quotient rule: problem 3 (1 point)\nlet $f(x)=\frac{-7x}{sin(x)+cos(x)}$. evaluate $f(x)$ at $x =…

quotient rule: problem 3 (1 point)\nlet $f(x)=\frac{-7x}{sin(x)+cos(x)}$. evaluate $f(x)$ at $x = 2pi$.\n$f(2pi)=square$\npreview my answers submit answers\nyou have attempted this problem 0 times.\nyou have unlimited attempts remaining.\nemail instructor
Answer
Explanation:
Step1: Recall quotient - rule
The quotient - rule states that if $y=\frac{u}{v}$, then $y'=\frac{u'v - uv'}{v^{2}}$. Here, $u = - 7x$, so $u'=-7$, and $v=\sin(x)+\cos(x)$, so $v'=\cos(x)-\sin(x)$.
Step2: Apply quotient - rule
$f'(x)=\frac{-7(\sin(x)+\cos(x))-(-7x)(\cos(x)-\sin(x))}{(\sin(x)+\cos(x))^{2}}$.
Step3: Evaluate at $x = 2\pi$
When $x = 2\pi$, $\sin(2\pi)=0$ and $\cos(2\pi)=1$. Substitute these values into $f'(x)$: [ \begin{align*} f'(2\pi)&=\frac{-7(0 + 1)-(-7\times2\pi)(1 - 0)}{(0 + 1)^{2}}\ &=\frac{-7+14\pi}{1}\ &=-7 + 14\pi \end{align*} ]
Answer:
$-7 + 14\pi$