Fundamental Theorem of Calculus Concepts

The antiderivative of a function is equal to its integral.

The derivative of the antiderivative of a function is the original function.

The integral of a function is equal to its derivative.

The derivative of a function is equal to its antiderivative.

The original function

A constant

The integral of the function

The square of the function

x squared plus 4

The square root of x squared plus 4

t squared plus 4

The square root of t squared plus 4

The constant itself

Zero

The integral of the constant

One

The function remains positive.

The function becomes negative.

The function becomes zero.

The function doubles.

Product Rule

Chain Rule

Quotient Rule

Power Rule

x times the square root of x to the sixth minus 4

x squared times the square root of x to the sixth minus 4

2x times the square root of x to the sixth minus 4

2x times the square root of x to the third minus 4

3x squared times the square root of x to the twelfth minus 2 plus 2x times the square root of x to the eighth minus 2

3x squared times the square root of x to the twelfth minus 2 minus 2x times the square root of x to the eighth minus 2

3x times the square root of x to the twelfth minus 2 minus 2x times the square root of x to the eighth minus 2

3x squared times the square root of x to the eighth minus 2 minus 2x times the square root of x to the twelfth minus 2

It helps in finding the integral of a function.

It is used to differentiate functions with constant limits.

It is crucial for differentiating integrals with variable limits.

It simplifies the process of integration.

The order of limits does not affect the derivative.

The derivative changes sign depending on the order of limits.

The derivative becomes zero if the order is reversed.

The derivative is always positive regardless of the order.