The Second Fundamental Theorem of Calculus

Applications of calculus in physics

The First Fundamental Theorem of Calculus

The history of calculus

It exists and is equal to some function F

It is always zero

It is undefined

It is equal to the derivative of f

1/x

x^3

x^2

x

x^2

1/3

x^3

3x^2

It is open

It is discrete

It is closed and bounded

It is infinite

It is always increasing

It attains its maximum and minimum values

It is differentiable everywhere

It is always positive

It shows that integrals are always positive

It demonstrates the continuity of functions

It proves the existence of derivatives

It allows constants to be factored out of integrals

It moves away from x

It approaches x

It becomes undefined

It remains constant

The derivative of a function is always increasing

The integral of a function is always positive

The derivative of the integral of a function is the function itself

The integral of a function is always zero