この問題わかる方いらっしゃいますか?

（1）∫(0→π) θsinθ(cosθ+θsinθ)dθ I=∫(0→π) θsinθ(cosθ+θsinθ)dθ=∫(0→π) [θsinθcosθ+θ^2sin^2θ]dθ =∫(0→π)[θsin2θ/2+θ^2(1-cos2θ)/2]dθ t=2θとおく I=∫(0→2π)[tsint/4+(t^2/2)(1-cost)/2]dt/2 =(1/16)∫(0→2π)[2tsint+t^2(1-cost)]dt J=∫tsintdt=[-tcost]+∫costdt=-tcost+sint(部分積分より） K=∫t^2dt=t^3/3 L=∫t^2costdt=[t^2sint]-∫2tsintdt=t^2sint-2(-tcost+sint)=t^2sint+2tcost-2sint (部分積分2回） I＝(1/16)(2J+K-L)(0→2π)=(1/16)(-t^2sint-4tcost+4sint+t^3/3)(0→2π) =(1/16)(8π^3/3-8π)=π^3/6-π/2 （2） ∫(0→π/2) |cosx-(1/2)|dx = ∫(0→π/3) [cosx-(1/2)]dx+ ∫(π/3→π/2)[1/2-cosx]dx =[sinx-(x/2)](0→π/3)+ [x/2-sinx](π/3→π/2)=(√3/2-π/6)+(π/4-π/6)-(1-√3/2)=√3-1-π/12