FIND DET MANGLENDE TAL I GEOMETRISK PROGRESSION

Givet et array, der repræsenterer elementer af geometrisk progression i rækkefølge. Et element mangler i progressionen find det manglende tal. Det kan antages, at et led altid mangler, og at det manglende led ikke er det første eller det sidste i rækken.

Eksempler:

Input : arr[] = {1 3  27 81} Output : 9 Input : arr[] = {4 16 64 1024}; Output : 256

EN Simpel løsning er at krydse arrayet lineært og finde det manglende tal. Tidskompleksiteten af denne løsning er O(n).

javatable

An effektiv løsning at løse dette problem i O(Log n) tid ved hjælp af binær søgning. Ideen er at gå til det midterste element. Tjek om forholdet mellem midten og næste til midten er lig med almindeligt forhold eller ej, hvis ikke, så ligger det manglende element mellem midt og midt+1. Hvis det midterste element er lig med n/2. led i Geometric Series (lad n være antallet af elementer i input-array), så ligger det manglende element i højre halvdel. Andet element ligger i venstre halvdel.

Implementering:

C++

// C++ program to find missing number in // geometric progression #include    using namespace std; // It returns INT_MAX in case of error int findMissingRec(int arr[] int low  int high int ratio) {  if (low >= high)  return INT_MAX;  int mid = low + (high - low)/2;  // If element next to mid is missing  if (arr[mid+1]/arr[mid] != ratio)  return (arr[mid] * ratio);  // If element previous to mid is missing  if ((mid > 0) && (arr[mid]/arr[mid-1]) != ratio)  return (arr[mid-1] * ratio);  // If missing element is in right half  if (arr[mid] == arr[0] * (pow(ratio mid)) )  return findMissingRec(arr mid+1 high ratio);  return findMissingRec(arr low mid-1 ratio); } // Find ration and calls findMissingRec int findMissing(int arr[] int n) {  // Finding ration assuming that the missing term is  // not first or last term of series.  int ratio = (float) pow(arr[n-1]/arr[0] 1.0/n);  return findMissingRec(arr 0 n-1 ratio); } // Driver code int main(void) {  int arr[] = {2 4 8 32};  int n = sizeof(arr)/sizeof(arr[0]);  cout << findMissing(arr n);  return 0; }

Java

// JAVA Code for Find the missing number // in Geometric Progression class GFG {    // It returns INT_MAX in case of error  public static int findMissingRec(int arr[] int low  int high int ratio)  {  if (low >= high)  return Integer.MAX_VALUE;  int mid = low + (high - low)/2;    // If element next to mid is missing  if (arr[mid+1]/arr[mid] != ratio)  return (arr[mid] * ratio);    // If element previous to mid is missing  if ((mid > 0) && (arr[mid]/arr[mid-1]) != ratio)  return (arr[mid-1] * ratio);    // If missing element is in right half  if (arr[mid] == arr[0] * (Math.pow(ratio mid)) )  return findMissingRec(arr mid+1 high ratio);    return findMissingRec(arr low mid-1 ratio);  }    // Find ration and calls findMissingRec  public static int findMissing(int arr[] int n)  {  // Finding ration assuming that the missing  // term is not first or last term of series.  int ratio =(int) Math.pow(arr[n-1]/arr[0] 1.0/n);    return findMissingRec(arr 0 n-1 ratio);  }     /* Driver program to test above function */  public static void main(String[] args)   {  int arr[] = {2 4 8 32};  int n = arr.length;    System.out.print(findMissing(arr n));  }  } // This code is contributed by Arnav Kr. Mandal.

Python3

# Python3 program to find missing  # number in geometric progression # It returns INT_MAX in case of error def findMissingRec(arr low high ratio): if (low >= high): return 2147483647 mid = low + (high - low) // 2 # If element next to mid is missing if (arr[mid + 1] // arr[mid] != ratio): return (arr[mid] * ratio) # If element previous to mid is missing if ((mid > 0) and (arr[mid] / arr[mid-1]) != ratio): return (arr[mid - 1] * ratio) # If missing element is in right half if (arr[mid] == arr[0] * (pow(ratio mid)) ): return findMissingRec(arr mid+1 high ratio) return findMissingRec(arr low mid-1 ratio) # Find ration and calls findMissingRec def findMissing(arr n): # Finding ration assuming that  # the missing term is not first # or last term of series. ratio = int(pow(arr[n-1] / arr[0] 1.0 / n)) return findMissingRec(arr 0 n-1 ratio) # Driver code arr = [2 4 8 32] n = len(arr) print(findMissing(arr n)) # This code is contributed by Anant Agarwal.

