# Python SGP4 1.1 Calculating Incorrect Orbit

I am using the python SGP4 1.1 module to calculate the position and velocity of a MEO satellite. I'm noticing when compared against STK and JSatTrak that the returned values for position and velocity are incorrect. The Satellite should have a ground repeat track of roughly 6 hours, but this program is showing a ground repeat of 4:47:51. Is there something that I am doing incorrectly?

``````from sgp4.earth_gravity import wgs72
from sgp4.io import twoline2rv
from math import atan2, cos, pi, sin, sqrt, tan
from datetime import datetime

def calculate(options):
x = options[0]
y = options[1]
z = options[2]

# Constants (WGS ellipsoid)
a = 6378.137
e = 8.1819190842622e-2
# Calculation
b = sqrt(pow(a,2) * (1-pow(e,2)))
ep = sqrt((pow(a,2)-pow(b,2))/pow(b,2))
p = sqrt(pow(x,2)+pow(y,2))
th = atan2(a*z, b*p)
lon = atan2(y, x)
lat = atan2((z+ep*ep*b*pow(sin(th),3)), (p-e*e*a*pow(cos(th),3)))
n = a/sqrt(1-e*e*pow(sin(lat),2))
alt = str(p/cos(lat)-n)
lat = str((lat*180)/pi)
lon = str((lon*180)/pi)
#print "%s %s %s" % (lat, lon, alt)
return (lat, lon, alt)

line1 = '1     1U 001001   14001.00000000  .00000000  00000+0  00000+0 0 00022'
line2 = '2     1   0.0891 294.8098 0002843  64.8653   0.5014  5.00115502    09'

satellite = twoline2rv(line1, line2, wgs72)
position1, velocity1 = satellite.propagate(2013, 3, 1, 0, 0, 1)
position2, velocity2 = satellite.propagate(2013, 3, 1, 4, 47, 52)
lat1,lon1,alt1 = calculate(position1)
lat2,lon2,alt2 = calculate(position2)

print lat1 + " " + lon1  + " " + alt1
print lat2 + " " + lon2  + " " + alt2
print "\n\n"
print position1
print position2
``````
-

It's been three weeks since you asked this question so I suppose it won't help you but anyway, for the archives...

I don't have the Python SGP4 routines and I cannot test them, but usually SGP4 routines will return position and speed in an inertial (non-rotating) reference frame called TEME (True Equator, Mean Equinox: https://en.wikipedia.org/wiki/Earth-centered_inertial#TEME). You are calculating the lat/long of Earth in this reference system, and it will give you wrong results. You should first transform the TEME system to a rotating system that rotates with Earth (like ECEF: https://en.wikipedia.org/wiki/ECEF ) and then you can calculate the lat/lon.

I hope there are libraries for this conversion, as it is not a trivial one.

Regards.

-

You need to allow for the rotation of the Earth in your calculations. Instead of longitude you have calculated geocentric right ascension. Start by reading the article on Hour Angle in Wikipedia.

-