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Lecture
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This lecture covers the concept of Lagrangian multipliers for finding extrema with constraints, introducing the Lagrange function and theorem. It also explores multiple constraint extrema problems, defining the Lagrange multiplier as a stationary point. The lecture further delves into multiple integrals, defining double and triple integrals, and exploring the concept of multiple integrals over rectangular regions. The importance of partitioning rectangular regions and the notion of degenerate regions are also discussed, along with the concept of tensorial refinement for partitions. The lecture concludes with the discussion of Darboux sums for bounded real functions and the relationship between upper and lower Darboux sums.
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