Your quadratic is right: you must have in fact r^2-2r+(1+z^2)=0\iff r=1\pm\sqrt{1-(1+z^2)} and because you are interested in real solutions the only possibility is z=0 Thus r=1\Rightarrow (x,y,z)=(1,1,0)

\displaystyle{y}'=-\frac{{{y}}}{{{\left({x}-{y}\right)}}} Explanation: Use implicit differentiation: \displaystyle{2}{x}{y}-{y}^{{2}}={1} \displaystyle{D}{\left({2}{x}{y}-{y}^{{2}}\right)}={D}{\left({1}\right)} ...

\displaystyle\frac{{{\left.{d}{y}\right.}}}{{{\left.{d}{x}\right.}}}=\frac{{y}}{{{y}-{1}}} Explanation: Given \displaystyle{\left(\text{XXX}\right)}{\left({2}{x}{y}\right)}-{\left({y}^{{2}}\right)}={3} ...

No one can be zero. So, in that surface, z^2=2/xy. Now, by AM-GM x^2+y^2+z^2=x^2+y^2+\frac{2}{xy}\geq2xy +\frac{2}{xy}\geq 2\sqrt{4}=4. Study the conditions for the equality to happen and show ...

Let F = (f_1, \dots, f_5)\in S^5 then F is a Gröbner basis of the ideal I = \langle f_1, \dots, f_5 \rangle if and only if every syzygy (g_1, \dots, g_5) of the leading monomial \mathop{LM}(I) ...

It sounds like you've been taught more from a pure differential geometry perspective, taking about curves on manifolds and such. I'll try to connect some of the disparate notions here into a coherent ...