Hindu calendar
Hindu calendar is a collective name for most of the luni-sidereal calendars and sidereal calendars traditionally used in Hinduism.
The Hindu calendars have undergone many changes in the process of regionalisation. Some of the more prominent regional Hindu calendars include the Nepali calendar, Punjabi calendar, Bengali calendar, Odia calendar, Malayalam calendar, Kannada panchangam, Tulu calendar, Tamil calendar, Vikrama Samvat used in Northern India, and Shalivahana calendar in the Deccan States of Karnataka, Telangana, Maharashtra and Andhra Pradesh.[1][2] The common feature of many regional Hindu calendars is that the names of the twelve months are the same (because the names are based in Sanskrit). The month which starts the year also varies from region to region. It is now 2059.
The Buddhist calendar and the traditional lunisolar calendars of Cambodia, Laos, Myanmar, Sri Lanka and Thailand are also based on an older version of the Hindu calendar.
Most of the Hindu calendars derived from Gupta era astronomy as developed by Āryabhaṭa and Varāhamihira in the 5th to 6th century. These in turn were based in the astronomical tradition of Vedāṅga Jyotiṣa, which in the preceding centuries had been standardised in a number of (non-extant) works known as Sūrya Siddhānta. Regional diversification took place in the medieval period. The astronomical foundations were further developed in the medieval period, notably by Bhāskara II (12th century).
Differences and regional variations abound in these computations, but the following is a general overview of the Hindu lunisolar calendar.
The Indian national calendar or "Saka calendar" was introduced in 1957 based on the traditional Hindu calendars.
Day
In the Hindu calendar, the day starts with the sunrise. It is allotted five "properties" or "limbs", called aṅgas. They are:
- the Tithi (one of 30 divisions of a synodic month) active at sunrise
- the Vāsara (ancient nomenclature), vāra (modern nomenclature), like in ravi-vāra, somā-vāra, etc. or weekday
- the Nakṣatra (one of 27 divisions of the celestial ecliptic) in which the moon resides at sunrise
- the Yoga (one of 27 divisions based on the ecliptic longitude of the sun and moon) active at sunrise time
- the Karaṇa (divisions based on tithis) active at sunrise.
Together 5 limbs or properties are labelled under as the pañcāṅgas (Sanskrit: pañca = five). An explanation of the terms follows.
Vāsara
Vāsara refers to the weekdays and the names of the week in many western cultures bear striking similarities with the Vāsara:
No. | Sanskrit name of the day (Day begins at sunrise) |
Hindi name | Punjabi name | Bengali name | Marathi name | Odia name | Kannada name | Telugu name | Tamil name | Malayalam name | Gujarati name | English & Latin names of the approximate day (Day begins at 00:00Hrs) |
Celestial object |
---|---|---|---|---|---|---|---|---|---|---|---|---|---|
1 | Ravivāsara रविवासर |
Ravivār रविवार |
Aitvār ਐਤਵਾਰ |
Rôbibār রবিবার |
Ravivār रविवार |
Rabibāra ରବିବାର |
Bhānuvāra ಭಾನುವಾರ |
Ādivāraṁ ఆదివారం |
Nyayiru ஞாயிறு |
Njaayar ഞായർ |
Ravivār રવિવાર |
Sunday/dies Solis | Ravi, Aditya = Sun |
2 | Somavāsara सोमवासर |
Somavār सोमवार |
Somavār ਸੋਮਵਾਰ |
Shombār সোমবার |
Somavār सोमवार |
Somabāra ସୋମବାର |
Sōmavāra ಸೋಮವಾರ |
Sōmavāraṁ సోమవారం |
Thingal திங்கள் |
Thinkal തിങ്കൾ |
Sōmavār સોમવાર |
Monday/dies Lunae | Soma = Moon |
3 | Maṅgalavāsara मंगलवासर |
Maṅgalavār मंगलवार |
Maṅgalavār ਮੰਗਲਵਾਰ |
Môngôlbār মঙ্গলবার |
Maṅgaḷavār मंगळवार |
Maṅgaḷabāra ମଙ୍ଗଳବାର |
Maṁgaḷavāra ಮಂಗಳವಾರ |
Maṁgaḷavāraṁ మంగళవారం |
Chevvai செவ்வாய் |
Chovva ചൊവ്വ |
Maṅgaḷavār મંગળવાર |
Tuesday/dies Martis | Maṅgala = Mars |
4 | Budhavāsara बुधवासर |
Budhavāra बुधवार |
Buddhavār ਬੁੱਧਵਾਰ |
Budhbār বুধবার |
Budhavār बुधवार |
Budhabāra ବୁଧବାର |
Budhavāra ಬುಧವಾರ |
Budhavāraṁ బుధవారం |
Arivan (Tamil tradition) or Buthan (religious tradition) அறிவன் (புதன் - பெருவாரியான பயன்பாட்டில்) |
Budhan ബുധൻ |
Budhavār બુધવાર |
Wednesday/dies Mercurii | Budha = Mercury |
5 | Guruvāsara गुरुवासर or Brhaspati vāsara बृहस्पतिवासर |
Guruvār गुरुवार |
Vīravār ਵੀਰਵਾਰ |
Brihôshpôtibār বৃহস্পতিবার |
Guruvār गुरुवार |
Gurubāra ଗୁରୁବାର |
Guruvāra ಗುರುವಾರ |
Guruvāraṁ, Br̥haspativāraṁ గురువారం, బృహస్పతివారం, లక్ష్మీవారం |
Vyazhan வியாழன் |
Vyaazham വ്യാഴം |
Guruvār ગુરુવાર |
Thursday/dies Iovis | Deva-Guru Bṛhaspati = Jupiter |
6 | Śukravāsara शुक्रवासर |
Śukravār शुक्रवार |
Śukkaravār ਸ਼ੁੱਕਰਵਾਰ |
Shukrôbār শুক্রবার |
Śukravār शुक्रवार |
Śukrabāra ଶୁକ୍ରବାର |
Śukravāra ಶುಕ್ರವಾರ |
Śukravāraṁ శుక్రవారం |
Velli வெள்ளி் |
Velli വെള്ളി |
Śukravār શુક્રવાર |
Friday/dies Veneris | Śukra = Venus |
7 | Śanivāsara शनिवासर |
Śanivār शनिवार |
Śanīvār ਸ਼ਨੀਵਾਰ Chhanicchharavār ਛਨਿੱਚਰਵਾਰ |
Shônibār শনিবার |
Śanivār शनिवार |
Śanibāra ଶନିବାର |
Śanivāra ಶನಿವಾರ |
Śanivāraṁ శనివారం |
Kaari (Tamil tradition) or Sani (religious tradition) காரி (சனி - பெருவாரியான பயன்பாட்டில்) |
Shani ശനി |
Śanivār શનિવાર |
Saturday/dies Saturnis | Śani = Saturn |
The term -vāsara is often realised as vāra or vaar in Sanskrit-derived and influenced languages. There are many variations of the names in the regional languages, mostly using alternate names of the celestial bodies involved.
