If you're like us, you might've looked at a globe of the Earth in elementary school long before the days of Google Earth and wondered just what that strange looking figure eight thing on its side was.
Above: An analemma of the Sun, taken from Budapest, Hungary over a one year span. (Courtesy of György Soponyai, used with permission).
Chances are, your teacher had no idea either, and you got an answer such as "it's a calendar, kid" based on the months of the year marking its border.
In a vague sense, this answer is correct… sort of. That funky figure eight is what's known as an analemma, and it traces out the course of the Sun in the sky through the year as measured from a daily point fixed in apparent solar time.
But try explaining that one to your 3rd grade teacher. Turns out, measuring the passage of time isn't as straight forward as you'd think. Our modern day clock and calendar is a sort of compromise, a method of marking the passage of time in a continuing battle to stay in sync with the heavens.
For most of history, the daily passage of time was denoted by the Sun. Solar Noon occurs when the Sun stands at its highest elevation (also known as its altitude) above the local horizon when it transits the north-south meridian. The trouble is, the passage apparent solar time doesn't exactly match what we call solar mean time, or the 24 hour rotation of the Earth. In fact, this discrepancy can add up to as much as more than 16 minutes ahead of solar noon in late October and November and over 12 minutes behind it in February. This is worth bringing up this week because this factor, known as "The Equation of Time" — think "equation" in the sense that sundial owners must factor it in to make solar mean and apparent time "equal" — reaches its shallow minimum for 2014 this Saturday at 7:00 UT/3:00 AM EDT with a value of -6.54 minutes.
So, what gives? Why won't the pesky universe stay in sync?
Well, the discrepancy arises from two factors: the eccentricity of the Earth's orbit, or how much it deviates from circular and the obliquity of the ecliptic to the celestial equator, think the tilt of Earth's axis. Of the two, obliquity is the major factor, with eccentricity playing a minor but measurable role. And remember, we move slightly faster in our orbit in January near perihelion as per Kepler's Laws of planetary motion than at aphelion, which occurred earlier this month , though be careful not to confuse the term "faster" with "sun fast."
This means that were the Earth to orbit the Sun in a perfect circle with its poles perpendicular to its orbit, apparent and mean time would essentially stay in sync. Of course, no known planet has such a perfect alignment scenario, and other worlds do indeed host alien analemmas (analemmae?) of their own.
It's also interesting to note that the two each major and minor minima of the Equation of Time roughly coincide with the four cross quarter tie in days of the year (marked by Groundhog's Day, May Day, Lammas Day and Halloween, respectively) while the zero value points fall within a few weeks of the equinoxes and solstices.
A graph showing the fluctuation of the valeu of the Equation of Time (with minute on the vertical axis) throughout the calendar year. (Created by the author.)
In the current epoch, the deep minimum falls on February 21st, while the highest maximum falls on November 3rd on non-leap years. The four zero value dates are April 15th, June 13th, September 1st and December 25th respectively. The exact timing of these also slip to the tune of about a second a year, but of course, most sundials lack this sort of precision.
A "globe sundial" on the University of North Dakota at Grand Forks campus. (Photo by author).
So, why should we care about the Equation of Time in the modern atomic clock age? It is true that there have been calls over the past few years to "abolish the leap second" and go off of the astronomical time standard entirely… if this ever does come to pass, some future Pope Gregory will have to institute a "leap hour" circa 10,000 A.D. or so to stop the Sun from rising at 2 AM. But some modern day Sun tracking devices (think heliostats or solar panels) do in fact use mechanical timers and must take the equation of time into account to maximize effectiveness.
Want to see the Equation of Time in action? You can make your own analemma simply by photographing the position of the Sun at the same time each day. Just remember to account for the shift on and off of Daylight Saving if you live in an area that observes the archaic practice, residents of Arizona need not to take heed. Otherwise, you'll end up with a "split analemma…" Wintertime near the December Solstice is the best time to start this project, as the Sun is at its lowest noonday culmination and this will assure that your very own personal analemma won't fall below the local horizon. [Credit: Starry Night Education Software]
Farther afield, the effects of the Precession of the Equinoxes will also tweak the dates of the Equation of Time values a bit. Live out a full 72 year life span, and the equinoctial points will have drifted along the ecliptic by about one degree, twice the diameter of the Full Moon. Incidentally, the failure to take Precession into account is yet another spectacular fail of modern astrology: most "houses" or "signs" have drifted in the past millennia to the point where most "Leos" are in fact "Cancers!"
Such is the challenges and vagaries of modern day astronomical time-keeping. Let us know of your tales of tragedy and triumph as you hunt down the elusive analemma.