The divisibility rule for 16 states that a number is divisible by 16 if its last four digits are divisible by 16. This rule can be used to quickly determine whether a number is divisible by 16 without having to perform the division operation. The divisibility rule for 16 is useful for numbers that end in 0, 4, 8, or 12, as these are the only values that are evenly divisible by 16.

## Divisibility Rule For 16

When working with numbers, it is important for students to understand the divisibility rules. These rules can be used to quickly determine if a number is divisible by another number. The divisibility rule for 16 states that a number is divisible by 16 if the last four digits of the number are divisible by 16. PDF

For example, let’s look at the number 36,288. The last four digits of this number are 8816. To determine if 36,288 is divisible by 16, we would need to determine if 8816 is divisible by 16. We can do this by looking at the last two digits of 8816, which are 16. Because 16 is evenly divisible by 16, we know that 36,288 is also evenly divisible by 16.

### Examples of Divisibility Rule of 16

The divisibility rule for 16 states that a number is divisible by 16 if the last four digits of the number are divisible by 16. For example, the number 12,456 is divisible by 16 because the last four digits (3456) are divisible by 16.

Here are some more examples of numbers that are divisible by 16:

1. 20,416

2. 45,760

3. 91,392

4.136,448

5.

Need of rules of divisibility for 16 for students

There are a few different divisibility rules for 16 that students should be aware of. These rules can come in handy when trying to determine whether or not a number is evenly divisible by 16. PDF

The first rule is that a number is evenly divisible by 16 if it is evenly divisible by 4 and by 8. This means that the number must be divisible by both 4 and 8 with no remainder left over.

another rule is that a number is evenly divisible by 16 if the last four digits of the number are zeroes. For example, 16,000 would be evenly divisible by 16 because the last four digits are zeroes.

Divisibility rules 16

When learning mathematics, it is important to understand and be able to apply the divisibility rules. The divisibility rule for 16 states that a number is divisible by 16 if the last four digits of the number are divisible by 16. This rule can be applied when working with large numbers, as well as when performing calculations with decimals.

This rule is helpful in many situations, such as when dividing large numbers or when calculating with decimals. For example, when dividing a large number by 16, you can determine if the number is evenly divisible by looking at the last four digits. If those digits are evenly divisible by 16, then the entire number is evenly divisible by 16.

The same concept applies when working with decimals.

What is the divisibility rule for 16

The divisibility rule for 16 states that if the last two digits of a number are divisible by 16, then the entire number is divisible by 16. This rule can be used to quickly determine whether or not a number is divisible by 16 without having to do any long division. PDF

For example, let’s say you want to know if the number 624 is divisible by 16. To use the divisibility rule, you would look at the last two digits of the number, which are 24. Since 24 is divisible by 16, we know that 624 is also divisible by 16.

This rule can be applied to any number, not just numbers ending in 0 or 5. So long as the last two digits of the number are evenly divisible by 16, the entire number will be evenly divisible by 16.

Divisibility rule for sixteen with examples

The divisibility rule for 16 states that a number is divisible by 16 if the last four digits are divisible by 16. For example, the number 16 is divisible by 16 because the last four digits (16) are divisible by 16.

Here are some more exciting examples of numbers that are divisible by 16:

-64,256: This number is divisible by 16 because the last four digits (256) are divisible by 16.

-1,024: This number is also divisible by 16 because the last four digits (1024) are divisible by 16.

-4,096: This number is yet again divisible by 16 because the last four digits (4096) are divisible by 16.