Intervallo query LCM
Dato un array arr[] di interi di dimensione N e un array di query Q query[] dove ciascuna query è di tipo [L R] che indica l'intervallo dall'indice L all'indice R, il compito è trovare l'LCM di tutti i numeri dell'intervallo per tutte le query.
Esempi:
Ingresso: arr[] = {5 7 5 2 10 12 11 17 14 1 44}
query[] = {{2 5} {5 10} {0 10}}
Produzione: 601570878540
Spiegazione: Nella prima query LCM(5 2 10 12) = 60
Nella seconda query LCM(12 11 17 14 1 44) = 15708
Nell'ultima query LCM(5 7 5 2 10 12 11 17 14 1 44) = 78540Ingresso: arr[] = {2 4 8 16} query[] = {{2 3} {0 1}}
Produzione: 164
Approccio ingenuo: L’approccio si basa sulla seguente idea matematica:
Matematicamente LCM(l r) = LCM(arr[l] arr[l+1] . . . arr[r-1] arr[r]) e
LCM(a b) = (a*b) / MCD(ab)
Quindi attraversa l'array per ogni query e calcola la risposta utilizzando la formula sopra per LCM.
Complessità temporale: O(N * Q)
Spazio ausiliario: O(1)
RangeLCM Interrogazioni utilizzando Albero dei segmenti :
Poiché il numero di query può essere elevato, la soluzione ingenua sarebbe poco pratica. Questa volta può essere ridotto
Non è disponibile alcuna operazione di aggiornamento in questo problema. Quindi possiamo inizialmente costruire un albero di segmenti e usarlo per rispondere alle domande in tempo logaritmico.
Ogni nodo nell'albero dovrebbe memorizzare il valore LCM per quel particolare segmento e possiamo usare la stessa formula di cui sopra per combinare i segmenti.
Seguire i passaggi indicati di seguito per implementare l'idea:
- Costruisci un albero di segmenti dall'array dato.
- Esplora le query. Per ogni query:
- Trova quel particolare intervallo nell'albero dei segmenti.
- Utilizza la formula sopra menzionata per combinare i segmenti e calcolare l'LCM per quell'intervallo.
- Stampa la risposta per quel segmento.
Di seguito è riportata l'implementazione dell'approccio di cui sopra.
C++ // LCM of given range queries using Segment Tree #include using namespace std ; #define MAX 1000 // allocate space for tree int tree [ 4 * MAX ]; // declaring the array globally int arr [ MAX ]; // Function to return gcd of a and b int gcd ( int a int b ) { if ( a == 0 ) return b ; return gcd ( b % a a ); } // utility function to find lcm int lcm ( int a int b ) { return a * b / gcd ( a b ); } // Function to build the segment tree // Node starts beginning index of current subtree. // start and end are indexes in arr[] which is global void build ( int node int start int end ) { // If there is only one element in current subarray if ( start == end ) { tree [ node ] = arr [ start ]; return ; } int mid = ( start + end ) / 2 ; // build left and right segments build ( 2 * node start mid ); build ( 2 * node + 1 mid + 1 end ); // build the parent int left_lcm = tree [ 2 * node ]; int right_lcm = tree [ 2 * node + 1 ]; tree [ node ] = lcm ( left_lcm right_lcm ); } // Function to make queries for array range )l r). // Node is index of root of current segment in segment // tree (Note that indexes in segment tree begin with 1 // for simplicity). // start and end are indexes of subarray covered by root // of current segment. int query ( int node int start int end int l int r ) { // Completely outside the segment returning // 1 will not affect the lcm; if ( end < l || start > r ) return 1 ; // completely inside the segment if ( l <= start && r >= end ) return tree [ node ]; // partially inside int mid = ( start + end ) / 2 ; int left_lcm = query ( 2 * node start mid l r ); int right_lcm = query ( 2 * node + 1 mid + 1 end l r ); return lcm ( left_lcm right_lcm ); } // driver function to check the above program int main () { // initialize the array arr [ 0 ] = 5 ; arr [ 1 ] = 7 ; arr [ 2 ] = 5 ; arr [ 3 ] = 2 ; arr [ 4 ] = 10 ; arr [ 5 ] = 12 ; arr [ 6 ] = 11 ; arr [ 7 ] = 17 ; arr [ 8 ] = 14 ; arr [ 9 ] = 1 ; arr [ 10 ] = 44 ; // build the segment tree build ( 1 0 10 ); // Now we can answer each query efficiently // Print LCM of (2 5) cout < < query ( 1 0 10 2 5 ) < < endl ; // Print LCM of (5 10) cout < < query ( 1 0 10 5 10 ) < < endl ; // Print LCM of (0 10) cout < < query ( 1 0 10 0 10 ) < < endl ; return 0 ; }
