QUESTION IMAGE
Question
find $\frac{dy}{dx}$ for $y = \frac{sec x}{\tan^{2}x}$
Step1: Rewrite functions in terms of sine and cosine
We know that $\sec x=\frac{1}{\cos x}$ and $\tan x = \frac{\sin x}{\cos x}$, so $y=\frac{\sec x}{\tan^{2}x}=\frac{\frac{1}{\cos x}}{\frac{\sin^{2}x}{\cos^{2}x}}=\frac{\cos x}{\sin^{2}x}$.
Step2: Apply the quotient - rule
The quotient - rule states that if $y = \frac{u}{v}$, then $y^\prime=\frac{u^\prime v - uv^\prime}{v^{2}}$. Here, $u=\cos x$, $u^\prime=-\sin x$, $v = \sin^{2}x$, and using the chain - rule $v^\prime = 2\sin x\cos x$.
\[
$$\begin{align*}
\frac{dy}{dx}&=\frac{-\sin x\cdot\sin^{2}x-\cos x\cdot(2\sin x\cos x)}{\sin^{4}x}\\
&=\frac{-\sin^{3}x - 2\sin x\cos^{2}x}{\sin^{4}x}\\
&=\frac{-\sin x(\sin^{2}x + 2\cos^{2}x)}{\sin^{4}x}\\
&=\frac{-(\sin^{2}x + 2\cos^{2}x)}{\sin^{3}x}\\
&=\frac{-(\sin^{2}x+\cos^{2}x+\cos^{2}x)}{\sin^{3}x}\\
&=\frac{-(1 + \cos^{2}x)}{\sin^{3}x}
\end{align*}$$
\]
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$\frac{-(1 + \cos^{2}x)}{\sin^{3}x}$