Understanding the Comparison Test for Infinite Series

If a smaller series converges, the larger one diverges.

If a larger series converges, the smaller one converges.

If a smaller series converges, the larger one converges.

If a larger series diverges, the smaller one converges.

Integral Test

p-Series Test

Ratio Test

Geometric Series Test

1/2

2

1

3

The series converges.

The series oscillates.

The series diverges.

The series is inconclusive.

1

2

1/2

3

Geometric Series

Harmonic Series

Arithmetic Series

p-Series

1/4

1/3

1/2

1

The inequality becomes an equality.

The inequality remains the same.

The inequality reverses.

The inequality is undefined.

Calculating the limit of the series

Choosing the correct series to compare with

Determining the type of series

Finding the exact value of the series

It identifies the type of series.

It determines the convergence or divergence of a series.

It helps in finding the sum of the series.

It calculates the limit of the series.