Evaluating Limits and Trigonometric Identities

They were too complex to solve.

They involved unknown variables.

They were not related to trigonometry.

They didn't match the previously discussed limits.

sec²

cos²

tan²

cot²

It becomes undefined.

It approaches one.

It approaches infinity.

It approaches zero.

It only applies to trigonometric functions.

It is unnecessary for limit evaluation.

It makes the problem more complex.

It helps in understanding the behavior of the function.

Because it is always positive.

Because it approaches one.

Because it approaches zero.

Because it cancels out.

It approaches zero.

It becomes undefined.

It approaches infinity.

It remains constant.

Both involve complex algebra.

Both are unsolvable.

Both can be evaluated at zero.

Both require numerical methods.

Avoiding trigonometric functions.

Guessing the answer.

Simplifying using known identities.

Using numerical methods.

To avoid using calculus.

To make the problem more complex.

To simplify the expression.

To introduce new variables.

To reduce the number of questions.

To avoid using trigonometry.

To challenge students with different scenarios.

To make the problems easier.