Which is the 5-adic number$\sqrt{-1}$? Let $a$ and $b$ be defined by the following; $a = \cdots 431212$, $b = \cdots 013233$. $a$ and $b$ satisfy $x^2 + 1 = 0$ in base $5$. Which is the 5-adic integer $\sqrt{-1}$?...--prophetes.ai

Which is the 5-adic number$\sqrt{-1}$? Let $a$ and $b$ be defined by the following; $a = \cdots 431212$, $b = \cdots 013233$. $a$ and $b$ satisfy $x^2 + 1 = 0$ in base $5$. Which is the 5-adic integer $\sqrt{-1}$? If $a$ is the 5-adic integer $\sqrt{-1}$, $b$ is the 5-adic integer $ - \sqrt{-1}$? If $b$ is the 5-adic integer $\sqrt{-1}$, $a$ is the 5-adic integer $ - \sqrt{-1}$?

Either $a$ or $b$ can be used as $\sqrt{-1}$.