Show that if $p _ { n } = o \left( \frac { 1 } { n ^ { 2 } } \right)$ in the neighborhood of $+ \infty$, then $\lim _ { n \rightarrow + \infty } \mathbf { P } \left( A _ { n } > 0 \right) = 0$.
Show that if $p _ { n } = o \left( \frac { 1 } { n ^ { 2 } } \right)$ in the neighborhood of $+ \infty$, then $\lim _ { n \rightarrow + \infty } \mathbf { P } \left( A _ { n } > 0 \right) = 0$.