Antipode of Corinthe, Saint Lucia
The opposite side of the world to Corinthe is Lailunggi, East Nusa Tenggara, Indonesia.
Corinthe
Saint Lucia
Continent: America
Coordinates: 14.045, -60.961
Antipodal point
Indian Ocean
Exact location on the other side of the world
Coordinates: -14.045, 119.039
Lailunggi
Indonesia
Lailunggi is the closest city to Corinthe's antipodal point (444 km).
The antipodal city to Corinthe is Lailunggi. This means that, among all the populated locations in the world, the farthest city from Corinthe is Lailunggi.
The distance from Corinthe to Lailunggi is about 20,000 kilometers. A direct flight would take around 22 hours, but there aren't commercial routes between these cities.
Cities on the other side of the world of Corinthe
This table contains the populated locations that are closest to Corinthe's antipode. These are the farthest cities in the world from Corinthe.
| City | Country | Distance from antipode | Coordinates |
|---|---|---|---|
| Lailunggi, East Nusa Tenggara | Indonesia | 444 km | (-10.172, 120.117) |
| Nggongi Satu, East Nusa Tenggara | Indonesia | 445 km | (-10.195, 120.231) |
| Nggongi, East Nusa Tenggara | Indonesia | 445 km | (-10.194, 120.234) |
| Tawui, East Nusa Tenggara | Indonesia | 446 km | (-10.143, 120.073) |
| Nggai, East Nusa Tenggara | Indonesia | 448 km | (-10.207, 120.353) |
| Wahang Dua, East Nusa Tenggara | Indonesia | 450 km | (-10.095, 120.028) |
| Maradabangga, East Nusa Tenggara | Indonesia | 451 km | (-10.177, 120.360) |
| Kalangga, East Nusa Tenggara | Indonesia | 452 km | (-10.160, 120.314) |
| Mbulung, East Nusa Tenggara | Indonesia | 453 km | (-10.224, 120.540) |
| Baing, East Nusa Tenggara | Indonesia | 454 km | (-10.221, 120.559) |
Local time:
Time Zone: America/St_Lucia
Coordinates: 14.0453° N 60.9607° W
Elevation: 25 m (82 ft)
Local time:
Time Zone: Asia/Makassar
Coordinates: 10.1716° S 120.1174° E
Elevation: 18 m (59 ft)
How to calculate the antipodal point?
The antipode can be calculated by understanding the geographic coordinates and applying simple formulas. We will use the following variables:
- LatO: Latitude at the origin point.
- LngO: Longitude at the origin point.
- LatA: Latitude at the antipodal point.
- LngA: Longitude at the antipodal point.
Step 1: Obtain the geographic coordinates of Corinthe
The DMS coordinates are: 14°2'43.1'' N 60°57'38.5'' W.
Calculations are easier by using the decimal format, hence:
LatO = 14.04531°
LngO = -60.9607°
Step 2: Calculate the latitude
LatA = - LatO = -14.04531°
Since the latitude is positive (north direction), the antipode must be negative (south direction).
Step 3: Calculate the longitude
LngA = LngO ± 180° = -60.9607 + 180° = 119.0393°
Since the longitude is negative, we sum 180° to ensure the final value lies between (-180, 180). If it were the other way around, we would subtract 180° for the same reason.
Result:
The antipode of Corinthe is located on coordinates: (LatA, LngA) = (-14.04531, 119.0393)
In DMS format: 14°2'43.1'' N 60°57'38.5'' W.