Understanding One-Sided Limits and Cosine Function

The function is undefined at x=2.

The function is zero at x=2.

The function is negative at x=2.

The function is infinite at x=2.

Inspecting the properties of the cosine function

Using a graphing tool

Applying the quadratic formula

Using a logarithmic table

It becomes greater than one.

It becomes negative.

It remains constant.

It approaches one but stays less than one.

It becomes negative.

It approaches zero.

It remains constant.

It becomes unbounded in the positive direction.

It indicates the function will be negative.

It suggests the function will be zero.

It implies the function will be positive.

It has no effect on the function's behavior.

It approaches zero.

It approaches negative infinity.

It becomes unbounded in the positive direction.

It remains constant.

Negative values are always greater.

Positive values are always greater.

They are always different.

They are equal.

The function remains constant.

The function approaches zero.

The function becomes unbounded in the negative direction.

The function becomes unbounded in the positive direction.

Because cosine approaches zero.

Because the numerator increases.

Because cosine approaches one.

Because the numerator decreases.

It becomes unbounded towards infinity.

It becomes negative.

It remains constant.

It approaches zero.