We have a^{1/4} + b^{1/4} + c^{1/4} =0 \Rightarrow (a^{1/4} + b^{1/4} + c^{1/4})^2 = a^{1/2}+b^{1/2} + c^{1/2} + 2 [(ab)^{1/4}+(bc)^{1/4}+(ac)^{1/4}]=0 \Rightarrow a^{1/2}+b^{1/2}+c^{1/2}=-2 [(ab)^{1/4}+(bc)^{1/4}+(ac)^{1/4}] ...

Let a=y+z, b=x+z and c=x+y. Hence, x, y and z are positives and we need to prove that: \sum\limits_{cyc}\sqrt{2x^2+y^2+z^2+2xy+2xz}\leq(2+\sqrt2)(x+y+z) By C-S \left(\sum\limits_{cyc}\sqrt{2x^2+y^2+z^2+2xy+2xz}\right)^2\leq\sum\limits_{cyc}\frac{2x^2+y^2+z^2+2xy+2xz}{\sqrt2x+y+z}\sum\limits_{cyc}(\sqrt2x+y+z) ...

continuing from your method: AB=2b and AM=MB=\sqrt{a^2+b^2} Now Ar(\Delta ABM)=ab=r_{ABM}\times s_{ABM}=4\frac{(2b+2\sqrt{a^2+b^2})}{2} So ab=4(b+\sqrt{a^2+b^2}) \tag{1} and from your ...

These two terms are indeed the same, however the problem is already present in the first expression, but hiffen a bit. In the case t=0 your first expresiion becomes \frac00, which is not equal to ...

By C-S \sum_{cyc}\frac{1}{\sqrt{3(2a^2+b^2)}}=\sum_{cyc}\frac{1}{\sqrt{(2+1)(2a^2+b^2)}}\leq\sum_{cyc}\frac{1}{2a+b}\leq\frac{1}{9}\sum_{cyc}\left(\frac{2^2}{2a}+\frac{1^2}{b}\right)= =\frac{1}{3}\sum_{cyc}\frac{1}{a}\leq\sqrt{\frac{1}{3}\sum_{cyc}\left(\frac{7}{a^2}-\frac{6}{ab}\right)}=\sqrt{\frac{2015}{3}}. ...

Answer 1: Your thoughts are correct. Answer 2: If the signal of both sides are equal, then the step of squaring both sides (say, the first step in your proof) is invertible. Answer 3: The way the ...