>>824
Σ[n=0,∞] c[n]t^n
= Σ[n=0,∞]∫[0,π/2] (t/(a^2 sin^2(x) + b^2 cos^2(x)))^n dx

 |t|<min(a^2,b^2)と仮定して積分と和を入れ替える

= ∫[0,π/2] 1/(1-t/(a^2 sin^2(x) + b^2 cos^2(x))) dx
= π/2+∫[0,π/2] t/((a^2-t)sin^2(x)+(b^2-t)cos^2(x)) dx

 √(a^2-t) tan(x) = √(b^2-t) tan(y) と置く

= π/2+∫[0,π/2] t/√((b^2-t)(a^2-t)) dy
= (π/2)(1 + t/√((b^2-t)(a^2-t)))