Math  /  Algebra

QuestionFor the function, evaluate the given expression. f(x,y)=xeyyex, find f(4,4)f(4,4)=\begin{array}{l} f(x, y)=x e^{y}-y e^{x}, \text { find } f(4,-4) \\ f(4,-4)= \end{array}

Studdy Solution
Factor out the common factor of 4 4 :
f(4,4)=4(e4+e4) f(4, -4) = 4 (e^{-4} + e^{4})
The value of f(4,4) f(4, -4) is:
4(e4+e4) \boxed{4 (e^{-4} + e^{4})}

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