Naksatra
The ecliptic is divided into 27 Nakṣatras, which are variously called lunar houses or asterisms. These reflect the moon's cycle against the fixed stars, 27 days and 7¾ hours, the fractional part being compensated by an intercalary 28th nakṣatra titled Abhijit. Nakṣatra's computation appears to have been well known at the time of the Rigveda (2nd–1st millennium BCE).
The ecliptic is divided into the nakṣatras eastwards starting from a reference point which is traditionally a point on the ecliptic directly opposite the star Spica called Citrā in Sanskrit. (Other slightly different definitions exist.) It is called Meṣādi - "start of Aries"; this is when the equinox — where the ecliptic meets the equator — was in Aries (today it is in Pisces, 28 degrees before Aries starts). The difference between Meṣādi and the present equinox is known as Ayanāṃśa - denoting by how much of a fraction of degrees & minutes the ecliptic has progressed from its fixed (sidereal) position. Given the 25,800 year cycle for the precession of the equinoxes, the equinox was directly opposite Spica in CE 285, around the date of the Sūrya Siddhānta.[3][4]
The nakṣatras with their corresponding regions of sky are given below, following Basham.[5] As always, there are many versions with minor differences. The names on the right-hand column give roughly the correspondence of the nakṣatras to modern names of stars. Note that nakṣatras are (in this context) not just single stars but are segments on the ecliptic characterised by one or more stars. Hence more than one star is mentioned for each nakṣatra.
# | Sanskrit/Hindi | Bengali name নক্ষত্র | Malayalam name മലയാളം | Tamil name தமிழ் | Telugu name తెలుగు | Kannada name ಕನ್ನಡ | Western star name |
---|---|---|---|---|---|---|---|
1 | Aśvinī अश्विनी | Aśvinī অশ্বিনী | Ashvati അശ്വതി | Aswini அஸ்வினி | Aśvinī అశ్విని | Aśvinī ಅಶ್ವಿನಿ | β and γ Arietis |
2 | Bharanī भरणी | Bhararī ভরণী | Bharari ഭരണി | Barani பரணி | Bharani భరణి | Bharani ಭರಣಿ | 35, 39, and 41 Arietis |
3 | Krttikā कृत्तिका | Krittikā কৃত্তিকা | Kārttika കാർത്തിക | Kārthikai கார்த்திகை | Krittika కృత్తిక | Kruthike ಕೃತಿಕೆ | Pleiades |
4 | Rohihī रोहिणी | Rohihī রোহিণী | Rōhihi രോഹിണി | Rōhini ரோகிணி | Rōhihi రోహిణి | Rōhihi ರೋಹಿಣಿ | Aldebaran |
5 | Mrigaśirṣa मृगशिर्ष - this is also a month in Marathi calendar | Mrigaśiras মৃগশিরা | Makayiram മകയിരം | Mirugasīridam மிருகசீரிடம் | Mrigaśira మృగశిర | Mrigaśira ಮೃಗಶಿರ | λ, φ Orionis |
6 | Ārdrā आद्रा | Ārdrā আর্দ্রা | Ātira or Tiruvātira ആതിര (തിരുവാതിര) | Thiruvādhirai திருவாதிரை | Arudra ఆరుద్ర | Aridra ಆರಿದ್ರ | Betelgeuse |
7 | Punarvasu पुनर्वसु | Punarvasu পুনর্বসু | Punartam പുണർതം | Punarpoosam புனர்பூசம் | Punarvasu పునర్వసు | Punarvasu ಪುನರ್ವಸು | Castor and Pollux |
8 | Pushya पुष्य | Puhya পুষ্যা (তিষ্যা) | Pūyam പൂയം | Poosam பூசம் | Puṣyami పుష్యమి | Puṣya ಪುಷ್ಯ | γ, δ and θ Cancri |
9 | Aśleshā आश्ळेषा / आश्लेषा | Aśleshā অশ্লেষা | Āyilyam ആയില്യം | Ayilyam ஆயில்யம் | Aślesha ఆశ్లేష | Aślesha ಆಶ್ಲೇಷ | δ, ε, η, ρ, and σ Hydrae |
10 | Maghā मघा | Maghā মঘা | Makam മകം | Magam மகம் | Makha or Magha మఖ or మాఘ | Makha ಮಖ | Regulus |
11 | Pūrva or Pūrva Phalguṇī पूर्व फाल्गुनी | Pūrva or Pūrva Phalguṇī পূর্ব ফল্গুনী | Pūram പൂരം | Pooram பூரம் | Pūrva Phalguṇī or Pubba పూర్వా ఫల్గుణి or పుబ్బ | Pubba ಪುಬ್ಬ | δ and θ Leonis |
12 | Uttara or Uttara Phalguṇī उत्तर फाल्गुनी | Uttara or Uttara Phalguṇī উত্তর ফল্গুনী | Utram ഉത്രം | Uthiram உத்திரம் | Uttara Phalguṇi or Uttara ఉత్తర ఫల్గుణి or ఉత్తర | Utthara ಉತ್ತರ | Denebola |
13 | Hasta हस्त | Hasta হস্তা | Attam അത്തം | Astham அஸ்தம் | Hasta హస్త | Hasta ಹಸ್ತ | α, β, γ, δ and ε Corvi |
14 | Citrā चित्रा14 | Citrā চিত্রা | Chittira (Chitra) ചിത്തിര (ചിത്ര) | Chithirai சித்திரை | Chittā or Chitrā చిత్తా or చిత్రా | Chitta ಚಿತ್ತ | Spica |
15 | Svāti स्वाति | Svāti স্বাতী | Chōti ചോതി | Swathi சுவாதி | Svāti స్వాతి | Svāti ಸ್ವಾತಿ | Arcturus |
16 | Viśākha विशाखा | Viśākha বিশাখা | Vishākham വിശാഖം | Visakam விசாகம் | Viśākha విశాఖ | Viśākhe ವಿಶಾಖೆ | α, β, γ and ι Librae |
