14.3 The Comparison Tests

14.3 The Comparison Tests

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1. The Standard Comparison Test (SCT)

In Section 14.2 we introduced some series that were shown to converge or diverge. To determine the behavior (convergence or
divergence) of most of them, we algebraically manipulated the sequence of their partial sums, expressing the general nth
partial sum as an explicit function of n and evaluated its limit as n approaches infinity. But for most other series, this approach doesn’t work, and thus the exact sums of those series usually can’t be determined. However there are techniques to determine whether a given series converges, and, if it does, to approximate its sum to any desired degree of accuracy. In this and the next three sections we’ll discuss some of these techniques. In this section we’ll compare series whose behavior is unknown to series whose behavior is known. This requires that we have a stockpile of series that are known to converge or diverge. For

convenience we display some such series below, which were dealt with in Section 14.2.

In this and the next two sections we’ll discuss positive series exclusively. They’re series whose terms are positive or 0 (so their
associated sequences are positive sequences). As seen in Section 14.2 Theorem 3.2, a series converges iff its tail, no matter where it begins, converges. Thus for the discussion to be more general we’ll discuss series that are ultimately positive. For the

definitions of (ultimately) positive and of (ultimately) increasing sequences, see Section 14.1 Definitions 1.2 and Remarks 1.1

that follows it. Remember that the “ultimately” property includes the corresponding normal property. For example, a positive sequence (or series) is also an ultimately positive sequence (or series). However an ultimately positive sequence (or series)

may or may not be a positive sequence (or series).

The proof of the comparison test that follows will make use of a property of ultimately positive series, stated in the theorem below. This theorem asserts that there are only two possibilities for an ultimately positive series: it either converges or diverges to infinity. If it diverges then it must diverge to infinity; it can’t diverge to negative infinity or simply diverge. Intuitively this is “obvious”, as from some point on it can’t decrease since all of its terms from that point on are positive or 0; adding a

quantity that’s positive or 0 to something can’t decrease that something.

Theorem 1.1 – A Property Of Ultimately Positive Series

Proof

EOP

^{1.1} Section 14.1 Completeness Property.
^{1.2} Section 14.2 Theorem 3.2.

^{1.3} Section 14.2 Theorem 3.2.

This is a comparison term-by-term from some point on of the two series, and therefore is called the standard comparison
test, abbreviated as “SCT”.

Theorem 1.2 – The Standard Comparison Test (SCT)

Proof                  

EOP

^{1.4} Section 14.1 Theorem 7.1.

This standard comparison test for series is similar to the standard comparison test for improper integrals as presented in
Section 11.3 Theorem 3.1.

Example 1.1

Test the convergence of this series:

Note

Parts a, b, and c produce k = 11, 3,010, and 40 respectively. We choose the “nicest” of them, k = 40 (part c).

Solution
We have:

EOS

It would lead to nowhere if we compared 1/(10n + 3,000) to 1/n. It would be 1/(10n + 3,000) < 1/n for all n. The SCT
doesn’t apply in this case, because the inequality goes in the wrong direction as the series of 1/n diverges to infinity.

Example 1.2

Determine the convergence or divergence of the following series. If it converges, determine the interval between two
consecutive integers that contains its sum.

Note

We know that n² gets very large very fast, thus that 1/n² gets very small very fast, as n gets larger and larger. This leads us to
feel that the series of 1/n² is likely to converge. Consequently we’ll compare it with the convergent telescoping series of
1/(n – 1)n, where n starts from 2 up.

Solution

EOS

This inequality is useless because it goes in the wrong direction. We would be forced to change our feeling about the behavior
of the series.

The Series Of 1/n²

Example 1.3

Establish the convergence or divergence of the following series. If it converges, determine the interval between two
consecutive integers that contains its sum.

Solution

EOS

Example 1.4

Find out whether the following series converges or diverges. If it converges, determine the interval between two consecutive
integers that contains its sum.

Solution

EOS

A deja-vu: multiplying a series that diverges to infinity by a positive constant, no matter how small, yields a series that still diverges to infinity. As an intuitive mnemonic device, multiplying infinity by a positive constant, no matter how small, still

produces infinity.

