When we talk about multiples, we refer to numbers that can be divided evenly by another number. In this case, we are focusing on the multiples of 12. Multiples of 12 could be any number that can be divided evenly by 12. So, we can start listing the first five multiples of 12:
First multiple: 12. When we divide 12 by 12, the result is 1 which means it can be divided evenly.
Second multiple: 24. When we divide 24 by 12, the result is 2 which indicates that it is also a multiple of 12.
Third multiple: 36. Dividing 36 by 12 gives us 3 which shows that it is another multiple of 12.
Fourth multiple: 48. By dividing 48 by 12, we get 4 which clearly makes it a multiple of 12.
Fifth multiple: 60. Dividing 60 by 12 gives us 5 which qualifies it as the fifth multiple of 12.
These are the first five multiples of 12. It is important to note that multiples can continue indefinitely, but for this case, we have specifically focused on the first five multiples.
Multiples are numbers that can be divided evenly by another number. When finding multiples, we determine which numbers can be obtained by multiplying a given number by different integers.
The 5 multiples refer to the numbers that are obtained by multiplying a number by 5. They are: 5, 10, 15, 20, and so on. Each of these numbers can be divided evenly by 5, resulting in a whole number quotient.
To identify the 5 multiples, we can use a simple pattern: starting with 5 and adding 5 to each previous multiple. This allows us to find the next multiple in the sequence.
For example, if we take the number 3 and multiply it by 5, we get the first multiple which is 15. If we add 5 to 15, we get the next multiple which is 20. By continuing this pattern, we can determine the 5 multiples of any given number.
The 5 multiples can be useful in various mathematical calculations and problem-solving. They help us determine factors of a number, find common multiples, and simplify fractions.
Understanding the 5 multiples provides a foundation for learning more complex mathematical concepts such as factors, divisors, and prime numbers.
When trying to find the multiples of a number, we are looking for numbers that can be divided evenly by that number. In the case of 12, we need to find the numbers that can be divided evenly by 12. Some common multiples of 12 include 24, 36, 48, and so on.
To find the multiples of 12, we can start by multiplying 12 by different whole numbers. For example, 12 multiplied by 1 is 12. This means that 12 is a multiple of itself.
Another way to find multiples is to use division. We can divide larger numbers by 12 and check if the division is exact. If it is, then the larger number is a multiple of 12.
It is important to note that multiples can be positive or negative numbers. For example, -12, -24, -36, and so on, are all multiples of 12, just like their positive counterparts.
Furthermore, we can also find the least common multiple (LCM) of 12 with other numbers. The LCM is the smallest multiple that two or more numbers have in common. For example, the LCM of 12 and 15 is 60, while the LCM of 12 and 18 is 36.
Knowing the multiples of a number can be useful for various mathematical operations. It helps in simplifying fractions, finding common denominators, and solving algebraic equations.
In conclusion, the multiples of 12 are numbers that can be divided evenly by 12. They can be positive or negative and can be found by multiplying 12 by different whole numbers or using division. Understanding multiples is important for various mathematical applications.
12 is a common multiple of a variety of numbers. One of the most common numbers that 12 is a multiple of is 6. This means that 12 can be evenly divided by 6, resulting in a quotient of 2. Additionally, 12 is a multiple of 3, as it can be divided evenly into 3 groups of 4.
Another number that 12 is a multiple of is 4. Dividing 12 by 4 results in a quotient of 3, demonstrating that 12 can be divided into 3 equal parts of 4. 12 is also a multiple of 2, as it can be divided evenly into 2 groups of 6.
In mathematics, we often refer to multiples as numbers that can be evenly divided by another number without leaving a remainder. Therefore, 12 is considered a common multiple of 6, 3, 4, and 2.
Understanding the concept of common multiples is crucial in various mathematical operations. For example, finding the least common multiple (LCM) of two or more numbers often requires identifying a number that is a multiple of all given numbers.
In conclusion, 12 is a common multiple of several numbers, namely 6, 3, 4, and 2. Recognizing these relationships helps to enhance one's understanding and application of mathematical concepts.
What are the first five multiples of 12 and 14?
When we talk about multiples, we refer to numbers that can be divided evenly by another number. In this case, we are looking for the first five multiples of 12 and 14.
The multiples of 12 are obtained by multiplying the number 12 by different integers:
Similarly, the multiples of 14 are obtained by multiplying the number 14 by different integers:
So, the first five multiples of 12 are 12, 24, 36, 48, and 60, while the first five multiples of 14 are 14, 28, 42, 56, and 70.
In conclusion, the multiples of a number can be found by multiplying that number by different integers. In this case, we found the first five multiples of 12 and 14. These multiples are useful in various mathematical calculations and can be used to solve problems in fields such as algebra and number theory.