17 | Anurādhā अनुराधा | Anurādhā অনুরাধা | Anizham അനിഴം | Anusham அனுஷம் | Anurādhā అనూరాధ | Anurādhā ಅನುರಾಧ | β, δ and π Scorpionis |
18 | Jyeṣṭha ज्येष्ठा | Jyeṣṭha জ্যেষ্ঠা | Kēṭṭa (Trikkēṭṭa) കേട്ട (തൃക്കേട്ട) | Kettai கேட்டை | Jyeṣṭha జ్యేష్ఠ | Jyeṣṭha ಜ್ಯೇಷ್ಠ | α, σ, and τ Scorpionis |
19 | Mūla मूल/मूळ | Mūla মূলা | Mūlam മൂലം | Mūlam மூலம் | Mūla మూల | Mūla ಮೂಲ | ε, ζ, η, θ, ι, κ, λ, μ and ν Scorpionis |
20 | Pūrvāṣāḍha पूर्वाषाढा | Pūrvāṣāḍha পূর্বাষাঢ়া | Pūrāṭam പൂരാടം | Pūradam பூராடம் | Pūrvāṣāḍha పూర్వాషాఢ | Pūrvāṣāḍha ಪೂರ್ವಾಷಾಢ | δ and ε Sagittarii |
21 | Uttarāṣāḍha उत्तराषाढा | Uttarāṣāḍha উত্তরাষাঢ়া | Utrāṭam ഉത്രാടം | Uthirādam உத்திராடம் | Uttarāṣāḍha ఉత్తరాషాఢ | Uttarāṣāḍha ಉತ್ತರಾಷಾಢ | ζ and σ Sagittarii |
22 | Śravaṇa श्रवण | Śravaṇa শ্রবণা | Tiruvōnam ഓണം (തിരുവോണം) | Tiruvōnam திருவோணம் | Śravaṇaṁ శ్రవణం | Śravaṇa ಶ್ರವಣ | α, β and γ Aquilae |
23 | Śraviṣṭhā or Dhaniṣṭha श्रविष्ठा or धनिष्ठा | Śraviṣṭhā or Dhaniṣṭha ধনিষ্ঠা (শ্রবিষ্ঠা) | Aviṭṭam അവിട്ടം | Aviṭṭam அவிட்டம் | Dhaniṣṭha ధనిష్ఠ | Dhaniṣṭha ಧನಿಷ್ಠ | α to δ Delphinus |
24 | Śatabhiṣak or Śatatārakā शतभिषक् / शततारका | Śatabhiṣak or Śatatārakā শতভিষা | Chatayam ചതയം | Sadayam சதயம் | Śatabhiṣaṁ శతభిషం | Śatabhiṣa ಶತಭಿಷ | γ Aquarii |
25 | Pūrva Bhādrapadā पूर्वभाद्रपदा / पूर्वप्रोष्ठपदा | Pūrva Bhādrapadā পূর্ব ভাদ্রপদ | Pūruruṭṭāti പൂരുരുട്ടാതി | Pūraṭṭādhi பூரட்டாதி | Pūrvābhādra పూర్వాభాద్ర | Pūrvābhādra ಪೂರ್ವಾ ಭಾದ್ರ | α and β Pegasi |
26 | Uttara Bhādrapadā उत्तरभाद्रपदा / उत्तरप्रोष्ठपदा | Uttara Bhādrapadā উত্তর ভাদ্রপদ | Uttṛṭṭāti ഉത്രട്ടാതി | Uttṛṭṭādhi உத்திரட்டாதி | Uttarābhādra ఉత్తరాభాద్ర | Uttarābhādra ಉತ್ತರಾ ಭಾದ್ರ | γ Pegasi and α Andromedae |
27 | Revatī रेवती | Revatī রেবতী | Rēvati രേവതി | Rēvathi ரேவதி | Rēvati రేవతి | Rēvati ರೇವತಿ | ζ Piscium |
Yoga
The Sanskrit word Yoga means "union", but in astronomical calculations it is used in the sense of "alignment". First one computes the angular distance along the ecliptic of each object, taking the ecliptic to start at Meṣa or Aries (Meṣādi, as defined above): this is called the longitude of that object. The longitude of the sun and the longitude of the moon are added, and normalised to a value ranging between 0° to 360° (if greater than 360, one subtracts 360). This sum is divided into 27 parts. Each part will now equal 800' (where ' is the symbol of the arcminute which means 1/60 of a degree). These parts are called the yogas. They are labelled:
- Viṣkambha
- Prīti
- Āyuśmān
- Saubhāgya
- Śobhana
- Atigaṇḍa
- Sukarma
- Dhṛti
- Śūla
- Gaṇḍa
- Vṛddhi
- Dhruva
- Vyāghatā
- Harṣaṇa
- Vajra
- Siddhi
- Vyatipāta
- Variyas
- Parigha
- Śiva
- Siddha
- Sādhya
- Śubha
- Śukla
- Brahma
- Māhendra
- Vaidhṛti
Again, minor variations may exist. The yoga that is active during sunrise of a day is the prevailing yoga for the day.
Karaṇa
A karaṇa is half of a tithi. To be precise, a karaṇa is the time required for the angular distance between the sun and the moon to increase in steps of 6° starting from 0°. (Compare with the definition of a tithi.)
Since the tithis are 30 in number, and since 1 tithi = 2 karaṇas, therefore one would logically expect there to be 60 karaṇas. But there are only 11 such karaṇas which fill up those slots to accommodate for those 30 tithis. There are actually 4 "fixed" (sthira) karaṇas and 7 "repeating" (cara) karaṇas.
The 4 "
- Śakuni (शकुनि)
- Catuṣpāda (चतुष्पाद)
- Nāga (नाग)
- Kiṃstughna (किंस्तुघ्न)
The 7 "repeating" karaṇas are:
- Vava or Bava (बव)
- Valava or Bālava (बालव)
- Kaulava (कौलव)
- Taitila or Taitula (तैतिल)
- Gara or Garaja (गरज)
- Vaṇija (वणिज)
- Viṣṭi (Bhadra) (भद्रा)
- Now the first half of the 1st tithi (of Śukla Pakṣa) is always Kiṃtughna karaṇa. Hence this karaṇa' is "fixed".
- Next, the 7-repeating karaṇas repeat eight times to cover the next 56 half-tithis. Thus these are the "repeating" (cara) karaṇas.
- The 3 remaining half-tithis take the remaining "fixed" karaṇas in order. Thus these are also "fixed" (sthira).
- Thus one gets 60 karaṇas from those 11 preset karaṇas.
The Vedic day begins at sunrise. The karaṇa at sunrise of a particular day shall be the prevailing karaṇa for the whole day.
