Given a large number as a string, find the remainder of number when divided by 7.
Examples :
Input : num = 1234 Output : 2 Input : num = 1232 Output : 0 Input : num = 12345 Output : 4
Simple Approach is to convert a string into number and perform the mod operation. But this approach will not work for long strings.
There exists an approach that works for large numbers also.
Below are the steps. Let the given number be “num”
- We use a series 1, 3, 2, -1, -3, -2 to find the remainder (Intuition behind the series is discussed below).
- Initialize the result as 0.
- Traverse num from end and above series from beginning. For every traversed digit, multiply it with next digit of series, and add the multiplication to result.
- Keep repeating step 3 while there are more digits to process. If there are more than 6(number of terms in series) digits, then start traversing the series from beginning.
- After each step, we keep doing result = result % 7 to make sure that result remains less than 7.
Illustration :
let us take above Example where number is 12345. We reverse the number from end and series from the beginning and keep adding multiplication to the result. (12345 % 7) = (5*1 + 4*3 + 3*2 + 2*(-1) + 1*(-3)) % 7 = (5 + 12 + 6 - 2 - 3)%7 = (18) % 7 = 4 hence 4 will be the remainder when we divide the number 12345 by 7.
How does this series formula work?
Below is the intuition behind the series
1 % 7 = 1 10 % 7 = 3 100 % 7 = 2 1000 % 7 = 6 = (-1) % 7 10000 % 7 = 4 = (-3) % 7 100000 % 7 = 5 = (-2) % 7 The series repeats itself for larger powers 1000000 % 7 = 1 10000000 % 7 = 3 .............. ............... The above property of modular division with 7 and associative properties of modular arithmetic are the basis of the approach used here.
Implementation:
C++
// C++ program to find remainder of a large // number when divided by 7. #include<iostream> using namespace std;
/* Function which returns Remainder after dividing the number by 7 */
int remainderWith7(string num)
{ // This series is used to find remainder with 7
int series[] = {1, 3, 2, -1, -3, -2};
// Index of next element in series
int series_index = 0;
int result = 0; // Initialize result
// Traverse num from end
for ( int i=num.size()-1; i>=0; i--)
{
/* Find current digit of nun */
int digit = num[i] - '0' ;
// Add next term to result
result += digit * series[series_index];
// Move to next term in series
series_index = (series_index + 1) % 6;
// Make sure that result never goes beyond 7.
result %= 7;
}
// Make sure that remainder is positive
if (result < 0)
result = (result + 7) % 7;
return result;
} /* Driver program */ int main()
{ string str = "12345" ;
cout << "Remainder with 7 is "
<< remainderWith7(str);
return 0;
} |
Java
// Java program to find remainder of a large // number when divided by 7. class GFG
{ // Function which return Remainder
// after dividingthe number by 7
static int remainderWith7(String num)
{
// This series is used to
// find remainder with 7
int series[] = { 1 , 3 , 2 , - 1 , - 3 , - 2 };
// Index of next element in series
int series_index = 0 ;
// Initialize result
int result = 0 ;
// Traverse num from end
for ( int i = num.length() - 1 ; i >= 0 ; i--)
{
/* Find current digit of nun */
int digit = num.charAt(i) - '0' ;
// Add next term to result
result += digit * series[series_index];
// Move to next term in series
series_index = (series_index + 1 ) % 6 ;
// Make sure that result never goes beyond 7.
