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More work on differentiation with trigonometric functions

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Differentiate the following trigonometric functions using the chain rule.

Do not write out $dy/dx$; only input the differentiated right hand side of each equation.

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If you don't know how to differentiate trigonometric functions, please see 'Differentiation 4 - Trigonometric Functions'.

These questions use the chain rule.

The earlier questions are easy to do by inspection, e.g using Part a:

$y=sin(\\var{c[0]}x)$.

We differentiate the term(s) inside the function, here the term is $\\var{c[0]}x$.

Then we derive $sin$ of any function, giving us $cos$.

Putting our results together, we get

$\\var{c[0]}cos(\\var{c[0]}x)$.

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coefficients

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$y=-5\\cos(\\var{c[3]}x)+\\sin(\\var{c[4]}x)$

$\\frac{dy}{dx}=$ [[0]]

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