证明数列为等差

等待hxh · Post time 2014-12-10 21:40

战巡 · Post time 2014-12-11 06:25

回复 1# 等待hxh

令$n=1$
\[\abs{a_{m+1}-a_m-a_1}<\frac{1}{m+1}\]
令$a_{m+1}-a_m=d_m$
\[\abs{d_m-a_1}<\frac{1}{m+1}\]
\[0<\lim_{m\to \infty}\abs{d_m-a_1}<\lim_{m\to \infty}\frac{1}{m+1}=0\]
\[\lim_{m\to \infty}d_m=a_1\]
于是
\[\abs{a_{m+n}-a_m-a_n}=\abs{d_m+d_{m+1}+...+d_{m+n-1}-a_n}\]
\[0<\lim_{m\to \infty}\abs{a_{m+n}-a_m-a_n}=\abs{na_1-a_n}<\lim_{m\to \infty}\frac{1}{m+n}=0\]
\[a_n=na_1\]

wzxsjz · Post time 2014-12-12 10:55

回复 2# 战巡

能取极限？

wzxsjz · Post time 2014-12-12 11:07

哦，可以，夹击

爪机专用 · Post time 2014-12-12 12:36

夹逼

巭孬嫑夯昆 · Post time 2014-12-12 13:05

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[数列] 证明数列为等差