To analyze the model shown, we can break down the components based on your description:
- The model has 10 hundreds, which contributes \(10 \times 100 = 1000\).
- There are 4 tens (which is \(4 \times 10 = 40\)).
- There are 8 ones (which is \(8\)).
Now, if we add these together, we have:
\[ 1000 + 40 + 8 = 1048 \]
However, since we are focused on the multiplication problem, let's see how those components would be structured for multiplication by 5.
Given that you have 10 hundreds, 4 tens, and 8 ones being multiplied by 5, the respective multiplication problems would be:
- \( (10 \times 100) \times 5 \) for hundreds,
- \( (4 \times 10) \times 5 \) for tens, and
- \( 8 \times 5 \) for ones.
Thus, the combined expression can also be represented as:
\[ (10 \times 100 + 4 \times 10 + 8) \times 5 = 1048 \times 5 \]
However, if you're looking for the terms represented in a multiplication form similar to those provided:
- The closest option seems to convey that there is a combination in the hundreds and tens place, leading us to propose a multiplication.
The total combined makes \( 248\) when considering the mobilization of dozens and hundreds rightly.
Thus, the response that fits best with the components you've described is:
248 x 5
So, the final answer choice representing the multiplication would be:
248 x 5.