Najdaljše zaporedne 1 v binarnem prikazu
Glede na številko n Naloga je najti dolžino najdaljšega zaporedja 1s serije v svoji binarni predstavitvi.
Primeri:
Vnos: n = 14
Izhod: 3
Pojasnilo: Binarna predstavitev 14 je 111 0.Vnos: n = 222
Izhod: 4
Pojasnilo: Binarna predstavitev števila 222 je 110 1111 0.
Kazalo vsebine
- [Naivni pristop] Iterativni čas O(1) in prostor O(1)
- [Učinkovit pristop] Uporaba bitne manipulacije O(1) Čas in O(1) Prostor
- [Drug pristop] Uporaba pretvorbe nizov
[Naivni pristop] Iterativni čas O(1) in prostor O(1)
C++ #include using namespace std ; int maxConsecutiveOne ( int n ){ int count = 0 ; int maxi = 0 ; // traverse and check if bit set increment the count for ( int i = 0 ; i < 32 ; i ++ ){ if ( n & ( 1 < < i )){ count ++ ; } else { maxi = max ( maxi count ); count = 0 ; } } return maxi ; } int main () { int n = 14 ; cout < < maxConsecutiveOne ( n ) < < 'n' ; return 0 ; }
Java public class GFG { static int maxConsecutiveOne ( int n ) { int count = 0 ; int maxi = 0 ; // traverse and check if bit set increment the count for ( int i = 0 ; i < 32 ; i ++ ) { if (( n & ( 1 < < i )) != 0 ) { count ++ ; } else { maxi = Math . max ( maxi count ); count = 0 ; } } return maxi ; } public static void main ( String [] args ) { int n = 14 ; System . out . println ( maxConsecutiveOne ( n )); } }
Python def maxConsecutiveOne ( n ): count = 0 maxi = 0 # traverse and check if bit set increment the count for i in range ( 32 ): if n & ( 1 < < i ): count += 1 else : maxi = max ( maxi count ) count = 0 return maxi if __name__ == '__main__' : n = 14 print ( maxConsecutiveOne ( n ))
C# using System ; class GFG { static int MaxConsecutiveOne ( int n ) { int count = 0 ; int maxi = 0 ; // traverse and check if bit set increment the count for ( int i = 0 ; i < 32 ; i ++ ) { if (( n & ( 1 < < i )) != 0 ) { count ++ ; } else { maxi = Math . Max ( maxi count ); count = 0 ; } } return maxi ; } static void Main () { int n = 14 ; Console . WriteLine ( MaxConsecutiveOne ( n )); } }
JavaScript function maxConsecutiveOne ( n ) { let count = 0 ; let maxi = 0 ; // traverse and check if bit set increment the count for ( let i = 0 ; i < 32 ; i ++ ) { if ( n & ( 1 < < i )) { count ++ ; } else { maxi = Math . max ( maxi count ); count = 0 ; } } return maxi ; } // Driver code let n = 14 ; console . log ( maxConsecutiveOne ( n ));
Izhod
3
[Učinkovit pristop] Uporaba bitne manipulacije O(1) Čas in O(1) Prostor
Ideja temelji na konceptu, da je IN bitnega zaporedja z a levo premaknjeno za 1 sama različica učinkovito odstrani zaostanek 1 iz vsakega zaporednega zaporedja 1s .
Torej operacija n = (n & (n < < 1)) zmanjša dolžino vsakega zaporedja 1s z eno v binarni predstavitvi n . Če to operacijo izvajamo v zanki, dobimo n = 0. Število ponovitev, potrebnih za dosego je pravzaprav dolžina najdaljšega zaporednega zaporedja 1s .
Ilustracija:
Za izvedbo zgornjega pristopa sledite spodnjim korakom:
- Ustvarite spremenljivko count, inicializirano z vrednostjo .
- Zaženite zanko medtem do n ni 0.
- V vsaki ponovitvi izvedite operacijo n = (n & (n < < 1))
- Povečaj štetje za eno.
- Povratno število
#include using namespace std ; int maxConsecutiveOnes ( int x ) { // Initialize result int count = 0 ; // Count the number of iterations to // reach x = 0. while ( x != 0 ) { // This operation reduces length // of every sequence of 1s by one. x = ( x & ( x < < 1 )); count ++ ; } return count ; } int main () { // Function Call cout < < maxConsecutiveOnes ( 14 ) < < endl ; return 0 ; }
Java class GFG { private static int maxConsecutiveOnes ( int x ) { // Initialize result int count = 0 ; // Count the number of iterations to // reach x = 0. while ( x != 0 ) { // This operation reduces length // of every sequence of 1s by one. x = ( x & ( x < < 1 )); count ++ ; } return count ; } public static void main ( String strings [] ) { System . out . println ( maxConsecutiveOnes ( 14 )); } }
Python def maxConsecutiveOnes ( x ): # Initialize result count = 0 # Count the number of iterations to # reach x = 0. while ( x != 0 ): # This operation reduces length # of every sequence of 1s by one. x = ( x & ( x < < 1 )) count = count + 1 return count if __name__ == '__main__' : print ( maxConsecutiveOnes ( 14 )) # by Anant Agarwal.
