Constrained Optimization and the Lagrangian

To find the shortest path

To minimize costs

To maximize revenue under constraints

To balance supply and demand

It calculates the total profit

It determines the cost of production

It indicates the change in maximum revenue with budget changes

It measures the efficiency of resource allocation

It finds the critical points for maximum revenue

It determines the break-even point

It identifies the minimum cost

It calculates the average revenue

It calculates the total expenditure

It determines the average cost

It confirms the maximum possible revenue

It helps in finding the minimum revenue

To find the shortest path

To balance the budget

To evaluate the derivative of the Lagrangian with respect to the budget

To calculate the total cost

To determine the break-even point

To minimize the budget

To understand how changes in budget affect revenue

To calculate the total profit

The average revenue

The total cost

The total expenditure

The change in maximum revenue with budget changes

They are always different

They are the same when evaluated at critical points

The single-variable derivative is always larger

The multivariable derivative is always larger

It measures the efficiency of production

It indicates how much revenue can increase with budget changes

It calculates the total profit

It determines the break-even point

To determine the break-even point

To calculate the total profit

To ensure the partial derivatives go to zero

To minimize costs