# Position of the sun given time of day, latitude and longitude

This question has been asked before a little over three years ago. There was an answer given, however I've found a glitch in the solution.

Code below is in R. I've ported it to another language, however have tested the original code directly in R to ensure the issue wasn't with my porting.

``````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))
}
``````

The problem I'm hitting is that the azimuth it returns seems wrong. For example, if I run the function on the (southern) summer solstice at 12:00 for locations 0ºE and 41ºS, 3ºS, 3ºN and 41ºN:

``````> sunPosition(2012,12,22,12,0,0,-41,0)
\$elevation
 72.42113

\$azimuth
 180.9211

> sunPosition(2012,12,22,12,0,0,-3,0)
\$elevation
 69.57493

\$azimuth
 -0.79713

Warning message:
In asin(sin(dec)/sin(lat)) : NaNs produced
> sunPosition(2012,12,22,12,0,0,3,0)
\$elevation
 63.57538

\$azimuth
 -0.6250971

Warning message:
In asin(sin(dec)/sin(lat)) : NaNs produced
> sunPosition(2012,12,22,12,0,0,41,0)
\$elevation
 25.57642

\$azimuth
 180.3084
``````

These numbers just don't seem right. The elevation I'm happy with - the first two should be roughly the same, the third a touch lower, and the fourth much lower. However the first azimuth should be roughly due North, whereas the number it gives is the complete opposite. The remaining three should point roughly due South, however only the last one does. The two in the middle point just off North, again 180º out.

As you can see there are also a couple of errors triggered with the low latitudes (close the equator)

I believe the fault is in this section, with the error being triggered at the third line (starting with `elc`).

``````  # 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
``````

I googled around and found a similar chunk of code in C, converted to R the line it uses to calculate the azimuth would be something like

``````az <- atan(sin(ha) / (cos(ha) * sin(lat) - tan(dec) * cos(lat)))
``````

The output here seems to be heading in the right direction, but I just can't get it to give me the right answer all the time when it's converted back to degrees.

A correction of the code (suspect it's just the few lines above) to make it calculate the correct azimuth would be fantastic.

• You might have better luck in the math stackexchange Jan 4, 2012 at 21:57
• There's code to do this in the maptools package, see ?solarpos Jan 4, 2012 at 22:25
• Thanks @ulvund - might try there next. Jan 5, 2012 at 1:47
• Ok then I think you should just the copy the Javascript from the NOAA site, that's the source of a lot of versions out there. The code we wrote collapsed all this down into just what we needed in two smallish functions, but that was for elevation only and tuned to a particular app. Just view the source of srrb.noaa.gov/highlights/sunrise/azel.html Jan 5, 2012 at 2:30
• have you tried my answer from the previous question? `ephem` might even take into account refraction of the atmosphere (influenced by temperature, pressure) and elevation of an observer.
– jfs
Jul 20, 2012 at 14:16

This seems like an important topic, so I've posted a longer than typical answer: if this algorithm is to be used by others in the future, I think it's important that it be accompanied by references to the literature from which it has been derived.

As you've noted, your posted code does not work properly for locations near the equator, or in the southern hemisphere.

To fix it, simply replace these lines in your original code:

``````elc <- asin(sin(dec) / sin(lat))
az[el >= elc] <- pi - az[el >= elc]
az[el <= elc & ha > 0] <- az[el <= elc & ha > 0] + twopi
``````

with these:

``````cosAzPos <- (0 <= sin(dec) - sin(el) * sin(lat))
sinAzNeg <- (sin(az) < 0)
az[cosAzPos & sinAzNeg] <- az[cosAzPos & sinAzNeg] + twopi
az[!cosAzPos] <- pi - az[!cosAzPos]
``````

It should now work for any location on the globe.

# Discussion

The code in your example is adapted almost verbatim from a 1988 article by J.J. Michalsky (Solar Energy. 40:227-235). That article in turn refined an algorithm presented in a 1978 article by R. Walraven (Solar Energy. 20:393-397). Walraven reported that the method had been used successfully for several years to precisely position a polarizing radiometer in Davis, CA (38° 33' 14" N, 121° 44' 17" W).

