In a deck of cards, each card has an integer written on it.
Return true if and only if you can choose X >= 2 such that it is possible to split the entire deck into 1 or more groups of cards, where:
Each group has exactly X cards.
All the cards in each group have the same integer.
Example 1:
Input: deck = [1,2,3,4,4,3,2,1]
Output: true
Explanation: Possible partition [1,1],[2,2],[3,3],[4,4].
Example 2:
Input: deck = [1,1,1,2,2,2,3,3]
Output: false´
Explanation: No possible partition.
Example 3:
Input: deck = [1]
Output: false
Explanation: No possible partition.
Example 4:
Input: deck = [1,1]
Output: true
Explanation: Possible partition [1,1].
Example 5:
Input: deck = [1,1,2,2,2,2]
Output: true
Explanation: Possible partition [1,1],[2,2],[2,2].
Constraints:
- 1 <= deck.length <= 10^4
- 0 <= deck[i] < 10^4
Solution in python:
class Solution:
def hasGroupsSizeX(self, deck: List[int]) -> bool:
adic = dict()
for item in deck:
if item not in adic.keys():
adic[item] = 1
else:
adic[item] += 1
min_value = min(adic.values())
for i in range(2, min_value+1):
for value in adic.values():
if value % i != 0:
break
else:
return True
return False
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