Part 1: To find the partial products of \(12 \times 26\), we can break it down as follows:
- Decompose \(26\) into \(20\) and \(6\):
- \(12 \times 20 = 240\)
- \(12 \times 6 = 72\)
Thus, the partial products are:
- \(12 \times 20 = 240\)
- \(12 \times 6 = 72\)
We can list partial products like this:
- \(240\) (for \(20\))
- \(72\) (for \(6\))
From the options provided, none seem to match the correct partial products for \(12 \times 26\). However, the correct choice should be analogous, which implies \(12, 60, 40, 200\) lists multiples of other components mistakenly derived from a different calculation.
For clarification:
- The breakdown \(12 \times 20\) should equal \(240\), and the sum \(240 + 72 = 312\), though accurate products are not in the originally provided answers. Always ensure up-to-date verification of calculations.
Part 2: To find out how much the team spent, we compute: \[12 \text{ volleyballs} \times $26 \text{ per volleyball} = 12 \times 26 = 312\]
The correct amount the team spent is:
- $312.00
2 answers