#648. 1652. [Usaco2006 Feb]Treats for the Cows

1652. [Usaco2006 Feb]Treats for the Cows

#1652. [Usaco2006 Feb]Treats for the Cows

题目描述

FJ has purchased N (1 <= N <= 2000) yummy treats for the cows who get money for giving vast amounts of milk. FJ sells one treat per day and wants to maximize the money he receives over a given period time. The treats are interesting for many reasons: * The treats are numbered 1..N and stored sequentially in single file in a long box that is open at both ends. On any day, FJ can retrieve one treat from either end of his stash of treats. * Like fine wines and delicious cheeses, the treats improve with age and command greater prices. * The treats are not uniform: some are better and have higher intrinsic value. Treat i has value v(i) (1 <= v(i) <= 1000). * Cows pay more for treats that have aged longer: a cow will pay v(i)*a for a treat of age a. Given the values v(i) of each of the treats lined up in order of the index i in their box, what is the greatest value FJ can receive for them if he orders their sale optimally? The first treat is sold on day 1 and has age a=1. Each subsequent day increases the age by 1.

约翰经常给产奶量高的奶牛发特殊津贴,于是很快奶牛们拥有了大笔不知该怎么花的钱.为此,约翰购置了N(1≤N≤2000)份美味的零食来卖给奶牛们.每天约翰售出一份零食.当然约翰希望这些零食全部售出后能得到最大的收益.这些零食有以下这些有趣的特性:

•零食按照1..N编号,它们被排成一列放在一个很长的盒子里.盒子的两端都有开口,约翰每

天可以从盒子的任一端取出最外面的一个.

•与美酒与好吃的奶酪相似,这些零食储存得越久就越好吃.当然,这样约翰就可以把它们卖出更高的价钱.

•每份零食的初始价值不一定相同.约翰进货时,第i份零食的初始价值为Vi(1≤Vi≤1000).

•第i份零食如果在被买进后的第a天出售,则它的售价是vi×a.

Vi的是从盒子顶端往下的第i份零食的初始价值.约翰告诉了你所有零食的初始价值,并希望你能帮他计算一下,在这些零食全被卖出后,他最多能得到多少钱.

输入格式

  • Line 1: A single integer,

N * Lines 2..N+1: Line i+1 contains the value of treat v(i)

输出格式

  • Line 1: The maximum revenue FJ can achieve by selling the treats

样例

样例输入

5  

1  

3  

1  

5  

2  

  

Five treats. On the first day FJ can sell either treat #1 (value 1) or  

treat #5 (value 2).  

样例输出

43  

  

OUTPUT DETAILS:  

  

FJ sells the treats (values 1, 3, 1, 5, 2) in the following order  

of indices: 1, 5, 2, 3, 4, making 1x1 + 2x2 + 3x3 + 4x1 + 5x5 = 43.  

数据范围与提示