![]() ![]() It can easily be demonstrated that the so-called 'Kuwaiti Algorithm' was based on the standard arithmetical scheme (type IIa) which has been used in Islamic astronomical tables since the 8th century CE. Mathematical Institute, Utrecht University. "Online Calendar Converters Based on the Tabular Islamic Calendar". ^ Robert Harry van Gent (December 2019).^ Hijri Dates in SQL Server 2000 from Microsoft Archived Page Archived January 8, 2010, at the Wayback Machine.In the Dutch East Indies (now Indonesia) into the early 20th century, the 8-year cycle was reset every 120 years by omitting the intercalary day at the end of the last year, thus resulting in a mean month length equal with that used in the 30-year cycles. In other words, the 8-year cycle is exactly 405 weeks long, resulting in a mean of exactly 4.21875 weeks per month. Though less accurate than the tabular calendars based on a 30-year cycle, it was popular due to the fact that in each cycle the weekdays fall on the same calendar date. The cycle contains 96 months in 2835 days, giving a mean month length of 29.53125 days, or 29d 12h 45m. Tabular Islamic calendars based on an 8-year cycle (with 2, 5 and 8 as leap years) were also used in the Ottoman Empire and in South-East Asia. Ḥabash al-Ḥāsib, al-Bīrūnī, Elias of Nisibis Muḥammad ibn Fattūḥ al-Jamāʾirī of Sevilleįāṭimid / Ismāʿīlī / Ṭayyibī / Bohorā calendar, Ibn al-Ajdābī Kūshyār ibn Labbān, Ulugh Beg, Taqī ad-Dīn Muḥammad ibn MaʾrufĪl-Fazārī, al-Khwārizmī, al-Battānī, Toledan Tables, Alfonsine Tables, Microsoft "Kuwaiti algorithm" According to Rob van Gent, the so-called "Kuwaiti algorithm" is simply an implementation of the standard Tabular Islamic calendar algorithm used in Islamic astronomical tables since the 11th century. As an attempt to make conversions between the calendars somewhat predictable, Microsoft claims to have created this algorithm based on statistical analysis of historical data from Kuwait. There is no fixed correspondence defined in advance between the algorithmic Gregorian solar calendar and the Islamic lunar calendar determined by actual observation. Microsoft's Kuwaiti algorithm is used in Windows to convert between Gregorian calendar dates and Islamic calendar dates. The Tabular Islamic calendar also deviates from the observation based calendar in the short term for various reasons. ![]() This is slightly too short and so will be a day out in about 2,500 solar years or 2,570 lunar years. There is another version where, in addition, the fourth leap day is postponed to year 11 and the last leap day is in the last year of the 30-year cycle. The Ismaili Tayyebi community delays three leap days by one year: the third to year 8, the seventh to year 19 and the tenth to year 27 in their 30-year cycle. If leap days are added whenever the remainder equals or exceeds a half day, then all leap years are the same except 15 replaces 16 as the sixth long year per cycle. Using this rule the leap years are year number 2, 5, 7, 10, 13, 16, 18, 21, 24, 26 and 29 of the 30-year cycle. Thus at the end of the second year the remainder would be 22/30 day which is reduced to −8/30 day by a leap day. Whenever the remainder exceeds a half day (15/30 day), then a leap day is added to that year, reducing the remainder by one day. Noting that the average year has 354 11/30 days and a common year has 354 days, at the end of the first year of the 30-year cycle the remainder is 11/30 day. In its most common form there are 11 leap years in a 30-year cycle. The odd numbered months have 30 days and the even numbered months have 29 days, except in a leap year when the 12th and final month Dhu al-Hijjah has 30 days. It is their belief that all Fatimid Imams and their Da'is have followed this tradition.Įach year has 12 months. It is believed that when Ali drew up this calendar, the previous events of the earlier prophets also fell into line with this calendar. It is used by some Muslims in everyday life, particularly in Ismaili and Shi'a communities, believing that this calendar was developed by Ali. ![]() An example is the Fatimid or Misri calendar. It is now used by historians to convert an Islamic date into a Western calendar when no other information (like the day of the week) is available. It was developed by early Muslim astronomers of the second hijra century (the 8th century of the Common Era) to provide a predictable time base for calculating the positions of the moon, sun, and planets. ![]() It has the same numbering of years and months, but the months are determined by arithmetical rules rather than by observation or astronomical calculations. The Tabular Islamic calendar ( Arabic: التقويم الهجري المجدول, romanized: altaqwim alhijriu almujadwal) is a rule-based variation of the Islamic calendar. ![]()
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