Antipode of Zall-Herr, Albania
The opposite side of the world to Zall-Herr is Waitangi, Chatham Islands, New Zealand.
Zall-Herr
Albania
Continent: Europe
Coordinates: 41.389, 19.828
Antipodal point
South Pacific Ocean
Exact location on the other side of the world
Coordinates: -41.389, -160.173
Waitangi
New Zealand
Waitangi is the closest city to Zall-Herr's antipodal point (1,371 km).
The antipodal city to Zall-Herr is Waitangi. This means that, among all the populated locations in the world, the farthest city from Zall-Herr is Waitangi.
The distance from Zall-Herr to Waitangi is about 19,000 kilometers. A direct flight would take around 21 hours, but there aren't commercial routes between these cities.
Cities on the other side of the world of Zall-Herr
This table contains the populated locations that are closest to Zall-Herr's antipode. These are the farthest cities in the world from Zall-Herr.
| City | Country | Distance from antipode | Coordinates |
|---|---|---|---|
| Waitangi, Chatham Islands | New Zealand | 1,371 km | (-43.954, -176.560) |
| Tolaga Bay, Gisborne | New Zealand | 1,867 km | (-38.367, 178.300) |
| Tokomaru, Gisborne | New Zealand | 1,875 km | (-38.133, 178.300) |
| Wainui, Gisborne | New Zealand | 1,876 km | (-38.689, 178.070) |
| Tamarau, Gisborne | New Zealand | 1,878 km | (-38.678, 178.050) |
| Kaiti, Gisborne | New Zealand | 1,880 km | (-38.668, 178.030) |
| Ruatoria, Gisborne | New Zealand | 1,881 km | (-37.883, 178.333) |
| Whataupoko, Gisborne | New Zealand | 1,881 km | (-38.648, 178.020) |
| Mangapapa, Gisborne | New Zealand | 1,882 km | (-38.638, 178.010) |
| Gisborne | New Zealand | 1,882 km | (-38.653, 178.004) |
Local time:
Time Zone: Europe/Tirane
Coordinates: 41.3894° N 19.8275° E
Elevation: 132 m (433 ft)
Local time:
Time Zone: Pacific/Chatham
Coordinates: 43.9535° S 176.5597° W
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 Zall-Herr
The DMS coordinates are: 41°23'22'' N 19°49'39'' E .
Calculations are easier by using the decimal format, hence:
LatO = 41.38944°
LngO = 19.8275°
Step 2: Calculate the latitude
LatA = - LatO = -41.38944°
Since the latitude is positive (north direction), the antipode must be negative (south direction).
Step 3: Calculate the longitude
LngA = LngO ± 180° = 19.8275 - 180° = -160.1725°
Since the longitude is positive, we subtract 180° to ensure the final value lies between (-180, 180). If it were the other way around, we would sum 180° for the same reason.
Result:
The antipode of Zall-Herr is located on coordinates: (LatA, LngA) = (-41.38944, -160.1725)
In DMS format: 41°23'22'' N 19°49'39'' E .