给定N个整数的数组arr [] 。任务是检查是否通过排列数组的元素来生成算术级数,几何级数或和声级数。如果可能,请按进度或其他类型打印“是”,然后打印“否”。
例子:
Input: arr[] = {2, 16, 4, 8}
Output: Yes, A GP can be formed
Explanation:
Rearrange given array as {2, 4, 8, 16}, forms a Geometric Progression with common ratio 2.
Input: arr[] = {15, 10, 15, 5}
Output: Yes, An AP can be formed
Explanation:
Rearrange given array as {5, 10, 15, 20}, forms Arithmetic Progression with common difference 5.
Input: arr[] = { 1.0/10.0, 1.0/5.0, 1.0/15.0, 1.0/20.0 }
Output: Yes, A HP can be formed
Explanation:
Rearrange given array as { 1.0/5.0, 1.0/10.0, 1.0/15.0, 1.0/20.0 }, forms a Harmonic Progression.
方法:这个想法是要观察到AP,GP或HP这三个进程中的任何一个元素都与排序顺序有关。因此,我们需要首先对给定的数组进行排序。
- 对于算术级数:检查排序数组的连续元素之间的差异是否相同。如果是,则给定的数组元素形成算术级数。
- 对于“几何级数” :检查排序数组的连续元素的比率是否相同。如果是,则给定的数组元素形成几何级数。
- 对于谐波进行:检查排序数组的所有连续元素的倒数之间的差是否相同。如果是,则给定的数组元素形成一个谐波级数。
下面是上述方法的实现:
C++
// C++ program to check if a given
// array form AP, GP or HP
#include
using namespace std;
// Returns true if arr[0..n-1]
// can form AP
bool checkIsAP(double arr[], int n)
{
// Base Case
if (n == 1)
return true;
// Sort array
sort(arr, arr + n);
// After sorting, difference
// between consecutive elements
// must be same.
double d = arr[1] - arr[0];
// Traverse the given array and
// check if the difference
// between ith element and (i-1)th
// element is same or not
for (int i = 2; i < n; i++) {
if (arr[i] - arr[i - 1] != d) {
return false;
}
}
return true;
}
// Returns true if arr[0..n-1]
// can form GP
bool checkIsGP(double arr[], int n)
{
// Base Case
if (n == 1)
return true;
// Sort array
sort(arr, arr + n);
// After sorting, common ratio
// between consecutive elements
// must be same.
double r = arr[1] / arr[0];
// Traverse the given array and
// check if the common ratio
// between ith element and (i-1)th
// element is same or not
for (int i = 2; i < n; i++) {
if (arr[i] / arr[i - 1] != r)
return false;
}
return true;
}
// Returns true if arr[0..n-1]
// can form HP
bool checkIsHP(double arr[], int n)
{
// Base Case
if (n == 1) {
return true;
}
double rec[n];
// Find reciprocal of arr[]
for (int i = 0; i < n; i++) {
rec[i] = ((1 / arr[i]));
}
// After finding reciprocal, check if
// the reciprocal is in A. P.
// To check for A.P.
if (checkIsAP(rec, n))
return true;
else
return false;
}
// Driver's Code
int main()
{
double arr[] = { 1.0 / 5.0, 1.0 / 10.0,
1.0 / 15.0, 1.0 / 20.0 };
int n = sizeof(arr) / sizeof(arr[0]);
int flag = 0;
// Function to check AP
if (checkIsAP(arr, n)) {
cout << "Yes, An AP can be formed"
<< endl;
flag = 1;
}
// Function to check GP
if (checkIsGP(arr, n)) {
cout << "Yes, A GP can be formed"
<< endl;
flag = 1;
}
// Function to check HP
if (checkIsHP(arr, n)) {
cout << "Yes, A HP can be formed"
<< endl;
flag = 1;
}
else if (flag == 0) {
cout << "No";
}
return 0;
}
Java
// Java program to check if a given
// array form AP, GP or HP
import java.util.*;
class GFG{
// Returns true if arr[0..n-1]
// can form AP
static boolean checkIsAP(double arr[], int n)
{
// Base Case
if (n == 1)
return true;
// Sort array
Arrays.sort(arr);
// After sorting, difference
// between consecutive elements
// must be same.
double d = arr[1] - arr[0];
// Traverse the given array and
// check if the difference
// between ith element and (i-1)th
// element is same or not
for (int i = 2; i < n; i++) {
if (arr[i] - arr[i - 1] != d) {
return false;
}
}
return true;
}
// Returns true if arr[0..n-1]
// can form GP
static boolean checkIsGP(double arr[], int n)
{
// Base Case
if (n == 1)
return true;
// Sort array
Arrays.sort(arr);
// After sorting, common ratio
// between consecutive elements
// must be same.
double r = arr[1] / arr[0];
// Traverse the given array and
// check if the common ratio
// between ith element and (i-1)th
// element is same or not
for (int i = 2; i < n; i++) {
if (arr[i] / arr[i - 1] != r)
return false;
}
return true;
}
// Returns true if arr[0..n-1]
// can form HP
static boolean checkIsHP(double arr[], int n)
{
// Base Case
if (n == 1) {
return true;
}
double []rec = new double[n];
// Find reciprocal of arr[]
for (int i = 0; i < n; i++) {
rec[i] = ((1 / arr[i]));
}
// After finding reciprocal, check if
// the reciprocal is in A. P.
