动态规划（基础版）-- 斐波那契类型 -- 第 N 个泰波那契数

2023-09-22 11:35:37 +08:00 · 2023-09-22 11:35:37 +08:00 · 03ba9aa8ca
commit 03ba9aa8ca
parent 0abe63dc40
2 changed files with 95 additions and 0 deletions
--- a/dynamic-programming/src/leetcode/editor/cn/NThTribonacciNumber.java
+++ b/dynamic-programming/src/leetcode/editor/cn/NThTribonacciNumber.java
@ -0,0 +1,62 @@
 //<p>泰波那契序列&nbsp;T<sub>n</sub>&nbsp;定义如下：&nbsp;</p>
 //
 //<p>T<sub>0</sub> = 0, T<sub>1</sub> = 1, T<sub>2</sub> = 1, 且在 n &gt;= 0&nbsp;的条件下 T<sub>n+3</sub> = T<sub>n</sub> + T<sub>n+1</sub> + T<sub>n+2</sub></p>
 //
 //<p>给你整数&nbsp;<code>n</code>，请返回第 n 个泰波那契数&nbsp;T<sub>n </sub>的值。</p>
 //
 //<p>&nbsp;</p>
 //
 //<p><strong>示例 1：</strong></p>
 //
 //<pre><strong>输入：</strong>n = 4
 //<strong>输出：</strong>4
 //<strong>解释：</strong>
 //T_3 = 0 + 1 + 1 = 2
 //T_4 = 1 + 1 + 2 = 4
 //</pre>
 //
 //<p><strong>示例 2：</strong></p>
 //
 //<pre><strong>输入：</strong>n = 25
 //<strong>输出：</strong>1389537
 //</pre>
 //
 //<p>&nbsp;</p>
 //
 //<p><strong>提示：</strong></p>
 //
 //<ul> 
 // <li><code>0 &lt;= n &lt;= 37</code></li> 
 // <li>答案保证是一个 32 位整数，即&nbsp;<code>answer &lt;= 2^31 - 1</code>。</li> 
 //</ul>
 //
 //<div><div>Related Topics</div><div><li>记忆化搜索</li><li>数学</li><li>动态规划</li></div></div><br><div><li>👍 279</li><li>👎 0</li></div>
 package leetcode.editor.cn;
 // 1137:第 N 个泰波那契数
 public class NThTribonacciNumber {
    public static void main(String[] args) {
        Solution solution = new NThTribonacciNumber().new Solution();
        // TO TEST
    }
    //leetcode submit region begin(Prohibit modification and deletion)
    class Solution {
        public int tribonacci(int n) {
            if (n == 0) {
                return 0;
            } else if (n < 3) {
                return 1;
            }
            int[] arr = new int[n + 1];
            arr[1] = 1;
            arr[2] = 1;
            for (int i = 3; i <= n; i++) {
                arr[i] = arr[i - 1] + arr[i - 2] + arr[i - 3];
            }
            return arr[n];
        }
    }
 //leetcode submit region end(Prohibit modification and deletion)
 }
--- a/dynamic-programming/src/leetcode/editor/cn/doc/content/NThTribonacciNumber.md
+++ b/dynamic-programming/src/leetcode/editor/cn/doc/content/NThTribonacciNumber.md
@ -0,0 +1,33 @@
 <p>泰波那契序列&nbsp;T<sub>n</sub>&nbsp;定义如下：&nbsp;</p>
 <p>T<sub>0</sub> = 0, T<sub>1</sub> = 1, T<sub>2</sub> = 1, 且在 n &gt;= 0&nbsp;的条件下 T<sub>n+3</sub> = T<sub>n</sub> + T<sub>n+1</sub> + T<sub>n+2</sub></p>
 <p>给你整数&nbsp;<code>n</code>，请返回第 n 个泰波那契数&nbsp;T<sub>n </sub>的值。</p>
 <p>&nbsp;</p>
 <p><strong>示例 1：</strong></p>
 <pre><strong>输入：</strong>n = 4
 <strong>输出：</strong>4
 <strong>解释：</strong>
 T_3 = 0 + 1 + 1 = 2
 T_4 = 1 + 1 + 2 = 4
 </pre>
 <p><strong>示例 2：</strong></p>
 <pre><strong>输入：</strong>n = 25
 <strong>输出：</strong>1389537
 </pre>
 <p>&nbsp;</p>
 <p><strong>提示：</strong></p>
 <ul> 
 <li><code>0 &lt;= n &lt;= 37</code></li> 
 <li>答案保证是一个 32 位整数，即&nbsp;<code>answer &lt;= 2^31 - 1</code>。</li> 
 </ul>
 <div><div>Related Topics</div><div><li>记忆化搜索</li><li>数学</li><li>动态规划</li></div></div><br><div><li>👍 279</li><li>👎 0</li></div>