CalcGospel 微積分福音
返回

求導 sin^2x , cos^2x 及其應用

Edit page

由 Chain rule ,

ddxsin2x=2sinxcosx=sin2xddxcos2x=2cosx(sinx)=sin2x\begin{align} &\,\frac{\mathop{}\mathrm{d}}{\mathop{}\mathrm{d}x} \sin^2x\notag\\[4mm] =&\,2\sin x\cdot\cos x\notag\\[4mm] =&\,\sin2x\\[7mm] &\,\frac{\mathop{}\mathrm{d}}{\mathop{}\mathrm{d}x} \cos^2x\notag\\[4mm] =&\,2\cos x\cdot\big(-\sin x\big)\notag\\[4mm] =&\,-\sin2x \end{align}

也可以

ddxcos2x=ddx(1sin2x)=ddxsin2x\begin{align} &\,\frac{\mathop{}\mathrm{d}}{\mathop{}\mathrm{d}x} \cos^2x\notag\\[4mm] =&\,\frac{\mathop{}\mathrm{d}}{\mathop{}\mathrm{d}x} \big(1-\sin^2x\big)\notag\\[4mm] =&\,-\frac{\mathop{}\mathrm{d}}{\mathop{}\mathrm{d}x} \sin^2x \end{align}

如果想追求磨煉解題技巧、快速解題,比方說有些同學準備名校轉學考,可以考慮把這個結果記起來。

ddxsin2x=sin2xddxcos2x=sin2x\begin{align} \frac{\mathop{}\mathrm{d}}{\mathop{}\mathrm{d}x} \sin^2x =&\,\sin2x\\[4mm] \frac{\mathop{}\mathrm{d}}{\mathop{}\mathrm{d}x} \cos^2x =&\,-\sin2x \end{align}

例題

sin2xcos2x+2dx\begin{align}\int \frac{\sin2x}{\cos^2x+2} \mathop{}\mathrm{d}x \end{align}

u=cos2x+2u=\cos^2x+2,則 du=sin2xdx\mathop{}\mathrm{d}u=-\sin2x\mathop{}\mathrm{d}x

原積分轉換為

1udu=lnu+C=lncos2x+2+C\begin{align} &\,-\int\frac{1}{u}\mathop{}\mathrm{d}u\\[4mm] =&\,-\ln\big\vert u\big\vert+C\\[4mm] =&\,-\ln\Big\vert\cos^2x+2\Big\vert+C \end{align}

如果事先記得 ddxcos2x=sin2x\dfrac{\mathop{}\mathrm{d}}{\mathop{}\mathrm{d}x}\cos^2x=-\sin2x

很快就能想到 u=cos2x+2u=\cos^2x+2

Edit page
Share this post on:
Share this post via WhatsApp Share this post on Facebook Share this post on X Share this post via Telegram Share this post on Pinterest Share this post via email
上一篇
《白話微積分》第五版與舊版差異
下一篇
寫給高中生的微積分簡介 第六版