Java // LCM of given range queries // using Segment Tree class GFG { static final int MAX = 1000 ; // allocate space for tree static int tree [] = new int [ 4 * MAX ] ; // declaring the array globally static int arr [] = new int [ MAX ] ; // Function to return gcd of a and b static int gcd ( int a int b ) { if ( a == 0 ) { return b ; } return gcd ( b % a a ); } // utility function to find lcm static int lcm ( int a int b ) { return a * b / gcd ( a b ); } // Function to build the segment tree // Node starts beginning index // of current subtree. start and end // are indexes in arr[] which is global static void build ( int node int start int end ) { // If there is only one element // in current subarray if ( start == end ) { tree [ node ] = arr [ start ] ; return ; } int mid = ( start + end ) / 2 ; // build left and right segments build ( 2 * node start mid ); build ( 2 * node + 1 mid + 1 end ); // build the parent int left_lcm = tree [ 2 * node ] ; int right_lcm = tree [ 2 * node + 1 ] ; tree [ node ] = lcm ( left_lcm right_lcm ); } // Function to make queries for // array range )l r). Node is index // of root of current segment in segment // tree (Note that indexes in segment // tree begin with 1 for simplicity). // start and end are indexes of subarray // covered by root of current segment. static int query ( int node int start int end int l int r ) { // Completely outside the segment returning // 1 will not affect the lcm; if ( end < l || start > r ) { return 1 ; } // completely inside the segment if ( l <= start && r >= end ) { return tree [ node ] ; } // partially inside int mid = ( start + end ) / 2 ; int left_lcm = query ( 2 * node start mid l r ); int right_lcm = query ( 2 * node + 1 mid + 1 end l r ); return lcm ( left_lcm right_lcm ); } // Driver code public static void main ( String [] args ) { // initialize the array arr [ 0 ] = 5 ; arr [ 1 ] = 7 ; arr [ 2 ] = 5 ; arr [ 3 ] = 2 ; arr [ 4 ] = 10 ; arr [ 5 ] = 12 ; arr [ 6 ] = 11 ; arr [ 7 ] = 17 ; arr [ 8 ] = 14 ; arr [ 9 ] = 1 ; arr [ 10 ] = 44 ; // build the segment tree build ( 1 0 10 ); // Now we can answer each query efficiently // Print LCM of (2 5) System . out . println ( query ( 1 0 10 2 5 )); // Print LCM of (5 10) System . out . println ( query ( 1 0 10 5 10 )); // Print LCM of (0 10) System . out . println ( query ( 1 0 10 0 10 )); } } // This code is contributed by 29AjayKumar
Python # LCM of given range queries using Segment Tree MAX = 1000 # allocate space for tree tree = [ 0 ] * ( 4 * MAX ) # declaring the array globally arr = [ 0 ] * MAX # Function to return gcd of a and b def gcd ( a : int b : int ): if a == 0 : return b return gcd ( b % a a ) # utility function to find lcm def lcm ( a : int b : int ): return ( a * b ) // gcd ( a b ) # Function to build the segment tree # Node starts beginning index of current subtree. # start and end are indexes in arr[] which is global def build ( node : int start : int end : int ): # If there is only one element # in current subarray if start == end : tree [ node ] = arr [ start ] return mid = ( start + end ) // 2 # build left and right segments build ( 2 * node start mid ) build ( 2 * node + 1 mid + 1 end ) # build the parent left_lcm = tree [ 2 * node ] right_lcm = tree [ 2 * node + 1 ] tree [ node ] = lcm ( left_lcm right_lcm ) # Function to make queries for array range )l r). # Node