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Split the Array to Make Coprime Products - Practice Coding | SlaveCode

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2584. Split the Array to Make Coprime Products

Hard

50 Points

Array

Hash Table

Math

Number Theory

You are given a 0-indexed integer array nums of length n. A split at an index i where 0 <= i <= n - 2 is called valid if the product of the first i + 1 elements and the product of the remaining elements are coprime. Return the smallest index i at which the array can be split validly or -1 if there is no such split. Two values val1 and val2 are coprime if gcd(val1, val2) == 1 where gcd(val1, val2) is the greatest common divisor of val1 and val2.

Examples

Example 1

Example 1 visualization

Input: nums = [4,7,8,15,3,5] Output: 2 Explanation: The table above shows the values of the product of the first i + 1 elements, the remaining elements, and their gcd at each index i. The only valid split is at index 2.

Example 2

Example 2 visualization

Input: nums = [4,7,15,8,3,5] Output: -1 Explanation: The table above shows the values of the product of the first i + 1 elements, the remaining elements, and their gcd at each index i. There is no valid split.

Constraints

n == nums.length
1 <= n <= 104
1 <= nums[i] <= 106

2584. Split the Array to Make Coprime Products

Hard

50 Points

Array

Hash Table

Math

Number Theory

You are given a 0-indexed integer array nums of length n. A split at an index i where 0 <= i <= n - 2 is called valid if the product of the first i + 1 elements and the product of the remaining elements are coprime. Return the smallest index i at which the array can be split validly or -1 if there is no such split. Two values val1 and val2 are coprime if gcd(val1, val2) == 1 where gcd(val1, val2) is the greatest common divisor of val1 and val2.

Examples

Example 1

Example 1 visualization

Input: nums = [4,7,8,15,3,5] Output: 2 Explanation: The table above shows the values of the product of the first i + 1 elements, the remaining elements, and their gcd at each index i. The only valid split is at index 2.

Example 2

Example 2 visualization

Input: nums = [4,7,15,8,3,5] Output: -1 Explanation: The table above shows the values of the product of the first i + 1 elements, the remaining elements, and their gcd at each index i. There is no valid split.

Constraints

n == nums.length
1 <= n <= 104
1 <= nums[i] <= 106