You are given an n-digit large number, you have to check whether it is divisible by 7.
A (r+1)-digit integer n whose digital form is (ar ar-1 ar-2….a2 a1 a0) is divisible by 7 if and only if the alternate series of numbers (a2 a1 a0) – (a5 a4 a3) + (a8 a7 a6) – … is divisible by 7.
The triplets of digits within parenthesis represent a 3-digit number in digital form.
The given number n can be written as a sum of powers of 1000 as follows.
n= (a2 a1 a0) + (a5 a4 a3)*1000 + (a8 a7 a6)*(1000*1000) +….
As 1000 = (-1)(mod 7), 1000 as per congruence relation.
For a positive integer n, two numbers a and b are said to be congruent modulo n, if their difference
(a – b) is an integer multiple of n (that is, if there is an integer k such that a – b = kn). This congruence relation is typically considered when a and b are integers, and is denoted
Hence we can write:
n = { (a2a1a0) + (a5a4a3)* (-1) + (a8a7a6)* (-1)*(-1)+…..}(mod 7),
Thus n is divisible by 7 if and if only if the series is divisible by 7.
Examples:
Input : 8955795758
Output : Divisible by 7
Explanation:
We express the number in terms of triplets
of digits as follows.
(008)(955)(795)(758)
Now, 758- 795 + 955 - 8 = 910, which is
divisible by 7
Input : 100000000000
Output : Not Divisible by 7
Explanation:
We express the number in terms of triplets
of digits as follows.
(100)(000)(000)(000)
Now, 000- 000 + 000 - 100 = -100, which is
not divisible by 7
Note that the number of digits in n may not be multiple of 3. In that case, we pass zero(s) on the left side of the remaining digits(s) after taking out all the triplets (from the right side of n) to form the last triplet.
A simple and efficient method is to take input in form of a string (make its length in form of 3*m by adding 0 to left of the number if required) and then you have to add the digits in blocks of three from the right to left until it becomes a 3 digit number to form an alternate series and check whether the series is divisible by 7 or not.
Here the program implementation to check the divisibility of 7 is done.
// C++ code to check divisibility of a // given large number by 7 #include<bits/stdc++.h> using namespace std;
int isdivisible7(string num)
{ int n = num.length(), gSum=0;
if (n == 0)
return 1;
// Append required 0s at the beginning.
if (n % 3 == 1) {
num= "00" + num;
n += 2;
}
else if (n % 3 == 2) {
num= "0" + num;
n++;
}
// add digits in group of three in gSum
int i, GSum = 0, p = 1;
for (i = n - 1; i >= 0; i--) {
// group saves 3-digit group
int group = 0;
group += num[i--] - '0' ;
group += (num[i--] - '0' ) * 10;
group += (num[i] - '0' ) * 100;
gSum = gSum + group * p;
// generate alternate series of plus
// and minus
p *= (-1);
}
return (gSum % 7 == 0);
} // Driver code int main()
{ // Driver method
string num= "8955795758" ;
if (isdivisible7(num))
cout << "Divisible by 7" ;
else
cout << "Not Divisible by 7" ;
return 0;
} |
// C code to check divisibility of a // given large number by 7 #include <stdio.h> #include <string.h> int isdivisible7( char num[])
{ int n = strlen (num), gSum=0;
char final[n+3];
if (n == 0 && num[0] == '\n' )
return 1;
// Append required 0s at the beginning.
if (n % 3 == 1) {
final[0]= '0' ;
final[1]= '0' ;
strcat (final,num);
n += 2;
}
else if (n % 3 == 2) {
final[0]= '0' ;
strcat (final,num);
n++;
}
// add digits in group of three in gSum
int i, GSum = 0, p = 1;
for (i = n - 1; i >= 0; i--) {
// group saves 3-digit group
int group = 0;
group += final[i--] - '0' ;
group += (final[i--] - '0' ) * 10;
group += (final[i] - '0' ) * 100;
gSum = gSum + group * p;
// generate alternate series of plus
// and minus
p *= (-1);
}
return (gSum % 7 == 0);
} // Driver code int main()
{ // Driver method
char num[] = "8955795758" ;
if (isdivisible7(num))
printf ( "Divisible by 7" );
else
printf ( "Not Divisible by 7" );
return 0;
} |
// Java code to check divisibility of a given large number by 7 class Test {
// Method to check divisibility
static boolean isDivisible7(String num)
{
int n = num.length();
if (n == 0 && num.charAt( 0 ) == '0' )
return true ;
// Append required 0s at the beginning.
