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                    REVERSAL-ADDITION PALINDROME TEST ON 6999

                    Reverse and Add Process:

                    1. Pick a number.
                    2. Reverse its digits and add this value to the original number.
                    3. If this is not a palindrome, go back to step 2 and repeat.
                    Let's view this Reverse and Add sequence starting with 6999:
                    6999
                    + 9996
                    step 1: 16995
                    + 59961
                    step 2: 76956
                    + 65967
                    step 3: 142923
                    + 329241
                    step 4: 472164
                    + 461274
                    step 5: 933438
                    + 834339
                    step 6: 1767777
                    + 7777671
                    step 7: 9545448
                    + 8445459
                    step 8: 17990907
                    + 70909971
                    step 9: 88900878
                    + 87800988
                    step 10: 176701866
                    + 668107671
                    step 11: 844809537
                    + 735908448
                    step 12: 1580717985
                    + 5897170851
                    step 13: 7477888836
                    + 6388887747
                    step 14: 13866776583
                    + 38567766831
                    step 15: 52434543414
                    + 41434543425
                    step 16: 93869086839
                    + 93868096839
                    step 17: 187737183678
                    + 876381737781
                    step 18: 1064118921459
                    + 9541298114601
                    step 19: 10605417036060
                    + 06063071450601
                    step 20: 16668488486661
                    6999 takes 20 iterations / steps to resolve into a 14 digit palindrome.

                    REVERSAL-ADDITION PALINDROME RECORDS

                    Most Delayed Palindromic Number for each digit length
                    (Only iteration counts for which no smaller records exist are considered. My program records only the smallest number that resolves for each distinct iteration count. For example, there are 18-digit numbers that resolve in 232 iterations, higher than the 228 iteration record shown for 18-digit numbers, but they were not recorded, as a smaller [17-digit] number already holds the record for 232 iterations.)

                    DigitsNumberResult
                    2
                    3
                    4
                    5
                    6
                    7
                    8
                    9
                    10
                    11
                    12
                    13
                    14
                    15
                    16
                    17
                    18
                    19
                    89
                    187
                    1,297
                    10,911
                    150,296
                    9,008,299
                    10,309,988
                    140,669,390
                    1,005,499,526
                    10,087,799,570
                    100,001,987,765
                    1,600,005,969,190
                    14,104,229,999,995
                    100,120,849,299,260
                    1,030,020,097,997,900
                    10,442,000,392,399,960
                    170,500,000,303,619,996
                    1,186,060,307,891,929,990
                    solves in 24 iterations.
                    solves in 23 iterations.
                    solves in 21 iterations.
                    solves in 55 iterations.
                    solves in 64 iterations.
                    solves in 96 iterations.
                    solves in 95 iterations.
                    solves in 98 iterations.
                    solves in 109 iterations.
                    solves in 149 iterations.
                    solves in 143 iterations.
                    solves in 188 iterations.
                    solves in 182 iterations.
                    solves in 201 iterations.
                    solves in 197 iterations.
                    solves in 236 iterations.
                    solves in 228 iterations.
                    solves in 261 iterations - World Record!
                    [View all records]

                    This reverse and add program was created by Jason Doucette.
                    Please visit my Palindromes and World Records page.
                    You have permission to use the data from this webpage (with due credit).
                    A link to my website is much appreciated. Thank you.

                    (This program has been run 2,095,760 times since Saturday, March 9th, 2002.)

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