Home > Times > The Jewish Calendar: A Closer Look

The Jewish Calendar: A Closer Look

**Level: Intermediate**

• A month is calculated as 29 days, 12 hours, and 793 "parts"

• Leap years occur in years 3, 6, 8, 11, 14, 17 and 19 of a 19-year cycle

• Adjustments (dechiyot) prevent round off the date calculated

• Dechiyot prevent oddities in the length of the year

• Dechiyot prevent holidays from falling on the wrong day of the week

• Some months have variable lengths

• There are 14 possible formats of year, identified by codes

• The calendar is not perfect, but it is very accurate

• Leap years occur in years 3, 6, 8, 11, 14, 17 and 19 of a 19-year cycle

• Adjustments (dechiyot) prevent round off the date calculated

• Dechiyot prevent oddities in the length of the year

• Dechiyot prevent holidays from falling on the wrong day of the week

• Some months have variable lengths

• There are 14 possible formats of year, identified by codes

• The calendar is not perfect, but it is very accurate

*See also:*

Current Calendar

Jewish Calendar

The basics of the Jewish calendar were explained on the previous page, and will be mentioned only in passing here. This page is intended for those who are interested in a deeper understanding of the workings of Rabbi Hillel II's fixed calendar, or those who want to be able to build their own Jewish calendar computer programs.

Although this page will focus primarily on calendar calculations, I encourage you not to dismiss this as purely a mathematical exercise devoid of spiritual value. The sages emphasized the value of studying astronomy as a way of appreciating the greatness of the Creator's work. This page does focus on some arcane mathematics, but do not be intimidated by it: the Jewish scholar Rambam wrote that, "the method of the fixed calendar is one which an average school child can master in 3 or 4 days." (Hilkhot Qiddush HaHodesh 11:4). A lot of the confusion people experience stems from variations in the way different sources say the same thing, and the way some sources use familiar terms to mean unfamiliar things. I will do my best to keep these variations straight for you.

This page includes JavaScript that performs all of the calculations described, in the order that the concepts are presented here and with detailed comments. Those who are comfortable with programming languages may find it faster and easier to understand the math by looking at the code. This code is not necessarily the best or most efficient script possible, but it's not intended to be; it's intended to illustrate how the calendar is calculated. Despite the inefficiency of this code, I have no doubt that it will be appearing on other websites in short order. Would it kill you to give me credit and a link back?

(show)

(hide)

The Jewish calendar is based on three astronomical phenomena: the rotation of the Earth about its axis (a day); the revolution of the moon about the Earth (a month); and the revolution of the Earth about the sun (a year). These three phenomena are independent of each other, so there is no direct correlation between them. On average, the moon revolves around the Earth in about 29½ days. The Earth revolves around the sun in about 365¼ days, that is, about 12 lunar months and 11 days.

To coordinate these three phenomena, and to accommodate certain ritual requirements, the Jewish calendar consists of 12 or 13 months of 29 or 30 days, and can be 353, 354, 355, 383, 384 or 385 days long. The keystone of the calendar is the new moon, referred to in Hebrew as the molad.

A new month on the Jewish calendar begins with the molad, (pronounced moh-LAHD). Molad is a Hebrew word meaning "birth," and refers to what we call the "new moon" in English. The molad for the month of Tishri (the month that starts with Rosh Hashanah) is the most important one for calendar calculations, and is referred to as Molad Tishri.

Note that the calculated molad does not necessarily correspond precisely to the
astronomical new moon. The length of time from one astronomical new moon to the
next varies somewhat because of the eccentric orbits of the Earth and Moon;
however, the moladot of Rabbi Hillel's calendar are set using a fixed average
length of time: 29 days, 12 hours, and 793 "parts" (or in Hebrew,
*chalakim*). The amount of time is commonly written in an abbreviated
form: 29d 12h 793p.

A "part" (or in Hebrew, *cheilek*) is a unit of time used in the Jewish
calendar, equal to 3-1/3 seconds. There are 18 parts in a minute and 1,080
parts in an hour. Most sources express time from calendar calculations in days,
hours and parts, although some sources break the parts down into minutes. For
example, the period between moladot could be written as 29 days, 12 hours, 44
minutes and 1 part (29d 12h 44m 1p), because 793 parts is 44 minutes and 1 part
(793 = 44 times 18 parts plus 1 part) . This makes the resulting times look
somewhat more familiar, but it increases the number of calculations, so we will
stick with days, hours and parts.

