Is there a relationship between the divisibility of a number and the factors of the same number? If so, what is it? If not, why? (2 points)
Yes, there is a relationship between the divisibility of a number and its factors.
When we say a number is divisible by another number, it means that the quotient of the division is a whole number without a remainder. For example, if we say that 10 is divisible by 2, it means that 10 divided by 2 equals 5, which is a whole number. In this case, 2 is a factor of 10 because it divides evenly into it.
The factors of a number are the numbers that divide into it without any remainder, just like in the example above. So, every factor of a number is also a number that divides it evenly.
Therefore, the divisibility of a number is directly related to its factors. If a number is divisible by another number, then the second number is a factor of the first number.
Yes, there is a relationship between the divisibility of a number and the factors of the same number.
The factors of a number are the numbers that divide evenly into that number without leaving a remainder. For example, the factors of 12 are 1, 2, 3, 4, 6, and 12.
Now, when we talk about the divisibility of a number, it means that the number is divisible by another number without leaving a remainder. For example, if a number is divisible by 4, it means that it can be divided evenly by 4 without any remainder.
The relationship between the divisibility of a number and its factors is that if a number is divisible by another number, then that number will be a factor of the original number. For example, if a number is divisible by 3, then 3 will be a factor of that number.
In other words, if a number "A" is divisible by a number "B", then "B" will be a factor of "A". This relationship holds true for all numbers.