Section 13.6 - 1 v=-I 2 P(2,4,0 Q(4,3,1 y e y x h x sin = 2 1 π P z xye z y x g = Definition of Gradient of a Function of Two Variables and Figure

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Section 13.6 Directional Derivatives and Gradients
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Figure 13.42, Figure 13.43, and Figure 13.44
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Find the directional derivative of the function at P in the direction of v
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Unformatted text preview: 1) v=-I 2) P(2,4,0) Q(4,3,1) y e y x h x sin ) , ( = ) 2 , 1 ( π P z xye z y x g = ) , , ( Definition of Gradient of a Function of Two Variables and Figure 13.48...
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This note was uploaded on 01/13/2012 for the course MATH 2574 taught by Professor Pamelasatterfield during the Fall '12 term at NorthWest Arkansas Community College.

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Section 13.6 - 1 v=-I 2 P(2,4,0 Q(4,3,1 y e y x h x sin = 2 1 π P z xye z y x g = Definition of Gradient of a Function of Two Variables and Figure

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