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a) Since at least one of the points on the string will be in the center of gravity, we can just make everything point masses for simplicity's sake, but we need to convert all units to kg and meters for this to work. Using Newton's Universal Law of Gravitation and some algebra, we get an approximate result of r=1.68x10^10 meters away from the smaller star.
b) Since the string has a mass across the entire bit, the forces will be changing based on distance, so we need to account for all points on the string to be balanced. I really don't want to do the number crunching for this one cause if it's wrong I'll be wholly devastated. So, say the center of gravity is L meters away from one end of the string, so that it is 3-L meters away from the other end. The total magnitude of all the forces on one side will be equal to the magnitude of the forces on the other side (F1=-F2), so we just need to worry more about getting the correct numbers in. We'll make the mass of the string m1. We'll make the 0.6 solar mass star m2 (now in kg) and the 1.35 solar mass neutron star m3 (also now in kg), and we will make the distance from m1 to the center of gravity r (to which is my listed answer in part a) and is in meters). F1 = (G(m1m2)/((r+3-x)^2)) - (G(m1m2)/((r-x)^2)). F2 = (G(m1m3)/((4.189E+10-r+x)^2)) - (G(m1m3)/((4.189E+10-3+x)^2)).
If that's wrong then welp I have overanalyzed this entire situation and it may just be 1.5 meters into the string (aka halfway). I'm pretty sure it's one of those two answers. 

A. 13,600 k
B. This would make it a B class star
C. 1.1 * 10^29 w
D. 928 k