Reworking Playfair's "Remarks on the Astronomy of the Brahmins"
Playfair's lengthy remarks originally were published in 1790 in the Transactions of the Royal Society of Edinburgh, vol. 2 (the remarks are said to have been received in 1789). They also are available in an online "Google" book of Playfair's works, and as a chapter in Dharampal's book, "Indian Science & Technology in the 18th Century". Let's rework Playfair's remarks with the help of modern ephemerides.
In sec. 33, Playfair says that the Hindu astronomers gave the maximum "equation of the sun's center" (i.e. maximum difference between actual and mean solar longitude) as 2deg 10' 32". Assuming an observer at the Earth-Luna barycenter, and finding the angle to third order in the eccentricity, I find that it corresponds to e = 0.018985. From the eccentricity formula in the 1965 Astronomical Almanac (which counts centuries from 1900) I find that the date would be 4800 BC. Interpolating quadratically from the eccentricities given by Dziobek, "Mathematical Theories of Planetary Motions" (1892) in Table VI, p. 294, I find that the needed eccentricity occurs at 4900 BC, in good agreement with the 4800BC date implied by the 1965 Astronomical Almanac's eccentricity polynomial.
In sec. 17, the sun's "apogee" is said to be given as 77deg "from the beginning of the zodiac". In sec. 22, Aldebaran is said to be given as 53deg 20' "from the beginning of the zodiac". Suppose that the text has been corrupted: "apogee" should read "vernal equinox". Including proper motion, Aldebaran's longitude, in coords of the equinox & ecliptic of date, at 4800BC, was 335.931, implying that the so-called "apogee" (really, vernal eqinox at the epoch of the original almanac) was at longitude 335.931-53.333+77 = 359.60. It would coincide with the vernal equinox 0.40/360*26000 yr later, i.e. 4770BC.
Besides this 4800BC date, which I find two ways above, there is another way, besides the several discovered by Playfair and Bailly, to get the Kali Yuga date (3102BC) from the almanac. Sec. 10 says that the sidereal year, given by the almanac, is abnormally long: 365d 6h 12' 36". (Correcting for the shorter days in 3000BC, the 36" becomes 09".) This exceeds the modern value of the sidereal year, 365.25636d, by 1/176,000, but is too short to be the anomalistic year, which by interpolating to 3200BC in Dziobek's table, I find to exceed the sidereal year by 1/121,000. This year seems really to be a special kind of "sidereal" year: the time between moments when the RA of the Sun, in the equinox and ecliptic of date, equals the RA of Arcturus. It is a kind of sidereal year relative to Arcturus. I discovered this by using the NASA lambda online utility, to find the RA, in coordinates of the equinox and ecliptic of date, of Arcturus at various ancient dates, corrected for proper motion. Then I used the JPL Horizons online ephemeris, to find the Sun's RA-to-RA time for those dates, then corrected for a year's change in Arcturus' RA, getting 3036BC, in good agreement with the 3102BC date determined for the Kali Yuga according to planetary conjunctions.
