Are you looking for a way to calculate the greatest common factor of 62, 24, 60, 744 ? Well, you’re in luck! In this article, we will be showing you how to use two different methods to find the GCF of 62, 24, 60, 744. We also provide a free GCF of Two or More Numbers Calculator to obtain instant results.
Given numbers are 62, 24, 60, 744
The greatest common factor of 62, 24, 60, 744 can be found by using the following 2 different methods.
The GCF of 62, 24, 60, 744 is 2.
Prime factorization is basically division by prime numbers only. Keep dividing all numbers by the same prime number, until the numbers can no longer be divided by a single prime number. Then, multiply all the prime numbers that are on the left side.
2 | 62, 24, 60, 744 |
31, 12, 30, 372 |
∴ Thus, the GCF of given numbers is 2 = 2
The common factor method requires listing down all the factors of 62,24,60,744 that divide each of these numbers without leaving a remainder. To begin, let us list down the factors
list down the factors of 62
1,2,31,62
list down the factors of 24
1,2,3,4,6,8,12,24
list down the factors of 60
1,2,3,4,5,6,10,12,15,20,30,60
list down the factors of 744
1,2,3,4,6,8,12,24,31,62,93,124,186,248,372,744
Greatest Common Factor
Once you have listed down the factors, all you have to do is look for the highest factor that appears in all the three aforementioned lists. The greatest number that we can see in all lists is 2 . Therefore, the GCF of 62,24,60,744 is 2
1. What is the GCF of 62, 24, 60, 744 ?
Answer: GCF of 62, 24, 60, 744 is 2.
2. How to calculate the GCF of 62, 24, 60, 744 ?
Answer: You can use two different methods: listing down the factors, and prime factorization. If you want to use the listing method, then simply write down all the factors of 62, 24, 60, 744. Then, select the greatest number that appears in lists. From this, you will see that the GCF is 2. Next, you can also use the prime factorization method to divide the numbers by prime numbers. Then, multiply the prime numbers on the side to get your answer, which is 2.