Compute all of the second-order partial derivatives for the functions and show that the mixed partial derivatives are equal. f(x,y)=e^{x}\sin(xy)

Marvin Mccormick

Marvin Mccormick

Answered question

2021-05-12

Compute all of the second-order partial derivatives for the functions and show that the mixed partial derivatives are equal.
f(x,y)=exsin(xy)

Answer & Explanation

Bertha Stark

Bertha Stark

Skilled2021-05-14Added 96 answers

Step 1
Given function is:
f(x,y)=exsin(xy)
Differentiating f(x, y) partially with respect to x we get,
fx(x,y)=exsin(xy)+yexcos(xy)=ex[sin(xy)+ycos(xy)]
Differentiating f(x, y) partially with respect to y we get,
fy(x,y)=xexcos(xy)
Step 2
Moreover we get,
fxy(x,y)=xexcos(xy)+excos(xy)xyexsin(xy)
fyx(x,y)=excos(xy)+xexcos(xy)xyexsin(xy)
These are the second order partial derivatives of f(x, y).

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