result %= 7 ;
}
// Make sure that remainder is positive
if (result < 0 )
result = (result + 7 ) % 7 ;
return result;
}
// Driver code
public static void main (String[] args)
{
String str = "12345" ;
System.out.print( "Remainder with 7 is "
+remainderWith7(str));
}
} // This code is contributed by Anant Agarwal. |
Python3
# Python3 program to find remainder of # a large number when divided by 7. # Function which return Remainder # after dividing the number by 7 def remainderWith7(num):
# This series is used to
# find remainder with 7
series = [ 1 , 3 , 2 , - 1 , - 3 , - 2 ];
# Index of next element
# in series
series_index = 0 ;
# Initialize result
result = 0 ;
# Traverse num from end
for i in range (( len (num) - 1 ), - 1 , - 1 ):
# Find current digit of num
digit = ord (num[i]) - 48 ;
# Add next term to result
result + = digit * series[series_index];
# Move to next term in series
series_index = (series_index + 1 ) % 6 ;
# Make sure that result
# never goes beyond 7.
result % = 7 ;
# Make sure that remainder
# is positive
if (result < 0 ):
result = (result + 7 ) % 7 ;
return result;
# Driver Code str = "12345" ;
print ( "Remainder with 7 is" ,
remainderWith7( str ));
# This code is contributed by mits |
C#
// C# program to find the remainder of // a large number when divided by 7. using System;
class GFG
{ // Function which return Remainder
// after dividingthe number by 7
static int remainderWith7(String num)
{
// This series is used to
// find remainder with 7
int []series = {1, 3, 2, -1, -3, -2};
// Index of next element in series
int series_index = 0;
// Initialize result
int result = 0;
// Traverse num from end
for ( int i = num.Length - 1; i >= 0; i--)
{
/* Find current digit of nun */
int digit = num[i] - '0' ;
// Add next term to result
result += digit * series[series_index];
// Move to next term in series
series_index = (series_index + 1) % 6;
// Make sure that result never goes beyond 7.
result %= 7;
}
// Make sure that remainder is positive
if (result < 0)
result = (result + 7) % 7;
return result;
}
// Driver code
public static void Main ()
{
String str = "12345" ;
Console.Write( "Remainder with 7 is " +
remainderWith7(str));
}
} // This code is contributed by nitin mittal. |
PHP
<?php // PHP program to find remainder of // a large number when divided by 7. /* Function which return Remainder after dividing the number by 7 */
function remainderWith7( $num )
{ // This series is used to
// find remainder with 7
$series = array (1, 3, 2, -1, -3, -2);
// Index of next element
// in series
$series_index = 0;
// Initialize result
$result = 0;
// Traverse num from end
for ( $i = strlen ( $num ) - 1; $i >= 0; $i --)
{
// Find current digit of num
$digit = $num [ $i ] - '0' ;
// Add next term to result
$result += $digit *
$series [ $series_index ];
// Move to next term in series
$series_index = ( $series_index + 1) % 6;
// Make sure that result
// never goes beyond 7.
$result %= 7;
}
// Make sure that remainder
// is positive
if ( $result < 0)
$result = ( $result + 7) % 7;
return $result ;
} // Driver Code { $str = "12345" ;
echo "Remainder with 7 is " ,
(remainderWith7( $str ));
return 0;
} // This code is contributed by nitin mittal. ?> |
Javascript
<script> // Javascript program to find remainder of a large // number when divided by 7. /* Function which returns Remainder after dividing the number by 7 */ function remainderWith7(num)
{ // This series is used to find remainder with 7
series = [1, 3, 2, -1, -3, -2]
// Index of next element in series
var series_index = 0;
var result = 0; // Initialize result
// Traverse num from end
for ( var i = num.length - 1; i >= 0; i--)
{
/* Find current digit of nun */
var digit = num[i] - '0' ;
// Add next term to result
result += digit * series[series_index];
// Move to next term in series
series_index = (series_index + 1) % 6;
// Make sure that result never goes beyond 7.
result %= 7;
}
// Make sure that remainder is positive
if (result < 0)
result = (result + 7) % 7;
return result;
} /* Driver program */ var str = "12345" ;
document.write( "Remainder with 7 is " + remainderWith7(str));
// This code is contributed by oob2000. </script> |
Output
Remainder with 7 is 4
Time complexity : O(n)
Auxiliary Space : O(1)