Satellite Scenario Key Concepts
You can use the Aerospace Toolbox satelliteScenario
(Satellite Communications Toolbox) object provides the ability to model and visualize satellites in orbit, compute access with ground stations, and visualize and analyze communication links. This topic describes of the technical terms frequently encountered in scenario visualization.
Coordinate Systems
Geodetic Coordinates
A geodetic system uses coordinates (lat, lon, h) to represent position relative to a reference ellipsoid. All geodetic coordinates in a satellite scenario use the World Geodetic System, 1984 (WGS 84), as the reference ellipsoid. The coordinate origin of WGS 84 is located at the center of mass of the Earth.
lat is the latitude, which originates at the equator. More specifically, the latitude of a point is the angle normal to the ellipsoid at that point makes with the equatorial plane, which contains the center and equator of the ellipsoid. An angle of latitude is in the range [–90°, 90°]. Positive latitudes correspond to North and negative latitudes correspond to South.
lon is the longitude, which originates at the prime meridian. More specifically, the longitude of a point is the angle that a plane containing the ellipsoid center and the meridian containing that point makes with the plane containing the ellipsoid center and prime meridian. Positive longitudes are measured in a counterclockwise direction from a vantage point above the North Pole. Typically, longitude is in the range [–180°, 180°] or [0°, 360°].
h is the ellipsoidal height, which is measured along a normal of the reference spheroid.
EarthCentered EarthFixed Coordinates
An Earthcentered Earthfixed (ECEF) system uses Cartesian coordinates (X, Y, Z) to represent position relative to the center of the reference ellipsoid. The distance between the center of the ellipsoid and the center of the Earth depends on the reference ellipsoid. The Satellite scenario uses the WGS 84 reference ellipsoid, which has a center that coincides with the center of mass of the Earth.
^{1}The positive Xaxis intersects the surface of the ellipsoid at 0° latitude and 0° longitude, where the equator meets the prime meridian.
The positive Yaxis intersects the surface of the ellipsoid at 0° latitude and 90° longitude.
The positive Zaxis intersects the surface of the ellipsoid at 90° latitude.
Frame of Reference and North East Down (NED) Frame
To describe a point in space, you need a frame of reference that does not rotate with respect
to the stars. The Geocentric Celestial Reference Frame
(GCRF), with the origin at the center of the Earth and orthogonal
vectors I, J, and
K, is used as the frame of reference when you
add Satellite
objects to a satelliteScenario
object. The fundamental plane
is the IJplane, which is closely aligned with the
equator with a small offset that changes over time because of precession and
nutation of the rotation axis of the Earth. When you use orbital elements to add
satellites to the satellite scenario, the coordinates are assumed to be defined in
the geocentric celestial reference frame.
When you refer to the position, velocity, acceleration, orientation, and angular velocity, you must mention the coordinate system in which these quantities are expressed. Global systems such as GCRF and geodetic systems describe the position of an object using a triplet of coordinates. Local systems such as NED and Azimuth Elevation Range (AER) systems require two triplets of coordinates: one triplet describes the location of the origin, and the other triplet describes the location of the object with respect to the origin.
An NED system uses Cartesian coordinates (xNorth, yEast, zDown) to represent position relative to a local origin. The local origin is described by geodetic coordinates (lat0, lon0, h0). Typically, the local origin of an NED system is above the surface of the Earth.
The positive xNorthaxis points North along the meridian of longitude containing lon0.
The positive yEastaxis points East along the parallel of latitude containing lat0.
The positive zDownaxis points South along the ellipsoid normal.
An NED coordinate system is commonly used to specify location relative to a moving satellite. In this case, the coordinates are not fixed to the frame of the satellite, but to the point on the surface of the WGS 84 ellipsoid corresponding to the latitude and longitude of the satellite.
Roll, Pitch, and Yaw
Three lines run through a satellite and intersect at right angles at the center of mass of the satellite. These axes are fixed with respect to the satellite and are used to define the orientation of the satellite with respect to the NED frame. The orientation is defined by rotations in this sequence:
Rotation about the yaw axis by the yaw angle
Rotation about the pitch axis by the pitch angle
Rotation about the roll axis by the roll angle
The yaw, pitch, and roll angles of satellites follow an International Organization for Standardization (ISO) convention. These angles have positive clockwise directions when looking in the positive direction of the axes. Unless otherwise specified, the Aerospace Toolbox uses the yawpitchroll (ZYX) rotation order for these angles by default.
AzimuthElevationRange (AER) Coordinates
An AER system uses spherical coordinates (az, elev, range) to represent position relative to a local origin. The local origin is described by geodetic coordinates (lat0, lon0, h0). Azimuth, elevation, and slant ranges are dependent on a local Cartesian system (for example, an NED system) with the origin centered at the center of mass of the satellite.
az is the azimuth, which is the clockwise angle in the (xNorth)(yEast)plane from the positive yEastaxis to the projection of the object into the plane.
elev is the elevation, which is the angle from the (xNorth)(yEast)plane to the object.
range is the slant range, which is the Euclidean distance between the object and the local origin.
Orbital Elements
Orbital elements are parameters required to uniquely identify a specific orbit. Uniquely defining an orbit and the position of a satellite within satellite orbit requires at least six parameters. Three of the parameters describe what the orbital plane looks like and the position of the satellite in the ellipse. The other three parameters describe how that plane is oriented in the celestial inertial reference frame and the location of the satellite in that plane. These six parameters are called the Keplerian elements or orbital elements.
