\displaystyle{s}{l}{o}{p}{e}=-\frac{{1}}{{0}}=-\infty Explanation: the given \displaystyle\sqrt{{{y}\cdot{e}^{{{x}-{y}}}}}={C} at \displaystyle{\left(-{2},{1}\right)} squaring both ...

\displaystyle\frac{{\left.{d}{y}\right.}}{{\left.{d}{x}\right.}}=\frac{{{y}{\left({x}-{5}\right)}}}{{{2}{\left({x}+{1}\right)}{\left({x}-{2}\right)}{\left({y}-{1}\right)}}} . Explanation: Let us ...

\displaystyle\nabla{f{{\left({x},{y}\right)}}}={\left(\frac{{{e}^{{{x}-{y}^{{2}}}}-{2}{x}{y}^{{2}}}}{{{2}\sqrt{{{e}^{{{x}-{y}^{{2}}}}-{\left({x}{y}\right)}^{{2}}}}}},\frac{{-{2}{y}{e}^{{{x}-{y}^{{2}}}}-{2}{x}^{{2}}{y}}}{{{2}\sqrt{{{e}^{{{x}-{y}^{{2}}}}-{\left({x}{y}\right)}^{{2}}}}}}\right)} ...

For all x≥0 sint*e^{t}=y ------------------------------1 cost*e^{t}=x   -------------------------------2        dy/dx=(sint*e^{t}+cost*e^{t}) dt/dx -----------3 ( from 1) ...

Note that we have \cosh y=\frac{e^y+e^{-y}}{2}=x So we have by multiplying 2e^{y} on each side, e^{2y}-2xe^{y}+1=0 Setting e^{y}=t and applying the quadratic formula, we have that e^{y}=x \pm \sqrt{x^2-1} ...

You have the right idea for the second part, but you need to be much more precise to obtain a rigorous proof. Suppose \,\sqrt{XY} = A/B\in \Bbb Q.\, Wlog we may assume that \,A/B\, is reduced, ...