tan 225 = 1 Explanation: Trig table of special arcs --> tan (225) = tan (45 + 180) = tan (45) = 1

If \dfrac{1-a^2}{2a}=\dfrac{a-b}{1+ab} \iff\dfrac{a^3-3a}{1-3a^2}=\dfrac1b If a=\tan x,b=2-\sqrt3 -\tan3x=\tan(-3x)=2+\sqrt3=\csc30^\circ+\cot30^\circ=\cdots=\cot15^\circ=\tan75^\circ \implies-3x=180^\circ n+75^\circ ...

\displaystyle\frac{\sqrt{{3}}}{{3}} Explanation: Use unit circle and trig table of special arcs: \displaystyle{\tan{{\left({210}\right)}}}={\tan{{\left({30}+{180}\right)}}}={\tan{{\left({30}\right)}}}=\frac{\sqrt{{3}}}{{3}}

\displaystyle{{\tan{{27}}}^{\circ}=}\sqrt{{{5}}}-{1}-\sqrt{{{5}-{2}\sqrt{{{5}}}}} Explanation: I like this question because it highlights the fact that you can find algebraic expressions for ...

\displaystyle-{\left({2}+\sqrt{{3}}\right)} . Explanation: \displaystyle{{\tan{{285}}}^{\circ}=}{\tan{{\left({360}^{\circ}-{75}^{\circ}\right)}}}=-{{\tan{{75}}}^{\circ}=}-{\tan{{\left({45}^{\circ}+{30}^{\circ}\right)}}} ...

\arctan 2 is not a rational multiple of \pi. If it were, then for some integer n > 0, we would have (1 + 2i)^n is real. On the other hand, if we define a_n := \operatorname{Im}((1 + 2i)^n) ...