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The 1962-digit number


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The digital root of any number divisible by 9 (other than 0), is 9.



Let a repdigit number be denoted as x(y), such that y is the number of digits and x is the repeated digit.

From 1 ≤ n < 9(11), the digital sum of a number divisible by 9 is < 99. The digital sum of that number is 9.
From 9(11) ≤ n < 9(1(11)), the digital sum of the digital sum of a number divisible by 9 is < 99. The digital sum of the resulting number is 9.

A 1962-digit number is < 9(1(11)), therefore, given n is the 1962-digit number and S(k) is the digit sum function of k, z = S(S(S(n))) = 9.
Edited by DejMar
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