A number ‘n’ is called Bleak if it cannot be represented as sum of a positive number x and set bit count in x, i.e., x + countSetBits(x) is not equal to n for any non-negative number x.
Examples :
Input : n = 3 Output : false 3 is not Bleak as it can be represented as 2 + countSetBits(2). Input : n = 4 Output : true 4 is t Bleak as it cannot be represented as sum of a number x and countSetBits(x) for any number x.
Method 1 (Simple)
bool isBleak(n) 1) Consider all numbers smaller than n a) If x + countSetBits(x) == n return false 2) Return true
Below is the implementation of the simple approach.
// A simple C++ program to check Bleak Number #include <bits/stdc++.h> using namespace std;
/* Function to get no of set bits in binary representation of passed binary no. */
int countSetBits( int x)
{ unsigned int count = 0;
while (x) {
x &= (x - 1);
count++;
}
return count;
} // Returns true if n is Bleak bool isBleak( int n)
{ // Check for all numbers 'x' smaller
// than n. If x + countSetBits(x)
// becomes n, then n can't be Bleak
for ( int x = 1; x < n; x++)
if (x + countSetBits(x) == n)
return false ;
return true ;
} // Driver code int main()
{ isBleak(3) ? cout << "Yes\n" : cout << "No\n" ;
isBleak(4) ? cout << "Yes\n" : cout << "No\n" ;
return 0;
} |
// A simple Java program to check Bleak Number import java.io.*;
class GFG {
/* Function to get no of set bits in binary
representation of passed binary no. */
static int countSetBits( int x)
{
int count = 0 ;
while (x != 0 ) {
x &= (x - 1 );
count++;
}
return count;
}
// Returns true if n is Bleak
static boolean isBleak( int n)
{
// Check for all numbers 'x' smaller
// than n. If x + countSetBits(x)
// becomes n, then n can't be Bleak
for ( int x = 1 ; x < n; x++)
if (x + countSetBits(x) == n)
return false ;
return true ;
}
// Driver code
public static void main(String args[])
{
if (isBleak( 3 ))
System.out.println( "Yes" );
else
System.out.println( "No" );
if (isBleak( 4 ))
System.out.println( "Yes" );
else
System.out.println( "No" );
}
} /*This code is contributed by Nikita Tiwari.*/ |
# A simple Python 3 program # to check Bleak Number # Function to get no of set # bits in binary # representation of passed # binary no. def countSetBits(x) :
count = 0
while (x) :
x = x & (x - 1 )
count = count + 1
return count
# Returns true if n # is Bleak def isBleak(n) :
# Check for all numbers 'x'
# smaller than n. If x +
# countSetBits(x) becomes
# n, then n can't be Bleak.
for x in range ( 1 , n) :
if (x + countSetBits(x) = = n) :
return False
return True
# Driver code if (isBleak( 3 )) :
print ( "Yes" )
else :
print ( "No" )
if (isBleak( 4 )) :
print ( "Yes" )
else :
print ( "No" )
# This code is contributed by Nikita Tiwari. |
// A simple C# program to check // Bleak Number using System;
class GFG {
/* Function to get no of set
bits in binary representation
of passed binary no. */
static int countSetBits( int x)
{
int count = 0;
while (x != 0) {
x &= (x - 1);
count++;
}
return count;
}
// Returns true if n is Bleak
static bool isBleak( int n)
{
// Check for all numbers
// 'x' smaller than n. If
// x + countSetBits(x)
// becomes n, then n can't
// be Bleak
for ( int x = 1; x < n; x++)
if (x + countSetBits(x)
== n)
return false ;
return true ;
}
// Driver code
public static void Main()
{
if (isBleak(3))
Console.Write( "Yes" );
else
Console.WriteLine( "No" );
if (isBleak(4))
Console.Write( "Yes" );
else
Console.Write( "No" );
}
} // This code is contributed by // Nitin mittal |
<?php // A simple PHP program // to check Bleak Number // Function to get no of // set bits in binary // representation of // passed binary no. function countSetBits( $x )
{ $count = 0;
while ( $x )
{
$x &= ( $x - 1);
$count ++;
}
return $count ;
} // Returns true if n is Bleak function isBleak( $n )
{ // Check for all numbers 'x' smaller
// than n. If x + countSetBits(x)
// becomes n, then n can't be Bleak
for ( $x = 1; $x < $n ; $x ++)
if ( $x + countSetBits( $x ) == $n )
return false;
return true;
} // Driver code
if (isBleak(3))
echo "Yes\n" ;
else
echo "No\n" ;
if (isBleak(4))
echo "Yes\n" ;
else
echo "No\n" ;
// This code is contributed by anuj_67. ?> |
<script> // JavaScript program to check Bleak Number /* Function to get no of set bits in binary
representation of passed binary no. */
function countSetBits(x)
{
let count = 0;
while (x != 0) {
x &= (x - 1);
count++;
}
return count;
}
// Returns true if n is Bleak
function isBleak(n)
{
// Check for all numbers 'x' smaller
// than n. If x + countSetBits(x)
// becomes n, then n can't be Bleak
for (let x = 1; x < n; x++)
if (x + countSetBits(x) == n)
return false ;
return true ;
}
// Driver Code if (isBleak(3))
document.write( "Yes" + "<br/>" );
else
document.write( "No" + "<br/>" );
if (isBleak(4))
document.write( "Yes" + "<br/>" );
else
document.write( "No" + "<br/>" );
</script> |
Output :
No Yes
Time complexity of above solution is O(n Log n).