if (n % 3 == 1 )
num = "00" + num;
if (n % 3 == 2 )
num = "0" + num;
n = num.length();
// add digits in group of three in gSum
int gSum = 0 , p = 1 ;
for ( int i = n - 1 ; i >= 0 ; i--) {
// group saves 3-digit group
int group = 0 ;
group += num.charAt(i--) - '0' ;
group += (num.charAt(i--) - '0' ) * 10 ;
group += (num.charAt(i) - '0' ) * 100 ;
gSum = gSum + group * p;
// generate alternate series of plus and minus
p = p * - 1 ;
}
// calculate result till 3 digit sum
return (gSum % 7 == 0 );
}
// Driver method
public static void main(String args[])
{
String num = "8955795758" ;
System.out.println(isDivisible7(num) ? "Divisible by 7" : "Not Divisible by 7" );
}
} |
# Python 3 code to check divisibility # of a given large number by 7 def isdivisible7(num):
n = len (num)
if (n = = 0 and num[ 0 ] = = '\n' ):
return 1
# Append required 0s at the beginning.
if (n % 3 = = 1 ) :
num = "00" + str (num)
n + = 2
elif (n % 3 = = 2 ) :
num = "0" + str (num)
n + = 1
# add digits in group of three in gSum
GSum = 0
p = 1
i = n - 1
while i> = 0 :
# group saves 3-digit group
group = 0
group + = ord (num[i]) - ord ( '0' )
i - = 1
group + = ( ord (num[i]) - ord ( '0' )) * 10
i - = 1
group + = ( ord (num[i]) - ord ( '0' )) * 100
GSum = GSum + group * p
# generate alternate series of
# plus and minus
p * = ( - 1 )
i - = 1
return (GSum % 7 = = 0 )
# Driver code if __name__ = = "__main__" :
num = "8955795758"
if (isdivisible7(num)):
print ( "Divisible by 7" )
else :
print ( "Not Divisible by 7" )
# This code is contributed by ChitraNayal |
// C# code to check divisibility of a // given large number by 7 using System;
class GFG {
// Method to check divisibility
static bool isDivisible7(String num)
{
int n = num.Length;
if (n == 0 && num[0] == '0' )
return true ;
// Append required 0s at the beginning.
if (n % 3 == 1)
num = "00" + num;
if (n % 3 == 2)
num = "0" + num;
n = num.Length;
// add digits in group of three in gSum
int gSum = 0, p = 1;
for ( int i = n - 1; i >= 0; i--) {
// group saves 3-digit group
int group = 0;
group += num[i--] - '0' ;
group += (num[i--] - '0' ) * 10;
group += (num[i] - '0' ) * 100;
gSum = gSum + group * p;
// generate alternate series
// of plus and minus
p = p * -1;
}
// calculate result till 3 digit sum
return (gSum % 7 == 0);
}
// Driver code
static public void Main()
{
String num = "8955795758" ;
// Function calling
Console.WriteLine(isDivisible7(num) ? "Divisible by 7" : "Not Divisible by 7" );
}
} // This code is contributed by Ajit. |
<script> // Javascript code to check divisibility of // a given large number by 7 // Function to check divisibility function isDivisible7(num)
{ let n = num.length;
if (n == 0 && num[0] == '0' )
return true ;
// Append required 0s at the beginning.
if (n % 3 == 1)
num = "00" + num;
if (n % 3 == 2)
num = "0" + num;
n = num.length;
// Add digits in group of three in gSum
gSum = 0 ;
let p = 1;
for (let i = n - 1; i >= 0; i--)
{
// Group saves 3-digit group
group = 0;
group += num[i--] - '0' ;
group += (num[i--] - '0' ) * 10;
group += (num[i] - '0' ) * 100;
gSum = gSum + group * p;
// Generate alternate series
// of plus and minus
p = p * -1;
}
// Calculate result till 3 digit sum
return (gSum % 7 == 0);
} // Driver Code let num = "8955795758" ;
document.write(isDivisible7(num) ? "Divisible by 7" :
"Not Divisible by 7" );
// This code is contributed by _saurabh_jaiswal </script> |
<?php // PHP code to check divisibility of // a given large number by 7 // Function to check divisibility function isDivisible7( $num )
{ $n = strlen ( $num ) ;
if ( $n == 0 && $num [0] == '0' )
return true;
// Append required 0s at the beginning.