is index of root of current segment in segment # tree (Note that indexes in segment tree begin with 1 # for simplicity). # start and end are indexes of subarray covered by root # of current segment. def query ( node : int start : int end : int l : int r : int ): # Completely outside the segment # returning 1 will not affect the lcm; if end < l or start > r : return 1 # completely inside the segment if l <= start and r >= end : return tree [ node ] # partially inside mid = ( start + end ) // 2 left_lcm = query ( 2 * node start mid l r ) right_lcm = query ( 2 * node + 1 mid + 1 end l r ) return lcm ( left_lcm right_lcm ) # Driver Code if __name__ == '__main__' : # initialize the array arr [ 0 ] = 5 arr [ 1 ] = 7 arr [ 2 ] = 5 arr [ 3 ] = 2 arr [ 4 ] = 10 arr [ 5 ] = 12 arr [ 6 ] = 11 arr [ 7 ] = 17 arr [ 8 ] = 14 arr [ 9 ] = 1 arr [ 10 ] = 44 # build the segment tree build ( 1 0 10 ) # Now we can answer each query efficiently # Print LCM of (2 5) print ( query ( 1 0 10 2 5 )) # Print LCM of (5 10) print ( query ( 1 0 10 5 10 )) # Print LCM of (0 10) print ( query ( 1 0 10 0 10 )) # This code is contributed by # sanjeev2552
C# // LCM of given range queries // using Segment Tree using System ; using System.Collections.Generic ; class GFG { static readonly int MAX = 1000 ; // allocate space for tree static int [] tree = new int [ 4 * MAX ]; // declaring the array globally static int [] arr = new int [ MAX ]; // Function to return gcd of a and b static int gcd ( int a int b ) { if ( a == 0 ) { return b ; } return gcd ( b % a a ); } // utility function to find lcm static int lcm ( int a int b ) { return a * b / gcd ( a b ); } // Function to build the segment tree // Node starts beginning index // of current subtree. start and end // are indexes in []arr which is global static void build ( int node int start int end ) { // If there is only one element // in current subarray if ( start == end ) { tree [ node ] = arr [ start ]; return ; } int mid = ( start + end ) / 2 ; // build left and right segments build ( 2 * node start mid ); build ( 2 * node + 1 mid + 1 end ); // build the parent int left_lcm = tree [ 2 * node ]; int right_lcm = tree [ 2 * node + 1 ]; tree [ node ] = lcm ( left_lcm right_lcm ); } // Function to make queries for // array range )l r). Node is index // of root of current segment in segment // tree (Note that indexes in segment // tree begin with 1 for simplicity). // start and end are indexes of subarray // covered by root of current segment. static int query ( int node int start int end int l int r ) { // Completely outside the segment // returning 1 will not affect the lcm; if ( end < l || start > r ) { return 1 ; } // completely inside the segment if ( l <= start && r >= end ) { return tree [ node ]; } // partially inside int mid = ( start + end ) / 2 ; int left_lcm = query ( 2 * node start mid l r ); int right_lcm = query ( 2 * node + 1 mid + 1 end l r ); return lcm ( left_lcm right_lcm ); } // Driver code public static void Main ( String [] args ) { // initialize the array arr [ 0 ] = 5 ; arr [ 1 ] = 7 ; arr [ 2 ] = 5 ; arr [ 3 ] = 2 ; arr [ 4 ] = 10 ; arr [ 5 ] = 12 ; arr [ 6 ] = 11 ; arr [ 7 ] = 17 ; arr [ 8 ] = 14 ; arr [ 9 ] = 1 ; arr [ 10 ] = 44 ; // build the segment tree build ( 1 0 10 ); // Now we can answer each query efficiently // Print LCM of (2 5) Console . WriteLine ( query ( 1 0 10 2 5 )); // Print LCM of (5 10) Console . WriteLine ( query ( 1 0 10 5 10 )); // Print LCM of (0 10) Console . WriteLine ( query ( 1 0 10 0 10 )); } } // This code is contributed by Rajput-Ji
