微分の計算で　arctan(asinx+bcosx)/(acosx-b

[{√(a-b)/(a+b)}*sec^2(x/2)]/2/{1+{(a-b)/(a+b)}*tan^2(x/2)} =[{√(a-b)/(a+b)}*sec^2(x/2)*cos^2(x/2)]/2{cos^2(x/2)+{(a-b)/(a+b)}*sin^2(x/2)} ={(a+b)√((a-b)/(a+b))}/2{(a+b)cos^2(x/2)+(a-b)sin^2(x/2)} =√(a^2-b^2)/2[{a(cos^2(x/2) + sin^2(x/2))} + b(cos^2(x/2) - sin^2(x/2))] =√(a^2-b^2)/2(a + bcosx) sec^2(x/2)*cos^2(x/2) = 1 cos^2(x/2) + sin^2(x/2) = 1 cos^2(x/2) - sin^2(x/2) = cos(2・x/2) = cosx (倍角公式あるいはcosの加法定理)