// To check for A.P.
if (checkIsAP(rec, n))
return true;
else
return false;
}
// Driver's Code
public static void main(String[] args)
{
double arr[] = { 1.0 / 5.0, 1.0 / 10.0,
1.0 / 15.0, 1.0 / 20.0 };
int n = arr.length;
int flag = 0;
// Function to check AP
if (checkIsAP(arr, n)) {
System.out.print("Yes, An AP can be formed"
+"\n");
flag = 1;
}
// Function to check GP
if (checkIsGP(arr, n)) {
System.out.print("Yes, A GP can be formed"
+"\n");
flag = 1;
}
// Function to check HP
if (checkIsHP(arr, n)) {
System.out.print("Yes, A HP can be formed"
+"\n");
flag = 1;
}
else if (flag == 0) {
System.out.print("No");
}
}
}
// This code is contributed by PrinciRaj1992
Python3
# Python3 program to check if a
# given array form AP, GP or HP
# Returns true if arr[0..n-1]
# can form AP
def checkIsAP(arr, n):
# Base Case
if (n == 1):
return True
# Sort array
arr.sort();
# After sorting, difference
# between consecutive elements
# must be same.
d = arr[1] - arr[0]
# Traverse the given array and
# check if the difference
# between ith element and (i-1)th
# element is same or not
for i in range(2, n):
if (arr[i] - arr[i - 1] != d):
return False
return True
# Returns true if arr[0..n-1]
# can form GP
def checkIsGP(arr, n):
# Base Case
if (n == 1):
return True
# Sort array
arr.sort()
# After sorting, common ratio
# between consecutive elements
# must be same.
r = arr[1] / arr[0]
# Traverse the given array and
# check if the common ratio
# between ith element and (i-1)th
# element is same or not
for i in range(2, n):
if (arr[i] / arr[i - 1] != r):
return False
return True
# Returns true if arr[0..n-1]
# can form HP
def checkIsHP(arr, n):
# Base Case
if (n == 1):
return True
rec = []
# Find reciprocal of arr[]
for i in range(0, n):
rec.append((1 / arr[i]))
# After finding reciprocal, check
# if the reciprocal is in A. P.
# To check for A.P.
if (checkIsAP(rec, n)):
return True
else:
return False
# Driver Code
arr = [ 1.0 / 5.0, 1.0 / 10.0,
1.0 / 15.0, 1.0 / 20.0 ]
n = len(arr)
flag = 0
# Function to check AP
if (checkIsAP(arr, n)):
print("Yes, An AP can be formed", end = '\n')
flag = 1
# Function to check GP
if (checkIsGP(arr, n)):
print("Yes, A GP can be formed", end = '\n')
flag = 1
# Function to check HP
if (checkIsHP(arr, n)):
print("Yes, A HP can be formed", end = '\n')
flag = 1
elif (flag == 0):
print("No", end = '\n')
# This code is contributed by Pratik
C#
// C# program to check if a given
// array form AP, GP or HP
using System;
class GFG{
// Returns true if arr[0..n-1]
// can form AP
static bool checkIsAP(double []arr, int n)
{
// Base Case
if (n == 1)
return true;
// Sort array
Array.Sort(arr);
// After sorting, difference
// between consecutive elements
// must be same.
double d = arr[1] - arr[0];
// Traverse the given array and
// check if the difference
// between ith element and (i-1)th
// element is same or not
for (int i = 2; i < n; i++) {
if (arr[i] - arr[i - 1] != d) {
return false;
}
}
return true;
}
// Returns true if arr[0..n-1]
// can form GP
static bool checkIsGP(double []arr, int n)
{
// Base Case
if (n == 1)
return true;
// Sort array
Array.Sort(arr);
// After sorting, common ratio
// between consecutive elements
// must be same.
double r = arr[1] / arr[0];
// Traverse the given array and
// check if the common ratio
// between ith element and (i-1)th
// element is same or not
for (int i = 2; i < n; i++) {
if (arr[i] / arr[i - 1] != r)
return false;
}
return true;
}
// Returns true if arr[0..n-1]
// can form HP
static bool checkIsHP(double []arr, int n)
{
// Base Case
if (n == 1) {
return true;
}
double []rec = new double[n];
// Find reciprocal of []arr
for (int i = 0; i < n; i++) {
rec[i] = ((1 / arr[i]));
}
// After finding reciprocal, check if
// the reciprocal is in A. P.
// To check for A.P.
if (checkIsAP(rec, n))
return true;
else
return false;
}
// Driver's Code
public static void Main(String[] args)
{
double []arr = { 1.0 / 5.0, 1.0 / 10.0,
1.0 / 15.0, 1.0 / 20.0 };
int n = arr.Length;
int flag = 0;
// Function to check AP
if (checkIsAP(arr, n)) {
Console.Write("Yes, An AP can be formed"
+"\n");
flag = 1;
}
// Function to check GP
if (checkIsGP(arr, n)) {
Console.Write("Yes, A GP can be formed"
+"\n");
flag = 1;
}
// Function to check HP
if (checkIsHP(arr, n)) {
Console.Write("Yes, A HP can be formed"
+"\n");
flag = 1;
}
else if (flag == 0) {
Console.Write("No");
}
}
}
// This code is contributed by PrinciRaj1992
Javascript
Yes, A HP can be formed
时间复杂度: O(N * log N)