JavaScript < script > // LCM of given range queries using Segment Tree const MAX = 1000 // allocate space for tree var tree = new Array ( 4 * MAX ); // declaring the array globally var arr = new Array ( MAX ); // Function to return gcd of a and b function gcd ( a b ) { if ( a == 0 ) return b ; return gcd ( b % a a ); } //utility function to find lcm function lcm ( a b ) { return Math . floor ( a * b / gcd ( a b )); } // Function to build the segment tree // Node starts beginning index of current subtree. // start and end are indexes in arr[] which is global function build ( node start end ) { // If there is only one element in current subarray if ( start == end ) { tree [ node ] = arr [ start ]; return ; } let mid = Math . floor (( start + end ) / 2 ); // build left and right segments build ( 2 * node start mid ); build ( 2 * node + 1 mid + 1 end ); // build the parent let left_lcm = tree [ 2 * node ]; let right_lcm = tree [ 2 * node + 1 ]; tree [ node ] = lcm ( left_lcm right_lcm ); } // Function to make queries for array range )l r). // Node is index of root of current segment in segment // tree (Note that indexes in segment tree begin with 1 // for simplicity). // start and end are indexes of subarray covered by root // of current segment. function query ( node start end l r ) { // Completely outside the segment returning // 1 will not affect the lcm; if ( end < l || start > r ) return 1 ; // completely inside the segment if ( l <= start && r >= end ) return tree [ node ]; // partially inside let mid = Math . floor (( start + end ) / 2 ); let left_lcm = query ( 2 * node start mid l r ); let right_lcm = query ( 2 * node + 1 mid + 1 end l r ); return lcm ( left_lcm right_lcm ); } //driver function to check the above program //initialize the array arr [ 0 ] = 5 ; arr [ 1 ] = 7 ; arr [ 2 ] = 5 ; arr [ 3 ] = 2 ; arr [ 4 ] = 10 ; arr [ 5 ] = 12 ; arr [ 6 ] = 11 ; arr [ 7 ] = 17 ; arr [ 8 ] = 14 ; arr [ 9 ] = 1 ; arr [ 10 ] = 44 ; // build the segment tree build ( 1 0 10 ); // Now we can answer each query efficiently // Print LCM of (2 5) document . write ( query ( 1 0 10 2 5 ) + '
' ); // Print LCM of (5 10) document . write ( query ( 1 0 10 5 10 ) + '
' ); // Print LCM of (0 10) document . write ( query ( 1 0 10 0 10 ) + '
' ); // This code is contributed by Manoj. < /script>
Produzione
60 15708 78540
Complessità temporale: O(Log N * Log n) dove N è il numero di elementi nell'array. L'altro log n indica il tempo necessario per trovare l'LCM. Questa volta la complessità riguarda ogni query. La complessità del tempo totale è O(N + Q*Log N*log n), poiché è necessario O(N) tempo per costruire l'albero e quindi per rispondere alle query.
Spazio ausiliario: O(N) dove N è il numero di elementi nell'array. Questo spazio è necessario per memorizzare l'albero dei segmenti.
Argomento correlato: Albero dei segmenti
Approccio n. 2: usare la matematica
Per prima cosa definiamo una funzione helper lcm() per calcolare il minimo comune multiplo di due numeri. Quindi per ogni query iteriamo attraverso il sottoarray di arr definito dall'intervallo di query e calcoliamo l'LCM utilizzando la funzione lcm(). Il valore LCM viene memorizzato in un elenco che viene restituito come risultato finale.
Albero dei segmenti
Approccio n. 2: usare la matematica
Algoritmo
Albero dei segmenti
Approccio n. 2: usare la matematica
1. Definire una funzione di supporto lcm(a b) per calcolare il minimo comune multiplo di due numeri.
2. Definire una funzione range_lcm_queries(arr query) che accetta come input un array arr e un elenco di intervalli di query.
3. Creare un elenco vuoto di risultati per archiviare i valori LCM per ciascuna query.
4. Per ogni query nelle query estrarre gli indici sinistro e destro l e r.
5. Impostare lcm_val sul valore di arr[l].
6. Per ogni indice i nell'intervallo da l+1 a r, aggiornare lcm_val in modo che sia l'LCM di lcm_val e arr[i] utilizzando la funzione lcm().
