A number is called as binary-decimal if all the digits in the number should be either ‘1’ or ‘0’. Any number can be written as a sum of binary-decimals. Our task is to find the minimum number of binary-decimals to represent a number.
Input : 32 Output : 10 11 11
Input : 120 Output : 10 110
What could be an efficient solution to this?
take for example
54321 the answer is
11111
11110
11100
11000
10000
so consider it as a m*n matrix where m is maximum value of the digit in given number and n is number of digits. Then fill the columns with number of 1's equal to the value of digit corresponding to that column and rest with 0's.
#include<iostream>
using namespace std;
int max(int arr[],int c)
{
int max=arr[0];
for(int i=1;i<c;i++){
if(arr[i]>max){
max=arr[i];
}
}
return max;
}
int main() {
int n,x,c=0,i=0,j=0;
cin>>n;
x=n;
while(n!=0){
n=n/10;
c++;
}
int *a=new int[c];
while(x!=0){
a[i]=x%10;
x=x/10;
i++;
}
int r=max(a,c);
int ans[r][c];
for(int i=0;i<c;i++)
{
for(int j=0;j<r;j++)
{
if(a[c-i-1]!=0){
ans[j][i]=1;
a[c-i-1]--;
}
else
ans[j][i]=0;
}
}
for(i=0;i<r;i++){
for(j=0;j<c;j++){
cout<<ans[i][j];
}
cout<<"\n";
}
}
I have solved this using DP. May not be as good as the previous one. But this could be another approach.
import java.util.ArrayList;
import java.util.*;
class Deci_binary
{
public static void main(String ars[])
{
Scanner sc=new Scanner(System.in);
Deci_binary Db=new Deci_binary();
Db.deci_binary(sc.nextInt());
}
public void deci_binary(int input)
{
String input_string=input+"";
int length=input_string.length();
ArrayList<Integer> combination=combination(length);
ArrayList dp[]=new ArrayList[input+1];
ArrayList<Integer> empty=new ArrayList<Integer>();
dp[0]=empty;
int combination_size=combination.size();
for(int i=1;i<=input;i++)
{
dp[i]=null;
for(int j=0;j<combination_size;j++)
{
int combination_get=combination.get(j);
if(i>=combination_get)
{
ArrayList<Integer> previous=new ArrayList<Integer>(dp[i-combination_get]);
previous.add(combination_get);
dp[i]=min(dp[i],previous);
}
else{
break;
}
}
}
System.out.println(dp[input]);
}
public ArrayList<Integer> min(ArrayList<Integer> first,ArrayList<Integer> second)
{
if(first==null)
{
return second;
}
else{
int first_size=first.size();
int second_size=second.size();
if(first_size<second_size)
{
return first;
}
else{
return second;
}
}
}
public ArrayList<Integer> combination(int number)//this will give all the combinations of binary number having x number of digits
{
int last_number=(int)Math.pow(2,number);
ArrayList<Integer> combination=new ArrayList<Integer>(last_number-1);
for(int i=1;i<last_number;i++)
{
combination.add(Integer.parseInt(Integer.toBinaryString(i)));
}
return combination;
}
}
The simplest solution could be return the highest digit from the number. For example : The answer to 82734 is
11111
11111
10111
10101
10100
10100
10100
10000
Below is a c++ solution for this.
int solve(int n) {
string n_str = to_string(n);
return *max_element(n_str.begin(),n_str.end()) - '0';
}
