You correctly applied the definition of the "xy-plane" in your first approach, but not in the second. A point (x,y,z) is on the xy-plane if and only if z = 0. As such, our system of ...

I think a reconsideration should be made from Eq.(3) above and what is after that. Our surface can be parameterized by any other two parameters ( I don't know that why notes and books on the ...

The idea is that the modified dynamics slows down the solutions of the first dynamics when such a solution approaches \partial\Omega and/or accelerates too much, so that the maximal interval of ...

Suppose z = w this will maximize zw (relative to xy) z = w = \frac {x+y}{2} zw = \frac {x^2 + y^2 + 2xy}{4} = 2xy\\ x^2 + y^2 - 6xy = 0 divide through by y (\frac {x}{y})^2 - 6\frac {x}{y} + 1 = 0 ...

The usual way that change of variables is stated is Theorem (Rogawski Fundamentals of Calculus \S16.6) Let G: \mathcal{D}_0 \to \mathcal{D} be a C^1 mapping that is one-to-one on the interior ...

(see figure 1 below) Let us rewrite the 3 line equations under the equivalent form : (L_1) \ \left\{ \begin{array}[ccc] .(2-z)y &=& zx \\ \ \ z& =& 0 \end{array} \right. , \ \ \ \ \ (L_2) \ \left\{ \begin{array}[rcc] .(2-z)y &= &zx \\ \ \ z& =& 1 \end{array} \right., \ \ \ \ \ (L_3) \ \left\{ \begin{array}[rcc] .(2-z)y& =& zx \\ \ \ z &=& 2 \end{array} \right. ...