How do you find the partial derivative of $f (x, y) = sin 3 x + cos 5 y$ $f(x,y) = sin 3x + cos 5y$ ?

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How do you find the partial derivative of $f (x, y) = sin 3 x + cos 5 y$ $f(x,y) = sin 3x + cos 5y$ ?

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Answer 1 · 2015-04-08T15:18:31

Hey there :)

Here's the answer with no taste.

$f_{x} (x, y) = 3 cos (3 x)$ $f_x(x, y) = 3cos(3x)$ and $f_{y} (x, y) = - 5 sin (5 y)$ $f_y(x, y) = -5sin(5y)$

Now the juicy parts.

To find $f_{x} (x, y)$ $f_x(x, y)$ , fix all other variables as constants, in this case just $y$ $y$ .

So for $f_{x} (x, y)$ $f_x(x, y)$ we know that $cos (5 y)$ $cos(5y)$ is only a function of $y$ $y$ so we differentiate it like a constant since $y$ $y$ is fixed. So we just differentiate $sin (3 x)$ $sin(3x)$ in terms of $x$ $x$ yielding $3 cos (3 x)$ $3cos(3x)$ .

This is

$f_{x} (x, y) = 3 cos (3 x)$ $f_x(x, y) = 3cos(3x)$

Similarly, for $f_{y} (x, y)$ $f_y(x, y)$ , we hold $x$ $x$ fixed and differentiate with respect to $y$ $y$ to get

This is

$f_{y} (x, y) = - 5 sin (5 y)$ $f_y(x, y) = -5sin(5y)$

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How do you find the partial derivative of $f (x, y) = sin 3 x + cos 5 y$ $f(x,y) = sin 3x + cos 5y$ ?

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How do you find the partial derivative of f(x,y)=sin3x+cos5yf(x,y) = sin 3x + cos 5y?

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How do you find the partial derivative of $f (x, y) = sin 3 x + cos 5 y$ $f(x,y) = sin 3x + cos 5y$ ?