Use the identities \sin4\theta = 4\cos\theta\left (\sin\theta - 2\sin^3\theta\right) \sin7\theta = -64\sin^7\theta + 112\sin^5\theta -56\sin^3\theta+7\sin\theta, obtained from De Moivre's ...

( Edited to address technical ambiguities in the earlier version): If we use the usual definition of the directional derivative at \mathbf{x} along \mathbf{v}, D_{\mathbf{v}}f(\mathbf{x}) = \lim_{t\rightarrow 0}\frac{f(\mathbf{x}+t\mathbf{v})-f(\mathbf{x})}{t} ...

All primitive nth roots of unity have the form \zeta=\exp(\frac{2\pi ik}{n}) with k an integer such that (k,n)=1. So it is enough to observe that \zeta^2=\exp(\frac{2\pi i\cdot 2k}{n}) and ...

Assuming that the center of the triangle is the origin z=0, to get from A to B you should rotate by 120 degrees - or 2\pi /3 radians. To see this, connect the origin O to both points A ...

\begin{align} (-1)^{2/3} & = (e^{\pi i})^{2/3} \\ & = e^{2/3\pi i} \\ & = \cos\left(\frac{2\pi}3\right) + i\sin\left(\frac{2\pi}3\right) \\ & = -\frac 12+i\frac{\sqrt 3}{2} \end{align} So yes, we ...

If I understand you correctly, someone has made an 'equilateral triangle' out of some number A of glasses, and you want to know how many glasses there are in the base. You realized the number must ...