I tried this: Explanation: You substitute your function with \displaystyle{x}+{2} instead of \displaystyle{x} to get: \displaystyle{3}{\left[{\left({\left({x}+{2}\right)}^{{3}}+{2}{\left({x}+{2}\right)}^{{2}}-{4}\right)}\right]}= ...

F(0) = 2 F(-1) = 7 F(2) = 4 Explanation: Notice where the x's are in the function F(x) For F(0) you sub in 0 wherever there is an x, ie: F(0) = \displaystyle{2}{\left({0}\right)}^{{2}}-{3}{\left({0}\right)}+{2} ...

The complex roots of the first equation satisfy x^2+x+1=0. What are the roots of this equation, and how do their powers behave?

Check that \displaystyle{f{{\left({x}\right)}}} is continuous & differentiable on the interval. Find the values of \displaystyle{c} (see below). \displaystyle{c}=\pm\sqrt{{\frac{{4}}{{3}}}}=\pm{1.1547}\ldots ...

They are \displaystyle\pm\sqrt{{\frac{{{15}\pm{6}\sqrt{{5}}}}{{10}}}} Explanation: The domain of \displaystyle{f} is all real numbers. \displaystyle{f}'{\left({x}\right)}={5}{x}^{{4}}-{15}{x}^{{2}}+{2} ...

f'(x)=9x^2+4x f'(x)=3x^2+2x f'(x)=0 f'(x)=12x^2+6x