The same shorthand can be used to express the time when a molad occurs. The time is normally expressed as a day of the week, along with the hours and parts (or hours, minutes and parts). For example, the time of a molad might be expressed as 2d 12h 1005p (or 2d 12h 55m 15p), meaning that it occurs on Monday (the second day) at the 12th hour and 1005 parts.

The "hours" used to calculate the molad are standard 1/24 of a day hours. Note that this differs from the "hours" used for ritual scheduling, which are 1/12 of the time from sunrise to sunset. For example, at Pesach (Passover), we are required to stop eating chametz at the end of the "fourth hour "of the morning on Nissan 14, that is, at the end of 1/3 of the time between sunrise and sunset. These "seasonal hours" vary depending on the time of the year; molad hours are constant. The time for the molad is Jerusalem Solar Time, which is not necessarily the same as your local time. It is also not necessarily the same as the time on the clock, even in Jerusalem. This fact has no effect on your calculations, but is worth knowing.

The Jewish "day" starts at sunset, rather than at midnight. If you read the
story of creation in Genesis Ch. 1, you will notice that it says, "And there
was evening, and there was morning, one day." From this, we infer that a day
begins with evening, that is, at sunset. Accordingly, most sources discussing
the molad use 6PM of the preceding evening as the "zero hour." In our example,
2d 12h 1005p, the 12h means the 12th hour after 6PM, that is, 6AM. If a molad
occurs at 2d 4h 0p, this means that it occurs at 10PM on *Sunday* night,
because the second day (Monday) begins at 6PM of the preceding evening
(Sunday). Some sources, however, use the more familiar Western conventions and
use midnight as the zero hour. Be very careful to check which system is being
used when you rely on times given by any source! If the time is referred to as
"Rambam time" or something similar, then you know
it uses 6PM as the zero hour. On this page, I am using Rambam time, but some
well-respected Orthodox sources in America use midnight as their zero hour. As
long as you are consistent, you will get the same result under either system.

(show)

(hide)

Here is an overview of the steps involved in calculating the date of Rosh Hashanah on the Jewish calendar:

- Start with a known molad (and the corresponding secular date, if you wish to convert your resulting date to a secular date).
- Determine the number of months between the known molad and Tishri of the year of the date you are calculating.
- Multiply the number of months by the length of the molad: 29d 12h 793p.
- Add the result to the known starting molad.
- Apply the dechiyot (rules of postponement) to determine the date of Rosh Hashanah for the year of your date.
- To get the secular date, add the number of days elapsed calculated above to the secular starting date.

If you want to calculate a date other than Rosh Hashanah, you will have to calculate either that year's Rosh Hashanah, the following year's Rosh Hashanah or both and use this information to work out the date.

We will now look at these steps in detail, illustrating the techniques by calculating the dates of Rosh Hashanah and Pesach (Passover) in the year 5775 (2014-2015) using 5732 as our starting point. As I said above, if you are comfortable with JavaScript, you may find that it is faster and easier to understand these concepts by viewing my code here. This code is designed to illustrate calendar principles and is not the most efficient code possible. If you choose to use it in your own work despite this warning, would it kill you to give me credit and a link back?

** Step 1: Start with a Known Molad **

To perform any calculations on the Jewish calendar, you need a starting point, preferably the molad of Tishri for a specific year, along with the corresponding secular date if you want to be able to convert the Hebrew date to secular. It is not possible to work out a molad from first principles, because the first molad of creation (known as Molad Tohu) did not occur at 0d 0h 0p!

