1630. Arithmetic Subarrays
Description
A sequence of numbers is called arithmetic if it consists of at least two elements, and the difference between every two consecutive elements is the same. More formally, a sequence s
is arithmetic if and only if s[i+1] - s[i] == s[1] - s[0]
for all valid i
.
For example, these are arithmetic sequences:
1, 3, 5, 7, 9 7, 7, 7, 7 3, -1, -5, -9
The following sequence is not arithmetic:
1, 1, 2, 5, 7
You are given an array of n
integers, nums
, and two arrays of m
integers each, l
and r
, representing the m
range queries, where the ith
query is the range [l[i], r[i]]
. All the arrays are 0-indexed.
Return a list of boolean
elements answer
, where answer[i]
is true
if the subarray nums[l[i]], nums[l[i]+1], ... , nums[r[i]]
can be rearranged to form an arithmetic sequence, and false
otherwise.
Example 1:
Input: nums =[4,6,5,9,3,7]
, l =[0,0,2]
, r =[2,3,5]
Output:[true,false,true]
Explanation: In the 0th query, the subarray is [4,6,5]. This can be rearranged as [6,5,4], which is an arithmetic sequence. In the 1st query, the subarray is [4,6,5,9]. This cannot be rearranged as an arithmetic sequence. In the 2nd query, the subarray is[5,9,3,7]. This
can be rearranged as[3,5,7,9]
, which is an arithmetic sequence.
Example 2:
Input: nums = [-12,-9,-3,-12,-6,15,20,-25,-20,-15,-10], l = [0,1,6,4,8,7], r = [4,4,9,7,9,10] Output: [false,true,false,false,true,true]
Constraints:
n == nums.length
m == l.length
m == r.length
2 <= n <= 500
1 <= m <= 500
0 <= l[i] < r[i] < n
-105 <= nums[i] <= 105
Solution
class Solution:
def checkArithmeticSubarrays(self, nums: List[int], left: List[int], right: List[int]) -> List[bool]:
res = []
for l,r in zip(left,right):
arr = sorted(nums[l:r+1])
cd = abs(arr[1] - arr[0])
check = True
for i in range(2, len(arr)):
if abs(arr[i] - arr[i-1]) != cd:
check = False
break
res.append(check)
return res