给定数字N,任务是在给定N的二进制表示形式中找到两个1之间的最大距离。如果二进制表示形式包含少于两个1,则打印-1。
例子:
Input: N = 131
Output: 6
131 in binary = 10000011.
The maximum distance between two 1's = 6.
Input: N = 8
Output: -1
8 in binary = 01000.
It contains less than two 1's.方法:
- 首先找到N的二进制表示形式。
- 对于计算出的每个位,检查其是否为“ 1”。
- 存储在first_1中找到的第一个“ 1”和在last_1中找到的最后一个“ 1”的索引
- 然后检查last_1是否小于或等于first_1。 N是2的幂的情况将是这种情况。因此,在这种情况下打印-1。
- 在任何其他情况下,请找到last_1和first_1之间的差异。这将是所需的距离。
下面是上述方法的实现:
C++
// C++ program to find the
// Maximum distance between two 1's
// in Binary representation of N
#include
using namespace std;
int longest_gap(int N)
{
int distance = 0, count = 0,
first_1 = -1, last_1 = -1;
// Compute the binary representation
while (N) {
count++;
int r = N & 1;
if (r == 1) {
first_1 = first_1 == -1
? count
: first_1;
last_1 = count;
}
N = N / 2;
}
// if N is a power of 2
// then return -1
if (last_1 <= first_1) {
return -1;
}
// else find the distance
// between the first position of 1
// and last position of 1
else {
distance = (last_1 - first_1 - 1);
return distance;
}
}
// Driver code
int main()
{
int N = 131;
cout << longest_gap(N) << endl;
N = 8;
cout << longest_gap(N) << endl;
N = 17;
cout << longest_gap(N) << endl;
N = 33;
cout << longest_gap(N) << endl;
return 0;
} Java
// Java program to find the
// Maximum distance between two 1's
// in Binary representation of N
class GFG
{
static int longest_gap(int N)
{
int distance = 0, count = 0,
first_1 = -1, last_1 = -1;
// Compute the binary representation
while (N != 0)
{
count++;
int r = N & 1;
if (r == 1)
{
first_1 = first_1 == -1 ?
count : first_1;
last_1 = count;
}
N = N / 2;
}
// if N is a power of 2
// then return -1
if (last_1 <= first_1)
{
return -1;
}
// else find the distance
// between the first position of 1
// and last position of 1
else
{
distance = (last_1 - first_1 - 1);
return distance;
}
}
// Driver code
public static void main (String[] args)
{
int N = 131;
System.out.println(longest_gap(N));
N = 8;
System.out.println(longest_gap(N));
N = 17;
System.out.println(longest_gap(N));
N = 33;
System.out.println(longest_gap(N));
}
}
// This code is contributed by AnkitRai01Python3
# Python3 program to find the
# Maximum distance between two 1's
# in Binary representation of N
def longest_gap(N):
distance = 0
count = 0
first_1 = -1
last_1 = -1
# Compute the binary representation
while (N > 0):
count += 1
r = N & 1
if (r == 1):
if first_1 == -1:
first_1 = count
else:
first_1 = first_1
last_1 = count
N = N // 2
# if N is a power of 2
# then return -1
if (last_1 <= first_1):
return -1
# else find the distance
# between the first position of 1
# and last position of 1
else:
distance = last_1 - first_1 - 1
return distance
# Driver code
N = 131
print(longest_gap(N))
N = 8
print(longest_gap(N))
N = 17
print(longest_gap(N))
N = 33
print(longest_gap(N))
# This code is contributed by Mohit KumarC#
// C# program to find the
// Maximum distance between two 1's
// in Binary representation of N
using System;
class GFG
{
static int longest_gap(int N)
{
int distance = 0, count = 0,
first_1 = -1, last_1 = -1;
// Compute the binary representation
while (N != 0)
{
count++;
int r = N & 1;
if (r == 1)
{
first_1 = first_1 == -1 ?
count : first_1;
last_1 = count;
}
N = N / 2;
}
// if N is a power of 2
// then return -1
if (last_1 <= first_1)
{
return -1;
}
// else find the distance
// between the first position of 1
// and last position of 1
else
{
distance = (last_1 - first_1 - 1);
return distance;
}
}
// Driver code
public static void Main (String []args)
{
int N = 131;
Console.WriteLine(longest_gap(N));
N = 8;
Console.WriteLine(longest_gap(N));
N = 17;
Console.WriteLine(longest_gap(N));
N = 33;
Console.WriteLine(longest_gap(N));
}
}
// This code is contributed by Arnab KunduJavascript
输出:
6
-1
3
4