HDU A - Shell Pyramid
Description
In the 17th century, with thunderous noise, dense smoke and blazing fire, battles on the sea were just the same as those in the modern times. But at that time, the cannon ,were extremely simple. It was just like an iron cylinder, with its rearward end sealed and forward end open. There was a small hole at the rearward end of it, which was used to install the fuse. The cannons on the warships were put on small vehicles which had four wheels and the shells were iron spheres with gunpowder in them.
At that time, it was said that there was an intelligent captain, who was also a mathematician amateur. He liked to connect everything him met to mathematics. Before every battle, he often ordered the soldiers to put the shells on the deck and make those shells to form shell pyramids.
Now let's suppose that a shell pyramid has four layers, and there will be a sequence of ordinal numbers in every layer. They are as the following figure:
In the figure, they are the first layer, the second layer, the third layer and the fourth layer respectively from the left to the right.
In the first layer, there is just 1 shell, and its ordinal number is 1. In the second layer, there are 3 shells, and their ordinal numbers are 1, 2, and 3. In the third layer, there are 6 shells, and their ordinal numbers are 1, 2, 3, 4, 5, and 6. In the fourth layer, there are 10 shells, and their ordinal numbers are shown in the figure above.
There are also serial numbers for the whole shell pyramid. For example, the serial number for the third shell in the second layer is 4, the serial number for the fifth shell in the third layer is 9, and the serial number for the ninth shell in the fourth layer is 19.
There is also a interrelated problem: If given one serial number s, then we can work out the s th shell is in what layer, what row and what column. Assume that the layer number is i, the row number is j and the column number is k, therefore, if s=19, then i=4, j=4 and k=3.
Now let us continue to tell about the story about the captain.
A battle was going to begin. The captain allotted the same amount of shells to every cannon. The shells were piled on the deck which formed the same shell pyramids by the cannon. While the enemy warships were near, the captain ordered to fire simultaneously. Thunderous sound then was heard. The captain listened carefully, then he knew that how many shells were used and how many were left.
At the end of the battle, the captain won. During the break, he asked his subordinate a question: For a shell pyramid, if given the serial number s, how do you calculate the layer number i, the row number j and column number k?
At that time, it was said that there was an intelligent captain, who was also a mathematician amateur. He liked to connect everything him met to mathematics. Before every battle, he often ordered the soldiers to put the shells on the deck and make those shells to form shell pyramids.
Now let's suppose that a shell pyramid has four layers, and there will be a sequence of ordinal numbers in every layer. They are as the following figure:
In the figure, they are the first layer, the second layer, the third layer and the fourth layer respectively from the left to the right.
In the first layer, there is just 1 shell, and its ordinal number is 1. In the second layer, there are 3 shells, and their ordinal numbers are 1, 2, and 3. In the third layer, there are 6 shells, and their ordinal numbers are 1, 2, 3, 4, 5, and 6. In the fourth layer, there are 10 shells, and their ordinal numbers are shown in the figure above.
There are also serial numbers for the whole shell pyramid. For example, the serial number for the third shell in the second layer is 4, the serial number for the fifth shell in the third layer is 9, and the serial number for the ninth shell in the fourth layer is 19.
There is also a interrelated problem: If given one serial number s, then we can work out the s th shell is in what layer, what row and what column. Assume that the layer number is i, the row number is j and the column number is k, therefore, if s=19, then i=4, j=4 and k=3.
Now let us continue to tell about the story about the captain.
A battle was going to begin. The captain allotted the same amount of shells to every cannon. The shells were piled on the deck which formed the same shell pyramids by the cannon. While the enemy warships were near, the captain ordered to fire simultaneously. Thunderous sound then was heard. The captain listened carefully, then he knew that how many shells were used and how many were left.
At the end of the battle, the captain won. During the break, he asked his subordinate a question: For a shell pyramid, if given the serial number s, how do you calculate the layer number i, the row number j and column number k?
Input
First
input a number n,repersent n cases.For each case there a shell pyramid
which is big enough, a integer is given, and this integer is the serial
number s(s<2^63). There are several test cases. Input is terminated
by the end of file.
Output
For each case, output the corresponding layer number i, row number j and column number k.
Sample Input
2
19
75822050528572544
Sample Output
4 4 3
769099 111570 11179
08 哈尔滨区域赛的题目 , 数学题。
题意就是一系列的数按照金字塔这样排列:
如 第一层有1个数 1
如 第一层有1个数 1
第二层有3个数 2
3 4
第三层有6个数 5
6 7
8 9 10
。。。。。
给定一个数 让你求它在第几层第几行第几列 。
第n层共有n*(n+1)/2 ;
前n层共有(1*2+2*3+3*4+…+n*(n+1))/2 -> n*(n+1)*(n+2) / 6;
View Code
#include<stdio.h> #include<math.h> typedef long long LL ; int main(){ int T; scanf("%d",&T); while(T--){ LL layer,row,col ; LL n; scanf("%I64d",&n) ; layer = (LL)(pow(double(n) * 6.0 , 1.0/3.0)) - 1; while(layer*(layer+1)/2*(layer+2)/3 < n ){ layer ++ ; } n -= (layer-1)*(layer)/2*(layer+1)/3 ; row = (LL )(sqrt(n * 2.0)) ; while(row * (row+1)/2 < n) row ++ ; n -=row*(row-1)/2 ; col = n; printf("%I64d %I64d %I64d\n",layer,row,col) ; } return 0; }
