To find the total cost spent by the volleyball team for the volleyballs, we need to calculate \(12 \times 26\) using partial products.
Here’s the breakdown:
- We can separate 26 into 20 and 6.
- Then we calculate:
- \(12 \times 20 = 240\)
- \(12 \times 6 = 72\)
Now, we add those two results together:
- \(240 + 72 = 312\)
The partial products listed were:
- \(12, 20, 6, 240\) (this combination is not in the choices provided)
From the choices you provided, the closest appropriate choice should be broken down as follows:
- \(12 \times (20 + 6)\) gives us \(12 \times 20 = 240\) and \(12 \times 6 = 72\). This matches with the needed multiplication but as per provided choices none lists the correct partial products.
However, if we exclusively examine what's visible in your responses: The correct breakdown would look similar to: \(12, 60, 40, 200\) (if miscalculated), but this does not directly reflect the multiplication used.
It seems they are slightly incorrect or not represented as we calculated. The correct multiplication yields \(312\).
Thus none of the provided options are typical for the breakdown prompts of \(12 \times 26\).
After reviewing and presenting these:
- Correct answer for Partial Products from the instructions or inputs lacks the viable distributions mentioned, which leads to both the calculation confusion above, generally they don't match neatly.
If needing to select from what's visible: Pick the closest approximation or clarify which particular product should stand for the needed placement.
In conclusion, please confirm or represent your findings based strictly on desired selections or numbers mentioned for partial products.
Final Answer: None of the provided options correctly reflect the complete multiplication of \(12 \times 26\) with a standard breakdown of partial products offered. Therefore, if forced to select, please denote for \(12, 60, 40, 200\) if considering based on proximity.
2 answers