We use radian notation. Every rational multiple of \pi has trigonometric functions that can be expressed using the ordinary arithmetic operations, plus n-th roots for suitable n. This is ...

They will hit at the same time; you can see this via Galilean relativity. If you are on a train moving at high speed and drop a ball straight down from your own point of view, it falls normally ...

Your equation is correct! Nice derivation. In your final formula, some simplification could be done using the trig identities 1-\sin^2 (\theta) = \cos^2 (\theta) \quad \text{ and } \quad \sin(2\theta)=2\sin(\theta)\cos(\theta) ...

You can write \frac{\sin(30^{\circ})\cos(\alpha)-\cos(30^{\circ})\sin(\alpha)}{\sin(\alpha)}=\sin(30^{\circ})\cot(\alpha)-\cos(30^{\circ})=\frac{b}{a}

All statements like "when the universe was the size of a grapefruit" refer to the currently observable universe. As the universe has a finite age and light travels at a finite speed (and there is ...

Let n = 2m+1, and let the radius of the polygon's circumcircle be r. The sides of the smallest polygons are sub-segments of the longest diagonals. Connecting the center to the endpoints of one of ...