Problem: Assume that the earth is a sphere of radius 5280 miles, find the length of the sides, the measure of the angles and the area of the spherical triangle with vertices A(70°N,10°E),B(10°S,100°E) and C(50°S,80°W). The earth's radius will be used as the unit of length. The spherical coordinates (r,v,u) of the three vertices are (1,10,20),(1,100,100) and (1,−80,140)
How did they obtain the spherical coordinates? meaning (r,v,u). So for example how did they get (1,10,20). I'm assuming the radius is 1 which is r, v=angle but i'm not sure why it is -80 and i have no idea what u could be.
I would match them as:
A : $10 \rm E \to v=10,\, 70 \rm N \to u=20$
B : $100 \rm E \to v = 100,\, 10\rm S \to u=100 $
C : $80 \rm W \to v = -80, 50 \rm S \to u=140 $
So, v is to East and is $(-180, 180)$ from a certain point, and u is to $ \rm S $ and is $(0, 180)$ from north pole.
Hope it helps.