prove

ertyu · 09.07.2013, 23:18

1.Let $z \in {C^ * }$ such that $\left| {{z^3} + \frac{1}{{{z^3}}}} \right| \le 2$ . prove that $\left| {z + \frac{1}{z}} \right| \le 2$

2.Find all non-negative numbers x, y, z, such that .
$\sqrt{x-y+z}=\sqrt{x}-\sqrt{y}+\sqrt{z}$

3. Solve the following equation

Руст · 10.07.2013, 06:17

1. Let $z+\frac 1z=re^{i\phi}$ , then $|z^3+z^{-3}|=|r^3e^{i3\phi}+3re^{i\phi}|\ge r(r^2-3)> 2$ if $r>2$ .

2. It is true, if $x=y$ or $y=z$ .

3. $x=3$ is solution. If $x>3$ right side $<1<x-2$ . If $x<3$ right side $>1>x-2$ .

Научный форум dxdy

prove