Answer :
Sure! Let's work through the division step-by-step:
We need to divide 62,479 by 884 and find both the quotient and the remainder.
1. Set up the division: You're dividing 62,479 by 884.
2. Estimate how many times 884 fits into 6,247: Since 884 is less than 6,247, we start by estimating how many times it goes into 6,247. It fits about 7 times (because 884 × 7 = 6,188, which is close to 6,247).
3. Subtract: Subtract 6,188 from 6,247 to get a remainder.
[tex]\[
6,247 - 6,188 = 59
\][/tex]
4. Bring down the next digit (9 from 62,479): Now, bring down the next digit, which is 9, making it 599.
5. Estimate again: Determine how many times 884 fits into 599. Since 884 is larger than 599, it doesn't fit at all. Therefore, the remainder becomes 599.
6. Conclusion: The full quotient is 70, and the remainder is 599.
So, [tex]\(62,479 \div 884 = 70\)[/tex] with a remainder of 599.
We need to divide 62,479 by 884 and find both the quotient and the remainder.
1. Set up the division: You're dividing 62,479 by 884.
2. Estimate how many times 884 fits into 6,247: Since 884 is less than 6,247, we start by estimating how many times it goes into 6,247. It fits about 7 times (because 884 × 7 = 6,188, which is close to 6,247).
3. Subtract: Subtract 6,188 from 6,247 to get a remainder.
[tex]\[
6,247 - 6,188 = 59
\][/tex]
4. Bring down the next digit (9 from 62,479): Now, bring down the next digit, which is 9, making it 599.
5. Estimate again: Determine how many times 884 fits into 599. Since 884 is larger than 599, it doesn't fit at all. Therefore, the remainder becomes 599.
6. Conclusion: The full quotient is 70, and the remainder is 599.
So, [tex]\(62,479 \div 884 = 70\)[/tex] with a remainder of 599.
