# Calculating the sum of all k-sized sub-arrays in an array using sliding window algorithm

I need to calculate the sum of all k-sized sub-arrays in an array using sliding window algorithm. Is that a valid sliding window algorithm? If not, why?

``````var sumOfSubArrays = function(arr, k) {
let currentSubArray = 0;
for(let i=0; i<k; i++) {
currentSubArray += arr[i];
}

let sum = currentSubArray;

for(let i=0; i<arr.length-k; i++) {
sum += currentSubArray - arr[i] + arr[i+k];
currentSubArray = currentSubArray - arr[i] + arr[i+k];
}

return sum;
};

let arr = [1,2,3,4,5]
let k = 3;

console.log(sumOfSubArrays(arr, k));``````

Should return 27

• This feels like this would be better suited for codereview.stackexchange.com? What's the issue you're having with the code? Sep 22, 2023 at 18:17
• There is no issue, it works, but I want to know if what i wrote here is a sliding window algorithm and what is the time and space complexity of this code Sep 22, 2023 at 18:22
• You seem to ask whether the current approach is 'valid'. What do you mean with that if the code does seem to work?
– Mast
Sep 22, 2023 at 19:17
• I mean is this code a sliding window algorithm? Sep 22, 2023 at 19:21

I analysed your code and it is actually window sliding algorithm, but done in a bit different way than I'm used to. I'd do it by moving the "window" a bit differently and not going from 0 index twice, but from the last visited index.

Difference is on how we move "the tail" - I move it by subtracting "k" and you by adding it.

My way of doing it would be this:

``````// O(n) solution for finding sum of all k-sized sub-arrays of size k using window sliding algorithm
function sumOfSubArrays(arr, k) {
let arrayLength = arr.length;
let sum = 0;
let finalSum = 0;
// Find initial sum of first k elements
for (let i = 0; i < k; i++) {
sum += arr[i];
finalSum = sum;
}
// Iterate the array once and increment the right edge
for (let i = k; i < arrayLength; i++) {
// Moving "window" to next element
sum += arr[i] - arr[i - k];

// Add a sum of new sub-array to finalSum;
finalSum += sum;
}
return finalSum;
}

let arr = [1, 2, 3, 4, 5]
let k = 3;

console.log(sumOfSubArrays(arr, k));``````

• Could you explain why is my code iterating through the array twice? Sep 22, 2023 at 19:32
• I updated my answer above.
– Ben
Sep 22, 2023 at 19:44
• I tested it on some other inputs and it seems to be working as well. Sep 22, 2023 at 19:49
• You can also see that in the code that I provided we're not "visiting" the same index twice in the loops. We "visit" every index (or a window) just once and that is the point of window sliding algorithm, to not go back - but to move forward and not revisit. Your question was is this window sliding algorithm and I answered it. It is not, because of the way you implemented it. It produces right results, but it is not right implementation of window sliding algorithm. I hope my code makes it clearer. I updated my answer.
– Ben
Sep 22, 2023 at 19:51
• So what's the complexity of my code if i may ask? Sep 22, 2023 at 19:57

Reduce the array, as long as the index is lesser than `k` just add the current number to the `total`, and `subTotal`. Afterwards calculate the `newSubTotal` by adding the current number to the last `newSubTotal`, and removing the 1st number used for creating the previous `subTotal`. Add the `newSubTotal` to the `total` to get the new `total`.

``````const sumOfSubArrays = (arr, k) =>
arr.reduce(([total, subTotal], n, i) => {
// calculate the base total and subTotal
if(i < k) return [total + n, subTotal + n];

// sliding window
const newSubTotal = subTotal + n - arr[i - k];

return [total + newSubTotal, newSubTotal]
}, [0, 0])[0];

const arr = [1, 2, 3, 4, 5]
const k = 3;

console.log(sumOfSubArrays(arr, k));``````