# Javascript in Leecode 10–12 | 面試問題

source code在此 | Github

### 10. Regular Expression Matching

Given an input string `s`

and a pattern `p`

, implement regular expression matching with support for `'.'`

and `'*'`

where:

`'.'`

Matches any single character.`'*'`

Matches zero or more of the preceding element.

The matching should cover the **entire** input string (not partial).

**Example 1:**

Input: s = "aa", p = "a" Output: false Explanation: "a" does not match the entire string "aa".

**Example 2:**

Input: s = "aa", p = "a*" Output: true Explanation: '*' means zero or more of the preceding element, 'a'. Therefore, by repeating 'a' once, it becomes "aa".

**Example 3:**

Input: s = "ab", p = ".*" Output: true Explanation: ".*" means "zero or more (*) of any character (.)".

**Constraints:**

`1 <= s.length <= 20`

`1 <= p.length <= 30`

`s`

contains only lowercase English letters.`p`

contains only lowercase English letters,`'.'`

, and`'*'`

.- It is guaranteed for each appearance of the character
`'*'`

, there will be a previous valid character to match.

### 11. Container With Most Water

You are given an integer array `height`

of length `n`

. There are `n`

vertical lines drawn such that the two endpoints of the `ith`

line are `(i, 0)`

and `(i, height[i])`

.

Find two lines that together with the x-axis form a container, such that the container contains the most water.

Return *the maximum amount of water a container can store*.

**Notice** that you may not slant the container.

**Example 1:**

Input: height = [1,8,6,2,5,4,8,3,7] Output: 49 Explanation: The above vertical lines are represented by array [1,8,6,2,5,4,8,3,7]. In this case, the max area of water (blue section) the container can contain is 49.

**Example 2:**

Input: height = [1,1] Output: 1

**Constraints:**

`n == height.length`

`2 <= n <= 105`

`0 <= height[i] <= 104`

### 12. Integer to Roman

Roman numerals are represented by seven different symbols: `I`

, `V`

, `X`

, `L`

, `C`

, `D`

and `M`

.

Symbol Value I 1 V 5 X 10 L 50 C 100 D 500 M 1000

For example, `2`

is written as `II`

in Roman numeral, just two one's added together. `12`

is written as `XII`

, which is simply `X + II`

. The number `27`

is written as `XXVII`

, which is `XX + V + II`

.

Roman numerals are usually written largest to smallest from left to right. However, the numeral for four is not `IIII`

. Instead, the number four is written as `IV`

. Because the one is before the five we subtract it making four. The same principle applies to the number nine, which is written as `IX`

. There are six instances where subtraction is used:

`I`

can be placed before`V`

(5) and`X`

(10) to make 4 and 9.`X`

can be placed before`L`

(50) and`C`

(100) to make 40 and 90.`C`

can be placed before`D`

(500) and`M`

(1000) to make 400 and 900.

Given an integer, convert it to a roman numeral.

**Example 1:**

Input: num = 3 Output: "III" Explanation: 3 is represented as 3 ones.

**Example 2:**

Input: num = 58 Output: "LVIII" Explanation: L = 50, V = 5, III = 3.

**Example 3:**

Input: num = 1994 Output: "MCMXCIV" Explanation: M = 1000, CM = 900, XC = 90 and IV = 4.

**Constraints:**

`1 <= num <= 3999`

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