HINT: k\sin\alpha=-4,k\cos\alpha=-3\implies\alpha is in the third quadrant See this

The formula for the height is wrong. We know \angle{BCD}=\frac{\pi}{2}-\gamma and \angle{BCA}=\frac{\pi}{2}-\alpha so therefore \angle{DCA}=\frac{\pi}{2}-\alpha - (\frac{\pi}{2}-\gamma)=\gamma-\alpha ...

The total gravitational force is mg and this force is the hypotenuse of a triangle whose sides are mg\cos\alpha in the direction of the rope and mg\sin\alpha in the orthogonal direction. So the ...

It is because \sin x and \cos x are linearly independent -- if you are given A\sin x + B\cos x \equiv 0 then both A=B=0. Proof: If given A\sin x + B\cos x \equiv 0, then \begin{align*} A\sin x + B\cos x &\equiv 0\\ A\sin0^\circ + B\cos 0^\circ &= 0 &\iff&&B = 0\\ A\sin 90^\circ + B\cos 90^\circ &= 0 &\iff &&A=0 \end{align*} ...

The image on the left is a side view and the image on the right is an end view along the x-v axis. The circle in the right image is the intersection of the dotted plane in the left image with the ...

Just take a slightly weaker lower bound. We have to show that \lim_{N\to +\infty}\sum_{n=1}^{N}\frac{2}{n}\left|\,\sin\left(\frac{\alpha-\beta}{2}\,n\right)\right|\cdot\left|\,\cos\left(\frac{\alpha+\beta}{2}\,n\right)\right|=+\infty ...