# Dynamic programming: minimum price for translating a number of books [closed]

We have N books ( `N<=200` ). All of them must be translated by K people (`K<=100`). Every man can translate D books starting from index S to index S+D-1, 0<=D<=N. Every man is paid c_1 dolars per page for the first book which he translates, c_2 for the second...

``````c_i for the book i.
0<=c_i<10000
``````

The books must be translated in the order they are given.

input:
first row: 2 numbers N and K
second row: N numbers - number of pages per every book (<=10 000)
third row: N numbers - c_1, c_2, ... c_N; c_i is the price for translating a book by a man who has translated i-1 books;

output:
minimum price which must be paid for the translation of all the books.

Example:
Input:
6 3
50 100 60 5 6 30
1 2 3 4 5 6

Output: 339
(the first man translated the first book +50*1 the scond man translated the second,third,forth and fifth books: +100*1+60*2+5*3+6*4 the third man translates the last book +30*1 =339)
Can someone help me with this homework? I know i must be using dynamic programming to solve it.

-
what have you tried? –  Ivaylo Strandjev May 31 '12 at 12:39

## closed as not a real question by Makoto, casperOne♦Jun 2 '12 at 18:50

It's difficult to tell what is being asked here. This question is ambiguous, vague, incomplete, overly broad, or rhetorical and cannot be reasonably answered in its current form. For help clarifying this question so that it can be reopened, visit the help center.If this question can be reworded to fit the rules in the help center, please edit the question.

Some clues: make a function F(BookNumber, ManNumber, NumOfBooksHeHaveTranslated).

``````F(1, 1, 0) = Pages[1] * C[1] + Min(F(2, 1, 1), F(2, 2, 0))
``````

i.e. we have to choose the best variant from - continue with the same translator, or use the next one. Elaborate this function for common case F(B, M, N), make recursive solution, check it for small inputs, transform recursion into DP (the methods are described in algo books)

-