Let $X$ be a normed space of dimension > 1. Prove that each $\epsilon > 0$ exist $x,y \in X$ such that $\left \| x \right \| = \left \| y \right \| = 1 $ and $ 0< \left \| x-y \right \|< \epsilon$
2026-04-06 16:15:33.1775492133
Normed space of dimension $> 1$
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