I could use some help as well.  

I got the same equation (3) as you by trisecting the angle 3x to divide ABC into two isosceles triangles, evaluating cos(x) and cos(2x), and substituting into the identity cos(2x) = 2*(cos(x))^2 - 1.   

Setting b=n^3 and (a+b)=mn^2 matches the posted solutions but doesn't give a handy form for p.

The ratio (a+b)/b is interesting -- 3/2, 5/3, 7/4, 8/5, 9/5, 10/7, 11/7, 11/6 in order -- but doesn't give me any insight into the general problem.

The only thought I have is to look at area.  I don't know if I want to face that algebra.  I'll look again later and hope for inspiration.