I am a six digit number, all my digits are the same, the sum of all my digits after being subtracted from the largest six digit number is six, who am i

If all "all my digits are the same," how can one be "the largest six digit number"?

To find the answer to this question, let's break it down step by step:

1. Identify the largest six-digit number: The largest six-digit number is 999,999.

2. Subtract the sum of the digits from this number: In this case, we are subtracting the sum of the digits from 999,999. Let's denote the digit as "x". Since all digits are the same, the sum of the digits can be represented as 6x (where x is the digit).

3. Set up the equation: Subtracting 6x from 999,999 gives us the equation: 999,999 - 6x = 6.

4. Solve the equation: To find the value of x, we can solve the equation for x. Starting with 999,999 - 6x = 6, we can simplify it further:

999,999 - 6x = 6
999,993 - 6x = 0
-6x = -999,993 (by subtracting 999,993 from both sides)
x = -999,993 / -6
x = 166,665.5

However, we are looking for a digit, not a decimal. Therefore, there is no whole number solution to this equation.

Hence, there is no six-digit number with identical digits for which the sum of the digits subtracted from the largest six-digit number is six.