I am working on an application with Spatial data. Here I need to find the distance from the centroid to a point. Can know how to convert miles to degrees in Java?

Final Edit: Look into Great Circle Distance and Geodesics to discover the complexities of what you were really asking in this question. This is admittedly well out of my familiarity with mathematics. [Leaving original suggestions in for historical reasons. Though pieces may help you, they will not directly answer your question.] See http://stackoverflow.com/a/1253545/1964221 for the answer to this question.
To go the other direction, I wonder if we can do this(my algebra is rusty): Latitude: 1 km = 1 deg / 110.54 km Application Is your distance always strictly EastWest or NorthSouth? If so, you should be able to say:
or
More than likely, you will need to know distance in both NorthSouth and EastWest directions(and takes this into the realm of "not straightforward). You could look at the Pythagorean Theorem. You know the "long side" of the triangle(c^2) and can calculate for longitude(a^2) and latitude(b^2). You should be able to apply portions of my previous code snippets to figure out Good luck. 


If this is really a straight forward question we should ignore latitude and longitude, and just look at the angle between the radii to two points such that the distance between them, along the great circle containing both points, is m miles. To keep it really straight forward, we should assume the earth is spherical, so that the answer is independent of location. I'm using mean radius 3,958.761 miles. One radian is the angle for a line 3,958.761 miles long, so the angle for a line m miles long is m/3,958.761 radians. Use Math.toDegrees if you want the angle in degrees. 


Expressing your distance in degrees is an incorrect approach because the distance degrees represent is not equal in all positions on the earth and they are expressed differently for latitude and longitude. Examples: 1° longitude on the equator is about 70 miles, whereas around the north pole it's a few feet. Latitude does not change over the surface of the earth, but what about distances which are not along a meridian or a parallel? Which measure would you represent those in? 


Answer by dwightdegroff is great (thanks, it helped me), but contains one mistype, which of course is of very low importance. If you want to be more correct (e.g. you're preparing tests based on external data coming from source with many decimal places), then it should be
instead of:
And thus for latitude it is:
And actually, for longitude it's 111.319 instead of 111.320, so:
However, both corrections might be negligible. 

