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Can you find the largest number possible containing any of 9 of 10 digits, considering 0 also a number, that is divisible by 11 without a reminder?
Originally posted by Greg Bernhardt
Can you find the largest number possible containing any of 9 of 10 digits, considering 0 also a number, that is divisible by 11 without a reminder?
The largest possible number that can be formed using 9 out of 10 digits is 987,654,321. This number contains all the digits from 1 to 9 except for 0.
Yes, this number can be formed using any order of the 9 digits. As long as all 9 digits are present, the number will still be the largest possible number.
The smallest possible number that can be formed using 9 out of 10 digits is 123,456,789. This number contains all the digits from 1 to 9 in ascending order.
No, the number cannot be formed using repeated digits. It must contain each digit from 1 to 9 only once in order to be the largest possible number.
This number is significant in mathematics because it is the largest possible number that can be formed using only 9 out of 10 digits. It is also known as the "Pandigital Number" and has interesting properties when used in certain mathematical equations.