I like to base my calculations on the molad of Tishri 5732, which occurred at 2d 7h 743p (using 6PM as the zero hour), and corresponded to the secular date September 20, 1971. I use this particular year because it is the first Molad Tishri after 1/1/1970 (Javascript's 0 date) that is not subject to dechiyot (postponements), which complicate secular date conversions. If you will be calculating dates in the past and would like to avoid the complications of subtracting dates, you may prefer to work with an earlier molad, such as Tishri 5661 (9/24/1900), 2d 11h 9p, or even Molad Tishri 5558 (9/21/1797), 5d 11h 607p. I'm sure our Christian friends are primarily interested in knowing Molad Tishri 3762 (the year 1), or some other year in that lifetime. Unfortunately, the program I use to calculate molads overflows after 3861 (the year 100), so you'll have to work out the rest yourself: Molad Tishri 3869 (9/22/108, the earliest one I can work out that is not subject to postponements) is 7d 8h 957p. A more interesting base from my perspective is Molad Tishri 4120 (9/10/359), 5d 8h 29p, which is the first non-postponed year after Rabbi Hillel II developed this calendar! Any calculations before that calendar was developed do not necessarily correspond to what people in those times observed. In addition, it is very complicated to convert a Hebrew date to a secular date before the Gregorian calendar reforms, which took effect at different times in different countries (introduced in 1582 but not adopted in America until 1752!).

** Step 2: Determine the Number of Months to Tishri of Your Year **

The next step is to determine how many months are between your starting point and Tishri of the year of your end point. There are exactly 235 months in every 19-year cycle of leap years (12 12-month years plus 7 13-month years), but if your number of years is not evenly divisible by 19, then you will have to determine whether each remaining year is a regular year (12 months) or a leap year (13 months).

Fortunately, the leap year cycle is easily calculated. Leap years occur in years 3, 6, 8, 11, 14, 17 and 19 of a 19-year cycle, and the 19-year cycle begins in the year 1, so you can simply divide the year number by 19 and examine the remainder. If the remainder is 3, 6, 8, 11, 14, 17 or 0 (the 19th year of the cycle) then the year is a leap year. Otherwise, it is not.

There are two cycles between 5732 and 5775, with a remainder of 5 years (5775 - 5732 / 19 = 2 remainder 5), that is 470 months from 5732 to 5770. The remaining months before 5775 are:

Year Divided by 19 Leap Year? Months 5770 303 remainder 13 No 12 5771 303 remainder 14 Yes 13 5772 303 remainder 15 No 12 5773 303 remainder 16 No 12 5774 303 remainder 17 Yes 13 Plus 2 cycles (2*235) 470 Total532

** Step 3: Multiply the Number of Months by the Length of the Molad **

Next, we multiply the number of months by the average length of the molad, which is 29d 12h 793p:

- 793p * 532 = 421,876p
- 12h * 532 = 6,384h
- 29d * 532 = 15,428d

Of course, we will then have to round up the smaller units into the larger units, just as we would round 75 minutes into 1 hour and 15 minutes. Here are the stages of this rounding:

- 421,876 parts / 1,080 parts per hour = 390 hours remainder
**676 parts** - (6,384 multiplied hours + 390 rounded hours) / 24 hours per day = 282 days
remainder
**6 hours** - 15,428 multiplied days + 282 rounded days =
**15,710 days**

We now know the amount of time between our starting molad and our ending molad: 15,710d 6h 676p

** Step 4: Add the Result to the Starting Molad **

Next, we add the elapsed time calculated above to the starting date to get the ending date. Our starting molad is 2d 12h 1005p (using 6PM as 0h). We will not add the days yet, for reasons that will soon become clear.

- 676 elapsed parts + 743 starting parts = 1,419 parts
- 6 elapsed hours + 7 starting hours = 13 hours

Now we need to do some more rounding:

- 1,419 calculated parts / 1,080 parts per hour = 1 hour remainder
**339 parts** - 13 calculated hours + 1 rounded hour / 24 hours per day = 0 days remainder
**14 hours** - 15,710 calculated days + 0 rounded days =
**15,710 days**

At this point, we should note the number of days elapsed between our starting point and our ending point: 15,710 days. We must note this at this point in the calculation, after the hours are rounded into the days but before the weekday of the starting molad is added to the number of days. This number of days will be necessary to determine the Gregorian date. Note that if the hours are more than 24 at this point, you will need to round those hours into the days to get the elapsed time. In this calculation, however, the number of hours is only 14.

