\displaystyle\frac{{\left.{d}{y}\right.}}{{\left.{d}{x}\right.}}=-{12}{\left[{\cos{{\left({4}{x}\right)}}}\right]}^{{2}}{\sin{{\left({4}{x}\right)}}} Explanation: What the chain rule is that it ...

Range: \displaystyle{\left[-\pi,{0.56109634}\right]} , nearly. Domain: \displaystyle{\left\lbrace-{1},{1}\right]} . Explanation: \displaystyle{\arccos{{x}}}=\frac{{y}}{{x}}\in{\left[{0},\pi\right]} ...

Steve M Nov 26, 2017 We have: \displaystyle{x}^{{2}}{y}={a}{\cos{⁡}}{x} If we differentiate implicitly wrt \displaystyle{x} and apply the product rule then: \displaystyle{\left({x}^{{2}}\right)}{\left(\frac{{d}}{{\left.{d}{x}\right.}}{y}\right)}+{\left(\frac{{d}}{{\left.{d}{x}\right.}}{x}^{{2}}\right)}{\left({y}\right)}=-{a}{\sin{{x}}} ...

I would do it this way: x=\cos(y) Differentiate both sides with respect to x: 1=-\sin(y)\frac{\mathrm{d}y}{\mathrm{d}x} \frac{\mathrm{d}y}{\mathrm{d}x}=-\frac{1}{\sin(y)} Now ...

\displaystyle{y}\ \text{ is}{\left\lbrace\begin{array}{ccccc} \text{increasing}&\Rightarrow&\frac{\pi}{{4}}{<}{x}{<}\frac{\pi}{{2}}&\frac{{{3}\pi}}{{4}}{<}{x}{<}\pi&\ldots\\\text{stationary}&\Rightarrow&{x}={0}&{x}=\frac{\pi}{{4}}&\ldots\\\text{decreasing}&\Rightarrow&{0}{<}{x}{<}\frac{\pi}{{4}}&\frac{\pi}{{2}}{<}{x}{<}\frac{{{3}\pi}}{{2}}&..\end{array}\right.} ...

Gió Apr 7, 2015 I would use the Chain Rule deriving the \displaystyle{()}^{{3}} first and then the \displaystyle{\cos} and then the argument as: \displaystyle{y}'={3}{{\cos}^{{2}}{\left({3}{x}+{1}\right)}}\cdot{\left[-{\sin{{\left({3}{x}+{1}\right)}}}\right]}\cdot{3}=-{9}{{\cos}^{{2}}{\left({3}{x}+{1}\right)}}{\sin{{\left({3}{x}+{1}\right)}}}