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2000 9s (Posted on 2019-04-15)

Find the sum of the digits of the number 999...999³. The number has 2000 repeated 9s.

No Solution Yet Submitted by Danish Ahmed Khan

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Puzzle Solution

Comment 2 of 2 |

In general, we have:

(99...........99)^3

p 9s

= (10^p-1)^3

= 10^(3p) - 3* 10^(2p) + 3 * 10^p -1

= 100.....00 - 300......00 + 300......00 - 1

3p 0s 2p 0s p 0s

= 99..............99700.......00299.......99

p-1 9s p-1 0s p 9s

Accordingly, the sum of the digits of (10^p -1)^3 is:

(p-1)*9 + 7 +2 + p*9

= 18*p -9 +9

= 18*p

Substituting p=2000, we have the required sum of the digits of (10^2000 - 1)^3 as:

18*2000 = 36,000

Posted by K Sengupta on 2022-06-21 04:44:46

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