Domain for \displaystyle{h}{\left({x}\right)} is \displaystyle{x}\le-{4} and \displaystyle{x}\ge{4} . Range for \displaystyle{h}{\left({x}\right)} is \displaystyle{\left(-\infty,-{3}\right)} ...

It is \displaystyle{f}'{\left(-{1}\right)}=-\frac{{5}}{{{2}\sqrt{{3}}}} Explanation: The rate of change is the value of the first derivative of the function \displaystyle{f{{\left({x}\right)}}} ...

Domain: \displaystyle{\left(-\infty,+\infty\right)} Explanation: Since you're dealing with the square root of an expression, you know that you need to exclude from the domain of the function any ...

\displaystyle{2}{y}+{4}{x}-{3}={0} and \displaystyle{y}=-\frac{{3}}{{2}} Explanation: \displaystyle{h}{\left({x}\right)}={y}=\sqrt{{{x}^{{2}}-{3}{x}}}-{x} \displaystyle{y}+{x}=\sqrt{{{x}^{{2}}-{3}{x}}} ...

See explanation. Explanation: The given function has an expression under square root sign. A square root can only be calculated if the value under square root sign is positive or zero. So to ...

\displaystyle{f}'{\left({4}\right)}=\frac{{28}}{{{2}\sqrt{{66}}}}={1.72328} . Explanation: The instantaneous rate of change at a point is equivalent to the derivative evaluated at that point. We ...