convergent and other ones which are
divergent.
Example: Use the Ratio and Root Tests for the harmonic series
.
Answer: First, let us take care of the Ratio Test. We have
,
which clearly implies
.
Hence, we have L=1.
Next, we consider the Root Test. We have
.
Since
,
then we have
.
Again, we have L=1.
But, we know that 
is
convergent, if and only if, p >1.
Remark: Note that the ratio-test is very appropriate and
useful when the series has factorial terms.
Example: Discuss the convergence of
where a > 0.
Answer: Because of the factorial, we will use the Ratio Test. We have
.
Since
,
then the series 
is convergent.
Note that, in this case, we must have
for any a >0. Moreover, you may wonder what is the total sum? Using the Taylor-series one can show that
.
Example:Discuss the convergence of
.
Answer: Because of the factorial, we will use the Ratio Test. We have
.
Since
then the series 
is divergent.
For more examples, please click HERE.
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Mohamed A. Khamsi