Months of the lunisolar calendar
There are two traditions being followed with respect to the start of the month. Amavasyant (Amanta) tradition followed mainly in the Western and Southern states of India (namely Andhra Pradesh, Goa, Gujarat, Karnataka, Maharashtra, and Tamil Nadu) considers a new moon occurring before sunrise on a day to be the first day of the lunar month.[6] Purnimant tradition, on the other hand, considers the next day of a Full moon to be the first day of the lunar month. This tradition is chiefly followed in the Northern and Eastern states of India (Bihar, Himachal Pradesh, Madhya Pradesh, Punjab, Odisha, Rajasthan, and Uttar Pradesh).[7] Having the two active traditions in practice would also mean that while the month names of the Hindu lunar calendar remains the same, there is on an average 15 days' difference in starting and ending of the month between the two traditions. This has its effects of the dates of recurring annual events such as the holy month of Śrāvaṇa.[8] For example, between the followers of the two traditions, the start of Śrāvaṇa month and its religious abstinence and observations will be deferred by 15 days for the followers of Amavasyant tradition.
A lunar month has 29 or 30 days (according to the movement of the moon).
The tithi at sunrise of a day is the only label of the day. There is no running day number from the first day to the last day of the month. This has some unique results, as explained below:
Sometimes two successive days have the same tithi. In such a case, the latter is called an adhika tithi where adhika means "extra". Sometimes, one tithi may never touch a sunrise, and hence no day will be labelled by that tithi. It is then said to be a Tithi Kṣaya where Kṣaya means "loss".
Month names
There are 12 months in Hindu lunar Calendar (Sanskrit: मासाः):
- Chaitra
- Vaiśākha
- Jyeṣṭha
- Āṣāḍha
- Śrāvaṇa
- Bhādrapada, Bhādra or Proṣṭhapada
- Āśvina
- Kārtika
- Agrahāyaṇa, Mārgaśīrṣa
- Pauṣa
- Māgha
- Phālguna
Determining, which name a lunar month takes is somewhat indirect. It is based on the rāshi (Zodiac sign) into which the sun transits within a lunar month, i.e. before the new moon ending the month.
There are 12 rāśi names, there are twelve lunar month names. When the sun transits into the Meṣa rāśi in a lunar month, then the name of the lunar month is Chaitra which has both Mīna rāśi and Meṣa rāśi . When the sun transits into Vṛṣabha rāśi, then the lunar month is Vaiśākha which has both Meṣa rāśi and Vṛṣabha rāśi. So on.
Purshottam maas is an extra month or thirteen in the Hindu calendar. This is been done for bridging of the lunar and solar calendars
Seasons
If the transits of the Sun through various constellations of the zodiac (Rāśi) are used, then we get solar months, which do not shift with reference to the Gregorian calendar. The solar months along with the corresponding Hindu seasons and Gregorian months are:
(Rāśi) Saura Māsa (solar months) |
Ṛtu (season) |
Bengali name | Kannada name | Telugu name | Malayalam name | Tamil name | Gregorian Tropical months |
Sidereal Vedic Zodiac |
---|---|---|---|---|---|---|---|---|
Meṣa | Grīṣma
(summer) |
গ্রীষ্ম (Grishmô) | ಗ್ರೀಷ್ಮ ಋತು (Grīṣma Ṛtu) | గ్రీష్మ ఋతువు (Grīṣma Ṛtuvu) | ഗ്രീഷ്മം (Grīṣmam) | இளவேனில் (ilavenil) | Apr-May | Aries |
Vṛṣabha | May–June | Taurus | ||||||
Mithuna | Varṣā
(monsoon) |
বর্ষা (Bôrsha) | ವರ್ಷ ಋತು (Varṣa Ṛtu) | వర్ష ఋతువు (Varṣa Ṛtuvu) | വർഷം (Varṣām) | முதுவேனில் (mudhuvenil) | June–July | Gemini |
Karkaṭa | July-Aug | Cancer | ||||||
Siṃha | Śarad
(autumn) |
শরৎ(Shôrôt) | ಶರದೃತು (Śaradṛtu) | శరదృతువు (Śaradṛtuvu) | ശരത് (Śarat) | கார் (kaar) | Aug-Sept | Leo |
Kanyā | Sept-Oct | Virgo | ||||||
Tulā | Hemanta
(winter) |
হেমন্ত (Hemôntô) | ಹೇಮಂತ ಋತು (Hēmaṃta Ṛtu) | హేమంత ఋతువు (Hēmaṃta Ṛtuvu) | ഹേമന്തം (Hemantam) | குளிர் (kulir) | Oct-Nov | Libra |
Vṛścika | Nov-Dec | Scorpius | ||||||
Dhanu | Śiśira
(prevernal) |
শীত (Shīth) | ಶಿಶಿರ ಋತು (Śiśira Ṛtu) | శిశిర ఋతువు (Śiśira Ṛtuvu) | ശിശിരം (Śiśiram) | முன்பனி (munpani) | Dec-Jan | Sagittarius |
Makara | Jan-Feb | Capricornus | ||||||
Kumbha | Vasanta
(spring) |
বসন্ত (Bôsôntô) | ವಸಂತ ಋತು (Vasaṃta Ṛtu) | వసంత ఋతువు (Vasaṃta Ṛtuvu) | വസന്തം (Vasaṃtam) | பின்பனி (pinpani) | Feb-Mar | Aquarius |
Mīna | Mar-Apr | Pisces |
The Sanskrit derivation of the lunar month names Chaitra etc., is the (lunar) month which has its central full moon occurring at or near the Citrā nakṣatra is called Chaitra. Another example is let's say when Pūrṇimā occurs in or near Viśākha nakṣatra, this in turn results to the initiation of the lunar month titled Vaiśākha Māsa.[9]
Similarly, for the nakṣatras Viśākha, Jyeṣṭhā, (Pūrva) Āṣāḍhā, Śravaṇa, Bhādrapadā, Aśvinī (old name Aśvayuj), Kṛttikā, Mṛgaśiras, Puṣya, Meghā and (Pūrva/Uttara) Phalguṇī the names Vaiśākha etc. at pūrṇimā, the other Lunar names are derived subsequently.
The lunar months are split into two pakṣas of 15 days. The waxing paksha is called Śukla Pakṣa "light half" and the waning pakṣa the kṛṣṇa pakṣa dark half. There are two different systems for making the lunar calendar:
- Amāvāsyanta or mukhya mana system – a month begins with a new moon and ends at new moon, mostly followed in South India
- Pūrṇimānta or gauna mana system – a month begins with a full moon and ends at full moon, followed more in North India. Pūrṇimānta is also known as Śuklānta Māsa and this system is recommended by Varāhamihira.
