这两天要帮老师录制一下题解视频,所以题目挑简单一点的,减(shui)轻(liang)大(pian)家(wen)压(zhang)力。
题目链接
LeetCode 面试题 08.01. 三步问题[1]
题目描述
三步问题。有个小孩正在上楼梯,楼梯有 
示例1
输入:
n = 3
输出:
4
解释:
有四种走法
示例2
输入:
n = 5
输出:
13
题解
这道题是动态规划入门题,我相信大家都会做,如果不会做,那就当我没说过这句话。
令 ![f[i]](https://pic1.xuehuaimg.com/proxy/csdn/https://www.zhihu.com/equation?tex=f%5Bi%5D)
![f[i] = f[i-1] + f[i-2] + f[i-3] \\](https://pic1.xuehuaimg.com/proxy/csdn/https://www.zhihu.com/equation?tex=f%5Bi%5D+%3D+f%5Bi-1%5D+%2B+f%5Bi-2%5D+%2B+f%5Bi-3%5D+%5C%5C)
初始情况就是 ![f[1] = 1, f[2] = 2, f[3] = 4](https://pic1.xuehuaimg.com/proxy/csdn/https://www.zhihu.com/equation?tex=f%5B1%5D+%3D+1%2C+f%5B2%5D+%3D+2%2C+f%5B3%5D+%3D+4)
然后利用取模的加法公式,可以每算出一个
当然了这题太水了,我主要就是想看看大家会怎么实现呢?
代码
定义长度为 ![n]()
的数组
最朴素的方法当然是定义长度为
typedef long long ll;
const ll p = 1e9+7;
const int N = 1e6+10;
class Solution {
public:
ll f[N] = {1, 2, 4};
int waysToStep(int n) {
for (int i = 3; i < n; ++i) {
f[i] = (f[i-1] + f[i-2] + f[i-3]) % p;
}
return f[n-1];
}
};
定义四个变量
但是这样太费空间了啊,其实每次只需要用到之前的三个状态就行了,然后还要用个临时变量用来交换状态值,代码如下:
typedef long long ll;
const ll p = 1e9+7;
class Solution {
public:
int waysToStep(int n) {
if (n == 1) return 1;
if (n == 2) return 2;
if (n == 3) return 4;
ll a = 1, b = 2, c = 4, d;
for (int i = 3; i < n; ++i) {
d = (a + b + c) % p;
a = b;
b = c;
c = d;
}
return d;
}
};
定义长度为 ![3]()
的数组
但是用 
所以我直接定义了一个长度为
typedef long long ll;
const ll p = 1e9+7;
class Solution {
public:
int waysToStep(int n) {
ll f[3] = {1, 2, 4};
for (int i = 3; i < n; ++i) {
(f[i%3] += f[(i-1)%3] + f[(i-2)%3]) %= p;
}
return f[(n-1)%3];
}
};
应读者要求,再来个 python 代码:
class Solution:
def waysToStep(self, n: int) -> int:
f = [1, 2, 4]
for i in range(3, n):
f[i%3] += f[(i-1)%3] + f[(i-2)%3]
f[i%3] %= 1e9+7;
return int(f[(n-1)%3])
参考资料
[1]
LeetCode 面试题 08.01. 三步问题: https://leetcode-cn.com/problems/three-steps-problem-lcci/