\displaystyle{\tan{{\left(\frac{{{2}\pi}}{{3}}\right)}}}=-\sqrt{{3}} Explanation: \displaystyle{\tan{{\left(\frac{{{2}\pi}}{{3}}\right)}}} Recall the identity \displaystyle{\tan{\theta}}=\frac{{\sin{\theta}}}{{\cos{\theta}}} ...

Alan P. Apr 26, 2015 The intersection of the ray for \displaystyle\frac{{{5}\pi}}{{3}} with the unit circle is at the same place as the ray for \displaystyle{\left(-\frac{\pi}{{3}}\right)} ...

\displaystyle-\sqrt{{3}} Explanation: Trig table and unit circle give --> \displaystyle{\tan{{\left(\frac{{{8}\pi}}{{3}}\right)}}}={\tan{{\left(\frac{{{2}\pi}}{{3}}+\frac{{{6}\pi}}{{3}}\right)}}}={\tan{{\left(\frac{{{2}\pi}}{{3}}+{2}\pi\right)}}}= ...

By definition , \arctan x is the angle (in radians) between -\pi/2 and \pi/2 whose tangent is x. There are infinitely many numbers y such that \tan y=-3/2.

Look at a \displaystyle{1} , \displaystyle\sqrt{{{3}}} , \displaystyle{2} right angled triangle to find: \displaystyle{\tan{{\left(\frac{\pi}{{3}}\right)}}}=\sqrt{{{3}}} ...

Find \displaystyle{\tan{{\left(\frac{{{10}\pi}}{{3}}\right)}}} Explanation: On the trig unit circle, \displaystyle{\tan{{\left(\frac{{{10}\pi}}{{3}}\right)}}}={\tan{{\left(\frac{{{4}\pi}}{{3}}+{2}\pi\right)}}}={\tan{{\left(\frac{\pi}{{3}}\right)}}}=\sqrt{{3}}