Extra months (Adhika Māsa)
When the sun does not at all transit into any rāśi but simply keeps moving within a rāśi in a lunar month (i.e. before a new moon), then that lunar month will be named according to the first upcoming transit. It will also take the epithet of adhika or "extra". For example, if a lunar month elapsed without a solar transit and the next transit is into Meṣa, then this month without transit is labelled Adhika Chaitra Māsa. The next month will be labelled according to its transit as usual and will get the epithet nija ("original") or Śuddha ("unmixed"). In the animation above, Year 2 illustrates this concept with Bhadrapada repeating twice; the first time the Sun stays entirely within Simha rashi thus resulting in an Adhika Bhadrapada.
Extra Month, or adhika māsa (māsa = lunar month in this context) falls every 32.5 months. It is also known as puruśottama māsa, it is said that the name is been given by Lord Vishnu as his name to this month. Thus 12 Hindu mas (māsa) is equal to approximate 356 days, while solar year have 365 or 366 (in leap year) which create difference of 9 to 10 days, which is offset every 3rd year. No adhika māsa falls during Kārtika to Māgh.
A month-long fair is celebrated in Machhegaun during adhika māsa. It is general belief that one can wash away all one's sins by taking a bath in the Machhenarayan's pond.
Lost months (Kṣaya Māsa)
If the sun transits into two rāshis within a lunar month, then the month will have to be labelled by both transits and will take the epithet kṣaya or "loss". There is considered to be a "loss" because in this case, there is only one month labelled by both transits. If the sun had transited into only one raashi in a lunar month as is usual, there would have been two separate months labelled by the two transits in question.
For example, if the sun transits into Meṣa and Vṛṣabha in a lunar month, then it will be called Chaitra-Vaiśākha kṣaya-māsa. There will be no separate months labelled Chaitra and Vaiśākha.
A Kṣaya-Māsa occurs very rarely. Known gaps between occurrence of Kṣaya-Māsas are 19 and 141 years. The last was in 1983. January 15 through February 12 were Pauṣa-Māgha kṣaya-māsa. February 13 onwards was (Adhika) Phālguna.
Special Case:
If there is no solar transit in one lunar month but there are two transits in the next lunar month,
- the first month will be labelled by the first transit of the second month and take the epithet Adhika and
- the next month will be labelled by both its transits as is usual for a Kṣaya-Māsa
This is a very very rare occurrence. The last was in 1315. October 8 to November 5 were Kārtika Adhika-Māsa. November 6 to December 5 were Kārtika-Mārgaśīrṣa Kṣaya-Māsa. December 6 onwards was Pauṣa.
Religious observances in case of extra and lost months
Among normal months, adhika months, and kshaya months, the earlier are considered "better" for religious purposes. That means, if a festival should fall on the 10th tithi of the Āshvayuja month (this is called Vijayadashamī) and there are two Āśvayuja (Āśvina)' months caused by the existence of an adhika Āśvayuja, the first adhika month will not see the festival, and the festival will be observed only in the second nija month. However, if the second month is āshvayuja kshaya then the festival will be observed in the first adhika month itself.
When two months are rolled into one in the case of a kshaya māsa, the festivals of both months will also be rolled into this Kṣaya Māsa', unless "adhika māsa" precedes it. For example, the festival of Mahāshivarātri which is to be observed on the fourteenth tithi of the Māgha Kṛṣṇa-Pakṣa was, in 1983, observed on the corresponding tithi of Pauṣa-Māgha Kṣaya Kṛṣṇa-Pakṣa, since in that year, Pauṣa and Māgha were rolled into one, and nija margashirsha preceded it, as mentioned above.
Vaiṣṇava calendar
Month | Presiding Deity of the month |
---|---|
Agrahāyaṇa | Keśava |
Pauṣa | Nārāyaṇa |
Maghā | Mādhava |
Phālguna | Govinda |
Chaitra | Viṣṇu |
Vaiśākha | Madhusudana |
Jyeṣṭha | Trivikrama |
Āṣāḍha | Vāmana |
Śrāvaṇa | Śrīdhara |
Bhādrapada | Hṛṣīkeśa |
Āśvina | Padmanābha |
Kārtika | Dāmodara |
Year of the lunisolar calendar
The new year day is the first day of the shukla paksha of Chaitra. In the case of adhika or kshaya months relating to Chaitra, the aforementioned religious rules apply giving rise to the following results:
- If an adhika Chaitra is followed by a nija Chaitra, the new year starts with the nija Chaitra. (e.g., 1015-02-22 CE)
- If an adhika Chaitra is followed by a Chaitra-Vaishākha kshaya, the new year starts with the adhika Chaitra.
- If a Chaitra-Vaiśākha Kṣaya occurs with no adhika Chaitra before it, then it starts the new year.
- If a Chaitra-Phālguna Kṣaya' occurs, it starts the new year.
Another kind of lunisolar calendar
There is another kind of lunisolar calendar which differs from the former in the way the months are named. When a full moon (instead of new moon) occurs before sunrise on a day, that day is said to be the first day of the lunar month. In this case, the end of the lunar month will coincide with a full moon. This is called the pūrṇimānta māna - full-moon-ending reckoning, as against the amānta māna - new-moon-ending reckoning used before.
This definition leads to a lot of complications:
- The first pakṣa of the month will fall on Kṛṣṇa-Pakṣa whilst the second will be Śukla-Pakṣa in Pūrṇimānta system.
- The new year is still on the first day of the Chaitra Śukla-Pakṣa. The subsequent Pakṣas will, for example, be:
Lunar Month Candra Māsa |
First Pakṣa | Ending (2nd) Pakṣa |
---|---|---|
Vaiśākha | Śukla-Pakṣa | Kṛṣṇa-Pakṣa |
Jyaiṣṭha | Śukla-Pakṣa | Kṛṣṇa-Pakṣa |
Āṣāḍha | Śukla-Pakṣa | Kṛṣṇa-Pakṣa |
Śrāvaṇa | Śukla-Pakṣa | Kṛṣṇa-Pakṣa |
Bhādrapada | Śukla-Pakṣa | Kṛṣṇa-Pakṣa |
Āśvina | Śukla-Pakṣa | Kṛṣṇa-Pakṣa |
Kārtika | Śukla-Pakṣa | Kṛṣṇa-Pakṣa |
Mārgaśīrṣa | Śukla-Pakṣa | Kṛṣṇa-Pakṣa |
Pauṣa | Śukla-Pakṣa | Kṛṣṇa-Pakṣa |
Māgha | Śukla-Pakṣa | Kṛṣṇa-Pakṣa |
Phālguna | Śukla-Pakṣa | Kṛṣṇa-Pakṣa |
Chaitra | Śukla-Pakṣa | Kṛṣṇa-Pakṣa |
Note:
- Phālguna Māsa is the last Lunar month, with the last pakṣa of the year in this pūrṇimānta system being Phālguna Śukla-Pakṣa.
