# count the number of products of all possible subarrays where product should be divisible by four or it is odd

i tried to count the number of products which are odd or divisible by 4 , generated by all possible sub-arrays but my implementation get O(n^2).... i need in O(n) time . I also tried to get some pattern but cant found it here is my code

``````#include<bits/stdc++.h>
#define lli long long int
using namespace std;
int main()
{
lli testcases,x,M=1000000007;
cin>>testcases;
for(x=0;x<testcases;x++){
lli n,i,j,temp,count1=0;
cin>>n;
vector<lli>v;
for(i=0;i<n;i++){
cin>>temp;
v.push_back(temp);
}
for(i=0;i<n-1;i++){
if(v[i]%2!=0 || v[i]%4==0){
++count1;
}
temp=v[i];
for(j=i+1;j<v.size();j++){
temp*=v[j];
if(temp%2!=0 || temp%4==0){
++count1;
}
}
}
if(v[n-1]%2!=0 || v[n-1]%4==0){
++count1;
}
cout<<count1<<"\n";
count1=0;
}
return 0;
}
``````

• An observation: once a subarray [i,j] is divisible by 4, any larger subarray that contains it is also divisible by 4. Apr 10 '20 at 11:13
• This reads like a typical puzzle from some online contest site. If your goal is to learn C++, you will not learn anything there. In nearly all cases, like this one, the correct solution requires knowing some kind of a mathematical or a programming trick. If you don't know what the trick is, and attempt to code a brute-force approach, your program runs forever, and fails for that reason. If you're trying to learn C++, you won't learn anything from meaningless online contest sites but only from a good C++ book. Apr 10 '20 at 11:14

• "two to the power N", or `pow(2,N)` if you prefer that notation. Apr 10 '20 at 11:49
• `0 % 4 == 0`, but doesn't have 2 or more multiple of 2 ;) And 0 is also a special case to handle. Apr 10 '20 at 18:21