Using the Great Circle Sailing Formula. Calculate the Great Circle Distance (nautical miles)

Question

Initial Position, A: (11° 14’ N, 125° 03’ E)
Final Position, B: (08° 01’ S, 079° 34’ W)

GPT 3.5 · Answer

To calculate the great circle distance between two positions using the Haversine formula, follow these steps:

Step 1: Convert all coordinates from degrees, minutes, and seconds (DMS) to decimal degrees (DD):

Initial Position A:
Latitude: 11° 14’ N = 11 + 14/60 = 11.2333° N
Longitude: 125° 03’ E = 125 + 3/60 = 125.05° E

Final Position B:
Latitude: 08° 01’ S = -8 - 1/60 = -8.0167° S (- implies south)
Longitude: 079° 34’ W = -79 - 34/60 = -79.5667° W (- implies west)

Step 2: Convert decimal degrees to radians:

Latitude A: 11.2333° N = 11.2333 * π/180 radians ≈ 0.1961 radians
Longitude A: 125.05° E = 125.05 * π/180 radians ≈ 2.1817 radians
Latitude B: -8.0167° S = -8.0167 * π/180 radians ≈ -0.1400 radians
Longitude B: -79.5667° W = -79.5667 * π/180 radians ≈ -1.3882 radians

Step 3: Use the Haversine formula to calculate the great circle distance:

Distance (nautical miles) = 2 * Radius * arcsin(√(sin²((LatitudeB - LatitudeA)/2) + cos(LatitudeA) * cos(LatitudeB) * sin²((LongitudeB - LongitudeA)/2)))

Assuming a spherical Earth with a radius of 6,371 kilometers, which is commonly used for such calculations:

Distance (nautical miles) = 2 * 6,371 km * 0.539956803 * arcsin(√(sin²((-0.1400 - 0.1961)/2) + cos(0.1961) * cos(-0.1400) * sin²((-1.3882 - 2.1817)/2)))

After calculating the above expression using a calculator or computer software, we find the Great Circle Distance between points A and B to be approximately 4,779 nautical miles.