if ( $n % 3 == 1)
$num = "00" . $num ;
if ( $n % 3 == 2)
$num = "0" . $num ;
$n = strlen ( $num );
// add digits in group of three in gSum
$gSum = 0 ;
$p = 1;
for ( $i = $n - 1; $i >= 0; $i --)
{
// group saves 3-digit group
$group = 0;
$group += $num [ $i --] - '0' ;
$group += ( $num [ $i --] - '0' ) * 10;
$group += ( $num [ $i ] - '0' ) * 100;
$gSum = $gSum + $group * $p ;
// generate alternate series
// of plus and minus
$p = $p * -1;
}
// calculate result till 3 digit sum
return ( $gSum % 7 == 0);
} // Driver Code $num = "8955795758" ;
echo (isDivisible7( $num ) ?
"Divisible by 7" :
"Not Divisible by 7" );
// This code is contributed by Ryuga ?> |
Output
Divisible by 7
Time Complexity: O(n), where n is the number of digits in num.
Auxiliary Space: O(1)
Method 2: Checking given number is divisible by 7 or not by using modulo division operator “%”.
#include <iostream> using namespace std;
int main()
{ //input
long long int n=100000000000;
// finding given number is divisible by 17 or not
if (n%7==0)
{
cout << "Yes" ;
}
else
{
cout << "No" ;
}
return 0;
} |
// Java code // To check whether the given number is divisible by 17 or not import java.io.*;
import java.util.*;
class GFG
{ public static void main(String[] args)
{
//input
long n=100000000000L;
// finding given number is divisible by 71 or not
if ((n)% 7 == 0 )
{
System.out.println( "Yes" );
}
else
{
System.out.println( "No" );
}
}
} //this code is contributed by aditya942003patil |
# Python code # To check whether the given number is divisible by 711 or not #input n = 100000000000
# the above input can also be given as n=input() -> taking input from user # finding given number is divisible by 7 or not if int (n) % 7 = = 0 :
print ( "Yes" )
else :
print ( "No" )
# this code is contributed by gangarajula laxmi
|
// c# code to check whether the given // number is diivisible by 7 or not using System;
public class GFG {
public static void Main()
{
//input
long n=100000000000;
// finding given number is divisible by 7 or not
if (n%7==0)
{
Console.Write( "Yes" );
}
else
{
Console.Write( "No" );
}
}
} // This code is contributed by aditya942003patil |
<script> // JavaScript code for the above approach
// To check whether the given number is divisible by 7 or not
//input
var n = 100000000000
// finding given number is divisible by 7 or not
if (n % 7 == 0)
document.write( "Yes" )
else
document.write( "No" )
// This code is contributed by Potta Lokesh
</script>
|
<?php //input
$n =100000000000;
// finding given number is divisible by 7 or not
if ( $n %7==0)
{
echo "Yes" ;
}
else
{
echo "No" ;
}
// This code is contributed by laxmigangarajula03 ?> |
Output
No
Time Complexity: O(1)
Auxiliary Space: O(1)
Method 3: Checking given String(containing digits 0-9) is divisible by 7 or not by checking each character of the string and taking its modulo % .
Firstly we take first character of the String and take its modulo with 7 .
Then we add the remainder with the next character and take modulo of that and so.. on , until we reach the end of the string .
If at last we have remainder as 0 we get string divisible by 7 otherwise we get it as not divisible by 7 .
