Heron and His Triangle
A triangle is a Heron’s triangle if it satisfies that the side lengths of it are consecutive integers t−1, t, t+ 1 and thatits area is an integer. Now, for given n you need to find a Heron’s triangle associated with the smallest t bigger
than or equal to n.
Input
The input contains multiple test cases. The first line of a multiple input is an integer T (1 ≤ T ≤ 30000) followedby T lines. Each line contains an integer N (1 ≤ N ≤ 10^30).
Output
For each test case, output the smallest t in a line. If the Heron’s triangle required does not exist, output -1.
Sample Input
4
1
2
3
4Sample Output
4
4
4
4题意:给你一个 n , 要求你找一个最小 t ,满足 t >= n 且 t - 1, t, t + 1 为边长所构成的三角形的面积为整数。
思路:先直接打表出前面几项 4 14 52 194 724 2702,然后可暴力求线性递推式系数 推出一个 线性递推式 a[n] = 4 * a[n-1] - a[n - 2],接着打表就可以了。 不会java大数,我也很难过。QAQ
AC代码:
#include<bits/stdc++.h>
#define debug(x) cout << "[" << #x <<": " << (x) <<"]"<< endl
#define pii pair<int,int>
#define clr(a,b) memset((a),b,sizeof(a))
#define rep(i,a,b) for(int i = a;i < b;i ++)
#define pb push_back
#define MP make_pair
#define LL long long
#define INT(t) int t; scanf("%d",&t)
#define LLI(t) LL t; scanf("%I64d",&t)
using namespace std;
char ans[100][100];
char tmp[100];
char tmp1[100];
char four[10] = {'4', '\0'};
void bigjian(char *a, char *b) {
int i = strlen(a) - 1, j = strlen(b) - 1;
int x = 0, c[205] = {0}, flag = 1, d[205] = {0}, f[205] = {0};
for(int l = 0; l <= i; l++)
c[l] = a[l] - '0';
for(int l = 0; l <= j; l++)
d[l] = b[l] - '0';
while(j != -1) {
if(c[i] < d[j]) {
c[i] += 10;
c[i - 1] -= 1;
}
f[x++] = c[i] - d[j];
i--;
j--;
}
while(i >= 0) {
if(c[i] < 0) {
c[i] += 10;
c[i - 1] -= 1;
}
f[x++] = c[i];
i--;
}
int p = 0;
if(f[x - 1] == 0)
flag = 0;
for(int y = x - 1; y >= 0; y--) {
if(f[y] != 0)
flag = 1;
if(flag == 1)
tmp[p ++] = f[y] + '0';
}
if(flag == 0)
tmp[p ++] = '0';
tmp[p] = '\0';
}
void bigx(char *a, char *b) {
int x, k, lena, lenb, lenb1, c[150] = {0};
lena = strlen(a) - 1;
lenb = strlen(b);
lenb1 = lenb;
while(lenb--) {
x = lenb1 - lenb - 1;
for(int i = lena; i >= 0; i--) {
k = (a[i] - '0') * (b[lenb] - '0');
c[x] += k;
if(c[x] >= 10) {
c[x + 1] += c[x] / 10;
c[x] %= 10;
}
x++;
}
}
int p = 0;
if(c[x] != 0)
tmp1[p ++] = c[x] + '0';
for(int i = x - 1; i >= 0; i--)
tmp1[p ++] = c[i] + '0';
tmp1[p] = '\0';
}
int main() {
ans[0][0] = '2';
ans[1][0] = '4';
int i;
for(i = 2; i <= 101; i ++) {
memset(tmp, 0, sizeof(tmp));
memset(tmp1, 0, sizeof(tmp1));
bigx(ans[i - 1], four); /// 存入 tmp1
bigjian(tmp1, ans[i - 2]); /// 存入 tmp
if(strlen(tmp) > 31) break;
strcpy(ans[i], tmp);
}
int t; scanf("%d",&t);
while(t --){
char n[50]; scanf("%s",n);
for(int j = 1;j <= i + 1;j ++){
if(strlen(n) < strlen(ans[j])){
printf("%s\n",ans[j]);
break;
}
else {
if(strlen(n) == strlen(ans[j])){
if(strcmp(n,ans[j]) <= 0){
printf("%s\n",ans[j]);
break;
}
}
}
}
}
return 0;
}