It is faster to exploit Gaussian elimination: \begin{eqnarray*} \det\begin{pmatrix}1 & a^2+bc & a^3 \\ 1 &b^2 +ac & b^3 \\ 1 & c^2+ab & c^3\end{pmatrix}&=&\det\begin{pmatrix}1 & a^2+bc & a^3 \\ 0 &(b-a)(a+b-c) & (b-a)(b^2+ba+a^2) \\ 0 & (c-a)(a+c-b) & (c-a)(c^2+ca+a^2)\end{pmatrix}\\[0.2cm]&=&(b-a)(c-a)\det\begin{pmatrix}1 & a^2+bc & a^3 \\ 0 &a+b-c & b^2+ba+a^2 \\ 0 & a+c-b & c^2+ca+a^2\end{pmatrix} \\[0.2cm]&=&(b-a)(c-a)\det\begin{pmatrix} a+b-c & b^2+ba+a^2 \\ a+c-b & c^2+ca+a^2\end{pmatrix}\\[0.2cm]&=&(b-a)(c-a)\det\begin{pmatrix} a+b-c & b^2+ba+a^2 \\ 2(c-b) & (c-b)(a+b+c)\end{pmatrix}\\[0.2cm]&=&(b-a)(c-a)(c-b)\det\begin{pmatrix} a+b-c & b^2+ba+a^2 \\ 2 & a+b+c\end{pmatrix}\end{eqnarray*} ...

To prove this equation non-negative, you will have to convert the equation in terms of perfect square form containing a,b and c. Now, a²+b²+c²-ab-bc-ca  = ½ • ( 2a²+2b²+2c²-2ab-2bc -2ca )  = ½ • ( ...

A + B + C = 3 ​

See the proof below Explanation: If \displaystyle{a}+{b}+{c}={0} Then, \displaystyle{a}=-{b}-{c}=-{\left({b}+{c}\right)} Therefore, \displaystyle{a}^{{2}}-{b}{c}={\left(-{\left({b}+{c}\right)}\right)}^{{2}}-{b}{c}={\left({b}+{c}\right)}^{{2}}-{b}{c} ...

Hint: The lines will be perpendicular to the surface normal at P. That means they must lie in the tangent plane at P. Analyzing your attempt: You have the right plane. And you are right that the ...

I saw this problem in AoPS but didn't solve it because it was bashy. Anyways.. If Lagrange Multipliers is banned, what we can do is set \sqrt{2}a+\sqrt{2}b+3c=k, and with a-b+c=3, we can write a=\frac{k+3\sqrt{2}-(3+\sqrt{2})c}{2\sqrt{2}}, b=-3+\frac{k+3\sqrt{2}-(3+\sqrt{2})c}{2\sqrt{2}}+c ...