Let's finish the calculation of the molad, adding the days and determining the day of the week:

- (15,710 calculated days + 2 starting days) / 7 days per week = 2244 weeks
remainder
**4 days**

The remainder of 4 days gives us the day of the week for our molad, so the resulting molad is: 4d 14h 339p, that is, Wednesday in the 14th hour (8 am) and 339 parts, with 15,710 elapsed days. Note that if the remainder is 0 days, the molad is 7d (Shabbat), because 7 days / 7 days per week = 1 week remainder 0 days.

** Step 5: Apply the Dechiyot **

There are four rules of postponement known as dechiyot, pronounced d'-khee-YOHT, where "kh" is a throat-clearing noise (singular: dechiyah). These rules postpone the date of Rosh Hashanah, but do not affect the calculated time of the molad. One of the dechiyot is a general rule of rounding while the rest are designed to prevent oddities in the length of the year and the date of Rosh Hashanah.

__Dechiyah 1: Molad Zakein__

The first dechiyah is molad zakein, meaning an "old" molad. If the molad occurs at or after noon (that is, 18h where 6PM is 0h or 12h where midnight is 0h), the molad is considered to be "old" and we round to the next day. This rule is quite commonly applied, affecting a quarter of all years (half if you use midnight as the 0 hour).

If noon seems a bit early to be considering the molad "old," remember that the Jewish "day" starts at sunset. The rule of molad zakein simply means that a molad at or after noon relates to the "day" that starts at the next sunset (4-10 hours later) rather than the previous sunset (14-20 hours earlier). This rationale is clear from the Rambam notation, where 6PM is 0h and a Molad Zakein is one that occurs at or after 18h in a 24h day.

Interestingly, Molad Zakein is the reason why you will get the same result regardless of whether you use 6PM or midnight as your zero hour. With midnight as your zero hour, Molad Zakein applies to molads after 12h, applying in half of all years. With 6PM as your zero hour, Molad Zakein only applies in one quarter of all years, but molads between 6PM and midnight are already considered to be part of the next day, so the result is the same!

Our molad occurs at 14h in Rambam notation, so it is not a molad zakein and Rosh Hashanah stays on the calculated date for now.

Note that when dechiyot like this apply, a day must be added to the elapsed time for purposes of calculating the Gregorian equivalent date, but the molad does not change. The unchanged molad is used for purposes of calculating subsequent years and for certain religious purposes. For example, in 5760, the calculated molad was 6d 21h 801p. Molad Zakein pushed Rosh Hashanah to the next day, but if you were to calculate a subsequent date using 5760 as your base, you would calculate from 6d (Friday), not from Saturday. This is why it is best to start with a molad that is not subject to postponements.

__Dechiyah 2: Lo A"DU Rosh__

The second dechiyah is known as Lo A"DU or Lo A"DU Rosh. This rule states that Rosh Hashanah cannot occur on a Sunday (Day 1), a Wednesday (Day 4) or a Friday (Day 6). The word Lo means "Not," and the word A"DU is a way of pronouncing Alef-Dalet-Vav, letters with the numerical values 1, 4 and 6 (see Hebrew Alphabet - Numerical Values). If the calculated molad occurs on one of these days of the week, Rosh Hashanah is postponed by a day to prevent other problems with the calendar. If Rosh Hashanah fell on a Wednesday or Friday, then Yom Kippur would fall on a Friday or Sunday, which is undesirable. If Rosh Hashanah fell on a Sunday, the Hoshanah Rabbah would fall on a Saturday, making it impossible to observe some of the day's customs.

This dechiyah is also commonly applied, as you might imagine. It applies to three out of seven days, so one would expect it to occur almost half of the time.

Note that the dechiyot of molad zakein and Lo A"DU Rosh can work in combination: a molad at 5d 19h 0m 0p (Thursday at 1PM) is rounded to Friday by the rule of Molad Zakein, then postponed to Saturday by the rule of Lo A"DU Rosh, even though the original molad was on a valid day of the week. On the other hand, a molad at 4d 19h 0m 0p (Wednesday at 1PM) is rounded to Thursday by Molad Zakein, and Lo A"DU Rosh does not apply: even though the molad occurred on Wednesday, Molad Zakein has already moved it off of that date so Lo A"DU Rosh is not necessary. This is why the rule of Molad Zakein must be checked before the rule of Lo A"DU Rosh.

