George C. May 16, 2015 From the formula for \displaystyle{\sin{{\left({2}\theta\right)}}} we have \displaystyle{\sin{{2}}}\theta={2}{\sin{\theta}}{\cos{\theta}} From Pythagoras ...

We have a\sin\theta\cos\phi=-b\cos\theta\sin\phi \iff\dfrac{\sin\phi}{\cos\phi}=-\dfrac ab\dfrac{\sin\theta}{\cos\theta}\iff \tan\phi= -\dfrac ab\tan\theta \phi=n\pi+\arctan\left(-\dfrac ab\tan\theta\right) ...

As I pointed out in my comment, you're missing some solutions. Your last equation (5+9\sin\theta)\cos\theta=0 factorizes as \cos\theta=0 \; \; \text{ or } \; \; \sin\theta=\frac{-5}{9}\; . ...

Without loss of generality, we can assume 0 < \theta < \pi (i.e., the second point is in the top half). If the third point is in the top half, the probability of success is 0, and if \phi \ge \theta+\pi ...

Like you wrote: \hat{r} = \cos \theta \hat{i} + \sin \theta \hat{j} \hat{\theta} = -\sin \theta \hat{i} + \cos \theta \hat{j} One can conclude (by projecting, or by just solving these ...

Hint: Try multiplying both sides of r=\sin\theta + \cos\theta by r, and using the identities r^2=x^2+y^2, x=r\cos\theta, and y=r\sin\theta, to find an equation in terms of x and y.