Studying Algorithms and having some difficulty understanding what specifically constitute the two recursive calls in MergeSort. Help is appreciated. Thanks.

## 2 Answers

Let the array be of size **N**. Basically take the array and divide into two parts form 1 to **N/2** and **N/2 + 1** to **N**. Let us call these parts **L** and **R** respectively. Now if we can sort **L**
and **R** separately we can just merge them to get the final result. Now how do you sort **L** and **R**
, well again apply the same procedure. Thus comes two recursive parts, one to sort recursively **L**
and oe two recursively sort **R** after which they are merged. Th pseudo code

```
merge_sort ( 1 , N )
merge_sort(1,N/2) /* L */
merger_sort(N/2 + 1,N) /* R */
merge both these sorted parts
```

You can achieve the same thing with only one function. Here is pseudocode:

```
def mergesort(int l, int r) {
if l == r:
return
int mid = (l + r) / 2
mergesort(l, mid)
mergesort(mid + 1, r)
merge left subarray and right subarray
}
```

Here is C++ code:

```
#include <cstdio>
#include <cstdlib>
using namespace std;
const int N = 1000003;
int tmp[N];
int a[N];
void merge_sort(int b, int e) {
if(b == e) // if there is only one element, then we have an sorted subarray
return;
int mid = (b + e) / 2;
merge_sort(b, mid); //recursive call
merge_sort(mid + 1, e); //recursive call
int sz = e - b + 1; // the size of the subarray
for(int k = 0, i = b, j = mid + 1; k < sz; ++k) {
if(i > mid) //if we have passed the border of left subarray, use the right one
tmp[k] = a[j++];
else if(j > e) // if we have passed the border of right subarray, use the left one
tmp[k] = a[i++];
else { // if all borders are oke
if(a[i] > a[j]) // compare values in left and right subarray
tmp[k] = a[j++];
else
tmp[k] = a[i++];
}
}
// sorted values form b to e are in tmp array, now just copy the tmp array to array a
for(int i = 0, j = b; i < sz; ++i, ++j)
a[j] = tmp[i];
}
int main() {
int n; scanf("%d", &n);
for(int i = 0; i < n; ++i)
scanf("%d", &a[i]);
merge_sort(0, n - 1);
for(int i = 0; i < n; ++i)
printf("%d ", a[i]);
return 0;
}
```