The Problem
Find the absolute minimum and maximum values of the following function on the given interval: $\ f(\theta) = \cos \theta; -\pi \leq \theta \leq {\pi \over 6} $
What I've Done So Far
- Find the derivative of $\ f(\theta) $. This equals $\ -\sin \theta $.
- Determine critical points. It won't ever be undefined, but I know there are points within the interior of the domain where the function is equal to zero.
So where I'm stuck is finding at what points $\ f(\theta) $ equals zero. Is it as simple as taking the inverse $\ \sin $ of $\ \theta $?
Thanks! Any help will be much appreciated!
Garren
Best Answer
If we have a function $f$ then at the maxima and minima of $f$, we have $f'=0$. $$f(\theta)=\cos(x)\implies f'(\theta)=-\sin(\theta)$$ We know that: $$-\sin(\theta)=0\implies \sin(\theta)=0\implies \theta=\pi k,k\in\Bbb{Z}$$ Since we have a domain $-\pi\leq\theta\leq\dfrac{\pi}{6}$, we have maxima or minima at $0\pi=0$ and $-1\pi=-\pi$. And: $$\cos(0)=1$$ $$\cos(-\pi)=-1$$ So we have a maximum at $(0,1)$ and a minimum at $(-\pi,-1)$. Since there are no other multiples of $\pi$ in the interval $-\pi\leq\theta\leq\dfrac{\pi}{6}$ and therefore no other solutions to $-\sin(\theta)=\theta$ in the interval, we are done.