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2. The Limit Comparison Test (LCT)

Consider the series:

the limit is still a finite number, and the same conclusion holds.

Instead of comparing two series term by term, we can just compare their tails near infinity, as we know that a series converges iff its tail converges. Comparison of the tails is carried out by evaluating the limit at infinity of the quotient of the corresponding terms of the two series. If the limit exists or is infinity, it tells us of the behavior of one series if that of the other

is known.

The test of comparing the tails of the series by investigating the limit of the quotient of the corresponding terms of the series is
known as the limit comparison test, abbreviated as “LCT”.

Theorem 2.1 – The Limit Comparison Test (LCT)

Proof
a. For sufficiently large n we have:

EOP

^{2.1} Section 14.2 Corollary 4.2.

The proof of the LCT makes use of the SCT. The LCT can therefore be considered as a corollary of the SCT.

Example 2.1

Test the convergence/divergence of the series:

Solution

EOS

If we didn’t have the feeling that, near infinity, the general term of the given series behaves like 1/n² and if we compared it to
1/n, we would get:

Example 2.2

Determine the behavior of the series:

Solution

EOS

Since for large n, (3ⁿ + 1)/(5ⁿ – 100) behaves like 3ⁿ/5ⁿ = (3/5)ⁿ of which the series converges, we have the intuitive feeling that the given series converges. So we compare them. We feel that using the SCT would be complicated. Thus we use the

LCT, which, as it turns out, serves us well.

Example 2.3

In Example 1.1 we found out that the series:

diverges to infinity by using the SCT. Now show that it diverges to infinity by utilizing the LCT.

Solution

EOS

Clearly the LCT is simpler than the SCT in this case. We don’t have to look for a fraction 1/kn to compare 1/(10n + 3,000) to.
We simply utilize the simplest of them, 1/n.

Example 2.4

Does the following series converge or diverge?

Note

Of course we feel that this series converges as near infinity it behaves like 3/n². So let’s use the LCT and 1/n² to try to show
that it converges.

Solution
We have:

EOS

This example shows that if one comparison test fails, the other may work. Of course if one comparison test doesn’t work, we’ll
try the other.

Example 2.5

Establish the convergence or divergence of this series:

Solution

EOS

Before trying to think of a series to employ in a comparison test, be alert for the possibility that the associated sequence of the
given series doesn’t approach 0.

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Correct Feeling About Convergence Or Divergence

All of the examples above give us the idea that to test the convergence of a series successfully without wasting time, and time is precious in a test or an exam, we should have a correct feeling about its convergence or divergence. If we feel that a series is likely to converge, we’ll use a convergent series for comparison, and if we feel that it’s likely to diverge, we’ll use a divergent series. If, for a given series, one comparison test is complicated or fails, we’ll try the other, or one of the other ones presented

in later sections.

Don’t forget to mentally examine the limit of the terms of the series to see whether it’s 0 or not before attempting to apply a
convergence test. If it doesn’t seem to be 0, evaluate it. Of course if it’s not 0 then the series must diverge.

Things Involved In The Comparison Tests

The two comparison tests involve two series, one whose behavior is to be determined and the other whose behavior is known.
The tests compare the terms of the former to those of the latter.

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1. For each of the following statements, mark it as T (True) or F (False).

Solution

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2. Determine the convergence or divergence of the following series. Find its sum if it converges.

Solution

Note

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3. Test the convergence of the following series.

Solution

    The two series on the right-hand side are geometric series with common ratios 5/8 and 7/8 respectively, and –1 < 5/8 < 1
    and –1 < 7/8 < 1. It follows that they both converge. Therefore the given series converges.

Note

Part b reminds us that before trying to test a series, we should examine mentally the limit of its terms. If the limit doesn’t
seem to be 0, we should calculate it. Parts b and c don’t utilize any test at all.

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4. Determine the convergence/divergence of these series:

Solution

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5. Establish the convergence or divergence of the following series:

Solution

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6. Does the following series converge or diverge?

Solution

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7. Find out whether the following series converges or diverges:

Solution

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8. Show that this series:

Solution

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