The traditional notation for the trigonometrc functions is that \tan^2 is the function that maps an angle to the square of its tangent. If, for a given x , \mathsf{opp} (i.e., \sin(x) ) ...

When plotting rapid oscillating functions on graphical calculators one often run into problems with the calculator using a too coarse sampling of the point making the plot look very erratic (the ...

Truong-Son N. Oct 21, 2016 The trick with this one is to split it up into two \displaystyle{{\tan}^{{2}}{x}} terms and use some identities. \displaystyle\int{{\tan}^{{4}}{x}}{\left.{d}{x}\right.} ...

\displaystyle\frac{{1}}{{5}}{{\tan}^{{5}}{x}}-\frac{{1}}{{3}}{{\tan}^{{3}}{x}}+{\tan{{x}}}-{x}+{C} Explanation: Use trignometric identity \displaystyle{{\tan}^{{2}}{x}}={{\sec}^{{2}}{x}}-{1} ...

\displaystyle\frac{{{\tan}^{{7}}{x}}}{{7}}-\frac{{{\tan}^{{5}}{x}}}{{5}}+\frac{{{\tan}^{{3}}{x}}}{{3}}-{\tan{{x}}}+{x}+{C}. Explanation: Let, \displaystyle{I}=\int{{\tan}^{{8}}{x}}{\left.{d}{x}\right.}=\int{{\tan}^{{6}}{x}}{\left({{\sec}^{{2}}{x}}-{1}\right)}{d}, ...

Let's consider the case when n=2k+1 is odd: we can write \int\tan^nx\,dx=\int\tan^{2k+1}x\,dx= \int\frac{(\sin^2x)^k}{\cos^{2k+1}x}\sin x\,dx= -\int\frac{(1-\cos^2x)^k}{\cos^{2k+1}x}\,d(\cos x) ...