MITFallClass Calendar 1

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Date: 2012-09-05 08:39:37 Joseph Fourier Erwin Kreyszig Linear algebra Homework Differential equation Calculus Mathematica Ordinary differential equation Multivariable calculus Mathematical software Mathematical analysis Science		MITFallClass Calendar 1 Add to Reading List Source URL: pruffle.mit.edu Download Document from Source Website File Size: 118,61 KB Share Document on Facebook

	Classroom Voting Questions: Multivariable Calculus 15.2 Optimization 1. Estimate the global maximum and minimum of the functions whose level curves are given below. How many times does each occur? DocID: 1vnbq - View Document
	Classroom Voting Questions: Multivariable Calculus 14.4 Gradients and Directional Derivatives in the Plane 1. The figure shows the temperature T ◦ C in a heated room as a function of distance x in meters along a wall a DocID: 1vl96 - View Document
	Classroom Voting Questions: Multivariable Calculus 14.7 Second-Order Partial Derivatives 1. At the point (4,0), what is true of the second partial derivatives of f (x, y)? (a) DocID: 1vjCI - View Document
	Classroom Voting Questions: Multivariable Calculus 12.4 Linear Functions 1. A plane has a z-intercept of 3, a slope of 2 in the x direction, and a slope of -4 in the y direction. The height of the plane at (2,3) is (a) DocID: 1vfMK - View Document
	Classroom Voting Questions: Multivariable Calculus 18.4 Path-Dependent Vector Fields and Green’s Theorem 1. What will guarantee that F~ (x, y) = yˆi + g(x, y)ˆj is not a gradient vector field? (a) g(x, y) is a functi DocID: 1v8ZZ - View Document