- The Śukla Pakṣa of a given month, say Chaitra, comprises the same actual days in both systems, as can be deduces from a careful analysis of the rules. However, the Chaitra Kṛṣṇa-Pakṣas defined by the 2 systems will be on different days, since the Chaitra Kṛṣṇa-Pakṣa precedes the Chaitra Śukla-Pakṣa in the pūrnimānta system but follows it in the amānta system.
- Though the regular months are defined by the full moon, the adhika and kṣaya lunar months are still defined by the new moon. That is, even if the pūrnimānta system is followed, adhika or kṣaya months will start with the first sunrise after the new moon, and end with the new moon.
- The adhika month will therefore get sandwiched between the 2 pakṣas of the nija months. For example, a Śrāvaṇa Adhika Māsa will be inserted as follows:
- nija Śrāvaṇa Kṛṣṇa-Pakṣa
- adhika Śrāvaṇa Śukla-Pakṣa
- adhika Śrāvaṇa Kṛṣṇa-Pakṣa and
- nija Shrāvana Śukla-Pakṣa
after which Bhādrapada Kṛṣṇa-Pakṣa will follow subsequently as usual.
- If there is an adhika Chaitra, then it will follow the (nija) Chaitra Krṣṇa-Pakṣa at the end of the year. Only with the nija Chaitra Śukla-Pakṣa will the new year start. The only exception is when it is followed by a kṣaya, and that will be mentioned later.
- The kṣaya month is more complicated. If in the amānta system there is a Pauṣa-Māgha Kṣaya Māsa, then in the pūrnimānta system there will be the following pakṣas:
- Pauṣa Kṛṣṇa-Pakṣa
- Pauṣa-Maagha kshaya Śukla-Pakṣa
- Māgha-Phālguna Kṣaya Kṛṣṇa-Pakṣa and a
- Phālguna Śukla-Pakṣa.
- The special Kṣaya case where an adhika māsa precedes a kshaya māsa gets even more convoluted. First, we should remember that the Āśvina Śukla-Pakṣa is the same in both the systems. After this come the following Pakṣas:
- nija Kārtika Kṛṣṇa-Pakṣa
- adhika Kārtika Śukla-Pakṣa
- adhika Kārtika Kṛṣṇa-Pakṣa
- Kārtika-Māgaśīrṣa Kṣaya Śukla-Pakṣa
- Māgaśīrsa-Pauṣa Kṣaya Kṛṣṇa-Pakṣa
- Pauṣa Śukla-Pakṣa
followed by the Māgha Kṛṣṇa-Pakṣa etc., as usual.
- The considerations for the new year are:
- If there is a Chaitra-Vaiśākha Kṣaya Śukla-Pakṣa:
- if an adhika Chaitra' precedes it, then the 'adhika Chaitra Śukla-Pakṣa starts the new year
- if not, the Kṣaya Śukla-Pakṣa starts the new year
- If there is a Phālguna-Chaitra Kṣaya Śukla-Pakṣa then it starts the new year
- If there is a Chaitra-Vaiśākha Kṣaya Śukla-Pakṣa:
However, none of these above complications cause a change in the day of religious observances. Since only the name of the Kṛṣṇa-Pakṣas of the months will change in the two systems, festivals which fall on the Kṛṣṇa-Pakṣa will be defined by the appropriate changed name. That is, the Mahāśivarātri, defined in the amānta māna to be observed on the fourteenth of the Māgha krishna paksha will now (in the pūrnimānta māna) be defined by the Phālguna krishna paksha.
Correspondence of the lunisolar calendar to the solar calendar
A lunisolar calendar is always a calendar based on the moon's celestial motion, which in a way keeps itself close to a solar calendar based on the sun's (apparent) celestial motion.[10] That is, the lunisolar calendar's new year is always kept close (within certain limits) to a solar calendar's new year.
Since the Hindu lunar month names are based on solar transits, and the month of Chaitra will, as defined above, always be close to the solar month of Meṣa (Aries), the Hindu lunisolar calendar will always keep in track with the Hindu solar calendar.
The Hindu solar calendar by contrast starts on April 14–15 each year. This signifies the sun's "entry" into Mesha rashi and is celebrated as the New Year in Assam, Bengal, Odisha, Manipur, Kerala, Punjab, Tamil Nadu and Tripura. The first month of the year is called "(சித்திரை)" in Tamil, "Medam" in Malayalam and Bohag in Assamese, Baisakh in Bengali/Punjabi and Nepali. This solar new year is celebrated on the same day in Myanmar, Cambodia, Laos, Nepal and Thailand.
Year numbering
The epoch (starting point or first day of the zeroth year) of the current era of Hindu calendar (both solar and lunisolar) is February 18, 3102 BCE in the proleptic Julian calendar or January 23, 3102 BCE in the proleptic Gregorian calendar. According to the Purāṇas this was the moment when Śrī Kṛṣṇa returned to his eternal abode.[11][12] Both the solar and lunisolar calendars started on this date. After that, each year is labelled by the number of years elapsed since the epoch.
This is an unusual feature of the Hindu calendar. Most systems use the current ordinal number of the year as the year label. But just as a person's true age is measured by the number of years that have elapsed starting from the date of the person's birth, the Hindu calendar measures the number of years elapsed. As of August 31, 2014, 5116 years have elapsed in the Hindu calendar. However, the lunisolar calendar year usually starts earlier than the solar calendar year, so the exact year will not begin on the same day every year.
Year names
Apart from the numbering system outlined above, there is also a cycle of 60 calendar year names, called Samvatsaras, which started at the first year (at elapsed years zero) and runs continuously:
- Prabhava
- Vibhava
- Shukla
- Pramoda
- Prajāpati
- Āngirasa
- Shrīmukha
- Bhāva
- Yuva
- Dhātri
- Īshvara
- Bahudhānya
- Pramādhi
- Vikrama (2000-2001)
- Vrisha (2001–02)
- Chitrabhānu (2002–03)
- Svabhānu (2003–04)
- Tārana (2004–05)
- Pārthiva (2005–06)
- Vyaya (2006-2007)
- Sarvajeeth (2007–08)
- Sarvadhāri (2008–09)
- Virodhi (2009–10)
- Vikrita (2010–11)
- Khara (2011–12)
- Nandana (2012–13)
- Vijaya (2013–14)
- Jaya (2014–15)
- Manmatha (2015–16)
- Durmukhi
- Hevilambi
- Vilambi
- Vikāri
- Shārvari
- Plava
- Shubhakruti
- Sobhakruthi
- Krodhi
- Vishvāvasu
- Parābhava
- Plavanga
- Kīlaka
- Saumya
- Sādhārana
- Virodhikruthi
- Paridhāvi
- Pramādicha
- Ānanda
- Rākshasa
- Anala
- Pingala
- Kālayukthi
- Siddhārthi
- Raudra
- Durmathi
- Dundubhi
- Rudhirodgāri
- Raktākshi
- Krodhana
- Akshaya
This system contains a concept of leap years similar to the Julian calendar . Every 4 years, there will be 366 days where the rest have 365. The starting point is Meshadi or Mesha Sankranti, (1st day of Meṣa or the Hindu solar new year). It is also counted on a daily basis. Beginning from 1 on the first day, it has presently reached over 1864000 days. This means that that many days have passed in the present Kaliyuga (1/10 of Catur-Yugas total).
