AnalysisCommon functionsTangentOn this pageTangentDefinitionDefinitionLet x∈Rx \in \mathbb Rx∈R, we define the tangent function astan(x)=sin(x)cos(x).\tan(x) = \frac{\sin(x)}{\cos(x)}.tan(x)=cos(x)sin(x).ResultsProposition : DerivativeLet x∈Rx \in \mathbb Rx∈R, we havetan′(x)=1−tan2(x)=1cos2(x).\tan'(x) = 1 - \tan^2(x) = \frac{1}{\cos^2(x)}.tan′(x)=1−tan2(x)=cos2(x)1.Proposition : Addition formulaLet a,b∈Ra,b \in \mathbb Ra,b∈R such that a≠π2[π]a \neq \frac{\pi}{2}[\pi]a=2π[π] and b≠π2[π]b \neq \frac{\pi}{2}[\pi]b=2π[π], we havetan(a+b)=tan(a)+tan(b)1−tan(a)tan(b).\tan(a+b) = \frac{\tan(a) + \tan(b)}{1 - \tan(a)\tan(b)}.tan(a+b)=1−tan(a)tan(b)tan(a)+tan(b).Proposition : Outstanding valuesSome outstanding values to keep in mindtan(0)=0,tan(π6)=33,tan(π4)=1,tan(π3)=3.\tan(0) = 0, \quad \tan \left (\frac{\pi}{6} \right ) = \frac{\sqrt{3}}{3}, \quad \tan \left (\frac{\pi}{4} \right ) = 1, \quad \tan \left (\frac{\pi}{3} \right ) = \sqrt 3.tan(0)=0,tan(6π)=33,tan(4π)=1,tan(3π)=3.