7. Aggiungere lcm_val all'elenco dei risultati.
8. Restituisce l'elenco dei risultati.
Approccio n. 2: usare la matematica
C++ Java #include
Python /*package whatever //do not write package name here */ import java.util.ArrayList ; import java.util.List ; public class GFG { public static int gcd ( int a int b ) { if ( b == 0 ) return a ; return gcd ( b a % b ); } public static int lcm ( int a int b ) { return a * b / gcd ( a b ); } public static List < Integer > rangeLcmQueries ( List < Integer > arr List < int []> queries ) { List < Integer > results = new ArrayList <> (); for ( int [] query : queries ) { int l = query [ 0 ] ; int r = query [ 1 ] ; int lcmVal = arr . get ( l ); for ( int i = l + 1 ; i <= r ; i ++ ) { lcmVal = lcm ( lcmVal arr . get ( i )); } results . add ( lcmVal ); } return results ; } public static void main ( String [] args ) { List < Integer > arr = List . of ( 5 7 5 2 10 12 11 17 14 1 44 ); List < int []> queries = List . of ( new int [] { 2 5 } new int [] { 5 10 } new int [] { 0 10 }); List < Integer > results = rangeLcmQueries ( arr queries ); for ( int result : results ) { System . out . print ( result + ' ' ); } System . out . println (); } }
C# from math import gcd def lcm ( a b ): return a * b // gcd ( a b ) def range_lcm_queries ( arr queries ): results = [] for query in queries : l r = query lcm_val = arr [ l ] for i in range ( l + 1 r + 1 ): lcm_val = lcm ( lcm_val arr [ i ]) results . append ( lcm_val ) return results # example usage arr = [ 5 7 5 2 10 12 11 17 14 1 44 ] queries = [( 2 5 ) ( 5 10 ) ( 0 10 )] print ( range_lcm_queries ( arr queries )) # output: [60 15708 78540]
JavaScript using System ; using System.Collections.Generic ; class GFG { // Function to calculate the greatest common divisor (GCD) // using Euclidean algorithm static int GCD ( int a int b ) { if ( b == 0 ) return a ; return GCD ( b a % b ); } // Function to calculate the least common multiple (LCM) // using GCD static int LCM ( int a int b ) { return a * b / GCD ( a b ); } static List < int > RangeLcmQueries ( List < int > arr List < Tuple < int int >> queries ) { List < int > results = new List < int > (); foreach ( var query in queries ) { int l = query . Item1 ; int r = query . Item2 ; int lcmVal = arr [ l ]; for ( int i = l + 1 ; i <= r ; i ++ ) { lcmVal = LCM ( lcmVal arr [ i ]); } results . Add ( lcmVal ); } return results ; } static void Main () { List < int > arr = new List < int > { 5 7 5 2 10 12 11 17 14 1 44 }; List < Tuple < int int >> queries = new List < Tuple < int int >> { Tuple . Create ( 2 5 ) Tuple . Create ( 5 10 ) Tuple . Create ( 0 10 ) }; List < int > results = RangeLcmQueries ( arr queries ); foreach ( var result in results ) { Console . Write ( result + ' ' ); } Console . WriteLine (); } }
// JavaScript Program for the above approach // function to find out gcd function gcd ( a b ) { if ( b === 0 ) { return a ; } return gcd ( b a % b ); } // function to find out lcm function lcm ( a b ) { return ( a * b ) / gcd ( a b ); } function rangeLcmQueries ( arr queries ) { const results = []; for ( const query of queries ) { const l = query [ 0 ]; const r = query [ 1 ]; let lcmVal = arr [ l ]; for ( let i = l + 1 ; i <= r ; i ++ ) { lcmVal = lcm ( lcmVal arr [ i ]); } results . push ( lcmVal ); } return results ; } // Driver code to test above function const arr = [ 5 7 5 2 10 12 11 17 14 1 44 ]; const queries = [[ 2 5 ] [ 5 10 ] [ 0 10 ]]; const results = rangeLcmQueries ( arr queries ); for ( const result of results ) { console . log ( result + ' ' ); } console . log (); // THIS CODE IS CONTRIBUTED BY PIYUSH AGARWAL
Produzione
[60 15708 78540]
Complessità temporale: O(log(min(ab))). Per ogni intervallo di query iteriamo attraverso un sottoarray di dimensione O(n) dove n è la lunghezza di arr. Pertanto la complessità temporale della funzione complessiva è O(qn log(min(a_i))) dove q è il numero di query e a_i è l'i-esimo elemento di arr.
Complessità spaziale: O(1) poiché stiamo memorizzando solo pochi numeri interi alla volta. Lo spazio utilizzato dall'input arr e dalle query non viene considerato.