Eras
Hinduism follows Hindu units of time containing four eras (or yuga, meaning age). The four yugas are:
They are often translated into English as the Golden, Silver, Bronze and Iron Ages, respectively. The ages follow a gradual decline of dharma, wisdom, knowledge, intellectual capability, life span and emotional and physical strength. The Kali Yuga began approximately five thousand years ago, and it has a duration of 432,000 years. The Dvāpara, Tretā, and Kṛta Yugas are two, three, and four times the length of the Kali Yuga, respectively. Thus, the ages together constitute a 4,320,000 year period.
A thousand and a thousand (i.e. two thousand) Catur-Yugas are said to be one day and night of the creator Brahmā. Brahmā lives for 100 years of 360 "days" and at the end, he is said to dissolve, along with his entire Creation, into the Eternal Soul or Paramātman.
History
The Hindu Calendar descends from the Vedic times. There are many references to calendrics in the Vedas. The (6) Vedāṅgas (auto Veda) called Jyotiṣa (literally, "celestial body study") prescribed all the aspects of the Hindu calendars. After the Vedic period, there were many scholars such as Āryabhaṭa (5th century), Varāhamihira (6th century) and Bhāskara (12th century) who were experts scholars in Jyotiṣa and contributed to the development of the Hindu Calendar.
The most widely used authoritative text for the Hindu Calendars is the "Sūrya Siddhānta", a text of uncertain age, though some place it at 10th century.
The traditional Vedic calendar used to start with the month of agrahayan (agra=first + ayan = travel of the sun, equinox) or Mārgaśīṣa. This is the month where the Sun crosses the equator, i.e. the vernal equinox. This month was called mārgashirsha after the fifth nakshatra (around lambda orionis). Due to the precession of the Earth's axis, the vernal equinox is now in Pisces, and corresponds to the month of chaitra. This shift over the years is what has led to various calendar reforms in different regions to assert different months as the start month for the year. Thus, some calendars (e.g. Vikram) start with Chaitra, which is the present-day month of the vernal equinox, as the first month. Others may start with Vaiśākha (e.g. Bangabda). The shift in the vernal equinox by nearly four months from Agrahāyaṇa to Chaitra in sidereal terms seems to indicate that the original naming conventions may date to the fourth or fifth millennium BCE, since the period of precession in the Earth's axis is about 25,800 years.
Regional variants
The Indian Calendar Reform Committee, appointed in 1952, identified more than thirty well-developed calendars, all variants of the Surya Siddhanta calendar outlined here, in systematic use across different parts of India. These include the widespread Vikrama and Shalivahana calendars and regional variations thereof. The Tamil calendar, a solar calendar, is used in Tamil Nadu and Kollavarsham Calendar is used in Kerala.
The two calendars most widely used in India today are the Vikrama calendar followed in Western and Northern India and Nepal, and the Shalivahana or Saka calendar which is followed in Andhra Pradesh, Karnataka, Maharashtra and Goa.
In the year 56 BCE, Vikrama Samvat era was founded by the emperor Vikramaditya of Ujjain following his victory over the Sakas. Later, in a similar fashion, Satavahana king Gautamiputra Satakarni initiated the Saka era to celebrate his victory against the Sakas in the year CE 78.
Both the Vikrama and the Shalivahana are lunisolar calendars, and feature annual cycles of twelve lunar months, each month divided into two phases: the 'bright half' (Śukla Pakṣa) and the 'dark half' (Kṛṣṇa Pakṣa); these correspond respectively to the periods of the 'waxing' and the 'waning' of the moon. Thus, the period beginning from the first day after the new moon and ending on the full moon day constitutes the Śukla Pakṣa, 'bright part' of the month; the period beginning from the day after Pūrṇimā (the full moon) until and including the next new moon day constitutes the Kṛṣṇa Pakṣa, the'dark part' of the month.
The names of the 12 months, as also their sequence, are the same in both calendars; however, the new year is celebrated at separate points during the year and the "year zero" for the two calendars is different. In the Vikrama calendar, the zero year corresponds to 56 BCE, while in the Shalivahana calendar, it corresponds to CE 78. The Vikrama calendar begins with the month of Baiśākha or Vaiśākha (April), or Kartak (October/November) in Gujarat. The Shalivahana calendar begins with the month of Chaitra (March) and the Ugadi/Gudi Padwa festivals mark the new year.
Another little-known difference between the two calendars exists: while each month in the Shalivahana calendar begins with the 'bright half' and is followed by the 'dark half', the opposite obtains in the Vikrama calendar. Thus, each month of the Shalivahana calendar ends with the no-moon day and the new month begins on the day after that, while the full-moon day brings each month of the Vikrama calendar to a close (This is an exception in Gujarati Calendar, its month (and hence new year) starts on a sunrise of the day after new moon, and ends on the new moon, though it follows Vikram Samvat).
In Gujarat, Diwali is held on the final day of the Vikram Calendar and the next day marks the beginning of the New Year and is also referred as ‘Annakut’ or Nutan Varsh or Bestu Varash. In the Hindu calendar popularly used in North India the year begins with Chaitra Shukala Pratipadha (March – April).
Samvat calendars
Samvat is one of the several Hindu calendars in India:
- Vikram Samvat: lunar months, solar sidereal years
- Shaka Samvat (traditional): lunar months, solar sidereal years
- Shaka Samvat (modern): solar tropical
- Bangla Calendar: solar tropical years
- Tamil Nadu/Kerala: solar tropical years such as Tamil calendar
- Nepali calendar with Bikram Sambat: solar tropical years
Most holidays in India are based on the first two calendars. A few are based on the solar cycle, Sankranti (solar sidereal) and Baisakhi (solar tropical).
Months and approximate correspondence
Indian months are listed below, numbered according to the Shaka calendar. Shaka and Chaitradi Vikram (UP, Rajasthan, Maharashtra etc.) start with Chaitra (The first month of the year is called "Chitterai (चैत्र)" in Marathi) Kartikadi Vikram (Gujarat) start in Kartika.
