Second to Sextant
″
sext
Conversion History
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Quick Reference Table (Second to Sextant)
| Second (″) | Sextant (sext) |
|---|---|
| 1 | 0.00000462962962962963 |
| 10 | 0.0000462962962962963 |
| 60 | 0.0002777777777777778 |
| 600 | 0.002777777777777778 |
| 3,600 | 0.016666666666666668 |
| 18,000 | 0.08333333333333334 |
About Second (″)
An arcsecond (″) is one-sixtieth of an arcminute, or 1/3600 of a degree. It is the standard unit of angular precision in astronomy, geodesy, and high-accuracy GPS. The angular diameter of the Moon from Earth is about 1,800 arcseconds (30 arcminutes). Modern GPS receivers can resolve positions to better than 0.001 arcseconds, corresponding to centimeter-level accuracy on the ground. Stellar parallax — used to measure distances to nearby stars — is expressed in arcseconds; the nearest star system, Alpha Centauri, has a parallax of 0.74 arcseconds.
The angular resolution of the human eye is roughly 60 arcseconds (1 arcminute). The Hubble Space Telescope can resolve objects separated by just 0.05 arcseconds.
About Sextant (sext)
As an angular unit, a sextant is one-sixth of a full circle — exactly 60°. The name comes from the Latin "sextans" (one-sixth), the same root as the navigational instrument whose arc spans one-sixth of a circle (60°), allowing it to measure angles up to 120° through its mirror system. The navigational sextant measures the angle between a celestial body and the horizon to determine latitude and longitude. As a pure angular unit, the sextant is rarely used outside of instrument design and historical contexts.
The arc of a marine sextant spans exactly one sextant unit (60°). Measuring the Sun's altitude at solar noon with a sextant allows a navigator to calculate latitude.
Second – Frequently Asked Questions
How much ground distance does one arcsecond of latitude cover on Earth?
One arcsecond of latitude corresponds to roughly 31 meters (about 101 feet) on the ground. This is why high-precision GPS coordinates are quoted to fractions of arcseconds — a shift of just 0.01″ means about 30 cm. Longitude arcseconds cover less ground as you move toward the poles because the meridians converge; at 45° latitude, one arcsecond of longitude spans about 22 meters.
What is stellar parallax and why is it measured in arcseconds?
Stellar parallax is the tiny apparent shift of a nearby star against distant background stars as Earth orbits the Sun. Even the closest star, Proxima Centauri, shifts by only 0.768 arcseconds over six months — far too small for the naked eye. The parsec (parallax-arcsecond) is defined as the distance at which a star would show exactly 1″ of parallax. No star is close enough to reach that threshold, which gives you a sense of how mind-bogglingly far away even our nearest neighbors are.
Why does the Hubble Space Telescope need resolution measured in fractions of arcseconds?
Hubble resolves details down to about 0.05 arcseconds — roughly the angular size of a coin seen from 80 km away. At that resolution it can distinguish individual stars in nearby galaxies, spot the discs of Pluto and large asteroids, and detect gravitational lensing arcs. Ground-based telescopes are blurred to about 0.5–1″ by atmospheric turbulence unless they use adaptive optics, which is why space telescopes remain essential for sharp imaging.
Why are arcseconds used in describing telescope and camera resolution?
Arcseconds per pixel is the standard metric for imaging sensors in astronomy because it directly links detector geometry to sky coverage. A telescope with 0.3″/pixel resolution can separate objects that close together on the sky. Photographers encounter this too — the resolving power of any long telephoto lens is ultimately limited by atmospheric seeing (typically 1–2″), which is why even a perfect 600 mm lens produces soft images of distant objects on a hazy day.
What is the smallest angle humans can distinguish with the naked eye?
The average human eye resolves about 60 arcseconds (1 arcminute) under good conditions, though some people with exceptional vision reach 30″. This is why the standard eye test chart (Snellen chart) defines 20/20 vision as the ability to resolve details that subtend 1 arcminute. For comparison, Jupiter at its brightest subtends about 50″, just below that threshold — which is why it looks like a bright dot to the naked eye, not a disc.
Sextant – Frequently Asked Questions
How does a marine sextant actually measure angles at sea?
A sextant uses two mirrors to superimpose the image of a celestial body onto the horizon. The navigator looks through the eyepiece and sees the horizon directly through a half-silvered mirror, while a second mirror on a movable arm reflects the Sun or star down into the same field of view. You swing the arm until the star appears to sit exactly on the horizon, then read the angle off the graduated arc. The double-reflection design means the arc only needs to span 60° (one sextant) to measure angles up to 120°.
Why is the instrument called a sextant if it measures more than 60 degrees?
The name refers to the arc of the instrument, not its measurement range. A sextant's arc is one-sixth of a circle (60°), but thanks to the double-reflection principle — where the angle of reflection doubles the arc angle — it can actually measure angles up to 120°. Similarly, an octant (one-eighth of a circle, 45° arc) measures up to 90°. The naming convention describes the physical shape of the tool, not its capability.
Can you still navigate by sextant in the GPS era and would anyone bother?
Yes, and navies worldwide still require it. The US Naval Academy reintroduced mandatory celestial navigation in 2015 after a decade-long hiatus, citing concerns about GPS vulnerability to jamming, spoofing, and satellite failure. A skilled celestial navigator with a sextant, an accurate clock, and a nautical almanac can determine position to within about 1–2 nautical miles — good enough to make port safely. Several solo round-the-world sailors carry sextants as backup specifically because they have no electronics to fail.
What was the sextant's role in solving the longitude problem?
The sextant itself couldn't solve longitude — that required an accurate clock (John Harrison's marine chronometer, completed in 1761). But the sextant was the other half of the solution. A navigator used it to measure the Sun's altitude at local noon to find the exact time of solar noon at their position. Comparing this to Greenwich time on the chronometer gave the time difference, and since Earth rotates 15° per hour, that time difference directly yielded longitude. Sextant + chronometer = position anywhere on Earth.
How is 60 degrees significant in geometry beyond the sextant?
Sixty degrees is the interior angle of an equilateral triangle — the simplest regular polygon after the square. Honeycomb cells are hexagons (six 120° angles, each the supplement of 60°) because hexagonal packing is the most efficient way to tile a plane. Carbon atoms in graphene and diamond form 60° and 109.5° angles respectively. The 60° angle appears everywhere in nature because it's the geometric consequence of close-packing equal-sized spheres or circles.