// C++ implementation to Count the
// number of distinct medians of an array
// where each array elements
// are given by a range
 
#include 
using namespace std;
#define int long long int
 
// Function to Count the
// number of distinct medians of an array
// where each array elements
// are given by a range
void solve(int n,
   const vector >& vec)
{
    vector a, b;
 
    // Loop to store the starting
    // and end range in the array
    for (auto pr : vec) {
        a.push_back(pr.first);
        b.push_back(pr.second);
    }
 
    sort(a.begin(), a.end());
    sort(b.begin(), b.end());
 
    int left, right, ans;
     
    // Condition to check if the
    // length of the array is odd
    if ((n & 1)) {
        left = a[n / 2];
        right = b[n / 2];
        ans = right - left + 1;
    }
    else {
        left = (a[n / 2] + a[n / 2 - 1]);
        right = (b[n / 2] + b[n / 2 - 1]);
        ans = right - left + 1;
    }
 
    cout << ans << endl;
}
 
// Driver Code
signed main()
{
 
    int N = 3;
    vector > vec =
         { { 100, 100 }, { 10, 10000 },
                    { 1, 1000000000 } };
                     
    // Function Call
    solve(N, vec);
 
    return 0;
}

// Java implementation to count the
// number of distinct medians of an
// array where each array elements
// are given by a range
import java.util.*;
import java.awt.*;
 
class GFG{
     
// Function to count the number
// of distinct medians of an array
// where each array elements are
// given by a range
static void solve(int n, ArrayList vec)
{
    ArrayList a = new ArrayList<>();
    ArrayList b = new ArrayList<>();
 
    // Loop to store the starting
    // and end range in the array
    for(Point pr : vec)
    {
        a.add(pr.x);
        b.add(pr.y);
    }
 
    Collections.sort(a);
    Collections.sort(b);
 
    int left, right, ans;
 
    // Condition to check if the
    // length of the array is odd
    if ((n & 1) != 0)
    {
        left = a.get(n / 2);
        right = b.get(n / 2);
        ans = right - left + 1;
    }
    else
    {
        left = (a.get(n / 2) +
                a.get(n / 2 - 1));
        right = (b.get(n / 2) +
                 b.get(n / 2 - 1));
        ans = right - left + 1;
    }
    System.out.println(ans);
}
 
// Driver Code
public static void main(String[] args)
{
    int N = 3;
     
    ArrayList vec = new ArrayList<>();
    vec.add(new Point(100, 100));
    vec.add(new Point(10, 10000));
    vec.add(new Point(1, 1000000000));
 
    // Function call
    solve(N, vec);
}
}
 
// This code is contributed by jrishabh99

# Python3 implementation to count the
# number of distinct medians of an array
# where each array elements
# are given by a range
 
# Function to count the number of 
# distinct medians of an array
# where each array elements
# are given by a range
def solve(n, vec):
 
    a = []
    b = []
 
    # Loop to store the starting
    # and end range in the array
    for pr in vec :
        a.append(pr[0])
        b.append(pr[1])
 
    a.sort()
    b.sort()
     
    # Condition to check if the
    # length of the array is odd
    if ((n & 1)):
        left = a[n // 2]
        right = b[n // 2]
        ans = right - left + 1
     
    else:
        left = (a[n // 2] + a[n // 2 - 1])
        right = (b[n // 2] + b[n // 2 - 1])
        ans = right - left + 1
 
    print(ans)
 
# Driver Code
if __name__ == "__main__":
 
    N = 3
    vec = [ (100, 100), (10, 10000),
            (1, 1000000000) ]
                     
    # Function Call
    solve(N, vec)
 
# This code is contributed by chitranayal

// C# implementation to count the 
// number of distinct medians of
// an array where each array elements 
// are given by a range
using System;
using System.Collections;
using System.Collections.Generic;
 
public class Point
{
    public int x, y;
     
    public Point(int xx, int yy)
    {
        x = xx;
        y = yy;
    }
}
   
class GFG{
 
// Function to count the number
// of distinct medians of an array
// where each array elements are
// given by a range
static void solve(int n, ArrayList vec)
{
    ArrayList a = new ArrayList();
    ArrayList b = new ArrayList();
     
    // Loop to store the starting
    // and end range in the array
    foreach(Point pr in vec)
    {
        a.Add(pr.x);
        b.Add(pr.y);
    }
    a.Sort();
    b.Sort();
  
    int left, right, ans;
     
    // Condition to check if the
    // length of the array is odd
    if ((n & 1) != 0)
    {
        left = (int)a[n / 2];
        right = (int)b[n / 2];
        ans = right - left + 1;
    }
    else
    {
        left = ((int)a[n / 2] +
                (int)a[n / 2 - 1]);
        right = ((int)b[n / 2] +
                 (int)b[n / 2 - 1]);
        ans = right - left + 1;
    }
    Console.WriteLine(ans);
}
 
// Driver code   
static public void Main()
{
    int N = 3;
     
    ArrayList vec = new ArrayList();
    vec.Add(new Point(100, 100));
    vec.Add(new Point(10, 10000));
    vec.Add(new Point(1, 1000000000));
     
    // Function call
    solve(N, vec);
}
}
 
// This code is contributed by offbeat