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Sequential time

From Wikipedia, the free encyclopedia

A sequential time is one in which the numbers form a normal sequence, such as 1:02:03 4/5/06 (two minutes and three seconds past 1 am on 4 May 2006 (or April 5, 2006 in the United States) or the same time and date in the "06" year of any other century). Short sequential times such as 1:23:45 or 12:34:56 appear every day. Larger sequential times rarely appear, such as 12:34:56 7/8/90, or 01:23:45 on 6/7/89. These times can be dependent on the date format being used; the month/day format will produce different results from the day/month format.

This term, however, is not limited to simple counting.[citation needed] Other sequences, such as the decimal numbers of the mathematical constants π (3/14/1592), e (2/7/1828), and the square root of two (1/4/1421) are also noted. Number sequences such as the Fibonacci sequence (1/1/2358) can also be found in time stamps.

These dates are particularly popular with couples getting married who are seeking unique wedding and anniversary dates. Dates with repeating numbers such as July 7, 2007 "7/7/07" are also popular.[1]

Palindromic times can also be observed, e.g. 10:02:10 on 11/01/2001 (two minutes and ten seconds after 10 am on 11 January 2001 in parts of the world using month/day format) was the first fully palindromic time sequence of the twenty-first century. The last palindromic time sequence was at 02:02:10 at 11/01/2020 (two minutes and twenty-one seconds past 2 am on 11 January 2020 in most of the world).

A sequential time occurred during Pi Day on 3/14/15 at 9:26:53.58979... following the sequence of pi to all digits.[2]

Historical events

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See also

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References

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  1. ^ Manchir, Michelle (11 December 2014). "Couples drawn to 12-13-14 wedding date". Chicago Tribune. Retrieved 13 December 2014.
  2. ^ Rosenthal, Jeffrey S. (October 2014). "Pi Instant". Retrieved 23 October 2014.
  3. ^ 5-4-3-2-1-0: History of Alko