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| Divisibility Principle of 4 Divisibility Principle of 10 | Divisibility Principle of 11 | Divisibility Principles of 2 | Divisibility Principle of 3 | Divisibility Principle of 4 | Divisibility Principle of 5 | Divisibility Principle of 6 | Divisibility Principle of 8 | Divisibility Principle of 9 | More Divisibility Rules | Definition :-
A given number (with 3 or more digits) is divisible by 4, if the last two digits of given number(i.e one's digit and ten's digit) is divisible by 4, then the given number is also divisible by 4.
Divisibility Principle of 4 can be learned from the above examples :-
Example 1 = Is 624 divisible by 4 ?
Answer = In the given number 624,
the last two digits(i.e one's digit and ten's digit) is 24,
Since 24 is divisible by 4,
So, the given number 624 is also divisible by 4.
Example 2 = Is 894 divisible by 4 ?
Answer = In the given number 894,
the last two digits(i.e one's digit and ten's digit) is 94,
Since 94 is not divisible by 4,
So,the given number 894 is also not divisible by 4.
Example 3 = Is 7212 divisible by 4 ?
Answer = In the given number 7212,
the last two digits(i.e one's digit and ten's digit) is 12,
Since 12 is divisible by 4,
So,the given number 7212 is also divisible by 4.
Example 4 = Is 5446 divisible by 4 ?
Answer = In the given number 5446,
the last two digits(i.e one's digit and ten's digit) is 46,
Since 46 is not divisible by 4,
So,the given number 5446 is also not divisible by 4.
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