If you have ever thought about prime factors of 98, you are in good company. Prime factors can be a very frustrating process for many students because they usually have to struggle to remember it each time.
The next few chapters are about prime factorization.
Prime factorization is the process of factorizing a number into its prime factors. In other words, we’re going to break the number into its prime factors. Think of it like a pizza where half of the stuff that goes into the crust is on top and the other half is on the bottom. The bottom half is basically a “base,” and the top half is a “crust.
They’re not the only two things that prime factorization can be. In fact, it’s a very general process, and it’s the base that can make the difference between a number being prime and a number being composite. The next few chapters are on prime factorization in general and how it applies to the number 98.
So far prime factorization of 98 has been the source of some confusion, because when I was doing it I got really excited about it, but when I finally did it I realized it was a little more complicated than I thought. The first step is to take a number, divide it in half, and see if each half is prime. If they are, the number is prime. If not, the two halves of the number are not prime.
The next chapter will be on how to divide 99 by 98. And I’ll talk about how to do this in more detail in this chapter.
Prime is an important number, but unfortunately it can be really confusing to people who don’t know which way to go. Many people believe that the two primes are 9 and 7, but that’s not the case. We can divide 99 by 98 and get 98. The two primes are actually 99 and 98, but 99 cannot be divided by 98 because they are both divisible by 9. So 98 can be divided by 98 and get 98 again, and so on.
The goal here is to find a universal number that divides 98 by 99. We already mentioned 99, but if we were to think about how to find a universal number, it would be in the shape of 9. So here’s a way to think about it. The key is to think about the number, the prime, and the divisibility of the divisibility.
We can find out how many primes are there by counting how many times the number of primes is divisible by 9. So 9 divides 98 and 98. This leaves 9, 8, 7, 6, 5, 4, 3. So 9, 8, 7, 6, 5, 4 are the primes, and we know there are 7 primes.