Given an existing point in lat/long, distance in (in KM) and bearing (in degrees converted to radians), I would like to calculate the new lat/long. This site crops up over and over again, but I just can't get the formula to work for me.
The formulas as taken the above link are:
lat2 = asin(sin(lat1)*cos(d/R) + cos(lat1)*sin(d/R)*cos(θ)) lon2 = lon1 + atan2(sin(θ)*sin(d/R)*cos(lat1), cos(d/R)−sin(lat1)*sin(lat2))
θ is the bearing (in radians, clockwise from north);
d/R is the angular distance (in radians), where d is the distance travelled and R is the earth’s radius.
Here's the code I've got in Python.
import math R = 6378.1 #Radius of the Earth brng = 1.57 #Bearing is 90 degrees converted to radians. d = 15 #Distance in km #lat2 52.20444 - the lat result I'm hoping for #lon2 0.36056 - the long result I'm hoping for. lat1 = 52.20472 * (math.pi * 180) #Current lat point converted to radians lon1 = 0.14056 * (math.pi * 180) #Current long point converted to radians lat2 = math.asin( math.sin(lat1)*math.cos(d/R) + math.cos(lat1)*math.sin(d/R)*math.cos(brng)) lon2 = lon1 + math.atan2(math.sin(brng)*math.sin(d/R)*math.cos(lat1), math.cos(d/R)-math.sin(lat1)*math.sin(lat2)) print(lat2) print(lon2)
lat2 = 0.472492248844 lon2 = 79.4821662373