Given a positive integer N, the task is to find the number of N-digit numbers such that at least one digit in the number has occurred more than once.
Examples:
Input: N = 2
Output: 9
Explanation:
All the 2-digit number such that at least 1 digits occurs more than once are {11, 22, 33, 44, 55, 66, 77, 88, 99}. Therefore, the total count is 9.Input: N = 5
Output: 62784
Naive Approach: The simplest approach to solve the given problem is to generate all possible N-digit numbers and count those numbers having at least one digit occurring more than once. After checking for all the numbers, print the value of the count as the resultant total count of numbers.
Algorithm
- Take input integer N from the user.
- Initialize a variable count to 0.
- Loop through all possible N-digit numbers, from 10^(N-1) to 10^N – 1.
- For each number, convert it to a string and check if any digit occurs more than once using a nested loop.
- If a digit occurs more than once, increment the count.
- After checking all numbers, print the value of the count as the resultant total count of numbers.
#include <iostream> #include <string> #include <algorithm> #include <cmath> using namespace std;
int main() {
int N = 2; // set the value of N
int countRepeated = 0; // initialize a counter variable
// iterate through all N-digit numbers
for ( int i = pow (10, N - 1); i < pow (10, N); i++) {
// convert the current number to a string
string digits = to_string(i);
// iterate through each digit in the string
for ( char digit : digits) {
// count the number of occurrences of the current digit in the string
if (count(digits.begin(), digits.end(), digit) > 1) {
// if the digit appears more than once, increment the counter and move on to the next number
countRepeated++;
break ;
}
}
}
// output the total count of N-digit numbers with at least one digit repeated
cout << "Total count of N-digit numbers with at least one digit repeated: " << countRepeated << endl;
return 0; // indicate successful program termination
} |
public class Main {
public static void main(String[] args) {
int N = 2 ;
int countRepeated = 0 ;
// Iterate through all N-digit numbers
for ( int i = ( int ) Math.pow( 10 , N - 1 ); i < Math.pow( 10 , N); i++) {
// Convert the current number to a string
String digits = String.valueOf(i);
// Create an array to keep track of the occurrences of each digit
int [] digitCount = new int [ 10 ];
// Iterate through each digit in the string
for ( char digit : digits.toCharArray()) {
int numericDigit = Character.getNumericValue(digit);
// Increment the count for the current digit
digitCount[numericDigit]++;
// If the digit appears more than once, increment the counter and move on to the next number
if (digitCount[numericDigit] > 1 ) {
countRepeated++;
break ;
}
}
}
System.out.println( "Total count of N-digit numbers with at least one digit repeated: " + countRepeated);
}
} |
countRepeated = 0 # initialize a counter variable
N = 2 # set the value of N
# iterate through all N-digit numbers for i in range ( 10 * * (N - 1 ), 10 * * N):
# convert the current number to a string
digits = str (i)
# iterate through each digit in the string
for digit in digits:
# count the number of occurrences of the current digit in the string
if digits.count(digit) > 1 :
# if the digit appears more than once, increment the counter and move on to the next number
countRepeated + = 1
break
# output the total count of N-digit numbers with at least one digit repeated print ( "Total count of N-digit numbers with at least one digit repeated: " , countRepeated)
|
using System;
class Program {
static void Main()
{
int N = 2; // Set the value of N
int countRepeated
= 0; // Initialize a counter variable
// Iterate through all N-digit numbers
for ( int i = ( int )Math.Pow(10, N - 1);
i < Math.Pow(10, N); i++) {
// Convert the current number to a string
string digits = i.ToString();
// Create a boolean flag to check if a digit is
// repeated
bool digitRepeated = false ;
// Iterate through each digit in the string
foreach ( char digit in digits)
{
// Count the number of occurrences of the
// current digit in the string
int digitCount
= digits.Split(digit).Length - 1;
// If the digit appears more than once, set
// the flag and break out of the loop
if (digitCount > 1) {
digitRepeated = true ;
break ;
}
}
// If at least one digit is repeated, increment
// the counter
if (digitRepeated) {
countRepeated++;
}
}
// Output the total count of N-digit numbers with at
// least one digit repeated
Console.WriteLine(
"Total count of N-digit numbers with at least one digit repeated: "
+ countRepeated);
}
} |
function countNumbersWithRepeatedDigit(N) {
let countRepeated = 0;
// Iterate through all N-digit numbers
for (let i = Math.pow(10, N - 1); i < Math.pow(10, N); i++) {
// Convert the current number to a string
const digits = i.toString();
// Create a boolean flag to check if a digit is repeated
let digitRepeated = false ;
// Iterate through each digit in the string
for (let j = 0; j < digits.length; j++) {
// Count the number of occurrences of the current digit in the string
const digitCount = digits.split(digits[j]).length - 1;
// If the digit appears more than once, set the flag and break out of the loop
if (digitCount > 1) {
digitRepeated = true ;
break ;
}
}
// If at least one digit is repeated, increment the counter
if (digitRepeated) {
countRepeated++;
}
}
// Output the total count of N-digit numbers with at least one digit repeated
console.log(
"Total count of N-digit numbers with at least one digit repeated: " + countRepeated
);
} const N = 2; // Set the value of N
countNumbersWithRepeatedDigit(N); |
Total count of N-digit numbers with at least one digit repeated: 9
Time Complexity: O(N *10N)
Auxiliary Space: O(1)
Efficient Approach: The above approach can also be optimized by using Dynamic Programming because the above problem has Overlapping subproblems and an Optimal substructure. The subproblems can be stored in dp[][][] table memoization where dp[digit][mask][repeated] stores the answer from the digitth position till the end, where the mask stores all the digits included in the number till now and repeated denotes if any digit has occurred more than once. Follow the steps below to solve the problem:
- Initialize a global multidimensional array dp[50][1024][2] with all values as -1 that stores the result of each recursive call.
