Can you determine whether the total number of classrooms in school in multiples of 48 or not? There are students in a school and one classroom has 15 students.
Example 2: Are any of the first ten multiples of 48 odd? The first ten multiples of 48 are, 48, 96, , , , , , , and As all the multiples of 48 are divisible by 2 hence, the first ten multiples of 48 are not odd. First five multiples of 48 are, 48, 96, , and Hence, the sum of first five multiples of 48 is Here GCF 48, 60 is referred as the greatest common factor of 48 and Multiples of 48 Multiples of a number "n" can be obtained by using the table of "n".
It can be factored further. Hence, it can only be factored as 1 and the number itself. Prime factorization is the process of writing a number as a product of its prime factors. Factors of 48 by prime factorization are given using the following steps. Step 1: Write the pair of factors that, on multiplication, give the required number. Step 2: See the factors, whether each one of them is prime or not.
Let's dive in! A factor pair is a combination of two factors which can be multiplied together to equal In proper math terms, the number 48 is called the product and the two numbers that can be multiplied together to equal it are called the factors. In order to work out the factor pairs of 48 we need to first get all of the factors of Once you have the list of all those factors we can pair them together to list out all of the factor pairs. Okay, so we know all of the factors for 48 now and to work out the factor pairs we can go through that list and find all of the different combinations that can be used to multiply together to result in Therefore, the sum of all factors of 48 is Prime Factor of any Prime Number :.
To make the task easier we can find the square root of the given number. Now, list all the prime numbers less than 6 which are 2,3 and 5 and since 41 cannot be divided evenly by 2, 3, or 5, we can conclude that 41 is a prime number. So there are no prime factors of Solved Examples.
Example 1: Write down the factors of Therefore the factors of 16 are 1, 2, 3, 4, 6, 8, 12, 16, 24 and Example 2: Write down the factors of Therefore the factors of 16 are 1, 2, 4, 17, 34 and Positive Factors of 48 1, 2, 3, 4, 6, 8, 12, 16, 24 and 48 Negative Factors of 48 -1,-2,-3,-4,-6,-8,,, and
0コメント