Nghi N. May 1, 2015 Numerator: \displaystyle{\left({{\sin}^{{2}}{x}}-{{\cos}^{{2}}{x}}\right)}={\left({\sin{{x}}}-{\cos{{x}}}\right)}{\left({\sin{{x}}}+{\cos{{x}}}\right)} ...

Let's try x=0. \displaystyle \frac{\sin 0 - \cos 0}{\sin 0 + \cos 0} = \frac{0-1}{0+1} = -1 \tan^2 \frac 0 2 = 0 Those aren't equal, so this is false and (hopefully) impossible to ...

\displaystyle\frac{{{{\sin}^{{3}}{x}}+{\sin{{x}}}{{\cos}^{{2}}{x}}}}{{\cos{{x}}}}={\tan{{x}}} Explanation: \displaystyle\frac{{{{\sin}^{{3}}{x}}+{\sin{{x}}}{{\cos}^{{2}}{x}}}}{{\cos{{x}}}} ...

Express the numerator in the form a^2-b^2, i.e. (cos^2 x)^2- (sin^2 x)^2. Use the identity a^2-b^2=(a+b)*(a-b). So the numerator will be (cos^2 x+ sin^2 x) (which is 1) * (cos^2x-sin^2x)   Then ...

Please see below. Explanation: We know that, \displaystyle{\left({\left({1}\right)}\frac{{1}}{{\cos{\theta}}}={\sec{\theta}}\right.} \displaystyle{\left({\left({2}\right)}{{\sin}^{{2}}\theta}+{{\cos}^{{2}}\theta}={1}\right.} ...

Let \alpha=\arctan(2\tan^2x) and \beta=\arcsin(\frac{3\sin2x}{5+4\cos2x}). \begin{align} \sin\beta&=\frac{3\sin2x}{5+4\cos2x}\\ ...