Your approach by polar coordinates is correct. Let x=r\cos \theta, y=r\sin \theta, then the first equation gives integrating area, while the second and third equation give the lower and upper ...

Notice that you can write your polynomial as x^n((y/x)^n-1), so we can look for factorizations of t^n-1 and then substitute. Over the integers or the rational numbers, we have a complete answer. ...

Of course, nothing prevents you from taking \eta = y in this parabolic equation. You must make sure that the transformation (x,y) \to (\xi,\eta) is not 'degenerate' or 'singular' (sorry if I'm not ...

Let C(k) be the claim that there exists a polynomial P_k(x,y) in x, y such that x^{2k} - y^{2k} = (x+y)P_k(x,y). Then a proof by induction might be as follows. For k = 0, we have x^0 - y^0 = 0 = (x+y) P_0(x,y) ...

You can obtain the solutions by reasoning. Suppose \lambda=0, then y=-\mu and x=-\nu. Then y=\mu=0 and x=\nu=0 due to nonnegativity. Thus we obtain one point that satisfies the KKT ...

Here is a general recipe for a polynomial whose level set is an n-torus in \mathbb R^3. First, take the polynomial \begin{align}f(x) &= \prod_{i=1}^n (x-(i-1))(x-i) \\ &= x(x-1)^2(x-2)^2\cdots(x-(n-1))^2(x-n)\end{align} ...