Be careful on what you apply the lowering of operators. \begin{eqnarray} g_{\nu\delta, \beta} &=& \partial_{\beta}(g^{\mu\alpha}g_{\mu\delta} g_{\nu\alpha})\\ &=& g^{\mu\alpha}_{,\beta}g_{\mu\delta} ...

g^{\alpha\beta} is symmetric in \alpha and \beta, while R_{\alpha\beta\gamma\mu} is anti-symmetric in \alpha and \beta, so the contraction g^{\alpha\beta}R_{\alpha\beta\gamma\mu} is ...

solving the equation we get x_1=1 and x_2=\frac{1}{3} thus we have \alpha^3=1 and \beta^3=\frac{1}{27} and our equation is given by (x-1)(x-1/27)=0 therefore we get 27x^2-28x+1=0 the ...

As commented, we consider the roots of P(x)=1 and P(x)=-1. If the roots are from solely one of the equations, then we are done. Now suppose that the roots are from both equations. We can imagine ...

In order to get rid of the quadratic terms we write \alpha:=a+2, \beta:=b+2. Then 1=\alpha^3-6\alpha^2+13\alpha=(a+2)^3-6(a+2)^2+13(a+2)=a^3+a+10\ , and similarly 19=\beta^3-6\beta^2+13\beta=b^3+b+10\ . ...

By homogeneity, it suffices to consider the case \beta = 1. Moreover, f(\alpha, 1) \ge 0, so it suffices to consider N=2. If \eqalign{h(\alpha) &= 2 (2 \alpha^4 - 6 \alpha^3 + 9 \alpha^2 - 8 \alpha + 3) - (\alpha^4 - 6 \alpha^3 + 12 \alpha^2 - 10 \alpha + 3) \cr &= 3\,{\alpha}^{4}-6\,{\alpha}^{3}+6\,{\alpha}^{2}-6\,\alpha+3} ...