The Soln. Set is \displaystyle{\left\lbrace{0},\frac{\pi}{{2}},\pi,{3}\frac{\pi}{{2}}\right\rbrace} . Explanation: We recall that, \displaystyle{\sin{{3}}}{x}={3}{\sin{{x}}}-{4}{{\sin}^{{3}}{x}} ...

\displaystyle\text{The Exp.}={2}{\sin{{x}}}{\left\lbrace{2}+{5}{\cos{{x}}}{\left({3}-{16}{{\sin}^{{2}}{x}}+{16}{{\sin}^{{4}}{x}}\right)}\right\rbrace} . Explanation: \displaystyle\text{The Expression}={4}{\sin{{x}}}+{5}{\sin{{6}}}{x} ...

Amplitude =1, Period = \displaystyle\frac{{{2}\pi}}{{3}} , Horizontal shift= 0, Vertical shift =7 Explanation: Write the function in the standard form y= A sin B(x-C) +D, to get A as amplitude, ...

Domain: \displaystyle{x}\in{\left[-\frac{{2}}{{3}},{0}\right]} Range: \displaystyle{y}\in{\left[-\frac{\pi}{{2}},\frac{\pi}{{2}}\right]} Explanation: It is easy if you treat it as a ...

I found: \displaystyle{3}{\cos{{\left({3}{x}+{1}\right)}}} Explanation: First you differentiate the \displaystyle{\sin} as it is (in red) and then the argument (in blue) and multiply ...

see below Explanation: \displaystyle{\sin{{x}}}+{2}={3} \displaystyle{\sin{{x}}}={3}-{2} \displaystyle{x}={{\sin}^{{-{{1}}}}{\left({1}\right)}}= \displaystyle{x}=\frac{\pi}{{2}}+{2}\pi{n}