Both Michalsky's and Walraven's code contains important/fatal errors. In particular, while Michalsky's algorithm works just fine in most of the United States, it fails (as you've found) for areas near the equator, or in the southern hemisphere. In 1989, J.W. Spencer of Victoria, Australia, noted the same thing (Solar Energy. 42(4):353):

Dear Sir:

Michalsky's method for assigning the calculated azimuth to the correct quadrant, derived from Walraven, does not give correct values when applied for Southern (negative) latitudes. Further the calculation of the critical elevation (elc) will fail for a latitude of zero because of division by zero. Both these objections can be avoided simply by assigning the azimuth to the correct quadrant by considering the sign of cos(azimuth).

My edits to your code are based on the corrections suggested by Spencer in that published Comment. I have simply altered them somewhat to ensure that the R function `sunPosition()` remains 'vectorized' (i.e. working properly on vectors of point locations, rather than needing to be passed one point at a time).

# Accuracy of the function `sunPosition()`

To test that `sunPosition()` works correctly, I've compared its results with those calculated by the National Oceanic and Atmospheric Administration's Solar Calculator. In both cases, sun positions were calculated for midday (12:00 PM) on the southern summer solstice (December 22nd), 2012. All results were in agreement to within 0.02 degrees.

``````testPts <- data.frame(lat = c(-41,-3,3, 41),
long = c(0, 0, 0, 0))

# Sun's position as returned by the NOAA Solar Calculator,
NOAA <- data.frame(elevNOAA = c(72.44, 69.57, 63.57, 25.6),
azNOAA = c(359.09, 180.79, 180.62, 180.3))

# Sun's position as returned by sunPosition()
sunPos <- sunPosition(year = 2012,
month = 12,
day = 22,
hour = 12,
min = 0,
sec = 0,
lat = testPts\$lat,
long = testPts\$long)

cbind(testPts, NOAA, sunPos)
#   lat long elevNOAA azNOAA elevation  azimuth
# 1 -41    0    72.44 359.09  72.43112 359.0787
# 2  -3    0    69.57 180.79  69.56493 180.7965
# 3   3    0    63.57 180.62  63.56539 180.6247
# 4  41    0    25.60 180.30  25.56642 180.3083
``````

# Other errors in the code

There are at least two other (quite minor) errors in the posted code. The first causes February 29th and March 1st of leap years to both be tallied as day 61 of the year. The second error derives from a typo in the original article, which was corrected by Michalsky in a 1989 note (Solar Energy. 43(5):323).

This code block shows the offending lines, commented out and followed immediately by corrected versions:

``````# leapdays <- year %% 4 == 0 & (year %% 400 == 0 | year %% 100 != 0) & day >= 60
leapdays <- year %% 4 == 0 & (year %% 400 == 0 | year %% 100 != 0) &
day >= 60 & !(month==2 & day==60)

# oblqec <- 23.429 - 0.0000004 * time
oblqec <- 23.439 - 0.0000004 * time
``````

# Corrected version of `sunPosition()`

Here is the corrected code that was verified above:

``````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 & !(month==2 & 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 <- 23.439 - 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))

# For logic and names, see Spencer, J.W. 1989. Solar Energy. 42(4):353
cosAzPos <- (0 <= sin(dec) - sin(el) * sin(lat))
sinAzNeg <- (sin(az) < 0)
az[cosAzPos & sinAzNeg] <- az[cosAzPos & sinAzNeg] + twopi
az[!cosAzPos] <- pi - az[!cosAzPos]

# if (0 < sin(dec) - sin(el) * sin(lat)) {
#     if(sin(az) < 0) az <- az + twopi
# } else {
#     az <- pi - az
# }

return(list(elevation=el, azimuth=az))
}
``````

# References:

Michalsky, J.J. 1988. The Astronomical Almanac's algorithm for approximate solar position (1950-2050). Solar Energy. 40(3):227-235.

Michalsky, J.J. 1989. Errata. Solar Energy. 43(5):323.

Spencer, J.W. 1989. Comments on "The Astronomical Almanac's Algorithm for Approximate Solar Position (1950-2050)". Solar Energy. 42(4):353.

Walraven, R. 1978. Calculating the position of the sun. Solar Energy. 20:393-397.