# | Indian | Gregorian |
---|---|---|
1 | Chaitra | March–April |
2 | Vaisākha | April–May |
3 | Jyeshta | May–June |
4 | Āshāda | June–July |
5 | Shraavana | July–August |
6 | Bhādrapada | August–September |
7 | Ashwina | September–October |
8 | Kartika | October–November |
9 | Mārgasirsa (Agrahayana) | November–December |
10 | Pausha | December–January |
11 | Māgha | January–February |
12 | Phālguna | February–March |
Nakshatras are divisions of ecliptic, each 13° 20', starting from 0° Aries. The purnima of each month is synchronized with a nakshatra.
Time cycles in India
The time cycles in India are:
- 60-year cycle
- Year
- 6 seasons of a year
- about 60 days (2 months) in a season
- Month (lunar)
- 2 pakshas in a month, shukla (waxing) and krishna (waning)
- 15 tithis in a paksha (1-14, 15th is purnima or amavasya)
- 60 ghatikas (or 30 muhurtas or 8 praharas) in a 24-hour period (ahoratra).
- 30 Kala (approx) in 1 muhurta
- 30 Kastha in 1 kala
- 15 Nimisha in 1 kastha
Years are synchronised with the solar sidereal year by adding a month every three years. The extra month is termed as "Adhik Mass" (extra month). This extra month is called Mala Masa (impure month) in Eastern India.
Date conversion
Converting a date from an Indian calendar to the common era can require a complex computation. To obtain the approximate year AD:
- Chaitradi Vikram (past) : Chaitra-Pausha: subtract 57; Pausha-Phalguna: subtract 56.
- Shaka: add 78-79
- Kalachuri: add 248-249
- Gupta/Valabhi: add 319-320
- Bangla: add 593-594
- Vira Nirvana Samvat: subtract 527-526
- Yudhishthira Samvat: add 3101 (Ascension of Lord Krishna at age 125)
- Sri Krishna Samvat: add 3226 (Birth of Lord Sri Krishna)
- Balabhi Samvat: add 320
Variations
- In Bihar, Uttar Pradesh, Rajasthan, and many northern region of India months are Purnimanta (means month ends on Purnima or Full Moon). In Gujarat, Maharashtra, and other parts of many south Indian region, months are Amanta (months end on Amavasya).
- In inscriptions, the years may be gata (past) or current.
National calendars in South and South East Asia
A variant of the Shalivahana Calendar was reformed and standardised as the Indian National calendar in 1957. This official calendar follows the Shalivahan Shak calendar in beginning from the month of Chaitra and counting years with CE 78 being year zero. It features a constant number of days in every month (with leap years).
The Bengali Calendar, or Bengali calendar (introduced 1584), is widely used in eastern India in the state of West Bengal, Tripura and Assam. A reformation of this calendar was introduced in present-day Bangladesh in 1966, with constant days in each month and a leap year system; this serves as the national calendar for Bangladesh. Nepal follows the Bikram Sambat. Parallel months and roughly the same periods apply to the Buddhist calendars used in Burma, Cambodia, Laos, Sri Lanka and Thailand.
Correspondence between calendars
As an indicator of this variation, Whitaker's Almanac reports that the Gregorian year CE 2000 corresponds, respectively with:
- Year 5102 in the Kaliyuga calendar; (3102 BCE)
- Year 2544 in the Buddha Nirvana calendar; (544 BCE)
- Year 2543 in the Buddhist Era (BE) of the Thai solar calendar (543 BCE)
- Year 2057 in the Bikram Samvat calendar; (57 BCE)
- Year 1922 in the Saka calendar; (CE 78)
- Year 1921 (shown in terms of 5-yearly cycles) of the Vedanga Jyotisa calendar; (CE 79)
- Year 1407 in the Bengali calendar; (CE 593)
- Year 1362 in the Burmese Calendar; (CE 638)
- Year 1176 in the Malayalam calendar or Kolla Varsham calendar; (CE 824)
- Year 514 in the Gaurabda Gaudiya calendar. (CE 1486)
See also
- Hindu astrology
- Hindu chronology
- Hindu units of measurement
- List of Hindu festivals
- Panchangam
- Panjika
- Ancient Vedic units of measurement
- Perpetual Calendar of 800 Years
- Pambu Panchangam
- Kollam era
References
- ↑ Mughal, Muhammad Aurang Zeb. (2014). Time, Space and Social Change in Rural Pakistan: An Ethnographic Study of Jhokwala Village, Lodhran District. PhD thesis. Durham University.
- ↑ Time Measurement and Calendar Construction. Brill Archive. Retrieved 2011-09-18.
- ↑ Chatterjee, S.K. (1998). Indian Calendric System. Publications Division, Ministry of Information and Broadcasting, Government of India.
- ↑ Chia Daphne and Helmer Aslaksen (April 2001). "Indian Calendars: Comparing the Surya Siddhanta and the Astronomical Ephemeris" (PDF). Retrieved 2004-04-04.
- ↑ Basham, A.L. (1954). The Wonder that was India. Macmillan (Rupa and Co, Calcutta, reprint),., Appendix II: Astronomy
- ↑ http://www.drikpanchang.com/faq/faq-ans8.html
- ↑ http://www.drikpanchang.com/faq/faq-ans8.html
- ↑ http://www.drikpanchang.com/festivals/sawan/sawan-somwar-vrat-dates.html
- ↑ Hindu Lunar Month Names
- ↑ Muhammad Aurang Zeb Mughal (2014). Calendars Tell History: Social Rhythm and Social Change in Rural Pakistan. History and Anthropology 25(5): 592-613.
- ↑ Bhāgavata Purāṇa 12.2.29-33
- ↑ Yano, Michio, "Calendar, astrology and astronomy" in Flood, Gavin (Ed) (2003). Blackwell companion to Hinduism. Blackwell Publishing. ISBN 0-631-21535-2.
Further reading
- Reingold and Dershowitz, Calendrical Calculations, Millennium Edition, Cambridge University Press, latest 2nd edition 3rd printing released November 2004. ISBN 0-521-77752-6
- S. Balachandra Rao, Indian Astronomy: An Introduction, Universities Press, Hyderabad, 2000.
- Rai Bahadur Pandit Gaurishankar Hirachand Ojha, The Paleography of India, 2 ed., Ajmer, 1918, reprinted Manshuram Manoharlal publishers, 1993.
External links
- The Astronomical Basis of the Hindu Lunisolar Calendar
- Hindu Calendars in various Indian Languages
- Hindu Calendar of Nepal The Official Hindu Calendar of Nepal
- Kyoto University Panchanga Converter Program
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