maximise the function x+y-z=1 with respect to the constant xy=36
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No maxima exists in the function x + y - z = 1.
- Mathematically, we can see that the level curves can go further the beginning along the curve xy=36 limitlessly and still not arrive at their most extreme worth.
- What the Lagrange multiplier predicts for this situation is the minimum worth.
- In numerical enhancement, the technique for Lagrange multipliers is a procedure for finding the local maxima and minima of a capacity subject to fairness imperatives (i.e., dependent upon the condition that at least one condition must be fulfilled precisely by the picked upsides of the factors).
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