\displaystyle={6}{\sin{{\left(\pi{x}+\frac{\pi}{{3}}\right)}}} Explanation: \displaystyle{3}{\sin{\pi}}{x}+{3}{\left(\sqrt{{3}}\right)}{\cos{\pi}}{x} \displaystyle={6}{\left(\frac{{1}}{{2}}\times{\sin{\pi}}{x}+\frac{{\sqrt{{3}}}}{{2}}{\cos{\pi}}{x}\right)} ...

A difficulty of this equation is that it contains both \sin(x) and \cos(x). You can use the trigonometric identity \sin^2(x) + \cos^2(x) = 1 to express \sin(x) = \pm \sqrt{1 - \cos^2(x)} (or \cos(x) ...

\frac{\sin x-\cos x}{\sqrt2}=\sin\left(x-\frac\pi4\right) and 2\sin x\cos x=\sin2x, so you are solving \sin\left(x-\frac\pi4\right)=\sin2x. But \sin a=\sin b iff either b-a=2k\pi ...

You can take the negative sign common and shift it to RHS and divide it throughout by √2. So we will obtain (cosx-sinx)/√2 = -cosx = cos(pi - x) [Since cos^-1 is defined in the domain of 0 to pi, I am ...

\displaystyle\frac{\pi}{{6}} Explanation: Observe that if \displaystyle{\sin{{\left({x}\right)}}}={0} we can't have any solutions, since in those case \displaystyle{\cos{{\left({x}\right)}}}=\pm{1} ...

\begin{align*} \cos x- \sin x &= \sqrt{2} \sin x \\ \cos x &= \sqrt{2} \sin x + \sin x \\ \cos x &= \left( \sqrt{2} + 1\right) \sin x \\ \left( \sqrt{2} - 1\right) \cos x &= \left( \sqrt{2} - 1\right) \left( \sqrt{2} + 1\right) \sin x \\ \left( \sqrt{2} - 1\right) \cos x &= \left(2 - 1\right) \sin x \\ \left( \sqrt{2} - 1\right) \cos x &= \sin x \\ \sqrt{2} \cos x - \cos x &= \sin x \\ \sqrt{2} \cos x &= \sin x + \cos x \\ \cos x + \sin x &= \sqrt{2} \cos x \end{align*}