we must dicuss it ,I think we can use cos law or INDUCTION

Hmmm, isn't it easy or I miss something $?$ Let vertice of convex polygon $P$ are $A_1,A_2,...,A_n$ (In this order.) We need to show that $2P_1\geq P_0$ which is equivalent to $A_1A_3+A_2A_4+A_3A_5+...+A_nA_2\geq A_1A_2+A_2A_3+...+A_nA_1$ Let $A_iA_{i+2}\cap A_{i-1}A_{i+1}=B_i$ for all $i=1,2,...,n$ (consider in modulo $n$) We get $A_1A_3+A_2A_4+A_3A_5+...+A_nA_2 \geq \sum_{i=1}^{n}{\Big( B_iA_i+B_iA_{i+1}\Big)} >\sum_{i=1}^{n}{A_iA_{i+1}}=LHS$, so we are done.