Convergence and Divergence of Series

Convergence and Divergence of Series

Assessment

Interactive Video

•

Mathematics

•

11th Grade - University

•

Hard

•

CCSS

HSA.SSE.B.4

Standards-aligned

Created by

Jackson Turner

FREE Resource

Standards-aligned

CCSS.HSA.SSE.B.4

The video tutorial covers the limit comparison test, explaining how it determines the convergence or divergence of two series by comparing their limits. It provides three examples: a polynomial series, a harmonic series, and a geometric series, demonstrating the application of the test in each case. The tutorial emphasizes the importance of identifying the type of series and using the test to draw conclusions about their behavior.

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10 questions

Show all answers

1.

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

What is the main condition for using the Limit Comparison Test?

The limit of the ratio of the sequences must be zero.

Both series must be arithmetic.

The limit of the ratio of the sequences must be a positive finite number.

Both series must be geometric.

2.

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

If the limit of the ratio of two series is a positive finite number, what can be concluded?

Both series will converge.

Both series will diverge.

One series will converge and the other will diverge.

Both series will either converge or diverge together.

3.

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

In the first example, what type of series is used for comparison?

Arithmetic series

Geometric series

P-series

Harmonic series

4.

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

What is the value of p in the p-series used in the first example?

3

2

4

1

5.

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

In the second example, what type of series is used for comparison?

Harmonic series

Arithmetic series

Geometric series

P-series

6.

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

What is the conclusion about the series in the second example?

It converges.

It oscillates.

It diverges.

It is inconclusive.

7.

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

In the third example, what is the common ratio of the geometric series?

1/2

1/5

1/3

1/4

8.

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

What is the condition for convergence of a geometric series?

The common ratio is greater than 1.

The common ratio is equal to 1.

The common ratio is less than 1.

The common ratio is negative.

9.

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

What happens to the series in the third example?

It diverges.

It is inconclusive.

It converges.

It oscillates.

Tags

CCSS.HSA.SSE.B.4

10.

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

What is the significance of the number 5 in the third example?

It determines convergence.

It is insignificant when n is large.

It is the degree of the series.

It is the common ratio.

Tags

CCSS.HSA.SSE.B.4

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