-
Define a recursive function, say countOfNumbers(digit, mask, repeated, N) by performing the following steps.
- If the value of a digit is equal to (N + 1) then return 1 as a valid N-digit number is formed if repeated is equal to true. Otherwise, return 0.
- If repeated is equal to true, then return pow(10, N – digit + 1).
- If the result of the state dp[digit][mask][repeated] is already computed, return this value dp[digit][mask][repeated].
- If the current digit is 1, then any digit from [1, 9] can be placed and if N = 1, then 0 can be placed as well.
-
Iterate over the range [N == 1 ? 0 : 1, 9] using the variable i and perform the following steps:
- If the ith bit of the mask is set, then add the value of countOfNumbers(digit + 1, mask|(1<<i), 1, N).
- Otherwise, add the value of countOfNumbers(digit + 1, mask|(1<<i), 0, N).
-
Otherwise, iterate over the range [0, 9] using the variable i and perform the following steps:
- If the ith bit of the mask is set, then add the value of countOfNumbers(digit + 1, mask|(1<<i), 1, N).
- Otherwise, add the value of countOfNumbers(digit + 1, mask|(1<<i), 0, N).
- Return the sum of all possible valid placements of digits val as the result from the current recursive call.
- Print the value returned by the function countOfNumbers(1, 0, 0, N) as the resultant count of N-digit number satisfying the given criteria.
Below is the implementation of the above approach:
// C++ program for the above approach #include <bits/stdc++.h> using namespace std;
int dp[50][1 << 10][2];
// Function to find the number of N // digit numbers such that at least // one digit occurs more than once int countOfNumbers( int digit, int mask,
bool repeated, int n)
{ // Base Case
if (digit == n + 1) {
if (repeated == true ) {
return 1;
}
return 0;
}
// If repeated is true, then for
// remaining positions any digit
// can be placed
if (repeated == true ) {
return pow (10, n - digit + 1);
}
// If the current state has already
// been computed, then return it
int & val = dp[digit][mask][repeated];
if (val != -1) {
return val;
}
// Stores the count of number for
// the current recursive calls
val = 0;
// If current position is 1, then
// any digit can be placed.
// If n = 1, 0 can be also placed
if (digit == 1) {
for ( int i = (n == 1 ? 0 : 1);
i <= 9; ++i) {
// If a digit has occurred
// for the second time, then
// set repeated to 1
if (mask & (1 << i)) {
val += countOfNumbers(
digit + 1, mask | (1 << i), 1, n);
}
// Otherwise
else {
val += countOfNumbers(
digit + 1, mask | (1 << i), 0, n);
}
}
}
// For remaining positions any
// digit can be placed
else {
for ( int i = 0; i <= 9; ++i) {
// If a digit has occurred
// for the second time, then
// set repeated to 1
if (mask & (1 << i)) {
val += countOfNumbers(
digit + 1, mask | (1 << i), 1, n);
}
else {
val += countOfNumbers(
digit + 1, mask | (1 << i), 0, n);
}
}
}
// Return the resultant count for
// the current recursive call
return val;
} // Function to count all the N-digit // numbers having at least one digit's // occurrence more than once void countNDigitNumber( int N)
{ // Initialize dp array with -1
memset (dp, -1, sizeof dp);
// Function to count all possible
// number satisfying the given
// criteria
cout << countOfNumbers(1, 0, 0, N);
} // Driver Code int main()
{ int N = 2;
countNDigitNumber(N);
return 0;
} |
import java.util.Arrays;
// Java program for the above approach class GFG {
public static int [][][] dp = new int [ 50 ][ 1 << 10 ][ 2 ];
// Function to find the number of N
// digit numbers such that at least
// one digit occurs more than once
public static int countOfNumbers( int digit, int mask,
int repeated, int n)
{
// Base Case
if (digit == n + 1 ) {
if (repeated == 1 ) {
return 1 ;
}
return 0 ;
}
// If repeated is true, then for
// remaining positions any digit
// can be placed
if (repeated == 1 ) {
return ( int ) Math.pow( 10 , n - digit + 1 );
}
// If the current state has already
// been computed, then return it
int val = dp[digit][mask][repeated];
if (val != - 1 ) {
return val;
}
// Stores the count of number for
// the current recursive calls
val = 0 ;
// If current position is 1, then
// any digit can be placed.
