Limits

Integrals

Series

Derivatives

The series of f(x) as x approaches a

The limit of f(x) as x approaches a

The derivative of f(x) as x approaches a

The integral of f(x) as x approaches a

They help in understanding the behavior of functions near a point

They determine the area under a curve

They are used to solve differential equations

They help in finding derivatives

It diverges

It approaches the limit L

It oscillates

It becomes undefined

1

2

3

4

The function is continuous

The function is differentiable

The limit describes the behavior of the function near that point

The function has a maximum at that point

The function's value increases without bound

The function is undefined

The function has a finite value

The function's value decreases without bound

When the left and right hand limits are equal

When the left and right hand limits are different

When the function is continuous

When the function is differentiable

The function must have a maximum at that point

The function must be differentiable

The function must be continuous

The left hand limit must equal the right hand limit