Our molad occurs on 4d, Wednesday, so it is postponed to Thursday. You should add 1 to your elapsed time so your secular date conversion will be correct. There are now 15,711 elapsed days.

__Dechiyah 3: Gatarad__

The remaining two dechiyot are much less commonly applied.

Dechiyah Gatarad holds that if Molad Tishri in a simple (12-month, non-leap) year occurs on a Tuesday at 9h 204p or later, Rosh Hashanah is postponed to the next day (a Wednesday, which by the effect of Lo A"DU Rosh would then be postponed to Thursday).

The name, Gatarad, is a mnemonic for the rule. In Hebrew, Gatarad it is spelled Gimel-Teit-Reish-Dalet. Using letters as numerals, Gimel is 3, and represents Tuesday. Teit is 9 and represents the 9th hour (that is, 9h in Rambam notation, but 3h in midnight-based notation). Reish is 200 and Dalet is 4, representing 204 parts.

Why does such a complicated rule exist? This rule prevents the possibility that a year might be 356 days, an invalid length. Consider: a Molad Tishri at 3d 9h 204p would not be postponed by Molad Zakein or Lo A"DU Rosh. Add 12 lunar cycles (354d 8h 876p) to the next year's Rosh Hashanah and you get 7d 18h 0p with 354 days elapsed. Molad Zakein applies to the following year, postponing Rosh Hashanah to the next day, a Sunday, with 355 days elapsed. Lo A"DU Rosh is then triggered, postponing Rosh Hashanah and leaving 356 days elapsed and making the current year an invalid length. Gatarad takes days away from the following year and adds them to the preceding year, so both years are a valid length.

Note that Gatarad invariably triggers Lo A"DU Rosh. Gatarad only applies when Rosh Hashanah is Tuesday and Gatarad postpones Rosh Hashanah to Wednesday. Lo A"DU Rosh then postpones Rosh Hashanah to Thursday. Some programmers like to check Gatarad before checking Lo A"DU Rosh; others check Gatarad after Lo A"DU Rosh but use this rule to add two days (the Gatarad day plus the resulting Lo A"DU Rosh day). Either way, if Gatarad applies, Rosh Hashanah falls on Thursday.

Note also that this rule is not combined with Molad Zakein. If Molad Zakein applies to the current year, Gatarad is unnecessary; thus Gatarad applies only to molads between 9h 204p and 17h 1079p.

As you might imagine, this rule is not commonly applied. It applies only in non-leap years (12 out of 19 years) when the molad occurs on Tuesday (1 out of 7 days) between the 9th hour and the 18th hour (9 out of 24 hours). It occurs about three times a century. It last occurred in 5745 (1984-85) and will not occur again until 5796 (2035-36).

__Dechiyah 4: Betutkafot__

Like Dechiyah Gatarad, this rule is not very commonly applied and is designed to prevent a year from having an invalid length. Dechiyah Betutkafot prevents a leap-year from having 382 days (too few days) by postponing Rosh Hashanah of the non-leap year following the leap year.

Also like Dechiyah Gatarad, the name of the rule tells you how it is calculated: if Molad Tishri in a year following a leap year occurs on Monday (Beit, 2) after the 15th hour (Teit-Vav, 15 in Rambam notation, but 9h in midnight-based notation) and 589 parts (Tav-Kaf-Pei-Teit, 589), then it is postponed to the next day. The rule is applied only if the actual molad occurs on Monday, not if it is postponed to Monday. Like Gatarad, the rule really only applies to molads before noon (18h), because Molad Zakein handles the postponements for molads at or after noon. Unlike Gatarad, Betutkafot does not trigger Lo A"DU Rosh, because Betutkafot postpones Rosh Hashanah from a Monday to a Tuesday and Tuesday is an acceptable day for Rosh Hashanah.

