Lagrange Multipliers and Constraints

To find the maximum and minimum values of a function without any constraints.

To find the maximum and minimum values of a function subject to a given constraint.

To graph a function in three dimensions.

To solve a system of linear equations.

The gradients of the function and the constraint are parallel.

The function and the constraint have the same value.

The function is always increasing.

The gradients of the function and the constraint are perpendicular.

The maximum value of the function.

The minimum value of the function.

The derivative of the function.

A constant that makes the gradients of the function and constraint parallel.

By setting the partial derivatives of the function equal to zero.

By dividing the partial derivative of the function by the partial derivative of the constraint.

By subtracting the partial derivatives of the function from the constraint.

By adding the partial derivatives of the function and the constraint.

x equals y squared.

x squared equals 10 divided by 4 times y squared.

x equals 10 times y.

x squared equals y divided by 4.

Solve for y using the original constraint.

Graph the function.

Find the derivative of the constraint.

Set x equal to zero.

y equals 0.

y equals plus or minus 2.

y equals 10.

y equals plus or minus the square root of 10.

Three points.

Two points.

One point.

Four points.

30

10

40

20

-20

-30

-40

-10