[ RooTeR @ 06.02.2005. 08:44 ] @
Citat: Arithmetic Progressions An arithmetic progression is a sequence of the form a, a+b, a+2b, ..., a+nb where n=0,1,2,3,... . For this problem, a is a non-negative integer and b is a positive integer. Write a program that finds all arithmetic progressions of length n in the set S of bisquares. The set of bisquares is defined as the set of all integers of the form p2 + q2 (where p and q are non-negative integers). PROGRAM NAME: ariprog INPUT FORMAT Line 1: N (3 <= N <= 25), the length of progressions for which to search Line 2: M (1 <= M <= 250), an upper bound to limit the search to the bisquares with 0 <= p,q <= M. SAMPLE INPUT (file ariprog.in) 5 7 OUTPUT FORMAT If no sequence is found, a singe line reading `NONE'. Otherwise, output one or more lines, each with two integers: the first element in a found sequence and the difference between consecutive elements in the same sequence. The lines should be ordered with smallest-difference sequences first and smallest starting number within those sequences first. There will be no more than 10,000 sequences. SAMPLE OUTPUT (file ariprog.out) 1 4 37 4 2 8 29 8 1 12 5 12 13 12 17 12 5 20 2 24 E sad, meni prolaze prvih 6 primera, a ima ih ukupno 9 ili 10. Sve zivo shto mi je palo na pamet sam probao, i nishta ne prolazi. Chak sam pogledao i njihovo reshenje, ni ono ne prolazi. Ogranichenje je 1 sekunda :( |