The reasoning behind this rule is similar to the reasoning behind Gatarad: the 13 lunar cycles of the preceding year are 383d 21h 589p. If this year's Molad Tishri occurs after 2d 15h 589p, then the preceding year's Molad Tishri must have occurred on or after 3d 18h 0p. This is 384 elapsed days, but the preceding year's Molad Tishri was a Molad Zakein postponing Rosh Hashanah to Wednesday, which triggers Lo A"DU, moving Rosh Hashanah to Thursday. The two postponements shorten the preceding year to 382 days. Dechiyah Betutkafot postpones the current year's Rosh Hashanah by one day to increase the preceding year to a permissible 383 days.

This is the rarest of the four dechiyot, applying only in the year after a leap year (7 out of 19 years) when the molad occurs on Monday (1 out of 7 days) between the 15th hour and the 18th hour (3 out of 24 hours). It applies once or twice a century. The last time it applied was 5766 (2005-06). It will not apply again until 6013 (2252-2253)!

** Step 6: Add Elapsed Days to Gregorian Starting Date **

To determine the Gregorian date for Rosh Hashanah, you must take the elapsed days calculated in Step 4, add any additional days triggered by the dechiyot in Step 5, and add this number of days to the date of Rosh Hashanah for your known molad. For those following the script: JavaScript doesn't do a great job of handling dates, but the ConvertGreg function adds elapsed dates and returns a properly formatted date (American m/d/yyyy format). If you're trying to do this without writing a program, a spreadsheet such as Microsoft Excel should be able to add a number of days to a date.

(show)

(hide)

To calculate the date of Rosh Hashanah for any year after 5732 using the principles above:

- Calculate the number of months between 5732 and your year.
- Calculate the amount of time elapsed in those months.
- Add the elapsed time to the molad of 5732 to determine the molad of your year, stopping to note the elapsed days before adding the day of week from the 5732 molad.
- Determine whether any dechiyot apply and if so, add them to the elapsed days determined above.
- Add the days elapsed to the date of Rosh Hashanah in 5732.

These steps are performed by the function CalcRH in the JavaScript, used by the form below. Just type the Hebrew year and the secular date will appear, using only the functions discussed above. Click the button below to try it!

(show)

(hide)

The principles and JavaScript above are sufficient to allow you to convert Rosh Hashanah to a Gregorian date for any year. However, if you want to calculate a date other than Rosh Hashanah, you will have to calculate either that year's Rosh Hashanah, the following year's Rosh Hashanah or both and use this information to work out the date. The information you need varies depending on the month of the date you are calculating

**Tishri**- Tishri is the month of Rosh Hashanah, so you simply add the date of the month to Rosh Hashanah and subtract 1 (because Rosh Hashanah is Day 1).
**Cheshvan**- Cheshvan is the second month of the calendar year, and the preceding month of Tishri is always 30 days, so you simply take the current Rosh Hashanah, add 29 days (30 - 1 for Rosh Hashanah) and add the date of the month.
**Kislev**- Kislev is the hardest month to calculate. You cannot simply work forward from the current year's Rosh Hashanah, because the preceding month of Cheshvan can be 29 or 30 days, nor can you work backward from the next year's Rosh Hashanah, because Kislev itself can also be 29 or 30 days. To calculate the length of Kislev, you need to know the date of Rosh Hashanah of both the current year and the next year, then calculate the difference between them to determine the length of the current year. If the year is 353, 354, 383 or 384 days, then Cheshvan is 29 days and you can determine a date in Kislev taking the current Rosh Hashanah, adding 58 days, then adding the date of the month. If the year is 355 or 385 days, then Cheshvan is 30 days and you can determine a date in Kislev by taking the current Rosh Hashanah, adding 59 days, then adding the date of the month.
**Tevet, Shevat**- The remaining months of the year are of unchanging length, but the number of months varies depending on whether the year is a leap year! Tevet and Shevat are best calculated by working backwards from the following year's Rosh Hashanah and subtracting an additional 30 days in a leap year. Tevet's offset in a non-leap year is -266; Shevat's is -237.
**Adar, Adar I and Adar II**- Adar is always offset -207 from the following Rosh Hashanah; however, in regular years, Adar is the 12th month of the year (starting from Nissan), and in leap years, is known as Adar II and is the 13th month of the year. Adar I, the extra month inserted as the 12th month in leap years, is always offset -237 days from Rosh Hashanah.
**Nissan, Iyar, Sivan, Tammuz, Av, Elul**- The remaining months of the year are all of unchanging length and not affected by leap years. Simply subtract the appropriate number of days from the following year's Rosh Hashanah and add the date of the month.

