Nonstop flight route between Paamiut, Greenland and Milos, Greece:
Departure Airport:
Arrival Airport:
Distance from JFR to MLO:
Share this route:
Jump to:
- About this route
- JFR Airport Information
- MLO Airport Information
- Facts about JFR
- Facts about MLO
- Map of Nearest Airports to JFR
- List of Nearest Airports to JFR
- Map of Furthest Airports from JFR
- List of Furthest Airports from JFR
- Map of Nearest Airports to MLO
- List of Nearest Airports to MLO
- Map of Furthest Airports from MLO
- List of Furthest Airports from MLO
About this route:
A direct, nonstop flight between Paamiut Airport (JFR), Paamiut, Greenland and Milos Island National Airport (MLO), Milos, Greece would travel a Great Circle distance of 3,518 miles (or 5,661 kilometers).
A Great Circle is the shortest distance between 2 points on a sphere. Because most world maps are flat (but the Earth is round), the route of the shortest distance between 2 points on the Earth will often appear curved when viewed on a flat map, especially for long distances. If you were to simply draw a straight line on a flat map and measure a very long distance, it would likely be much further than if you were to lay a string between those two points on a globe. Because of the large distance between Paamiut Airport and Milos Island National Airport, the route shown on this map most likely appears curved because of this reason.
Try it at home! Get a globe and tightly lay a string between Paamiut Airport and Milos Island National Airport. You'll see that it will travel the same route of the red line on this map!
Departure Airport Information:
IATA / ICAO Codes: | JFR / BGPT |
Airport Names: |
|
Location: | Paamiut, Greenland |
GPS Coordinates: | 62°0'52"N by 49°40'14"W |
Area Served: | Paamiut, Greenland |
Operator/Owner: | Mittarfeqarfiit |
Airport Type: | Public |
Elevation: | 120 feet (37 meters) |
# of Runways: | 1 |
View all routes: | Routes from JFR |
More Information: | JFR Maps & Info |
Arrival Airport Information:
IATA / ICAO Codes: | MLO / LGML |
Airport Names: |
|
Location: | Milos, Greece |
GPS Coordinates: | 36°41'48"N by 24°28'36"E |
Operator/Owner: | Hellenic Civil Aviation Authority |
Airport Type: | Public |
Elevation: | 10 feet (3 meters) |
# of Runways: | 1 |
View all routes: | Routes from MLO |
More Information: | MLO Maps & Info |
Facts about Paamiut Airport (JFR):
- Paamiut Airport handled 4,249 passengers last year.
- The furthest airport from Paamiut Airport (JFR) is Hobart International Airport (HBA), which is located 10,938 miles (17,602 kilometers) away in Hobart, Tasmania, Australia.
- Paamiut Airport (JFR) currently has only 1 runway.
- The closest airport to Paamiut Airport (JFR) is Qassimiut Heliport (QJH), which is located 119 miles (192 kilometers) SE of JFR.
- Because of Paamiut Airport's relatively low elevation of 120 feet, planes can take off or land at Paamiut Airport at a lower air speed than at airports located at a higher elevation. This is because the air density is higher closer to sea level than it would otherwise be at higher elevations.
- In addition to being known as "Paamiut Airport", other names for JFR include "Mittarfik Paamiut" and "Paamiut Lufthavn".
Facts about Milos Island National Airport (MLO):
- The furthest airport from Milos Island National Airport (MLO) is Rurutu Airport (RUR), which is located 11,420 miles (18,379 kilometers) away in Rurutu, French Polynesia.
- The closest airport to Milos Island National Airport (MLO) is Paros National Airport (PAS), which is located 42 miles (68 kilometers) ENE of MLO.
- In addition to being known as "Milos Island National Airport", another name for MLO is "Κρατικός Αεροδρόμιο Μήλου".
- Milos Island National Airport (MLO) currently has only 1 runway.
- Annual passenger throughput - 10 year history
- Because of Milos Island National Airport's relatively low elevation of 10 feet, planes can take off or land at Milos Island National Airport at a lower air speed than at airports located at a higher elevation. This is because the air density is higher closer to sea level than it would otherwise be at higher elevations.