求∫ln4ln2dx/√(ex-1)
设√(ex-1)=t,故x=ln(t2+1),则dx=[2t/(t2+1)]dt,当x=ln4时,t=√3;当x=ln2时,t=1,所以 ∫ln4ln2dx/√(ex-1) =∫√31[2t/(t2+1)]•(1/t)dt =2∫√31[1/(t2+1)]dt =2arctant∣√31=2(π/3-π/4)=π/6
求∫ln4ln2dx/√(ex-1)
设√(ex-1)=t,故x=ln(t2+1),则dx=[2t/(t2+1)]dt,当x=ln4时,t=√3;当x=ln2时,t=1,所以 ∫ln4ln2dx/√(ex-1) =∫√31[2t/(t2+1)]•(1/t)dt =2∫√31[1/(t2+1)]dt =2arctant∣√31=2(π/3-π/4)=π/6