The form below uses the functions above to calculate the dates of major Jewish holidays for any Hebrew year.

(show)

(hide)

Calendar scholars use a system of encoding to describe each Jewish year. This encoding consists of three Hebrew letters that serve as a shorthand for important features of the calendar, and once you work out the code, you know everything you need to know about the calendar. You don't need to know the encoding system to be able to calculate the calendar, but it may help you understand important features of the calendar.

The first letter is either Pei or Mem. Pei stands for the Hebrew word P'shuta (simple), and refers to a 12-month regular year. Mem stands for Me'uberet, and refers to a 13-month leap year.

The second letter indicates which day of the week Rosh Hashanah occurs. Letters of the Hebrew alphabet also serve as numerals (see Hebrew Alphabet - Numerical Values), and this letter indicates whether Rosh Hashanah occurs on a Monday (Beit, that is, 2), a Tuesday (Gimel, 3), a Thursday (Hei, 5) or a Saturday (Zayin, 7). Why not Alef (1), Dalet (4) or Vav (6)? Because Dechiyah Lo A"DU Rosh, discussed above, prevents Rosh Hashanah from falling on Sunday, Wednesday or Friday.

The third letter tells you the length of the year, which can be 353, 354 or 355 days (in a leap year, 383, 384 or 385). This variation comes in part from the length of the molad cycles (which add about 8 or 21 hours to the time of day each year, which sometimes rolls over to another day) and in part from the application of the dechiyot. A year's length can be encoded as Cheit for Chaseir (deficient or lacking, a 353 or 383 day year), Kaf for K'Seder (in order, a 354 or 384 day year) or Shin for Shaleim (whole or complete, a 355 or 385 day year). In a Chaseir year, both Cheshvan and Kislev have 29 days. In a Shaleim year, both Cheshvan and Kislev have 30 days. In a K'Seder year, Cheshvan has 29 days and Kislev has 30 days.

Under this system of encoding, the current year (5765) is coded Mem-Hei-Cheit, because it is a leap year (Mem), Rosh Hashanah started on a Thursday (Hei), and the year will have 383 days (Cheit). Next year (5766) would be encoded as Pei-Gimel-Kaf because it will be a regular (non-leap) year, it will start on a Tuesday, and it will have 354 days.

Some people code the years differently: the day of Rosh Hashanah as the first letter (instead of the second), the length of the year as the second letter (instead of the third), and the day of the week that Pesach (Passover) starts as the third. This third letter can be Alef (1, Sunday) through Zayin (7, Saturday). The advantage of this system is that it tells you the day of the week that both Pesach and Rosh Hashanah occur, which has some effect on their observances, and once these are known, we can infer the days of the other major festivals (Sukkot and Shavu'ot). The disadvantage is that nothing in this system tells you whether the year is a leap year, although this can be inferred if you know the calendar well enough.

Although there are many theoretical permutations of these three-letter codes, only 14 of them are actually possible given the constraints of calendar calculations. This means that there are only 14 different possible layouts for an annual Jewish calendar. Keep in mind, though, that these 14 different layouts don't necessarily correspond to the same Gregorian days, but they do correspond to the distribution of weekly Torah readings. For example, in the year 5765, a Mem-Hei-Cheit year, the Torah portion Emor was read on 5 Iyar, which was May 14, 2005. The next Mem-Hei-Cheit year will be 5768, and Parshat Emor will be read on 5 Iyar in that year too, but 5 Iyar will occur on May 10, 2008. Contrast this with 5766, a Pei-Gimel-Kaf year, when Emor will be read on 15 Iyar (May 13, 2006).

