  ### Home > ACC6 > Chapter 6 Unit 6 > Lesson CC1: 6.2.3 > Problem6-100

6-100.

Recall that a factor of a number divides the original number and leaves no remainder. For example, $4$ and $6$ are factors of $12$.

1. Find all factors of $24$.

Remember that factors go together.
For example, if $12$ goes into $24$ exactly twice, then $2$ must go into $24$ exactly $12$ times.
2. Find the smallest number that has $1$, $2$, $3$, $4$, and $5$ as factors. What is the special name for this number?
Because $5$ is a factor, we know that it has to be a multiple of $5$.
Because $2$ is also a factor, we know that the number has to be a multiple of $10$.
Because $3$ is also a factor, we know that the number has to be a multiple of $30$.
What is the first multiple of $30$ that is divisible by $4$?
3. Find the second smallest number that has $1$, $2$, $3$, $4$, and $5$ as factors.
After reading the hint to part (b), answer the following question: What is the second multiple of $30$ that is divisible by $4$?