In this diagram, the orbital plane (yellow) intersects a reference plane (gray). For Earthorbiting satellites, the reference plane is usually the IJplane of the GCRF.
These two elements define the shape and size of the ellipse:
Eccentricity (e) — Describe how elongated the shape of the ellipse is when compared to a circle.
Semimajor axis (a) — The sum of the periapsis and apoapsis distances divided by 2. Periapsis is the point at which an orbiting object is closest to the center of mass of the body it is orbiting. Apoapsis is the point at which an orbiting object is farthest away from the center of mass of the body it is orbiting. For classic twobody orbits, the semimajor axis is the distance between the centers of the bodies.
These two elements define the orientation of the orbital plane in which the ellipse is embedded:
Inclination (i) — The vertical tilt of the ellipse with respect to the reference plane measured at the ascending node. The ascending node is the location where the orbit passes upward through the reference plane (the green angle i in the diagram). The tilt angle is measured perpendicular to the line of intersection between orbital plane and the reference plane. Any three points on an ellipse defines the ellipse orbital plane.
Starting with an equatorial orbit, the orbital plane can be tilted up. The angle it is tilted up from the equator is referred to as the inclination angle, i, in the range [0,180]. Because the center of the Earth must always be in the orbital plane, the point in the orbit where the satellite passes the equator on its way up northbound through the orbit is the ascending node, and the point where the satellite passes the equator on its way down southbound is the descending node. Drawing a line through these two points on the equator defines the line of nodes.
Right ascension of ascending node (Ω) — The horizontal orientation of the ascending node of the ellipse (where the orbit passes upward through the reference plane) with respect to the Iaxis of the reference frame. The rotation of the right ascension of the ascending node (RAAN) can be any number between 0° and 360°.
The remaining two elements are:
Argument of periapsis (ω) — The orientation of the ellipse in the orbital plane, as an angle measured from the ascending node to the periapsis in the range [0, 360).
True Anomaly (v) — The position of the orbiting body along the ellipse at a specific time. The position of the satellite on the path is measured counterclockwise from the periapsis and is called the true anomaly, ν, in the range [0, 360).
Two Line Element (TLE) Files
The Aerospace Toolbox satellite
function accepts a TLE file as an input. To download TLE files, see the Space track website.
A TLE set is a data format encoding a list of orbital elements of an Earth orbiting object for a given point in time, the epoch. Orbital element parameters can be encoded as text in a variety of formats. The most common format is the National Aeronautics and Space Administration (NASA) or North American Aerospace Defense Command (NORAD) TLE format. In this format, each satellite has three rows: the first row contains the name of the satellite, and the next two rows are the standard TLE.
Data for each satellite consists of three lines, as this example shows.
Satellite 1 1 25544U 98067A 04236.56031392 .00020137 000000 165383 0 9993 2 25544 51.6335 344.7760 0007976 126.2523 325.9359 15.70406856328906
Row 1 is an elevencharacter satellite name.
Rows 2 and 3 are the standard TLE set format identical to that used by NORAD and NASA.
This table describes the columns in row 2.
Column Description Example 1 Line number
1
3–7 Satellite number
25544
8 Elset classification
U
10–17 International designator
98067A
19–32 Element set epoch (UTC)
04236.56031392
34–43 First derivative of the mean motion with respect to time
.00020137
45–52 Second derivative of the mean motion with respect to time (decimal point assumed)
000000
54–61 BSTAR drag term
165383
63 Element set type
0
65–68 Element number
999
69 Check sum (modulo 10)
3
This table describes the columns in row 3.
Column Description Example 1 Line number of element data
2
3–7 Satellite number
25544
9–16 Inclination (in degrees)
51.6335
18–25 Right ascension of the ascending node (in degrees)
344.7760
27–33 Eccentricity (leading decimal point assumed)
0007976
35–42 Argument of perigee (in degrees)
126.2523
44–51 Mean anomaly (in degrees)
325.9359
53–63 Mean motion (in revs per day)
15.70406856
64–68 Revolution number at epoch (in revs)
32890
69 Check sum (modulo 10)
6
Depending on the application and object orbit, the data derived from TLEs older than 30 days can become unreliable. Calculate the orbital positions from TLEs using the Simplified General Perturbations4 (SGP4) and Simplified DeepSpace Perturbations4 (SDP4) algorithms.
Orbit MeanElements Message (OMM) File
Aerospace Toolbox accepts Orbit MeanElements Message (OMM) files as inputs to
satellite
. OMM files are part of Orbit Data Messages (ODM) Recommended
Standard CCSDS 502.0B2 developed by The Consultative Committee for Space Data Systems
(CCSDS). OMM files enable you to access general perturbations (GP) data using standard
queries. To download OMM files, visit the Space track or CelesTrak websites. Aerospace Toolbox supports the .XML
and .JSON
OMM file formats.
OMM file formats are defined by CelesTrak^{®}. For more information, see Orbit Data Messages.
Aerospace Toolbox uses these fields of the OMM file. All other fields are ignored.
Predicate  Description  Examples 

 Satellite names. 

 Mean element theory. This value must be


 Mean Keplerian elements epoch. 

 Mean motion (rev/day). 

 Eccentricity. 

 Inclination, in degrees. 

 Right ascension of ascending node, in degrees. 

 Pericenter argument, in degrees. 

 Mean anomaly, in degrees. 

 NORAD catalog number (satellite number). 

 SGP/SGP4 draglike coefficient in 1/Earth radii. 

References
[1] “Basics of Space Flight” https://solarsystem.nasa.gov/basics/chapter51/.
[2] “CelesTrak. Frequently Asked Questions: TwoLine Element Set Format.” Accessed March 26, 2016. https://celestrak.com/columns/v04n03/.
See Also
Objects
Functions
show
play
hide
satellite
access
groundStation
satelliteScenarioViewer
conicalSensor
Related Topics
^{1} Alignment of boundaries and region labels are a presentation of the feature provided by the data vendors and do not imply endorsement by MathWorks^{®}.