# Position of the sun given time of day, and lat/long [closed]

Anyone want to share some nice code that gives the position of the sun (elevation and azimuth) given latitude and longitude and time of day ?

And date, of course.

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## closed as not a real question by Juhana, spryno724, thaJeztah, Andrew Eisenberg, Rachel GallenApr 12 '13 at 0:05

It's difficult to tell what is being asked here. This question is ambiguous, vague, incomplete, overly broad, or rhetorical and cannot be reasonably answered in its current form. For help clarifying this question so that it can be reopened, visit the help center.If this question can be reworded to fit the rules in the help center, please edit the question.

Why is it 'difficult to tell what is being asked here'? This a clearly phrased and specific question that can be answered very precisely, as people have demonstrated. I really don't see why this question was closed. –  CvR Jun 6 at 23:28

Here is my implementation in R of the Astronomer's Almanac algorithm (Joseph J. Michalsky. The astronomical almanac’s algorithm for approximate solar position (1950–2050). Solar Energy, 40(3):227–235, 1988.) It's straightforward to translate it in any other language:

``````sunPosition <- function(year, month, day, hour=12, min=0, sec=0,
lat=46.5, long=6.5) {
twopi <- 2 * pi

# Get day of the year, e.g. Feb 1 = 32, Mar 1 = 61 on leap years
month.days <- c(0,31,28,31,30,31,30,31,31,30,31,30)
day <- day + cumsum(month.days)[month]
leapdays <- year %% 4 == 0 & (year %% 400 == 0 | year %% 100 != 0) & day >= 60
day[leapdays] <- day[leapdays] + 1

# Get Julian date - 2400000
hour <- hour + min / 60 + sec / 3600 # hour plus fraction
delta <- year - 1949
leap <- trunc(delta / 4) # former leapyears
jd <- 32916.5 + delta * 365 + leap + day + hour / 24

# The input to the Atronomer's almanach is the difference between
# the Julian date and JD 2451545.0 (noon, 1 January 2000)
time <- jd - 51545.

# Ecliptic coordinates

# Mean longitude
mnlong <- 280.460 + .9856474 * time
mnlong <- mnlong %% 360
mnlong[mnlong < 0] <- mnlong[mnlong < 0] + 360

# Mean anomaly
mnanom <- 357.528 + .9856003 * time
mnanom <- mnanom %% 360
mnanom[mnanom < 0] <- mnanom[mnanom < 0] + 360

# Ecliptic longitude and obliquity of ecliptic
eclong <- mnlong + 1.915 * sin(mnanom) + 0.020 * sin(2 * mnanom)
eclong <- eclong %% 360
eclong[eclong < 0] <- eclong[eclong < 0] + 360
oblqec <- 23.429 - 0.0000004 * time

# Celestial coordinates
# Right ascension and declination
num <- cos(oblqec) * sin(eclong)
den <- cos(eclong)
ra <- atan(num / den)
ra[den < 0] <- ra[den < 0] + pi
ra[den >= 0 & num < 0] <- ra[den >= 0 & num < 0] + twopi
dec <- asin(sin(oblqec) * sin(eclong))

# Local coordinates
# Greenwich mean sidereal time
gmst <- 6.697375 + .0657098242 * time + hour
gmst <- gmst %% 24
gmst[gmst < 0] <- gmst[gmst < 0] + 24.

# Local mean sidereal time
lmst <- gmst + long / 15.
lmst <- lmst %% 24.
lmst[lmst < 0] <- lmst[lmst < 0] + 24.
lmst <- lmst * 15. * deg2rad

# Hour angle
ha <- lmst - ra
ha[ha < -pi] <- ha[ha < -pi] + twopi
ha[ha > pi] <- ha[ha > pi] - twopi

# Azimuth and elevation
el <- asin(sin(dec) * sin(lat) + cos(dec) * cos(lat) * cos(ha))
az <- asin(-cos(dec) * sin(ha) / cos(el))
elc <- asin(sin(dec) / sin(lat))
az[el >= elc] <- pi - az[el >= elc]
az[el <= elc & ha > 0] <- az[el <= elc & ha > 0] + twopi

return(list(elevation=el, azimuth=az))
}
``````
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This is actually closest to what i was looking for. I had been using algorithm from: saao.ac.za/public-info/sun-moon-stars/sun-index/… and yours seems similar. Bonus: I never heard of programming languge R before, so I'm also looking at that. –  Scott Evernden Nov 3 '08 at 16:49
R is free, from r-project.org –  RBerteig Apr 23 '09 at 1:29
+1 for being a lot of code - even though i have no idea if it's right, or what it's doing :) –  Ian Boyd Jun 19 '09 at 2:57
Digging this up from two and a half years ago - there's a minor bug in this code! It gives you the Azimuth, but it's sometimes out by 180 degrees. If you run the code based on today's date at solar midday and a location of, say 3 degrees south; and at 44 degrees south you'll find that it'll give the same figure - one should be roughly 180 degrees, and one should be roughly 0 degrees. Any ideas? Cheers –  SpoonNZ Dec 22 '11 at 3:51
@SpoonNZ -- Michalsky's published code, faithfully implemented above, does not work properly either: (a) near the equator; or (b) in the southern hemisphere. A subsequent 'Comment' in the same journal pointed out a correction, and I've incorporated that in a corrected version of the function, posted here. –  Josh O'Brien Jan 7 '12 at 9:08

Here's code that uses `ephem`, a Python package for performing high-precision astronomy computations:

``````#!/usr/bin/env python
# -*- coding: utf-8 -*-
import datetime
import ephem # to install, run `pip install pyephem`

o = ephem.Observer()
# Los Angeles, Calif. 34°3'N, 118°15'W
o.lat, o.long, o.date = '34:3', '-118:15', datetime.datetime.utcnow()
sun = ephem.Sun(o)

print o.date
print sun.az, sun.alt
``````

### Output

``````2010/3/29 20:52:25 UTC
205:40:44.9 56:59:27.7
``````

, where:

• az — azimuth east of north
• alt — altitude above horizon
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The National Renewable Energy Lab has a Solar Position and Intensity Calculator called Solpos. I used it years ago to track sun position to avoid "sunstrikes" against our optical communication systems.

