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| | |<math>\frac{\partial z}{\partial x}=2xe^{x^2y}+x^2e^{x^2y}2xy</math> (product rule +chain rule) | | |<math>\frac{\partial z}{\partial x}=2xe^{x^2y}+x^2e^{x^2y}2xy</math> (product rule +chain rule) |
| | |- | | |- |
| − | |<math>\frac{\partial z}{\partial y}=x^2e^{x^2y}x^2</math> | + | |<math>\frac{\partial z}{\partial y}=x^2e^{x^2y}(x^2)=x^4e^{x^2y}</math> |
| | |} | | |} |
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Revision as of 08:38, 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) 
| ExpandSolution:
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2) 
| ExpandSolution:
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3) 
| ExpandSolution:
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 (product rule +chain rule)
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