Inverse function: \displaystyle{{f}^{{-{{1}}}}{\left({x}\right)}}=\frac{{1}}{{6}}{x}-\frac{{3}}{{2}} When \displaystyle{x}={21},{f{{\left({21}\right)}}}={135} When \displaystyle{{f}^{{-{{1}}}}{\left({135}\right)}}={21} ...

This means to plug function h in the place of x into f. Explanation: \displaystyle{f{{\left({h}{\left({x}\right)}\right)}}}=-{3}{\left({6}{x}+{2}\right)}^{{2}}-{8} \displaystyle{f{{\left({h}{\left({x}\right)}\right)}}}=-{3}{\left({36}{x}^{{2}}+{24}{x}+{4}\right)}-{8} ...

Do both compositions. Explanation: \displaystyle{f{{\left({g{{\left({x}\right)}}}\right)}}}={f{{\left({6}{x}+{2}\right)}}}={2}{\left({6}{x}+{2}\right)}+{3}={12}{x}+{7} \displaystyle{g{{\left({f{{\left({x}\right)}}}\right)}}}={g{{\left({2}{x}+{3}\right)}}}={6}{\left({2}{x}+{3}\right)}+{2}={12}{x}+{20}

\displaystyle{f{{\left(-{2}\right)}}}={4} Explanation: \displaystyle{f{{\left({x}\right)}}}=-{x}+{2} \displaystyle{f{{\left(-{2}\right)}}}=-{\left(-{2}\right)}+{2} \displaystyle{f{{\left(-{2}\right)}}}={2}+{2} ...

\displaystyle{f{{\left({\left(-{1}\right)}\right)}}}={0} Explanation: To solve \displaystyle{f{{\left(-{1}\right)}}} you need to substitute \displaystyle{\left(-{1}\right)} for every ...

The inverse function is \displaystyle{y}=\frac{{{x}-{2}}}{{4}} . Explanation: First, lets rewrite the equation like this: \displaystyle{y}={4}{x}+{2} In order to find the inverse of an ...