// C# Code for Find the missing number // in Geometric Progression using System; class GFG {    // It returns INT_MAX in case of error  public static int findMissingRec(int []arr int low  int high int ratio)  {  if (low >= high)  return int.MaxValue;    int mid = low + (high - low)/2;    // If element next to mid is missing  if (arr[mid+1]/arr[mid] != ratio)  return (arr[mid] * ratio);    // If element previous to mid is missing  if ((mid > 0) && (arr[mid]/arr[mid-1]) != ratio)  return (arr[mid-1] * ratio);    // If missing element is in right half  if (arr[mid] == arr[0] * (Math.Pow(ratio mid)) )  return findMissingRec(arr mid+1 high ratio);    return findMissingRec(arr low mid-1 ratio);  }    // Find ration and calls findMissingRec  public static int findMissing(int []arr int n)  {    // Finding ration assuming that the missing  // term is not first or last term of series.  int ratio =(int) Math.Pow(arr[n-1]/arr[0] 1.0/n);    return findMissingRec(arr 0 n-1 ratio);  }     /* Driver program to test above function */  public static void Main()   {  int []arr = {2 4 8 32};  int n = arr.Length;    Console.Write(findMissing(arr n));  } } // This code is contributed by nitin mittal.

PHP

 // PHP program to find missing number // in geometric progression // It returns INT_MAX in case of error function findMissingRec(&$arr $low $high $ratio) { if ($low >= $high) return PHP_INT_MAX; $mid = $low + intval(($high - $low) / 2); // If element next to mid is missing if ($arr[$mid+1]/$arr[$mid] != $ratio) return ($arr[$mid] * $ratio); // If element previous to mid is missing if (($mid > 0) && ($arr[$mid] / $arr[$mid - 1]) != $ratio) return ($arr[$mid - 1] * $ratio); // If missing element is in right half if ($arr[$mid] == $arr[0] * (pow($ratio $mid))) return findMissingRec($arr $mid + 1 $high $ratio); return findMissingRec($arr $low $mid - 1 $ratio); } // Find ration and calls findMissingRec function findMissing(&$arr $n) { // Finding ration assuming that the missing  // term is not first or last term of series. $ratio = (float) pow($arr[$n - 1] / $arr[0] 1.0 / $n); return findMissingRec($arr 0 $n - 1 $ratio); } // Driver code $arr = array(2 4 8 32); $n = sizeof($arr); echo findMissing($arr $n); // This code is contributed by ita_c ?>

JavaScript

<script> // Javascript Code for Find the missing number // in Geometric Progression    // It returns INT_MAX in case of error  function findMissingRec(arrlowhighratio)  {  if (low >= high)  return Integer.MAX_VALUE;  let mid = Math.floor(low + (high - low)/2);    // If element next to mid is missing  if (arr[mid+1]/arr[mid] != ratio)  return (arr[mid] * ratio);    // If element previous to mid is missing  if ((mid > 0) && (arr[mid]/arr[mid-1]) != ratio)  return (arr[mid-1] * ratio);    // If missing element is in right half  if (arr[mid] == arr[0] * (Math.pow(ratio mid)) )  return findMissingRec(arr mid+1 high ratio);    return findMissingRec(arr low mid-1 ratio);  }    // Find ration and calls findMissingRec  function findMissing(arrn)  {  // Finding ration assuming that the missing  // term is not first or last term of series.  let ratio =Math.floor( Math.pow(arr[n-1]/arr[0] 1.0/n));    return findMissingRec(arr 0 n-1 ratio);  }    /* Driver program to test above function */  let arr=[2 4 8 32];  let n = arr.length;  document.write(findMissing(arr n));    // This code is contributed by rag2127   </script>

Produktion

Tidskompleksitet: O(logn)

Hjælpeplads: O(logn)

Bemærk: Ulempen ved denne løsning er: For større værdier eller for større array kan det forårsage overløb og/eller kan tage længere tid at computere.

pandaer iterrows

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Find det manglende tal i Geometrisk Progression