=\lim_{\Delta x\to 0} {\sqrt{9-4(x_1 +\Delta x)} - \sqrt{9-4x_1}\over \Delta x} \\ \neq \lim_{\Delta x\to 0}{\sqrt{9-4x_1-4\Delta x -9 +4x_1}\over \Delta x} You made the mistake of taking the ...

See below. Explanation: The limit definition of the derivative is given by: \displaystyle{f{{\left({x}\right)}}}=\lim_{{{h}\to{0}}}\frac{{{f{{\left({x}+{h}\right)}}}-{f{{\left({x}\right)}}}}}{{h}} ...

Noah G Sep 3, 2017 This is asking us to use the formula \displaystyle{f}'{\left({x}\right)}=\lim_{{{h}\to{0}}}\frac{{{f{{\left({x}+{h}\right)}}}-{f{{\left({x}\right)}}}}}{{h}} . \displaystyle{f}'{\left({x}\right)}=\lim_{{{h}\to{0}}}\frac{{\sqrt{{-{4}{\left({x}+{h}\right)}-{4}}}-\sqrt{{-{4}{x}-{4}}}}}{{h}} ...

Domain : \displaystyle{x}\in{\left(-\infty,{3}\right]} Range : \displaystyle{y}\in{\left[{0},\infty\right)} See the illustrative semi-parabola graph. Explanation: \displaystyle{y}=\sqrt{{{x}-{3}}}\ge{0} ...

\displaystyle{y}'=\frac{{4}}{{{3}{\sqrt[{{3}}]{{{\left({4}{x}-{1}\right)}^{{2}}}}}}} Explanation: \displaystyle{y}'=\frac{{1}}{{{3}{\sqrt[{{3}}]{{{\left({4}{x}-{1}\right)}^{{2}}}}}}}\cdot{4}=\frac{{4}}{{{3}{\sqrt[{{3}}]{{{\left({4}{x}-{1}\right)}^{{2}}}}}}}

Atharva Joshi Oct 7, 2017