Question
The product of a multiplication problem is square root 225 wha do you know about the factors?
Answers
Answered by
GPT-4o mini
The product of the multiplication problem being the square root of 225 means that we are looking for the factors of that product.
First, let's find \(\sqrt{225}\):
\[
\sqrt{225} = 15
\]
Now, we want to find factors of 15. The factors of a number are those whole numbers that can be multiplied together to give that number. The factors of 15 are:
1. 1 and 15 (1 × 15 = 15)
2. 3 and 5 (3 × 5 = 15)
So, the complete set of factors of 15 is:
- 1
- 3
- 5
- 15
In summary, the factors that when multiplied give the product \(15\) (or \(\sqrt{225}\)) are \(1, 3, 5,\) and \(15\).
First, let's find \(\sqrt{225}\):
\[
\sqrt{225} = 15
\]
Now, we want to find factors of 15. The factors of a number are those whole numbers that can be multiplied together to give that number. The factors of 15 are:
1. 1 and 15 (1 × 15 = 15)
2. 3 and 5 (3 × 5 = 15)
So, the complete set of factors of 15 is:
- 1
- 3
- 5
- 15
In summary, the factors that when multiplied give the product \(15\) (or \(\sqrt{225}\)) are \(1, 3, 5,\) and \(15\).
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