Auxiliary Space: O(1)
Method 2 (Efficient)
The idea is based on the fact that the largest count of set bits in any number smaller than n cannot exceed ceiling of Log2n. So we need to check only numbers from range n – ceilingLog2(n) to n.
bool isBleak(n) 1) Consider all numbers n - ceiling(Log2n) to n-1 a) If x + countSetBits(x) == n return false 2) Return true
Below is the implementation of the idea.
// An efficient C++ program to check Bleak Number #include <bits/stdc++.h> using namespace std;
/* Function to get no of set bits in binary representation of passed binary no. */
int countSetBits( int x)
{ unsigned int count = 0;
while (x) {
x &= (x - 1);
count++;
}
return count;
} // A function to return ceiling of log x // in base 2. For example, it returns 3 // for 8 and 4 for 9. int ceilLog2( int x)
{ int count = 0;
x--;
while (x > 0) {
x = x >> 1;
count++;
}
return count;
} // Returns true if n is Bleak bool isBleak( int n)
{ // Check for all numbers 'x' smaller
// than n. If x + countSetBits(x)
// becomes n, then n can't be Bleak
for ( int x = n - ceilLog2(n); x < n; x++)
if (x + countSetBits(x) == n)
return false ;
return true ;
} // Driver code int main()
{ isBleak(3) ? cout << "Yes\n" : cout << "No\n" ;
isBleak(4) ? cout << "Yes\n" : cout << "No\n" ;
return 0;
} |
// An efficient Java program to // check Bleak Number import java.io.*;
class GFG {
/* Function to get no of set bits in
binary representation of passed binary
no. */
static int countSetBits( int x)
{
int count = 0 ;
while (x != 0 ) {
x &= (x - 1 );
count++;
}
return count;
}
// A function to return ceiling of log x
// in base 2. For example, it returns 3
// for 8 and 4 for 9.
static int ceilLog2( int x)
{
int count = 0 ;
x--;
while (x > 0 ) {
x = x >> 1 ;
count++;
}
return count;
}
// Returns true if n is Bleak
static boolean isBleak( int n)
{
// Check for all numbers 'x' smaller
// than n. If x + countSetBits(x)
// becomes n, then n can't be Bleak
for ( int x = n - ceilLog2(n); x < n; x++)
if (x + countSetBits(x) == n)
return false ;
return true ;
}
// Driver code
public static void main(String[] args)
{
if (isBleak( 3 ))
System.out.println( "Yes" );
else
System.out.println( "No" );
if (isBleak( 4 ))
System.out.println( "Yes" );
else
System.out.println( "No" );
}
} // This code is contributed by Prerna Saini |
# An efficient Python 3 program # to check Bleak Number import math
# Function to get no of set # bits in binary representation # of passed binary no. def countSetBits(x) :
count = 0
while (x) :
x = x & (x - 1 )
count = count + 1
return count
# A function to return ceiling # of log x in base 2. For # example, it returns 3 for 8 # and 4 for 9. def ceilLog2(x) :
count = 0
x = x - 1
while (x > 0 ) :
x = x>> 1
count = count + 1
return count
# Returns true if n is Bleak def isBleak(n) :
# Check for all numbers 'x'
# smaller than n. If x +
# countSetBits(x) becomes n,
# then n can't be Bleak
for x in range ((n - ceilLog2(n)), n) :
if (x + countSetBits(x) = = n) :
return False
return True
# Driver code if (isBleak( 3 )) :
print ( "Yes" )
else :
print ( "No" )
if (isBleak( 4 )) :
print ( "Yes" )
else :
print ( "No" )
# This code is contributed by Nikita Tiwari. |
// An efficient C# program to check // Bleak Number using System;
class GFG {
/* Function to get no of set
bits in binary representation
of passed binary no. */
static int countSetBits( int x)
{
int count = 0;
while (x != 0) {
x &= (x - 1);
count++;
}
return count;
}
// A function to return ceiling
// of log x in base 2. For
// example, it returns 3 for 8
// and 4 for 9.
