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hbghlyj
Posted at 2023-5-16 00:28:03
APPSYZY 发表于 2017-11-28 15:39
$(p \in \mathbf{Z}, q \in \mathbf{N})$.
注 3 (Kronecker-Чебышёв 定理) 对任意的无理数 $\alpha$ 以及数 $\beta$, 存在无限个整数 $p, q(p>$ $0)$, 使得 $|p a-q+\beta|<3 / p$. 由此结果可以证明: 对任意实数 $\beta$, 均存在整数列 $\left\{n_k\right\}$, 使得 $\sin n_k \rightarrow$ $\sin \beta(k \rightarrow \infty)$. 实际上, 取 $\alpha=2 \pi$, 以及 $p_k, q_k\left(p_k \rightarrow+\infty\right)$, 使得 $2 p_k \pi-q_k+\beta=o(1)(k \rightarrow \infty), q_k=2 p_k \pi+\beta+o(1)(k \rightarrow \infty)$.
Chebyshev´s theorem: The inequality $|x(k)-y|<3/k$ has infinitely many solutions, where $x(k)=x_0+k\alpha \pmod 1$, $\alpha$ is an irrational number, and $x_0,y\in S^1$. |
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zhcosin
Posted at 2017-11-27 11:23:23
![m0943[1].png](data/attachment/forum/202212/05/014302w0ud393pzy4gop3o.png "m0943[1].png")