\displaystyle{2}{x}^{{3}}-{10}{x}^{{2}}+{12}{x} Explanation: \displaystyle{\left({p}.{q}\right)}{\left({x}\right)} means you have to multiply the value of \displaystyle{p} by the value ...

\displaystyle{p}{\left({c}\right)}={0} Explanation: \displaystyle\text{to evaluate p(c) substitute }\ {x}={2}-\sqrt{{3}}\ \text{ into p(x)} \displaystyle\Rightarrow{p}{\left({\left({2}-\sqrt{{3}}\right)}\right)}={\left({\left({2}-\sqrt{{3}}\right)}\right)}^{{2}}-{4}{\left({\left({2}-\sqrt{{3}}\right)}\right)}+{1} ...

If You understand f to be a function on \mathbb{R} it is not invertible but the restrictions f|_{\mathbb{R}^{\leq 2}} and f|_{\mathbb{R}^{\geq 2}} are invertible with inverses g_1:\mathbb{R}^{\geq-4}\rightarrow \mathbb{R}^{\leq 2},x\mapsto 2-\sqrt{x+4} ...

Remember how you would evaluate a function for a known value: you replace the variable with the specif value and to the calculation, for example if you were to evaluate g(5), you would replace all ...

\displaystyle\lim_{{{x}\to{2}}}{\left({x}^{{2}}-{4}{x}+{23}\right)}={19} Explanation: \displaystyle{f{{\left({x}\right)}}}={\left({x}^{{2}}-{4}{x}+{23}\right)} is a polynomial and as such ...

See the entire solution process below: Explanation: To find \displaystyle{p}{\left(-{4}{x}\right)} we must substitute \displaystyle{\left(-{4}{x}\right)} for each occurrence of \displaystyle{\left({x}\right)} ...