static int ceilLog2( int x)
{
int count = 0;
x--;
while (x > 0) {
x = x >> 1;
count++;
}
return count;
}
// Returns true if n is Bleak
static bool isBleak( int n)
{
// Check for all numbers
// 'x' smaller than n. If
// x + countSetBits(x)
// becomes n, then n
// can't be Bleak
for ( int x = n - ceilLog2(n);
x < n; x++)
if (x + countSetBits(x)
== n)
return false ;
return true ;
}
// Driver code
public static void Main()
{
if (isBleak(3))
Console.WriteLine( "Yes" );
else
Console.WriteLine( "No" );
if (isBleak(4))
Console.WriteLine( "Yes" );
else
Console.WriteLine( "No" );
}
} // This code is contributed by anuj_67. |
<?php // An efficient PHP program // to check Bleak Number /* Function to get no of set bits in binary representation
of passed binary no. */
function countSetBits( $x )
{ $count = 0;
while ( $x )
{
$x &= ( $x - 1);
$count ++;
}
return $count ;
} // A function to return ceiling of log x // in base 2. For example, it returns 3 // for 8 and 4 for 9. function ceilLog2( $x )
{ $count = 0;
$x --;
while ( $x > 0)
{
$x = $x >> 1;
$count ++;
}
return $count ;
} // Returns true if n is Bleak function isBleak( $n )
{ // Check for all numbers 'x' smaller
// than n. If x + countSetBits(x)
// becomes n, then n can't be Bleak
for ( $x = $n - ceilLog2( $n ); $x < $n ; $x ++)
if ( $x + countSetBits( $x ) == $n )
return false;
return true;
} // Driver code
if (isBleak(3))
echo "Yes\n" ;
else
echo "No\n" ;
if (isBleak(4))
echo "Yes\n" ;
else
echo "No\n" ;
// This code is contributed by anuj_67 ?> |
<script> // An efficient JavaScript
// program to check Bleak Number
/* Function to get no of set
bits in binary representation
of passed binary no. */
function countSetBits(x)
{
let count = 0;
while (x != 0) {
x &= (x - 1);
count++;
}
return count;
}
// A function to return ceiling
// of log x in base 2. For
// example, it returns 3 for 8
// and 4 for 9.
function ceilLog2(x)
{
let count = 0;
x--;
while (x > 0) {
x = x >> 1;
count++;
}
return count;
}
// Returns true if n is Bleak
function isBleak(n)
{
// Check for all numbers
// 'x' smaller than n. If
// x + countSetBits(x)
// becomes n, then n
// can't be Bleak
for (let x = n - ceilLog2(n); x < n; x++)
if (x + countSetBits(x) == n)
return false ;
return true ;
}
if (isBleak(3))
document.write( "Yes" + "</br>" );
else
document.write( "No" + "</br>" );
if (isBleak(4))
document.write( "Yes" + "</br>" );
else
document.write( "No" + "</br>" );
</script> |
Output:
No Yes
Time Complexity: O(Log n * Log n)
Auxiliary Space: O(1)
Note: In GCC, we can directly count set bits using __builtin_popcount(). So we can avoid a separate function for counting set bits.
// C++ program to demonstrate __builtin_popcount() #include <iostream> using namespace std;
int main()
{ cout << __builtin_popcount(4) << endl;
cout << __builtin_popcount(15);
return 0;
} |
// Java program to demonstrate Integer.bitCount() import java.util.*;
class GFG{
public static void main(String[] args)
{ System.out.print(Integer.bitCount( 4 ) + "\n" );
System.out.print(Integer.bitCount( 15 ));
} } // This code is contributed by umadevi9616 |
# Python program to demonstrate Integer.bitCount() def bitsoncount(i):
assert 0 < = i < 0x100000000
i = i - ((i >> 1 ) & 0x55555555 )
i = (i & 0x33333333 ) + ((i >> 2 ) & 0x33333333 )
return (((i + (i >> 4 ) & 0xF0F0F0F ) * 0x1010101 ) & 0xffffffff ) >> 24
# Driver code if __name__ = = '__main__' :
x = 4 ;
y = 15 ;
print (bitsoncount(x));
print (bitsoncount(y));
# This code is contributed by umadevi9616 |
// C# program to demonstrate int.bitCount() using System;
public class GFG{
public static int bitCount ( int n) {
n = n - ((n >> 1) & 0x55555555);
n = (n & 0x33333333) + ((n >> 2) & 0x33333333);
return ((n + (n >> 4) & 0xF0F0F0F) * 0x1010101) >> 24;
}
public static void Main(String[] args)
{ Console.WriteLine(bitCount(4));
Console.WriteLine(bitCount(15));
} } // This code is contributed by gauravrajput1 |
<script> // javascript program to demonstrate int.bitCount() function bitCount ( n) {
n = n - ((n >> 1) & 0x55555555);
n = (n & 0x33333333) + ((n >> 2) & 0x33333333);
return ((n + (n >> 4) & 0xF0F0F0F) * 0x1010101) >> 24;
}
document.write(bitCount(4)+ "<br/>" );
document.write(bitCount(15));
// This code is contributed by gauravrajput1 </script> |
Output :
1 4
Time Complexity: O(log n)
Auxiliary Space: O(1)