// C++ code for the above approach #include <bits/stdc++.h> using namespace std;
bool isDivisibleBySeven(string s)
{ int remainder = 0;
for ( int i = 0; i < s.length(); i++) {
int digit = remainder * 10 + (s[i] - '0' );
remainder = digit % 7;
}
return remainder == 0;
} int main()
{ string s = "8955795758" ;
bool check = isDivisibleBySeven(s);
cout << ((check) ? "String is divisible by 7"
: "String is not divisible by 7" );
return 0;
} // This code is contributed by karandeep1234 |
/*package whatever //do not write package name here */ import java.io.*;
import java.util.Scanner;
class GFG {
public boolean isDivisibleBySeven(String s)
{
int remainder = 0 ;
for ( int i = 0 ; i < s.length(); i++) {
int digit
= remainder * 10 + (s.charAt(i) - '0' );
remainder = digit % 7 ;
}
return remainder == 0 ;
}
public static void main(String[] args)
{
GFG obj = new GFG();
String s = "8955795758" ;
boolean check = obj.isDivisibleBySeven(s);
System.out.print(
(check) ? "String is divisible by 7"
: "String is not divisible by 7" );
}
} |
# Python code for the above approach def isDivisibleBySeven(s):
remainder = 0
for i in range ( len (s)):
digit = remainder * 10 + int (s[i]) - 0
remainder = digit % 7
return remainder = = 0
s = "8955795758"
check = isDivisibleBySeven(s)
print ( "String is divisible by 7" if check else "String is not divisible by 7" )
# This code is contributed by lokesh |
// C# code for the above approach using System;
public class GFG {
public bool isDivisibleBySeven(String s)
{
int remainder = 0;
for ( int i = 0; i < s.Length; i++) {
int digit = remainder * 10 + (s[i] - '0' );
remainder = digit % 7;
}
return remainder == 0;
}
static public void Main()
{
GFG obj = new GFG();
string s = "8955795758" ;
bool check = obj.isDivisibleBySeven(s);
Console.Write((check)
? "String is divisible by 7"
: "String is not divisible by 7" );
}
} // This code is contributed by lokesh. |
// JavaScript code for the above approach function isDivisibleBySeven(s) {
let remainder = 0;
for (let i = 0; i < s.length; i++) {
let digit = remainder * 10 + (s.charCodeAt(i) - '0' .charCodeAt(0));
remainder = digit % 7;
}
return remainder === 0;
} let s = "8955795758" ;
let check = isDivisibleBySeven(s); console.log(check ? "String is divisible by 7" : "String is not divisible by 7" );
// This code is contributed by lokeshmvs21. |
Output
String is divisible by 7
Time Complexity: O(n) , n being length of the input string .
Auxiliary Space: O(1)
Method 4:
We can use the following property to check whether a number is divisible by 7 or not:
- If we subtract twice the last digit of the number from the remaining prefix, the resulting number will be divisible by 7 if and only if the original number is divisible by 7.
We can repeatedly apply this property until we are left with a 2-digit number, and then check whether it is divisible by 7 or not.
Steps:
- Initialize the given number as n.
-
While n is greater than or equal to 100, do the following:
a. Extract the last digit of n.
b. Update n as n // 10 – 2 * last_digit. - Check whether the remaining 2-digit number is divisible by 7 or not.
- If the remaining 2-digit number is divisible by 7, return “Divisible by 7”, otherwise return “Not divisible by 7”.
#include <iostream> using namespace std;
string is_divisible_by_7( long long n)
{ while (n >= 100) {
int last_digit = n % 10;
n = n / 10 - 2 * last_digit;
}
return (n % 7 == 0) ? "Divisible by 7"
: "Not divisible by 7" ;
} // example usage int main()
{ long long number = 8955795758;
cout << is_divisible_by_7(number) << endl;
return 0;
} |
import java.util.*;
public class Main {
public static String isDivisibleBy7( long n)
{
while (n >= 100 ) {
int lastDigit = ( int )(n % 10 );
n = n / 10 - 2 * lastDigit;
}
return (n % 7 == 0 ) ? "Divisible by 7"
: "Not divisible by 7" ;
}
public static void main(String[] args)
{
long number = 8955795758L;
System.out.println(isDivisibleBy7(number));
}
} |
def is_divisible_by_7(n):
while n > = 100 :
last_digit = n % 10
n = n / / 10 - 2 * last_digit
return "Divisible by 7" if n % 7 = = 0 else "Not divisible by 7"
# example usage number = 8955795758
print (is_divisible_by_7(number))
|
using System;
class GFG
{ static string IsDivisibleBy7( long n)
{
while (n >= 100)
{
int lastDigit = ( int )(n % 10);
n = n / 10 - 2 * lastDigit;
}
return (n % 7 == 0) ? "Divisible by 7" : "Not divisible by 7" ;
}
static void Main( string [] args)
{
long number = 8955795758;
Console.WriteLine(IsDivisibleBy7(number));
}
} |
// JavaScript function to check if a number is divisible by 7 function isDivisibleBy7(n) {
// While the number is greater than or equal to 100
while (n >= 100) {
// Get the last digit of the number
var lastDigit = n % 10;
// Update the number by removing the last digit and subtracting twice the last digit from it
n = Math.floor(n / 10) - 2 * lastDigit;
}
// Check if the resulting number is divisible by 7
return (n % 7 === 0) ? "Divisible by 7" : "Not divisible by 7" ;
} // Test the function with the given number var number = 8955795758;
console.log(isDivisibleBy7(number)); |
Output
Divisible by 7
Time complexity: O(log10 n)
Auxiliary space: O(1)