You are given an array of variable pairs equations and an array of real numbers values, where equations[i] = [Ai, Bi] and values[i] represent the equation Ai / Bi = values[i]. Each Ai or Bi is a string that represents a single variable.
You are also given some queries, where queries[j] = [Cj, Dj] represents the jth query where you must find the answer for Cj / Dj = ?.
Return the answers to all queries. If a single answer cannot be determined, return -1.0.
Note: The input is always valid. You may assume that evaluating the queries will not result in division by zero and that there is no contradiction.
Note: The variables that do not occur in the list of equations are undefined, so the answer cannot be determined for them.
Example 1:
- Input: equations = [[βaβ,βbβ],[βbβ,βcβ]], values = [2.0,3.0], queries = [[βaβ,βcβ],[βbβ,βaβ],[βaβ,βeβ],[βaβ,βaβ],[βxβ,βxβ]]
- Output: [6.00000,0.50000,-1.00000,1.00000,-1.00000]
- Explanation:
Given: a / b = 2.0, b / c = 3.0
queries are: a / c = ?, b / a = ?, a / e = ?, a / a = ?, x / x = ?
return: [6.0, 0.5, -1.0, 1.0, -1.0 ]
note: x is undefined => -1.0
Example 2:
- Input: equations = [[βaβ,βbβ],[βbβ,βcβ],[βbcβ,βcdβ]], values = [1.5,2.5,5.0], queries = [[βaβ,βcβ],[βcβ,βbβ],[βbcβ,βcdβ],[βcdβ,βbcβ]]
- Output: [3.75000,0.40000,5.00000,0.20000]
Example 3:
- Input: equations = [[βaβ,βbβ]], values = [0.5], queries = [[βaβ,βbβ],[βbβ,βaβ],[βaβ,βcβ],[βxβ,βyβ]]
- Output: [0.50000,2.00000,-1.00000,-1.00000]
Constraints:
- 1 <= equations.length <= 20
- equations[i].length == 2
- 1 <= Ai.length, Bi.length <= 5
- values.length == equations.length
- 0.0 < values[i] <= 20.0
- 1 <= queries.length <= 20
- queries[i].length == 2
- 1 <= Cj.length, Dj.length <= 5
- Ai, Bi, Cj, Dj consist of lower case English letters and digits.