How do you differentiate $y =-2e^(xcosx)$ using the chain rule?

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How do you differentiate $y =-2e^(xcosx)$ using the chain rule?

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Answer 1 · 2017-06-06T22:15:15

The answer is -2 $e^(xcosx)$ ∗ $cosx-xsinx$ .

Explanation:

The $d/dx$ of $e^x$ is always itself.

Now that we know this we move forward the trick here is that we take the $d/dx$ of $e^x$ then we apply the chain rule to $e^(xcosx)$ we take the $d/dx$ of the inside $xcosx$ . Here we apply the product rule $f^1(g)$ x $g^1(f)$ the $d/dx$ of this is $cosx-xsinx$ . Our final answer is -2 $e^(xcosx)$ ∗ $cosx-xsinx$ . We don't take the 2 into account because its a constant.

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How do you differentiate $y =-2e^(xcosx)$ using the chain rule?

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How do you differentiate y =-2e^(xcosx) y =-2e^(xcosx) using the chain rule?

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How do you differentiate $y =-2e^(xcosx)$ using the chain rule?