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how to get horizontal coordinates a few mile from given coordinates?

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hye wook Kim
hye wook Kim el 25 de Feb. de 2021
Comentada: hye wook Kim el 1 de Mzo. de 2021
hello! I'm trying to find the coordinates a few miles horizontally away from given coordinates.
It's like find (38, y) which is 5 nm right side of (38, 125).
I tried drawing 5nm radius circle from (38,125) with scircle1, but as the circle is comprised of
given points. It;s hard to get exact 38.
Is there any trick to find exact coordinates?
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Adam Danz
Adam Danz el 26 de Feb. de 2021
If you have the mapping toolbox you can convert nm to km using nm2km() and then convert km to miles using m=km*1.609344.
hye wook Kim
hye wook Kim el 27 de Feb. de 2021
As the figure shows, I tried to find the coordinates 5mile horizontaly(same latitude) away from [30, 124].
But with drawing circle method, it's hard to get exact same latitude as you can see 30.0004
+
I have no problem with converting mile between km, but thanks a lot!

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William Rose
William Rose el 26 de Feb. de 2021
I assume that 38,135 are the latitude and longitude of the center, and that you want the latitude and longitude for a point on a circle of radius 5 nm about that center. Let d=circle radius, R=Earth radius (same units as d), δ=d/R, ()=latitude, longitude of center, and ()=latitude, longitude of points on the circle. Then
If the distance d is small compared to the Earth radius R, then the following approximation (flat-Earth approximation) is quite accurate:
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William Rose
William Rose el 26 de Feb. de 2021
For a 5 n.mi. circle at 38 degrees latitude, the positions by flat Earth approximation differ from the true great circle by 2 meters or less, i.e. radial error is < (1/4500)*circle radius.
hye wook Kim
hye wook Kim el 1 de Mzo. de 2021
sorry for unkindful explannation. 38, 135 are the lat and lon as you said:)
I'm trying what you've told! Thanks for help!

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William Rose
William Rose el 27 de Feb. de 2021
@hye wook Kim,
d=5 n.mi., R=earth radius=3440.1 n.mi, =30, =124, =30, δ=d/R.
So the code is
>> d=5; R=3440.1; lat0=30*pi/180; latc=30*pi/180; long0=124*pi/180;
>> longc=long0+sqrt((d/R)^2-(latc-lat0)^2)/cos(lat0);
>> longc=longc*180/pi; fprintf('%.7f\n',longc);
124.0961592
Which is the longitude on the 5 mile circle, at latc=30.00000 degrees.
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hye wook Kim
hye wook Kim el 1 de Mzo. de 2021
As I tried with the code you wrote. It gave me the coordiation with 0.0002 mile error with distance measure function 'haversine'.
But this is the error that I can deal with. Thank you for help:)

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