Question #9c03c

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Question #9c03c

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Answer 1 · 2017-12-15T11:41:39

$sec^2(2x+3) * 2$

Explanation:

$f(x) = tan(2x+3)$

The chain rule states that:

$(df(u))/dx = (df)/(du) * (du)/(dx)$

Setting $u = 2x+3$ , we get the equation:

$(df(x))/dx = d/(du) tan(u) * d/(dx) 2x+3$

And since $d/(du) tan(u)$ = $sec^2(u)$ and $d/(dx) 2x+3$ = 2:

$(df(x))/dx = sec^2(u) * 2$ , which is:

$= sec^2(2x+3) * 2$

Answer 2 · 2017-12-15T11:45:03

$dy/dx=2sec^2(2x+3)$

Explanation:

$"differentiate using the "color(blue)"chain rule"$

$"given "y=f(g(x))" then"$

$dy/dx=f'(g(x))xxg'(x)$

$y=tan(2x+3)$

$rArrdy/dx=sec^2(2x+3)xxd/dx(2x+3)$

$color(white)(rArrdy/dx)=2sec^2(2x+3)$

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Question #9c03c

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