Write an algorithm to determine if a number is “happy”.
A happy number is a number defined by the following process: Starting with any positive integer, replace the number by the sum of the squares of its digits, and repeat the process until the number equals 1 (where it will stay), or it loops endlessly in a cycle which does not include 1. Those numbers for which this process ends in 1 are happy numbers.
Example: 19 is a happy number
- 1^2 + 9^2 = 82
- 8^2 + 2^2 = 68
- 6^2 + 8^2 = 100
- 1^2 + 0^2 + 0^2 = 1
Credits:
Special thanks to @mithmatt and @ts for adding this problem and creating all test cases.
这道题定义了一种快乐数,就是说对于某一个正整数,如果对其各个位上的数字分别平方,然后再加起来得到一个新的数字,再进行同样的操作,如果最终结果变成了1,则说明是快乐数,如果一直循环但不是1的话,就不是快乐数,那么现在任意给我们一个正整数,让我们判断这个数是不是快乐数,题目中给的例子19是快乐数,那么我们来看一个不是快乐数的情况,比如数字11有如下的计算过程:
1^2 + 1^2 = 2
2^2 = 4
4^2 = 16
1^2 + 6^2 = 37
3^2 + 7^2 = 58
5^2 + 8^2 = 89
8^2 + 9^2 = 145
1^2 + 4^2 + 5^2 = 42
4^2 + 2^2 = 20
2^2 + 0^2 = 4
我们发现在算到最后时数字4又出现了,那么之后的数字又都会重复之前的顺序,这个循环中不包含1,那么数字11不是一个快乐数,发现了规律后就要考虑怎么用代码来实现,我们可以用set来记录所有出现过的数字,然后每出现一个新数字,在set中查找看是否存在,若不存在则加入表中,若存在则跳出循环,并且判断此数是否为1,若为1返回true,不为1返回false,代码如下:
解法一:
class Solution { public: bool isHappy(int n) { set<int> s; while (n != 1) { int t = 0; while (n) { t += (n % 10) * (n % 10); n /= 10; } n = t; if (s.count(n)) break; else s.insert(n); } return n == 1; } };
其实这道题也可以不用set来做,我们并不需要太多的额外空间,关于非快乐数有个特点,循环的数字中必定会有4,这里就不做证明了,我也不会证明,就是利用这个性质,就可以不用set了,参见代码如下:
解法二:
class Solution { public: bool isHappy(int n) { while (n != 1 && n != 4) { int t = 0; while (n) { t += (n % 10) * (n % 10); n /= 10; } n = t; } return n == 1; } };
参考资料:
https://leetcode.com/discuss/89535/0ms-solution-beats-97-perhaps-the-most-easy-one-to-understand
https://leetcode.com/discuss/33055/my-solution-in-c-o-1-space-and-no-magic-math-property-involved