Given an array A of 0s and 1s, consider N_i: the i-th subarray from A[0] to A[i] interpreted as a binary number (from most-significant-bit to least-significant-bit.)
Return a list of booleans answer, where answer[i] is true if and only if N_i is divisible by 5.
Example 1:
Input: [0,1,1]
Output: [true,false,false]
Explanation:
The input numbers in binary are 0, 01, 011; which are 0, 1, and 3 in base-10. Only the first number is divisible by 5, so answer[0] is true.
Example 2:
Input: [1,1,1]
Output: [false,false,false]
Example 3:
Input: [0,1,1,1,1,1]
Output: [true,false,false,false,true,false]
Example 4:
Input: [1,1,1,0,1]
Output: [false,false,false,false,false]
Note:
1 <= A.length <= 30000-
A[i]is0or1
Idea 1. Modular arithmetic
(a*b + c)%d = (a%d) * (b%d) + c%d
Time complexity: O(n)
Space complexity: O(n)
class Solution {
public List<Boolean> prefixesDivBy5(int[] A) {
int val = 0;
List<Boolean> divisible = new ArrayList<>();
for(int num: A) {
val = ((val * 2)%5 + num)%5;
divisible.add(val == 0? true : false);
}
return divisible;
}
}
Idea 1.b left shift, bitwise operation
class Solution {
public List<Boolean> prefixesDivBy5(int[] A) {
int val = 0;
List<Boolean> divisible = new ArrayList<>();
for(int num: A) {
val = ((val << 1) | num)%5;
divisible.add(val == 0);
}
return divisible;
}
}