Given two strings s and t, each of which represents a non-negative rational number, return true if and only if they represent the same number. The strings may use parentheses to denote the repeating part of the rational number.
A rational number can be represented using up to three parts: <IntegerPart>, <NonRepeatingPart>, and a <RepeatingPart>. The number will be represented in one of the following three ways:
<IntegerPart><ul> <li>For example, <code>12</code>, <code>0</code>, and <code>123</code>.</li> </ul> </li> <li><code><IntegerPart><strong><.></strong><NonRepeatingPart></code> <ul> <li>For example, <code>0.5</code>, <code>1.</code>, <code>2.12</code>, and <code>123.0001</code>.</li> </ul> </li> <li><code><IntegerPart><strong><.></strong><NonRepeatingPart><strong><(></strong><RepeatingPart><strong><)></strong></code> <ul> <li>For example, <code>0.1(6)</code>, <code>1.(9)</code>, <code>123.00(1212)</code>.</li> </ul> </li>
The repeating portion of a decimal expansion is conventionally denoted within a pair of round brackets. For example:
1/6 = 0.16666666... = 0.1(6) = 0.1666(6) = 0.166(66).
Example 1:
Input: s = "0.(52)", t = "0.5(25)" Output: true Explanation: Because "0.(52)" represents 0.52525252..., and "0.5(25)" represents 0.52525252525..... , the strings represent the same number.
Example 2:
Input: s = "0.1666(6)", t = "0.166(66)" Output: true
Example 3:
Input: s = "0.9(9)", t = "1." Output: true Explanation: "0.9(9)" represents 0.999999999... repeated forever, which equals 1. [See this link for an explanation.] "1." represents the number 1, which is formed correctly: (IntegerPart) = "1" and (NonRepeatingPart) = "".
Constraints:
- Each part consists only of digits.
- The
<IntegerPart>does not have leading zeros (except for the zero itself). 1 <= <IntegerPart>.length <= 40 <= <NonRepeatingPart>.length <= 41 <= <RepeatingPart>.length <= 4