• Thanks for the fantastic answer! I haven't been on here over the weekend so missed it sorry. Won't get a chance to try this until at least tonight, but looks like it'll do the trick. Cheers! Jan 8, 2012 at 21:49
• @SpoonNZ -- My pleasure. If you need pdf copies of any of those cited references, let me know at my email address, and I can send them to you. Jan 9, 2012 at 17:51
• @JoshO'Brien: Just added some suggestions in a separate answer. You might want to take a look and incorporate them in your own. Jan 9, 2012 at 23:40
• @RichieCotton -- Thanks for posting your suggestions. I'm not going to add them here, but only because they are `R`-specific and the OP was using the R-code to try to debug it before porting it to another language. (In fact, I've just now edited my post to correct a date-processing error in the original code, and it's exactly the sort of error that argues for using higher-level code like that you proposed.) Cheers! Jan 11, 2012 at 0:59
• One could also combine the julian dates to: time = 365*(year - 2000) + floor((year - 1949)/4) + day + hour - 13.5
– Hawk
Aug 28, 2015 at 7:56

Using "NOAA Solar Calculations" from one of the links above I have changed a bit the final part of the function by using a slighly different algorithm that, I hope, have translated without errors. I have commented out the now-useless code and added the new algorithm just after the latitude to radians conversion:

``````# -----------------------------------------------
# New code
# Solar zenith angle
zenithAngle <- acos(sin(lat) * sin(dec) + cos(lat) * cos(dec) * cos(ha))
# Solar azimuth
az <- acos(((sin(lat) * cos(zenithAngle)) - sin(dec)) / (cos(lat) * sin(zenithAngle)))
rm(zenithAngle)
# -----------------------------------------------

# 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

# -----------------------------------------------
# New code
if (ha > 0) az <- az + 180 else az <- 540 - az
az <- az %% 360
# -----------------------------------------------

return(list(elevation=el, azimuth=az))
``````

To verify azimuth trend in the four cases you mentioned let's plot it against time of day:

``````hour <- seq(from = 0, to = 23, by = 0.5)
azimuth <- data.frame(hour = hour)
az41S <- apply(azimuth, 1, function(x) sunPosition(2012,12,22,x,0,0,-41,0)\$azimuth)
az03S <- apply(azimuth, 1, function(x) sunPosition(2012,12,22,x,0,0,-03,0)\$azimuth)
az03N <- apply(azimuth, 1, function(x) sunPosition(2012,12,22,x,0,0,03,0)\$azimuth)
az41N <- apply(azimuth, 1, function(x) sunPosition(2012,12,22,x,0,0,41,0)\$azimuth)
azimuth <- cbind(azimuth, az41S, az03S, az41N, az03N)
rm(az41S, az03S, az41N, az03N)
library(ggplot2)
azimuth.plot <- melt(data = azimuth, id.vars = "hour")
ggplot(aes(x = hour, y = value, color = variable), data = azimuth.plot) +
geom_line(size = 2) +
geom_vline(xintercept = 12) +
facet_wrap(~ variable)
``````

Image attached: • @Josh O'Brien: Your very detailed answer is an excellent read. As a related note, our SunPosition functions yield exactly the same results. Jan 7, 2012 at 9:31
• I attached the image file, if you want it. Jan 7, 2012 at 13:38
• @Charlie - Great answer, and the plots are an especially nice addition. Before seeing them, I hadn't appreciated how different the night-time azimuthal coordinates of the sun would be at 'equatorial' vs more 'temperate' locations. Truly cool. Jan 8, 2012 at 18:59

