Farmer John wants to repair a small length of the fence around the pasture. He measures the fence and finds that he needs $N\ (1≤N≤20,000)$ planks of wood, each having some integer length $L_i\ (1≤Li≤50,000)$ units. He then purchases a single long board just long enough to saw into the $N$ planks (i.e., whose length is the sum of the lengths Li). FJ is ignoring the "kerf", the extra length lost to sawdust when a sawcut is made; you should ignore it, too.
FJ sadly realizes that he doesn't own a saw with which to cut the wood, so he mosies over to Farmer Don's Farm with this long board and politely asks if he may borrow a saw.
Farmer Don, a closet capitalist, doesn't lend FJ a saw but instead offers to charge Farmer John for each of the $N-1$ cuts in the plank. The charge to cut a piece of wood is exactly equal to its length. Cutting a plank of length $21$ costs $21$ cents.
Farmer Don then lets Farmer John decide the order and locations to cut the plank. Help Farmer John determine the minimum amount of money he can spend to create the N planks. FJ knows that he can cut the board in various different orders which will result in different charges since the resulting intermediate planks are of different lengths.

Line 1: One integer $N$, the number of planks
Lines 2..N+1: Each line contains a single integer describing the length of a needed plank

One integer: the minimum amount of money he must spend to make $N−1$ cuts

34

He wants to cut a board of length $21$ into pieces of lengths $8, 5, 8$.The original board measures $8+5+8=21$.
The first cut will cost $21$, and should be used to cut the board into pieces measuring $13$ and $8$.
The second cut will cost $13$, and should be used to cut the $13$ into $8$ and $5$. This would cost $21+13=34$. If the $21$ was cut into $16$ and $5$ instead, the second cut would cost $16$ for a total of $37$ (which is more than $34$).