Understanding the Graph of Secant Function

Secant is the derivative of cosine.

Secant is the integral of cosine.

Secant is the reciprocal of cosine.

Secant is the square of cosine.

Where cosine is 2.

Where cosine is -1.

Where cosine is 1.

Where cosine is 0.

π/2 radians

2π radians

4π radians

π radians

Because it is a constant function.

Because it oscillates between fixed values.

Because it extends infinitely in both directions.

Because it is a linear function.

Where cosine equals -1.

Where cosine equals 2.

Where cosine equals 0.

Where cosine equals 1.

Secant is undefined.

Secant equals 1.

Secant equals 0.

Secant equals -1.

It approaches zero.

It remains constant.

It approaches infinity.

It oscillates.

0

1/2

2

1

1

1/2

2

0

By using the reciprocal relationship with the cosine function.

By finding the derivative of the cosine function.

By integrating the cosine function.

By finding the square of the cosine function.