It simplifies the process of differentiation.

It provides a method to calculate the area under a curve.

It is only applicable to polynomial functions.

It is a historical concept with no practical application.

A function that has no derivative.

A function whose derivative is the original function.

A function that is the inverse of the original function.

A function whose derivative is zero.

Subtract one from the exponent and multiply by the new exponent.

Add one to the exponent and divide by the new exponent.

Multiply by the old exponent and subtract one from the exponent.

Divide by the old exponent and add one to the exponent.

It is always equal to zero.

It accounts for all possible vertical shifts of the function.

It is used to find the derivative of the function.

It represents a specific solution.

sine(x) + C

cosine(x) + C

-sine(x) + C

-cosine(x) + C

cosine(x) + C

-sine(x) + C

-cosine(x) + C

sine(x) + C

They represent the slope of a tangent line.

They can be calculated using anti-derivatives.

They are only applicable to continuous functions.

They can be solved using summation notation.