If you divide a number by 7, which number could the remainder NOT be? 2? 5? 6? 8?
Remainders have to be less than the divisor.
Duh! to me! Thanks!
i argree with him or her V
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ya its eight
To determine which number could not be the remainder when dividing a number by 7, we need to understand the concept of remainders. When dividing a number by 7, the remainder can be any whole number between 0 and 6 (inclusive). Let's check each of the given numbers to see if it falls within this range.
1. 2: When dividing this number by 7, we get a remainder of 2, which means it is possible.
2. 5: When dividing this number by 7, we get a remainder of 5, which means it is possible.
3. 6: When dividing this number by 7, we get a remainder of 6, which means it is possible.
4. 8: When dividing this number by 7, we need to determine the remainder. The quotient of 8 divided by 7 is 1, with a remainder of 1 (8 = 7*1 + 1). As 1 is not in the range of 0 to 6, it cannot be the remainder.
Therefore, among the given numbers, the remainder that cannot be obtained when dividing a number by 7 is 8.