Limits and the Squeeze Theorem

Approaching from both sides

Approaching from the right

Approaching from the left

No specific direction

It remains constant

It oscillates between -1 and 1

It decreases indefinitely

It increases indefinitely

It becomes a very small number

It becomes a very large number

It approaches zero

It remains constant

Because it approaches infinity

Because it becomes undefined

Because it oscillates infinitely fast

Because it approaches a single value

It increases the oscillation

It decreases the oscillation

It drags the function towards zero

It makes the function undefined

Functions that increase the oscillation

Functions that bound the oscillation

Functions that make the oscillation constant

Functions that decrease the oscillation

To find the minimum value of a function

To determine the derivative of a function

To determine the limit of a function squeezed between two others

To find the maximum value of a function

They must be undefined

One must be greater than the other

They must be equal

They must be different

The limit is zero

The limit is infinity

The limit is one

The limit is undefined