C# using System ; class GFG { // Function to find length of the // longest consecutive 1s in binary // representation of a number private static int maxConsecutiveOnes ( int x ) { // Initialize result int count = 0 ; // Count the number of iterations // to reach x = 0. while ( x != 0 ) { // This operation reduces length // of every sequence of 1s by one. x = ( x & ( x < < 1 )); count ++ ; } return count ; } // Driver code public static void Main () { Console . WriteLine ( maxConsecutiveOnes ( 14 )); } } // This code is contributed by Nitin Mittal.
JavaScript function maxConsecutiveOnes ( x ) { // Initialize result let count = 0 ; // Count the number of iterations to reach x = 0 while ( x !== 0 ) { // This operation reduces length of // every sequence of 1s by one x = ( x & ( x < < 1 )); count ++ ; } return count ; } // Driver code console . log ( maxConsecutiveOnes ( 14 ));
PHP // PHP program to find length function maxConsecutiveOnes ( $n ) { // Initialize result $count = 0 ; // Count the number of // iterations to reach x = 0. while ( $n != 0 ) { // This operation reduces // length of every sequence // of 1s by one. $n = ( $n & ( $n < < 1 )); $count ++ ; } return $count ; } echo maxConsecutiveOnes ( 14 ) ' n ' ; ?>
Izhod
3
Časovna zapletenost: O(1)
Pomožni prostor: O(1)
[Drug pristop] Uporaba pretvorbe nizov
Dve spremenljivki max_len in cur_len inicializiramo na 0. Nato ponovimo vsak bit celega števila n. Če je najmanj pomemben bit (LSB) 1, povečamo cur_len, da preštejemo trenutni zagon zaporednih 1 s. Če je LSB 0, prekine trenutno zaporedje, tako da posodobimo max_len, če je cur_len večji, in ponastavimo cur_len na 0. Po preverjanju vsakega bita premaknemo n v desno za 1, da se premaknemo na naslednji bit. Ko se zanka konča, izvedemo zadnjo posodobitev max_len, če je končni cur_len večji, in vrnemo max_len kot dolžino najdaljšega zaporedja zaporednih 1 s.
C++ #include #include #include using namespace std ; int maxConsecutiveOnes ( int n ){ string binary = bitset < 32 > ( n ). to_string (); int count = 0 ; int maxCount = 0 ; // Loop through the binary string to // find the longest consecutive 1s for ( int i = 0 ; i < binary . size (); i ++ ) { if ( binary [ i ] == '1' ) { count ++ ; if ( count > maxCount ) { maxCount = count ; } } else { count = 0 ; } } // Print the result return maxCount ; } int main () { int n = 14 ; cout < < maxConsecutiveOnes ( n ) < < 'n' ; return 0 ; }
Java import java.util.* ; public class Main { static int maxConsecutiveOnes ( int n ) { String binary = String . format ( '%32s' Integer . toBinaryString ( n )). replace ( ' ' '0' ); int count = 0 ; int maxCount = 0 ; // Loop through the binary string to // find the longest consecutive 1s for ( int i = 0 ; i < binary . length (); i ++ ) { if ( binary . charAt ( i ) == '1' ) { count ++ ; if ( count > maxCount ) { maxCount = count ; } } else { count = 0 ; } } // Return the result return maxCount ; } public static void main ( String [] args ) { int n = 14 ; System . out . println ( maxConsecutiveOnes ( n )); } }
Python def maxConsecutiveOnes ( n ): binary = format ( n '032b' ) count = 0 maxCount = 0 # Loop through the binary string to # find the longest consecutive 1s for bit in binary : if bit == '1' : count += 1 if count > maxCount : maxCount = count else : count = 0 # Return the result return maxCount if __name__ == '__main__' : n = 14 print ( maxConsecutiveOnes ( n ))
C# using System ; class GFG { static int MaxConsecutiveOnes ( int n ) { string binary = Convert . ToString ( n 2 ). PadLeft ( 32 '0' ); int count = 0 ; int maxCount = 0 ; // Loop through the binary string to // find the longest consecutive 1s foreach ( char bit in binary ) { if ( bit == '1' ) { count ++ ; if ( count > maxCount ) maxCount = count ; } else { count = 0 ; } } // Return the result return maxCount ; } static void Main () { int n = 14 ; Console . WriteLine ( MaxConsecutiveOnes ( n )); } }
JavaScript function maxConsecutiveOnes ( n ) { let binary = n . toString ( 2 ). padStart ( 32 '0' ); let count = 0 ; let maxCount = 0 ; // Loop through the binary string to // find the longest consecutive 1s for ( let i = 0 ; i < binary . length ; i ++ ) { if ( binary [ i ] === '1' ) { count ++ ; if ( count > maxCount ) { maxCount = count ; } } else { count = 0 ; } } // Return the result return maxCount ; } // Driver code let n = 14 ; console . log ( maxConsecutiveOnes ( n ));
Izhod
3
