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| | 4. <math>\frac{\partial}{\partial x}(\frac{\partial f}{\partial y})=\frac{\partial^2 f}{\partial x\partial y}=f_{yx}</math> | | 4. <math>\frac{\partial}{\partial x}(\frac{\partial f}{\partial y})=\frac{\partial^2 f}{\partial x\partial y}=f_{yx}</math> |
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| | + | '''1)''' <math>f(x,y)=2x^2-4xy</math>, find <math>f_{xy}</math> |
| | + | {| class = "mw-collapsible mw-collapsed" style = "text-align:left;" |
| | + | !Solution: |
| | + | |- |
| | + | |<math>f_x=4x-4y</math> |
| | + | |- |
| | + | |Then, <math>f_{xy}=-4</math> |
| | + | |} |
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| − | | + | '''2)''' <math>z=f(x,y)=3xy^2-2y+5x^2y^2</math>, find <math>f_{yx}</math> |
| | + | {| class = "mw-collapsible mw-collapsed" style = "text-align:left;" |
| | + | !Solution: |
| | + | |- |
| | + | |<math>f_y=6xy-2+10x^2y</math> |
| | + | |- |
| | + | |Then, <math>f_{yx}=6y+20xy</math> |
| | + | |} |
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Revision as of 07:47, 18 August 2020
Partial Derivatives of a Function of Two Variables
If 
, then the first partial derivatives of with respect to 
and 
are the functions 
and , defined as shown.
We can denote as 
and 
as 
Example: Find and of:
1) 
| Solution:
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2) 
| Solution:
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3) 
| Solution:
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 (product rule +chain rule)
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Higher-Order Partial Derivatives
1. 
2. 
3. 
4. 
1) 
, find 
| Solution:
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Then, 
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2) 
, find 
| Solution:
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Then, 
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