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$\bf命题2:$设正项级数$\sum\limits_{n = 1}^\infty {{a_n}} $收敛,则存在发散到正无穷大的数列$\left\{ {{b_n}} \right\}$,使得级数$\sum\limits_{n = 1}^\infty {{a_n}{b_n}} $仍收敛
证明:令${r_n} = \sum\limits_{m = n}^\infty {{a_m}} $,则${r_n} \to 0\left( {n \to \infty } \right)$,由于
\[\frac{{{a_n}}}{{\sqrt {{r_n}} }} = \frac{{{r_n} - {r_{n + 1}}}}{{\sqrt {{r_n}} }} = \frac{{\left( {\sqrt {{r_n}} + \sqrt {{r_{n + 1}}} } \right)\left( {\sqrt {{r_n}} - \sqrt {{r_{n + 1}}} } \right)}}{{\sqrt {{r_n}} }} \le 2\left( {\sqrt {{r_n}} - \sqrt {{r_{n + 1}}} } \right)\]
而级数$\sum\limits_{n = 1}^\infty {2\left( {\sqrt {{r_n}} - \sqrt {{r_{n + 1}}} } \right)}$收敛,所以由比较判别法知级数$\sum\limits_{n = 1}^\infty {\frac{{{a_n}}}{{\sqrt {{r_n}} }}} $收敛,取${b_n} = \frac{1}{{\sqrt {{r_n}} }}$,则命题成立