Show that \[ \min \{ |PA|, |PB|, |PC| \} + |PA| + |PB| + |PC| < |AB|+|BC|+|CA| \] if $P$ is a point inside $\triangle ABC$.
Source: Turkey TST 2004 - P2
Tags: geometry proposed, geometry
Show that \[ \min \{ |PA|, |PB|, |PC| \} + |PA| + |PB| + |PC| < |AB|+|BC|+|CA| \] if $P$ is a point inside $\triangle ABC$.