You'll wanna set them equal to each other. r=\sqrt{3}+6\cos(\theta)=\sqrt{3}+2\cos(\theta) Then we want to find the values that make these equal to each other. Then 6\cos(\theta)=2\cos(\theta) ...

This writes as \;\cos2\theta=\dfrac{\sqrt 3}2=\cos\dfrac\pi6. Now you have to know that \cos x=\cos\alpha\iff\theta\equiv\pm\alpha\pmod2\pi, and similarly: \sin x=\sin \alpha\iff\begin{cases}\theta\equiv\alpha\pmod{2\pi},\\\theta\equiv\pi-\alpha\pmod{2\pi}, \end{cases} ...

The solutions are \displaystyle{S}={\left\lbrace\frac{\pi}{{6}},\frac{{11}}{{6}}\pi\right\rbrace} Explanation: The equation is \displaystyle{2}{\cos{\theta}}-\sqrt{{3}}={0} \displaystyle\Rightarrow ...

Wataru Sep 25, 2014 The area of the enclosed region is \displaystyle\frac{{5}}{{24}}\pi-\frac{\sqrt{{{3}}}}{{4}} . It looks like this: \displaystyle{A}={\int_{{0}}^{{\frac{\pi}{{3}}}}}{\int_{{0}}^{{{\sin{\theta}}}}}{r}{d}{r}{d}\theta+{\int_{{\frac{\pi}{{3}}}}^{{\frac{\pi}{{2}}}}}{\int_{{0}}^{{\sqrt{{{3}}}{\cos{\theta}}}}}{r}{d}{r}{d}\theta ...

We have to solve the equation \ x+\frac{1}{x}=a. This leads to the equation x^2-ax+1=0 If \ 0\le a<2, the solutions must be complex. If u+vi is one of the solutions, the other one is u-vi. ...

The directional derivative is \nabla f \bullet u, where u is a unit vector which points in the direction desired. What you want is the unit vector u=(x,y); your del f is (-4,1) as you say, ...