1 人解决，12 人已尝试。
1 份提交通过，共有 20 份提交。
9.9 EMB 奖励。
单点时限: 5.0 sec
内存限制: 256 MB
The Frobenius problem is an old problem in mathematics, named after the German mathematician G.frobenius (1849-1917).
Let a1 , a2 , … , an be integers lager than 1, with greatest common divisor (gcd) 1. Then it is known that there are finitely many integers larger than or equal to 0, that cannot be expressed as a linear combination w1 a1 + w2 a2 + … + wn an using integer coefficients wi >= 0. The largest of such nonnegative integers is known as the Frobenius number of a1 , a2 , … , an (denoted by F(a1 , a2 , … , an )). So: F(a1 , a2 , … , an ) is the largest nonnegative integer that cannon be expressed as nonnegative linear combination of a1 , a2 , … , an.
For n = 2 there is a simple formula for F(a1 , a2). However, for n >= 3 it is much more complicated. For n = 3 only for some special choices of a1 , a2 , a3 formulas exist. For n >= 4 no formulas are known at all.
We will consider here the Frobenius problem for n = 4. In this case our version of the problem can be formulated as follows. Let four integers a, b, c, and d be given, with a, b, c, d > 1 and gcd(a, b, c, d) = 1. we want to know two things.
How many nonnegative integers less than or equal 1,000,000 cannot be expressed as a nonnegative integer linear combination of the values a, b, c, and d ?
Is the Frobenius number of a, b, c, and d less than or equal to 1,000 ,000 and if so, what is its value ?
The first line of the input file contains a single number: the number of test cases has the following format:
For every test case in the input file, the output should contain teo lines.
The first line contains the number of integers between 0 and 1,000,000 (boundaries included) that cannot be expressed as aw+bx+cy+dz, where w, x, y, z are nonnegative (meaning >= 0) integers.
The second line contains the Frobenius number if this is less or equal to 1,000,000 and otherwise -1, meaning that the Frobenius bunber of a, b, c and d is larger than 1,000,000.
3 8 5 9 7 5 8 5 5 1938 1939 1940 1937
6 11 14 27 600366 -1
1 人解决，12 人已尝试。
1 份提交通过，共有 20 份提交。
9.9 EMB 奖励。