Answer :
To solve the division problem [tex]\(62 \div 7\)[/tex] and find the quotient and remainder, follow these steps:
1. Determine the Quotient:
- Divide 62 by 7.
- Figure out how many whole times 7 can fit into 62 without exceeding it.
- 7 fits into 62 a total of 8 whole times because [tex]\(7 \times 8 = 56\)[/tex], which is the highest multiple of 7 that is less than 62.
- Therefore, the quotient is 8.
2. Calculate the Remainder:
- Multiply the quotient (8) by the divisor (7): [tex]\(8 \times 7 = 56\)[/tex].
- Subtract this result from the original dividend (62): [tex]\(62 - 56 = 6\)[/tex].
- The number left over after subtracting is the remainder.
- So, the remainder is 6.
Finally, you have:
- Quotient: 8
- Remainder: 6
1. Determine the Quotient:
- Divide 62 by 7.
- Figure out how many whole times 7 can fit into 62 without exceeding it.
- 7 fits into 62 a total of 8 whole times because [tex]\(7 \times 8 = 56\)[/tex], which is the highest multiple of 7 that is less than 62.
- Therefore, the quotient is 8.
2. Calculate the Remainder:
- Multiply the quotient (8) by the divisor (7): [tex]\(8 \times 7 = 56\)[/tex].
- Subtract this result from the original dividend (62): [tex]\(62 - 56 = 6\)[/tex].
- The number left over after subtracting is the remainder.
- So, the remainder is 6.
Finally, you have:
- Quotient: 8
- Remainder: 6