// If n = 1, 0 can be also placed
if (digit == 1 ) {
for ( int i = (n == 1 ? 0 : 1 ); i <= 9 ; ++i) {
// If a digit has occurred
// for the second time, then
// set repeated to 1
if ((mask & ( 1 << i)) > 0 ) {
val += countOfNumbers(digit + 1 , mask | ( 1 << i), 1 , n);
}
// Otherwise
else {
val += countOfNumbers(digit + 1 , mask | ( 1 << i), 0 , n);
}
}
}
// For remaining positions any
// digit can be placed
else {
for ( int i = 0 ; i <= 9 ; ++i) {
// If a digit has occurred
// for the second time, then
// set repeated to 1
if ((mask & ( 1 << i)) > 0 ) {
val += countOfNumbers(digit + 1 , mask | ( 1 << i), 1 , n);
} else {
val += countOfNumbers(digit + 1 , mask | ( 1 << i), 0 , n);
}
}
}
// Return the resultant count for
// the current recursive call
return val;
}
// Function to count all the N-digit
// numbers having at least one digit's
// occurrence more than once
public static void countNDigitNumber( int N)
{
// Initialize dp array with -1
for ( int i = 0 ; i < 50 ; i++) {
for ( int j = 0 ; j < 1 << 10 ; j++) {
for ( int k = 0 ; k < 2 ; k++) {
dp[i][j][k] = - 1 ;
}
}
}
// Function to count all possible
// number satisfying the given
// criteria
System.out.println(countOfNumbers( 1 , 0 , 0 , N));
}
// Driver Code
public static void main(String args[])
{
int N = 2 ;
countNDigitNumber(N);
}
} // This code is contributed by gfgking. |
# Python program for the above approach dp = [[[ - 1 for i in range ( 2 )] for i in range ( 1 << 10 )] for i in range ( 50 )]
# Function to find the number of N # digit numbers such that at least # one digit occurs more than once def countOfNumbers(digit, mask, repeated, n):
global dp
# Base Case
if (digit = = n + 1 ):
if (repeated = = True ):
return 1
return 0
# If repeated is true, then for
# remaining positions any digit
# can be placed
if (repeated = = True ):
return pow ( 10 , n - digit + 1 )
# If the current state has already
# been computed, then return it
val = dp[digit][mask][repeated]
if (val ! = - 1 ):
return val
# Stores the count of number for
# the current recursive calls
val = 4
# If current position is 1, then
# any digit can be placed.
# If n = 1, 0 can be also placed
if (digit = = 1 ):
for i in range (( 0 if (n = = 1 ) else 1 ), 10 ):
# If a digit has occurred
# for the second time, then
# set repeated to 1
if (mask & ( 1 << i)):
val + = countOfNumbers(digit + 1 , mask | ( 1 << i), 1 , n)
# Otherwise
else :
val + = countOfNumbers(digit + 1 , mask | ( 1 << i), 0 , n)
# For remaining positions any
# digit can be placed
else :
for i in range ( 10 ):
# If a digit has occurred
# for the second time, then
# set repeated to 1
if (mask & ( 1 << i)):
val + = countOfNumbers(digit + 1 , mask | ( 1 << i), 1 , n)
else :
val + = countOfNumbers(digit + 1 , mask | ( 1 << i), 0 , n)
# Return the resultant count for
# the current recursive call
dp[digit][mask][repeated] = val
return dp[digit][mask][repeated]
# Function to count all the N-digit # numbers having at least one digit's # occurrence more than once def countNDigitNumber(N):
# Function to count all possible
# number satisfying the given
# criteria
print (countOfNumbers( 1 , 0 , 0 , N))
# Driver Code if __name__ = = '__main__' :
N = 2
countNDigitNumber(N)
# This code is contributed by mohit kumar 29. |
// C# program for the above approach using System;
class GFG{
public static int [,,] dp = new int [50, 1 << 10, 2];
// Function to find the number of N // digit numbers such that at least // one digit occurs more than once public static int countOfNumbers( int digit, int mask,
int repeated, int n)
{ // Base Case
if (digit == n + 1)
{
if (repeated == 1)
{
return 1;
}
return 0;
}
// If repeated is true, then for
// remaining positions any digit
// can be placed
if (repeated == 1)
{
return ( int )Math.Pow(10, n - digit + 1);
}
// If the current state has already
// been computed, then return it
int val = dp[digit, mask, repeated];
if (val != -1)
{
return val;
}
// Stores the count of number for
// the current recursive calls
val = 0;
// If current position is 1, then
// any digit can be placed.
