Sure! To solve \( 929 \div 4 \) using smaller friendly equations, you can break it down using numbers that are easier to work with. Here are five simpler equations:
- \( 800 \div 4 = 200 \)
- \( 120 \div 4 = 30 \)
- \( 8 \div 4 = 2 \)
- \( 1 \div 4 = 0 \) (not needed for division, but shows another way to think about smaller parts)
- Combine the results:
- \( 200 + 30 + 2 = 232\)
Now we can sum up the results of \( 800, 120, 8, 1 \) to check the total:
- \( 800 + 120 + 8 + 1 = 929 \)
Finally, you can verify:
- \( 800 \div 4 = 200 \)
- \( 120 \div 4 = 30 \)
- \( 8 \div 4 = 2 \)
Add these results:
- \( 200 + 30 + 2 = 232\)
Thus, \( 929 \div 4 = 232\).
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