1.Divisibility by 10: If a number has 0 in the one's place then it is divisible by 10.
2.Divisibility by 5: A number which has either 0 or 5 in it's one's place is divisible by 5.
3.Divisibility by 2: A number is divisible by 2 if it has 0,2,4,6 or 8 in it's one's place.
4.Divisibility by 3: If sum of the digits is a multiple of 3, then the number is divisible by 3
ex: 112461 = (1+1+2+4+6+1)=15 is divisible by 3 , so 112461 is divisible by 3.
5.Divisibility by 6: If a number is divisible by both 2 & 3 then it is divisible by 6.
6.Divisibility by 4: A number with 3 or more digits is divisible by 4 if the number formed by its last two digits (i.e; ones & tens) is divisible by 4.
Divisibility for 1 0r 2 digit number by 4 has to be checked by actual division.
ex: 12458936 = last 2 digits =36 which is divisible by 4 , so 12458936 is divisible by 4
7.Divisibility by 8: A number with 4 or more digits is divisible by 8 if the number formed by the last 3 digits is divisible by 8.
The divisibility for numbers with 1,2 or 3 digits by 8 has to b checked by actual division.
8.Divisibility by 9: If the sum of the digits is divisible by 9, then the number itself is divisible by 9.
9.Divisibility by 11: Find the difference between the sum of the digits at the odd place (from the right) and the sum of digits at even place (from the right) of a number.
If the difference is either 0 or divisible by 11, then the number is divisible by 11.
ex: 61809
=> (9+8+6)-(0+1) = 23-1=22 .
Since 22 is divisible by 11, so 61809 is divisible by 11.
10.Divisibility by 7:
For 3 digits numbers: Subtract twice the last digit from the number formed by the remaining digits. If the remaining number is multiple of 7 then it is divisible by 7.
ex: 651
=>65-(1*2)
=>63
Since 63 is divisible by 7, so 651 is divisible by 7.
For 4 digits and above numbers: Divide the number into two groups of 3 digits (starting from right) and find the difference between the sum of the numbers in odd and even places. If the difference is 0 or divisible by 7, it is divisible by 7.
ex:4537792
=>(792+4)-(537)= 259, which is divisible by 7 .
11.Divisibility by 13:
For 3 digits numbers: Multiple last digit with 4 and add with the remaining number, the number formed is divisible 13 then the entire number is divisible by 13.
ex: 273
=>27+(3*4)
=>27+12=39 , which is divisible by 13.
For 4 digits and above numbers: Divide the number into two groups of 3 digits (starting from right) and find the difference between the sum of the numbers in odd and even places. If the difference is 0 or divisible by 13, it is divisible by 13.
ex:579488
=>(579)-(488)= 91, which is divisible by 13 .
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