The following table shows which parshiyot are combined in which year encodings:

Year Encoding | Parshiyot Combined |
---|---|

Mem-Beit-Cheit | Chukat-Balak Matot-Masei Nitzavim-Vayeilech |

Mem-Beit-Shin | Matot-Masei |

Mem-Gimel-Kaf | Matot-Masei |

Mem-Hei-Cheit | none |

Mem-Hei-Shin | Nitzavim-Vayeilech |

Mem-Zayin-Cheit | Matot-Masei Nitzavim-Vayeilech |

Mem-Zayin-Shin | Chukat-Balak Matot-Masei Nitzavim-Vayeilech |

Pei-Beit-Cheit | Vayakhel-Pekudei Tazria-Metzora Achrei Mot-Kedoshim Behar-Bechukotai Matot-Masei Nitzavim-Vayeilech |

Pei-Beit-Shin | Vayakhel-Pekudei Tazria-Metzora Achrei Mot-Kedoshim Behar-Bechukotai Chukat-Balak Matot-Masei Nitzavim-Vayeilech |

Pei-Gimel-Kaf | Vayakhel-Pekudei Tazria-Metzora Achrei Mot-Kedoshim Behar-Bechukotai Chukat-Balak Matot-Masei Nitzavim-Vayeilech |

Pei-Hei-Kaf | Vayakhel-Pekudei Tazria-Metzora Achrei Mot-Kedoshim Behar-Bechukotai Matot-Masei |

Pei-Hei-Shin | Tazria-Metzora Achrei Mot-Kedoshim Behar-Bechukotai Matot-Masei |

Pei-Zayin-Cheit | Vayakhel-Pekudei Tazria-Metzora Achrei Mot-Kedoshim Behar-Bechukotai Matot-Masei |

Pei-Zayin-Shin | Vayakhel-Pekudei Tazria-Metzora Achrei Mot-Kedoshim Behar-Bechukotai Matot-Masei Nitzavim-Vayeilech |

(show)

(hide)

At one time, the accuracy of the Jewish calendar was proverbial. But how accurate is it really?

The average lunar month on the Jewish calendar is 29d 12h 793p. The average lunar month as calculated by modern astronomers is 29d 12h 44m 2.8s, that is, 29d 12h 792.84p. so the variation is less than two tenths of the smallest unit of measurement recognized by the system, about half of a second. That is quite remarkably accurate. Of course, those lost half-seconds do add up: within in a century, you're off by 10 minutes.

How well does the calendar correspond to the solar year? The rabbis recognized long ago that the calendar gains 1h 485p in every 19-year cycle, adding up to a day every 300 years or so. This was important to the rabbis in scheduling certain rituals that are based on the solar year rather than the lunar year. We can see this effect when we examine the dates of Rosh Hashanah over time.

Rabbi Hillel II developed the Jewish calendar in the Jewish year 4119. Using his calendar methods as described above, and artificially assuming that the Gregorian calendar we use today was in effect at that time, the date of Rosh Hashanah ranged from August 29 to September 28 between the years 4100 and 4200 (the 42nd century). In the present Jewish century (the 58th), the dates of Rosh Hashanah range from September 5 to October 5, a gain of 6 or 7 days. This is considerably more accurate than the Julian calendar used by Christians in Rabbi Hillel's time (which had to be corrected by 11 days a few centuries ago), but you can see that it is gaining some time.

The discrepancy in the Jewish calendar, however, is still less than a lunar month and is therefore as accurate as it is possible to be in a lunisolar calendar. In fact, it takes about 9300 years for this discrepancy to accumulate to a full month of time. The rabbis were aware of the problem, but were quite confident that a new Sanhedrin will be established long before this discrepancy becomes problematic. We still have more than 3500 years to go.

(show)

(hide)

The book that most people recommend for learning about the Jewish calendar is Rabbi Nathan Bushwick's Understanding the Jewish Calendar. I ordered this book while I was writing this page; it took about a month to arrive, and I confess I was a bit disappointed by it. About half of the book was basic astronomy that I learned in fourth grade, and most of the calendar calculations I had learned before the book arrived. Nevertheless, the book did have some interesting insights and thorough citation to Torah, Talmud and Rambam that you may find useful or interesting.

*© Copyright 5765-5771 (2005-2011), Tracey R Rich*