// If n = 1, 0 can be also placed
if (digit == 1)
{
for ( int i = (n == 1 ? 0 : 1); i <= 9; ++i)
{
// If a digit has occurred
// for the second time, then
// set repeated to 1
if ((mask & (1 << i)) > 0)
{
val += countOfNumbers(
digit + 1, mask | (1 << i), 1, n);
}
// Otherwise
else
{
val += countOfNumbers(
digit + 1, mask | (1 << i), 0, n);
}
}
}
// For remaining positions any
// digit can be placed
else
{
for ( int i = 0; i <= 9; ++i)
{
// If a digit has occurred
// for the second time, then
// set repeated to 1
if ((mask & (1 << i)) > 0)
{
val += countOfNumbers(
digit + 1, mask | (1 << i), 1, n);
}
else
{
val += countOfNumbers(
digit + 1, mask | (1 << i), 0, n);
}
}
}
// Return the resultant count for
// the current recursive call
return val;
} // Function to count all the N-digit // numbers having at least one digit's // occurrence more than once public static void countNDigitNumber( int N)
{ // Initialize dp array with -1
for ( int i = 0; i < 50; i++)
{
for ( int j = 0; j < 1 << 10; j++)
{
for ( int k = 0; k < 2; k++)
{
dp[i, j, k] = -1;
}
}
}
// Function to count all possible
// number satisfying the given
// criteria
Console.Write(countOfNumbers(1, 0, 0, N));
} // Driver Code public static void Main()
{ int N = 2;
countNDigitNumber(N);
} } // This code is contributed by ukasp |
<script> // JavaScript program for the above approach let dp = new Array(50).fill(0)
.map(() => new Array(1 << 10).fill(0)
.map(() => new Array(2).fill(-1)));
// Function to find the number of N // digit numbers such that at least // one digit occurs more than once function countOfNumbers(digit, mask, repeated, n) {
// Base Case
if (digit == n + 1) {
if (repeated == true ) {
return 1;
}
return 0;
}
// If repeated is true, then for
// remaining positions any digit
// can be placed
if (repeated == true ) {
return Math.pow(10, n - digit + 1);
}
// If the current state has already
// been computed, then return it
let val = dp[digit][mask][repeated];
if (val != -1) {
return val;
}
// Stores the count of number for
// the current recursive calls
val = 0;
// If current position is 1, then
// any digit can be placed.
// If n = 1, 0 can be also placed
if (digit == 1) {
for (let i = (n == 1 ? 0 : 1);
i <= 9; ++i) {
// If a digit has occurred
// for the second time, then
// set repeated to 1
if (mask & (1 << i)) {
val += countOfNumbers(
digit + 1, mask | (1 << i), 1, n);
}
// Otherwise
else {
val += countOfNumbers(
digit + 1, mask | (1 << i), 0, n);
}
}
}
// For remaining positions any
// digit can be placed
else {
for (let i = 0; i <= 9; ++i) {
// If a digit has occurred
// for the second time, then
// set repeated to 1
if (mask & (1 << i)) {
val += countOfNumbers(
digit + 1, mask | (1 << i), 1, n);
}
else {
val += countOfNumbers(
digit + 1, mask | (1 << i), 0, n);
}
}
}
// Return the resultant count for
// the current recursive call
return val;
} // Function to count all the N-digit // numbers having at least one digit's // occurrence more than once function countNDigitNumber(N) {
// Initialize dp array with -1
// Function to count all possible
// number satisfying the given
// criteria
document.write(countOfNumbers(1, 0, 0, N));
} // Driver Code let N = 2; countNDigitNumber(N); </script> |
9
Time Complexity: O(10 * N * 210 * 2 )
Auxiliary Space: O(N * 210 * 2)