Givet et positivt tal N skal vi nå til 1 i minimum antal trin, hvor et trin er defineret som at konvertere N til (N-1) eller konvertere N til dets en af de større divisorer.
Formelt hvis vi er ved N, kan vi i 1 trin nå til (N - 1), eller hvis N = u*v så kan vi nå til max(u v) hvor u > 1 og v > 1.
Eksempler:
Input : N = 17 Output : 4 We can reach to 1 in 4 steps as shown below 17 -> 16(from 17 - 1) -> 4(from 4 * 4) -> 2(from 2 * 2) -> 1(from 2 - 1) Input : N = 50 Output : 5 We can reach to 1 in 5 steps as shown below 50 -> 10(from 5 * 10) -> 5(from 2 * 5) -> 4(from 5 - 1) -> 2(from 2 *2) -> 1(from 2 - 1)
Vi kan løse dette problem ved at bruge bredde-først-søgning, fordi det fungerer niveau for niveau, så vi når til 1 i minimum antal trin, hvor næste niveau for N indeholder (N - 1) og større korrekte faktorer af N.
Fuldstændig BFS-procedure vil være som følger. Først vil vi skubbe N med trin 0 ind i datakøen, derefter vil vi på hvert niveau skubbe deres næste niveauelementer med 1 trin mere end dets tidligere niveauelementer. På denne måde, når 1 vil blive rykket ud af køen, vil den indeholde minimum antal trin med det, hvilket vil være vores endelige resultat.
I nedenstående kode bruges en kø af en struktur af 'data'-typen, som gemmer værdi og trin fra N i den, bruges et andet sæt heltalstype for at redde os selv fra at skubbe det samme element mere end én gang, hvilket kan føre til en uendelig løkke. Så ved hvert trin skubber vi værdien ind i sæt efter at have skubbet den ind i køen, så værdien ikke vil blive besøgt mere end én gang.
Se venligst nedenstående kode for bedre forståelse
nummereret alfabetC++
// C++ program to get minimum step to reach 1 // under given constraints #include
// Java program to get minimum step to reach 1 // under given constraints import java.util.*; class GFG { // structure represent one node in queue static class data { int val; int steps; public data(int val int steps) { this.val = val; this.steps = steps; } }; // method returns minimum step to reach one static int minStepToReachOne(int N) { Queue<data> q = new LinkedList<>(); q.add(new data(N 0)); // set is used to visit numbers so that they // won't be pushed in queue again HashSet<Integer> st = new HashSet<Integer>(); // loop until we reach to 1 while (!q.isEmpty()) { data t = q.peek(); q.remove(); // if current data value is 1 return its // steps from N if (t.val == 1) return t.steps; // check curr - 1 only if it not visited yet if (!st.contains(t.val - 1)) { q.add(new data(t.val - 1 t.steps + 1)); st.add(t.val - 1); } // loop from 2 to Math.sqrt(value) for its divisors for (int i = 2; i*i <= t.val; i++) { // check divisor only if it is not visited yet // if i is divisor of val then val / i will // be its bigger divisor if (t.val % i == 0 && !st.contains(t.val / i) ) { q.add(new data(t.val / i t.steps + 1)); st.add(t.val / i); } } } return -1; } // Driver code public static void main(String[] args) { int N = 17; System.out.print(minStepToReachOne(N) +'n'); } } // This code is contributed by 29AjayKumar
# Python3 program to get minimum step # to reach 1 under given constraints # Structure represent one node in queue class data: def __init__(self val steps): self.val = val self.steps = steps # Method returns minimum step to reach one def minStepToReachOne(N): q = [] q.append(data(N 0)) # Set is used to visit numbers # so that they won't be pushed # in queue again st = set() # Loop until we reach to 1 while (len(q)): t = q.pop(0) # If current data value is 1 # return its steps from N if (t.val == 1): return t.steps # Check curr - 1 only if # it not visited yet if not (t.val - 1) in st: q.append(data(t.val - 1 t.steps + 1)) st.add(t.val - 1) # Loop from 2 to Math.sqrt(value) # for its divisors for i in range(2 int((t.val) ** 0.5) + 1): # Check divisor only if it is not # visited yet if i is divisor of val # then val / i will be its bigger divisor if (t.val % i == 0 and (t.val / i) not in st): q.append(data(t.val / i t.steps + 1)) st.add(t.val / i) return -1 # Driver code N = 17 print(minStepToReachOne(N)) # This code is contributed by phasing17
// C# program to get minimum step to reach 1 // under given constraints using System; using System.Collections.Generic; class GFG { // structure represent one node in queue class data { public int val; public int steps; public data(int val int steps) { this.val = val; this.steps = steps; } }; // method returns minimum step to reach one static int minStepToReachOne(int N) { Queue<data> q = new Queue<data>(); q.Enqueue(new data(N 0)); // set is used to visit numbers so that they // won't be pushed in queue again HashSet<int> st = new HashSet<int>(); // loop until we reach to 1 while (q.Count != 0) { data t = q.Peek(); q.Dequeue(); // if current data value is 1 return its // steps from N if (t.val == 1) return t.steps; // check curr - 1 only if it not visited yet if (!st.Contains(t.val - 1)) { q.Enqueue(new data(t.val - 1 t.steps + 1)); st.Add(t.val - 1); } // loop from 2 to Math.Sqrt(value) for its divisors for (int i = 2; i*i <= t.val; i++) { // check divisor only if it is not visited yet // if i is divisor of val then val / i will // be its bigger divisor if (t.val % i == 0 && !st.Contains(t.val / i) ) { q.Enqueue(new data(t.val / i t.steps + 1)); st.Add(t.val / i); } } } return -1; } // Driver code public static void Main(String[] args) { int N = 17; Console.Write(minStepToReachOne(N) +'n'); } } // This code is contributed by 29AjayKumar
<script> // Javascript program to get minimum step // to reach 1 under given constraints // Structure represent one node in queue class data { constructor(val steps) { this.val = val; this.steps = steps; } } // Method returns minimum step to reach one function minStepToReachOne(N) { let q = []; q.push(new data(N 0)); // Set is used to visit numbers // so that they won't be pushed // in queue again let st = new Set(); // Loop until we reach to 1 while (q.length != 0) { let t = q.shift(); // If current data value is 1 // return its steps from N if (t.val == 1) return t.steps; // Check curr - 1 only if // it not visited yet if (!st.has(t.val - 1)) { q.push(new data(t.val - 1 t.steps + 1)); st.add(t.val - 1); } // Loop from 2 to Math.sqrt(value) // for its divisors for(let i = 2; i*i <= t.val; i++) { // Check divisor only if it is not // visited yet if i is divisor of val // then val / i will be its bigger divisor if (t.val % i == 0 && !st.has(t.val / i)) { q.push(new data(t.val / i t.steps + 1)); st.add(t.val / i); } } } return -1; } // Driver code let N = 17; document.write(minStepToReachOne(N) + '
'); // This code is contributed by rag2127 </script>
Produktion:
4