See the C source code at: http://rredc.nrel.gov/solar/codesandalgorithms/solpos/

You can test drive the algorithm at: http://www.nrel.gov/midc/solpos/solpos.html

If you need real precise data, fed from NASA-JPL, check out JPL's HORIZONS data service which has various gateways to the data used by NASA to track celestial bodies. They have "431015 asteroids, 2966 comets, 168 planetary satellites, 8 planets, the Sun, L1, L2, select spacecraft, and system barycenters". HORIZONS is at http://ssd.jpl.nasa.gov/?horizons

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I use solpos to calculate a sample day ` pdat->longitude = 114.0 + (10.0 / 60.0); pdat->latitude = 22.0 + (15.0 / 60.0); pdat->timezone = 8.0; pdat->year = 2011; pdat->daynum = 19; ` (2011 Jan 19 Hong Kong GMT+8 long:114'10N lat:22'15E) gives: ` sunrise 428.911835 (minutes from midnight) 7.000000 (hour) : 8.911835 (minutes) ` which is a few minutes off, compares with esrl.noaa.gov/gmd/grad/solcalc and aa.usno.navy.mil/cgi-bin/aa_rstablew.pl (both shows 7:05am). Anything wrong in my input parameters? –  ohho Jan 19 '11 at 3:22
And, the result is different, comparing esrl.noaa.gov/gmd/grad/solcalc with nrel.gov/midc/solpos/solpos.html using testing day: Lat: 22.25E Long: 114.16666N Timzone: 8 Date: 2011 Jan 19 –  ohho Jan 19 '11 at 3:41
I believe that each of them use somewhat different formulas and correction factors. I think solpos exists to give best algorithmic estimates, while some of the online services will have more accurate correction factors. –  Toybuilder Jan 26 '11 at 1:25

Doing this correctly isn't easy. It depends on the orbit of the Earth, which is probably beyond what you were looking to do. The easiest way to get a completely correct answer is to pull it from JPL Horizons. Just get the az/el readings once an hour, and linear interpolation. That'll look pretty good visually.

If you need to figure it out for a lot of positions on the Earth, get Horizons to give you ECI coordinates (which you can again linearly interpolate between), and then convert the ECI coordinates to az/el. See Celestrak for information on that conversion. You want the "Orbital Coordinate Systems" articles. Astronomical Algorithms by Meeus is also useful.

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How precise an answer do you need?

(For example, are your latitude and longitude expressed in WGS84 or some other coordinate system?)

P. J. Naughter's code probably has everything you need and then some...

http://www.naughter.com/aa.html

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"Practical Astronomy with your Calculator" by Peter Duffett-Smith provides well-illustrated explanations and equations for this sort of thing. From these, its easy to code solutions in whatever language you choose.

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If you need high precision:

The sun position algorithm with the highest precision so far is the Solar Position Algorithm (SPA) by the National Renewable Energy Laboratory (NREL) of the US. It is the successor of the Solpos algorithm.

From the website:

``````This algorithm calculates the solar zenith and azimuth angles in the period from
the year -2000 to 6000, with uncertainties of +/- 0.0003 degrees based on the
date, time and location on Earth.
``````

The algorithm is available as C source code from the website above. An online version can be found here.

There is a python package called pysolar which implemented this algorithm in pure Python.

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You need a license to include this in any commercial project, no matter how small. The cost of the license was prohibitive for my iPhone app, so I used the less precise SolPos code which it replaces (it's open source). –  juggleware Apr 26 '13 at 20:30
I knew that you need a licence if you want to sell software using spa, do you also need this licence if you run it on your own server? –  bmu Apr 26 '13 at 21:25
I don't think you need a license to use the Solar Position Algorithm. It's a work of a US government agency, which means that it is in the public domain. In the case of the Python port, Pysolar, you can use it under the terms of the GPL. I am quite certain that no additional license fees are collected in that case because I wrote Pysolar. –  pingswept May 8 '13 at 1:28
@pingswept Thanks for your comment (and for pysolar). I'm quite sure, that there was some licence fee for using the NREL code (but I don't really understand the licence and further more the sentence about licensing seems to end in june 2013: nrel.gov/midc/spa/#agree). You did code your own version of the algorythm, which seems not to be affected by the licensing. –  bmu May 10 '13 at 8:49

PHP actually has some built-in functions that deal with similar tasks: http://au2.php.net/manual/en/function.date-sun-info.php

Unfortunately, this only tells you the time of sun rise, sun set, twilight, and some other things: not the location of the sun at a particular time.

I did find some formulae for this sort of thing here:

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"Firefox reports this as a dangerous site". Probably because of the 5 occurences of the word "sexagesimal"... :-/ –  stevenvh Feb 15 '09 at 15:46
sounds kinda hot, don't it? –  nickf Feb 27 '09 at 2:01

You'll not only need the time of day, but also the date. The position of the sun depends on the time of year.

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yeah of course. I shouldn't have said simply "time of day" –  Scott Evernden Nov 3 '08 at 1:39
this seems like it would have been a better comment than an answer... but based on the date i'm wondering if they had comments ;) –  drewish Oct 9 '12 at 4:26