Here's a rewrite in that's more idiomatic to R, and easier to debug and maintain. It is essentially Josh's answer, but with azimuth calculated using both Josh and Charlie's algorithms for comparison. I've also included the simplifications to the date code from my other answer. The basic principle was to split the code up into lots of smaller functions that you can more easily write unit tests for.

``````astronomersAlmanacTime <- function(x)
{
# Astronomer's almanach time is the number of
# days since (noon, 1 January 2000)
origin <- as.POSIXct("2000-01-01 12:00:00")
as.numeric(difftime(x, origin, units = "days"))
}

hourOfDay <- function(x)
{
x <- as.POSIXlt(x)
with(x, hour + min / 60 + sec / 3600)
}

{
degrees * pi / 180
}

{
}

meanLongitudeDegrees <- function(time)
{
(280.460 + 0.9856474 * time) %% 360
}

{
degreesToRadians((357.528 + 0.9856003 * time) %% 360)
}

{
(mnlong + 1.915 * sin(mnanom) + 0.020 * sin(2 * mnanom)) %% 360
)
}

{
}

{
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] + 2 * pi
ra
}

{
asin(sin(oblqec) * sin(eclong))
}

greenwichMeanSiderealTimeHours <- function(time, hour)
{
(6.697375 + 0.0657098242 * time + hour) %% 24
}

{
degreesToRadians(15 * ((gmst + long / 15) %% 24))
}

{
((lmst - ra + pi) %% (2 * pi)) - pi
}

{
asin(sin(dec) * sin(lat) + cos(dec) * cos(lat) * cos(ha))
}

solarAzimuthRadiansJosh <- function(lat, dec, ha, el)
{
az <- asin(-cos(dec) * sin(ha) / cos(el))
cosAzPos <- (0 <= sin(dec) - sin(el) * sin(lat))
sinAzNeg <- (sin(az) < 0)
az[cosAzPos & sinAzNeg] <- az[cosAzPos & sinAzNeg] + 2 * pi
az[!cosAzPos] <- pi - az[!cosAzPos]
az
}

{
zenithAngle <- acos(sin(lat) * sin(dec) + cos(lat) * cos(dec) * cos(ha))
az <- acos((sin(lat) * cos(zenithAngle) - sin(dec)) / (cos(lat) * sin(zenithAngle)))
ifelse(ha > 0, az + pi, 3 * pi - az) %% (2 * pi)
}

sunPosition <- function(when = Sys.time(), format, lat = 46.5, long = 6.5)
{
if(is.character(when)) when <- strptime(when, format)
when <- lubridate::with_tz(when, "UTC")
time <- astronomersAlmanacTime(when)
hour <- hourOfDay(when)

# Ecliptic coordinates
mnlong <- meanLongitudeDegrees(time)

# Celestial coordinates

# Local coordinates
gmst <- greenwichMeanSiderealTimeHours(time, hour)

# Hour angle

# Azimuth and elevation
azJ <- solarAzimuthRadiansJosh(lat, dec, ha, el)

data.frame(
)
}
``````
• Note when testing against NOAA website here: esrl.noaa.gov/gmd/grad/solcalc/azel.html That NOAA uses Longitude West as +ve. This algorithm uses Longitude West as -ve. Jun 28, 2014 at 12:32
• When I run "sunPosition(lat = 43, long = -89)", I get an elevation of 52 and an azimuth of 175. But using NOAA's web app esrl.noaa.gov/gmd/grad/solcalc, I get elevation of around 5 and azimuth of 272. Am I missing something? NOAA is correct, but I can't get sunPosition to give accurate results. Sep 7, 2016 at 22:49
• @Tedward `sunPosition` defaults to using the current time and date. Is that what you wanted? Sep 8, 2016 at 7:22
• Yes. I also tested with some different times. This was late in the day, I'm going to try again today with a fresh start. I'm pretty certain I'm doing something wrong, but don't know what. I'll keep working at it. Sep 8, 2016 at 13:42
• I needed to convert "when" to UTC to get accurate results. See stackoverflow.com/questions/39393514/…. @aichao suggests code for conversion. Sep 8, 2016 at 17:35

This is a suggested update to Josh's excellent answer.

Much of the start of the function is boilerplate code for calculating the number of days since midday on 1st Jan 2000. This is much better dealt with using R's existing date and time function.

I also think that rather than having six different variables to specify the date and time, it's easier (and more consistent with other R functions) to specify an existing date object or a date strings + format strings.

Here are two helper functions

``````astronomers_almanac_time <- function(x)
{
origin <- as.POSIXct("2000-01-01 12:00:00")
as.numeric(difftime(x, origin, units = "days"))
}

hour_of_day <- function(x)
{
x <- as.POSIXlt(x)
with(x, hour + min / 60 + sec / 3600)
}
``````

And the start of the function now simplifies to

``````sunPosition <- function(when = Sys.time(), format, lat=46.5, long=6.5) {

twopi <- 2 * pi

if(is.character(when)) when <- strptime(when, format)
time <- astronomers_almanac_time(when)
hour <- hour_of_day(when)
#...
``````

The other oddity is in the lines like

``````mnlong[mnlong < 0] <- mnlong[mnlong < 0] + 360
``````

Since `mnlong` has had `%%` called on its values, they should all be non-negative already, so this line is superfluous.

