Q:
# What are the multiples of 4?

Some multiples of 4 include 8, 16, 24, 400 and 60. Any number that can be defined as the product of 4 and another number is a multiple of 4. Any number that can be evenly divided by 4 is a multiple of 4.

Continue ReadingIntegers in multiplication can be referred to as either factors or multiples depending on their use in an equation. For example, 4*8=32, so 32 is a multiple of both 4 and 8. However, 32 is not a multiple of 4 and 8. Four and 8, therefore, are factors of 32, meaning that they can be multiplied together to achieve that result. A number is only considered the multiple of another if it can be multiplied by an integer to achieve that other number. Therefore, even though 4*0.25=1, 4 is not a multiple of 1 because 0.25 is not an integer.

All of the multiples of 4 can be defined as 4*a, where a is a positive integer greater than or equal to one. Therefore, there are an infinite number of multiples for 4, since 4 could be multiplied by any integer from 1 to infinity and would yield a different result. Huge amounts of multiples can be calculated very quickly by multiple calculators.

Learn more about Numbers-
Q:
## How can you find the LCM?

A: The multiples method is the most common technique of finding the LCM, or least common multiple, of a set of numbers. While there are other methods availabl... Full Answer >Filed Under: -
Q:
## What are the multiples of 30?

A: 30 has an infinite number of multiples. Some multiples of thirty include 30, 60, 90, 120 and 150. Three and 10 divide evenly into all multiples of 30. Full Answer >Filed Under: -
Q:
## What are some multiples of 12?

A: Some multiples of 12 are 24, 72, 144, 1,200 and 60. Any number that can be expressed as the product of 12 and another number is a multiple of 12. Any numbe... Full Answer >Filed Under: -
Q:
## What are the multiples of six?

A: There is an infinite number of multiples of six. A multiple of six is any number that is divisible by six, such as 12, 24, 360 or 7,907,560,848 Full Answer >Filed Under: