Consider a positive integer N written in standard notation with k+1 digits ai as ak⋯a1a0 with 0≤ai<10 for all i and ak>0. Then N is palindromic if and only if ai=ak−i for all i. Zero is written 0 and is also palindromic by definition.
Non-palindromic numbers can be paired with palindromic ones via a series of operations. First, the non-palindromic number is reversed and the result is added to the original number. If the result is not a palindromic number, this is repeated until it gives a palindromic number. Such number is called a delayed palindrome. (Quoted from https://en.wikipedia.org/wiki/Palindromic_number )
Given any positive integer, you are supposed to find its paired palindromic number.
Input Specification:
Each input file contains one test case which gives a positive integer no more than 1000 digits.
Output Specification:
For each test case, print line by line the process of finding the palindromic number. The format of each line is the following:
A + B = C
where A is the original number, B is the reversed A, and C is their sum. A starts being the input number, and this process ends until C becomes a palindromic number -- in this case we print in the last line C is a palindromic number.; or if a palindromic number cannot be found in 10 iterations, print Not found in 10 iterations. instead.
Sample Input 1:
97152
Sample Output 1:
97152 + 25179 = 122331
122331 + 133221 = 255552
255552 is a palindromic number.
Sample Input 2:
196
Sample Output 2:
196 + 691 = 887 887 + 788 = 1675 1675 + 5761 = 7436 7436 + 6347 = 13783 13783 + 38731 = 52514 52514 + 41525 = 94039 94039 + 93049 = 187088 187088 + 880781 = 1067869 1067869 + 9687601 = 10755470 10755470 + 07455701 = 18211171 Not found in 10 iterations.
思路:因为他的数字个数不超过1000个,所以用字符串来保存数据;
然后判断是不是回文串,反过来比较是否相同即可;
其中用到了reverse()函数,把一个字符串反过来,大数相加,存进位;因为是加法,所以进位最大也只可能是1;
注意事项:
将单个字符存入字符串:ans += char(num + '0');
将个位数转换为char类型,要 + '0';不能 - ‘0’
代码如下:
1 #include<bits/stdc++.h> 2 using namespace std; 3 #define ll long long 4 5 string add(string a) 6 { 7 string ans; 8 int l = a.length(); 9 int co = 0; 10 for(int i = 0;i < l;i++) 11 { 12 int num = (a[i] - '0') + (a[l - 1 - i] - '0') + co; 13 //cout << num << "---" << endl; 14 co = 0; 15 if(num > 9) 16 { 17 co = 1; 18 num -= 10; 19 } 20 ans += char(num + '0'); 21 } 22 if(co == 1) 23 ans += '1'; 24 reverse(ans.begin(),ans.end()); 25 //cout << ans << endl; 26 return ans; 27 } 28 29 30 string a,b; 31 int main() 32 { 33 cin >> a; 34 int i,len; 35 for(i = 0;i < 10;i++) 36 { 37 b = a; 38 reverse(b.begin(),b.end()); 39 if(a == b) 40 break; 41 cout << a << " + " << b << " = " << add(a) << endl; 42 a = add(a); 43 } 44 if(i == 10) 45 cout << "Not found in 10 iterations." << endl; 46 else 47 cout << a << " is a palindromic number." << endl; 48 return 0; 49 }