• Great thanks! As mentioned, I've ported this to PHP (and will go to Javascript probably - just gotta decide where I want what functions handled) so that code isn't much help to me, but should be able to be ported (though with slightly more thinking involved than with the original code!). I need to tweak the code that handles the time zones a little, so might be able to integrate this change at the same time. Jan 10, 2012 at 1:57
• Nifty changes @Richie Cotton. Note that the assignment hour <- hour_of_day should actually be hour <- hour_of_day(when) and that variable time should hold the number of days, not an object of class "difftime". The second line of function astronomers_almanac_time should be changed to something like as.numeric(difftime(x, origin, units = "days"), units = "days"). Jan 10, 2012 at 9:22
• Thanks for the great suggestions. It might be nice (if you're interested) to include in your post an edited version of the entire `sunPosition()` function that is more R-ish in its construction. Jan 11, 2012 at 1:03
• @JoshO'Brien: Done. I've made the answer community wiki, since it's a combination of all our answers. It give the same answer as yours for the current time and default (Swiss?) coordinates but lots more testing is needed. Jan 11, 2012 at 17:32
• @RichieCotton -- What a nice idea. I'll take a deeper look at what you've done, as soon as I get the chance. Jan 11, 2012 at 17:58

I needed sun position in a Python project. I adapted Josh O'Brien's algorithm.

Thank you Josh.

In case it could be useful to anyone, here's my adaptation.

Note that my project only needed instant sun position so time is not a parameter.

``````def sunPosition(lat=46.5, long=6.5):

# Get Julian date - 2400000
day = time.gmtime().tm_yday
hour = time.gmtime().tm_hour + \
time.gmtime().tm_min/60.0 + \
time.gmtime().tm_sec/3600.0
delta = time.gmtime().tm_year - 1949
leap = delta / 4
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)
t = jd - 51545

# Ecliptic coordinates

# Mean longitude
mnlong_deg = (280.460 + .9856474 * t) % 360

# Mean anomaly

# Ecliptic longitude and obliquity of ecliptic
) % 360)

# Celestial coordinates
# Right ascension and declination
den = math.cos(eclong)
if den < 0:
elif num < 0:

# Local coordinates
# Greenwich mean sidereal time
gmst = (6.697375 + .0657098242 * t + hour) % 24
# Local mean sidereal time
lmst = (gmst + long / 15) % 24

# Elevation

# Azimuth

``````
• This was really useful to me. Thanks. One thing I did do is add an adjustment for Daylight Savings. In case it's of use, it was simply: if (time.localtime().tm_isdst == 1): hour += 1 May 22, 2015 at 17:03

I encountered a slight problem with a data point & Richie Cotton's functions above (in the implementation of Charlie's code)

``````longitude= 176.0433687000000020361767383292317390441894531250
latitude= -39.173830619999996827118593500927090644836425781250
event_time = as.POSIXct("2013-10-24 12:00:00", format="%Y-%m-%d %H:%M:%S", tz = "UTC")
sunPosition(when=event_time, lat = latitude, long = longitude)
elevation azimuthJ azimuthC
1 -38.92275      180      NaN
Warning message:
In acos((sin(lat) * cos(zenithAngle) - sin(dec))/(cos(lat) * sin(zenithAngle))) : NaNs produced
``````

because in the solarAzimuthRadiansCharlie function there has been floating point excitement around an angle of 180 such that `(sin(lat) * cos(zenithAngle) - sin(dec)) / (cos(lat) * sin(zenithAngle))` is the tiniest amount over 1, 1.0000000000000004440892098, which generates a NaN as the input to acos should not be above 1 or below -1.

I suspect there might be similar edge cases for Josh's calculation, where floating point rounding effects cause the input for the asin step to be outside -1:1 but I have not hit them in my particular dataset.

In the half-dozen or so cases I have hit this, the "true" (middle of the day or night) is when the issue occurs so empirically the true value should be 1/-1. For that reason, I would be comfortable fixing that by applying a rounding step within `solarAzimuthRadiansJosh` and `solarAzimuthRadiansCharlie`. I'm not sure what the theoretical accuracy of the NOAA algorithm is (the point at which numerical accuracy stops mattering anyway) but rounding to 12 decimal places fixed the data in my data set.