Sequences, Functions, and Integrals

The sequence graph is only defined at natural numbers.

The function graph is only defined at natural numbers.

The function graph is discrete.

The sequence graph is continuous.

Sequences are restricted to natural numbers.

Sequences have a continuous domain.

Functions are restricted to integers.

Functions have a discrete domain.

To calculate the exact area under the curve.

To approximate the area under the curve.

To find the maximum value of the sequence.

To determine the sequence's convergence.

The sum of the sequence values.

The area under the curve.

The height of the sequence values.

The width of the sequence intervals.

An integral with a negative lower limit.

An integral with a zero lower limit.

An integral with an infinite upper limit.

An integral with a finite upper limit.

When the function is negative and decreasing.

When the function is positive and increasing.

When the function is negative, continuous, and increasing.

When the function is positive, continuous, and decreasing.

The exact value of a series.

The convergence or divergence of a series.

The maximum value of a function.

The minimum value of a sequence.

It is a specific case of the integral test.

It is unrelated to the integral test.

It contradicts the integral test.

It is a more general form of the integral test.