They are used to find the minimum value of the function.

They indicate points where the function value is constant.

They represent the maximum value of the function.

They show the direction of the greatest change in the function.

It is used to find the function's average value.

It gives a vector field indicating the direction of greatest change.

It provides a scalar value indicating the function's magnitude.

It shows the direction of the least change in the function.

The partial derivative of M with respect to x equals the partial derivative of N with respect to y.

The integral of M equals the integral of N.

The partial derivative of M with respect to y equals the partial derivative of N with respect to x.

The second derivative of M equals the second derivative of N.

Clairhaut’s Theorem

Pythagorean Theorem

Fundamental Theorem of Calculus

Mean Value Theorem

8 x y plus y to the fourth

4 y squared minus x squared

8 y minus x squared

x squared minus 4 y squared

To find the maximum value of the function.

To determine the potential function F of x y.

To calculate the average rate of change.

To solve for the exact value of y.

The average value of the function.

The maximum value of the function.

The minimum value of the function.

The solution to the differential equation.

It calculates the average rate of change.

It determines the maximum value of the function.

It gives the implicit general solution to the differential equation.

It provides the explicit solution to the differential equation.

Because the function is not continuous.

Due to the complexity of the equation.

Because the function is not differentiable.

Due to the lack of boundary conditions.

They provide the explicit solution to the equation.

They determine the maximum value of the function.

They help in finding the constant C.

They are used to calculate the average rate of change.