Nonstop flight route between Coromandel, New Zealand and Selma, Alabama, United States:
Departure Airport:
Arrival Airport:
Distance from CMV to SEM:
Share this route:
Jump to:
- About this route
- CMV Airport Information
- SEM Airport Information
- Facts about CMV
- Facts about SEM
- Map of Nearest Airports to CMV
- List of Nearest Airports to CMV
- Map of Furthest Airports from CMV
- List of Furthest Airports from CMV
- Map of Nearest Airports to SEM
- List of Nearest Airports to SEM
- Map of Furthest Airports from SEM
- List of Furthest Airports from SEM
About this route:
A direct, nonstop flight between Coromandel Aerodrome (CMV), Coromandel, New Zealand and Craig Field (SEM), Selma, Alabama, United States would travel a Great Circle distance of 7,885 miles (or 12,690 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 Coromandel Aerodrome and Craig Field, 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 Coromandel Aerodrome and Craig Field. You'll see that it will travel the same route of the red line on this map!
Departure Airport Information:
IATA / ICAO Codes: | CMV / NZCX |
Airport Name: | Coromandel Aerodrome |
Location: | Coromandel, New Zealand |
GPS Coordinates: | 36°47'30"S by 175°30'30"E |
Operator/Owner: | Coromandel Flying Club |
Airport Type: | Private |
Elevation: | 13 feet (4 meters) |
# of Runways: | 1 |
View all routes: | Routes from CMV |
More Information: | CMV Maps & Info |
Arrival Airport Information:
IATA / ICAO Codes: | SEM / KSEM |
Airport Name: | Craig Field |
Location: | Selma, Alabama, United States |
GPS Coordinates: | 32°20'38"N by 86°59'16"W |
Area Served: | Selma, Alabama |
Operator/Owner: | Craig Field Airport & Industrial Authority |
Airport Type: | Public |
Elevation: | 166 feet (51 meters) |
# of Runways: | 1 |
View all routes: | Routes from SEM |
More Information: | SEM Maps & Info |
Facts about Coromandel Aerodrome (CMV):
- Coromandel Aerodrome (CMV) currently has only 1 runway.
- The closest airport to Coromandel Aerodrome (CMV) is Thames Aerodrome (TMZ), which is located 26 miles (41 kilometers) S of CMV.
- The furthest airport from Coromandel Aerodrome (CMV) is Málaga Airport (AGP), which is nearly antipodal to Coromandel Aerodrome (meaning Coromandel Aerodrome is almost on the exact opposite side of the Earth from Málaga Airport), and is located 12,429 miles (20,002 kilometers) away in Málaga, Spain.
- Because of Coromandel Aerodrome's relatively low elevation of 13 feet, planes can take off or land at Coromandel Aerodrome 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.
Facts about Craig Field (SEM):
- The closest airport to Craig Field (SEM) is Montgomery Regional Airport (MGM), which is located 35 miles (56 kilometers) E of SEM.
- Craig Field (SEM) currently has only 1 runway.
- The furthest airport from Craig Field (SEM) is Margaret River Airport (MGV), which is located 11,157 miles (17,955 kilometers) away in Margaret River, Western Australia, Australia.
- Although the former USAF air traffic control tower at Craig Field remains standing, as of 2007 it was unmanned and non-operational, with UNICOM being used as a common traffic advisory frequency.
- Because of Craig Field's relatively low elevation of 166 feet, planes can take off or land at Craig Field 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.