Nonstop flight route between Norman, Oklahoma, United States and Port Hawkesbury, Nova Scotia, Canada:
Departure Airport:
![Get maps and more information about University of Oklahoma Max Westheimer Airport Get airport maps and more information about University of Oklahoma Max Westheimer Airport](images/takeoff-icon.gif)
Arrival Airport:
![Get maps and more information about Port Hawkesbury Airport Get airport maps and more information about Port Hawkesbury Airport](images/landing-icon.gif)
Distance from OUN to YPS:
Share this route:
Jump to:
- About this route
- OUN Airport Information
- YPS Airport Information
- Facts about OUN
- Facts about YPS
- Map of Nearest Airports to OUN
- List of Nearest Airports to OUN
- Map of Furthest Airports from OUN
- List of Furthest Airports from OUN
- Map of Nearest Airports to YPS
- List of Nearest Airports to YPS
- Map of Furthest Airports from YPS
- List of Furthest Airports from YPS
About this route:
A direct, nonstop flight between University of Oklahoma Max Westheimer Airport (OUN), Norman, Oklahoma, United States and Port Hawkesbury Airport (YPS), Port Hawkesbury, Nova Scotia, Canada would travel a Great Circle distance of 2,010 miles (or 3,234 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 relatively short distance between University of Oklahoma Max Westheimer Airport and Port Hawkesbury Airport, the route shown on this map most likely still appears to be a straight line.
Departure Airport Information:
IATA / ICAO Codes: | OUN / KOUN |
Airport Name: | University of Oklahoma Max Westheimer Airport |
Location: | Norman, Oklahoma, United States |
GPS Coordinates: | 35°14'44"N by 97°28'19"W |
Area Served: | Norman, Oklahoma |
Operator/Owner: | University of Oklahoma |
Airport Type: | Public |
Elevation: | 1182 feet (360 meters) |
# of Runways: | 2 |
View all routes: | Routes from OUN |
More Information: | OUN Maps & Info |
Arrival Airport Information:
IATA / ICAO Codes: | YPS / CYPD |
Airport Name: | Port Hawkesbury Airport |
Location: | Port Hawkesbury, Nova Scotia, Canada |
GPS Coordinates: | 45°39'23"N by 61°22'5"W |
Operator/Owner: | Municipality of Port Hawkesbury |
Airport Type: | Public |
Elevation: | 373 feet (114 meters) |
# of Runways: | 1 |
View all routes: | Routes from YPS |
More Information: | YPS Maps & Info |
Facts about University of Oklahoma Max Westheimer Airport (OUN):
- The furthest airport from University of Oklahoma Max Westheimer Airport (OUN) is Sir Gaëtan Duval Airport (RRG), which is located 10,853 miles (17,467 kilometers) away in Rodrigues Island, Mauritius.
- The closest airport to University of Oklahoma Max Westheimer Airport (OUN) is Will Rogers World Airport (OKC), which is located only 13 miles (20 kilometers) NW of OUN.
- University of Oklahoma Max Westheimer Airport (OUN) has 2 runways.
- The Cleveland County Composite Squadron of Civil Air Patrol meets on Tuesday evenings in a hangar provided by the City of Norman, east of the terminal.
Facts about Port Hawkesbury Airport (YPS):
- The furthest airport from Port Hawkesbury Airport (YPS) is Albany Airport (ALH), which is located 11,695 miles (18,822 kilometers) away in Albany, Western Australia, Australia.
- Port Hawkesbury Airport (YPS) currently has only 1 runway.
- The closest airport to Port Hawkesbury Airport (YPS) is Sydney/J.A. Douglas McCurdy Airport (YQY), which is located 72 miles (117 kilometers) ENE of YPS.
- Because of Port Hawkesbury Airport's relatively low elevation of 373 feet, planes can take off or land at Port Hawkesbury 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.