To break down the division problem \(3347 \div 7\) into smaller, more manageable parts, we can separate the number into smaller components. Here are 5 friendly equations:
- \(3000 \div 7\)
- \(300 \div 7\)
- \(40 \div 7\)
- \(7 \div 7\)
- \(7 \div 7\)
Now, we can calculate each of these:
- \(3000 \div 7 \approx 428.57\)
- \(300 \div 7 \approx 42.86\)
- \(40 \div 7 \approx 5.71\)
- \(7 \div 7 = 1\)
- \(7 \div 7 = 1\)
Once we sum them up to find the final division:
- Sum the approximations to see how they contribute to the total:
- Total: \(428.57 + 42.86 + 5.71 + 1 + 1 = 479.14\)
However, for a proper division, we directly focus on \(3347 \div 7\), which equals \(479\) with a remainder of \(4\).
So the final answer is:
- \(3347 \div 7 = 479\) remainder \(4\).