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令x=tant,则dx=sec^2tdt
原式=∫(0,π/4) ln(1+tant)/sec^2t*sec^2tdt
=∫(0,π/4) ln(1+tant)dt
令巧姿判u=π/4-t,则t=π/4-u,dt=-du
∫(0,π/4) ln(1+tant)dt=∫(π/4,0) ln[1+tan(π/孝改4-u)](-du)
=∫(0,π/4) ln[1+(1-tanu)/(1+tanu)]du
=∫(0,π/4) ln[2/(1+tanu)]du
=∫(0,π/4) ln2du-∫(0,π/4) ln(1+tanu)du
=ln2*(π/4)-∫(0,π/4) ln(1+tant)dt
所册盯以2*∫(0,π/4) ln(1+tant)dt=ln2*(π/4)
∫(0,π/4) ln(1+tant)dt=ln2*(π/8)
所以原式=ln2*(π/8)
原式=∫(0,π/4) ln(1+tant)/sec^2t*sec^2tdt
=∫(0,π/4) ln(1+tant)dt
令巧姿判u=π/4-t,则t=π/4-u,dt=-du
∫(0,π/4) ln(1+tant)dt=∫(π/4,0) ln[1+tan(π/孝改4-u)](-du)
=∫(0,π/4) ln[1+(1-tanu)/(1+tanu)]du
=∫(0,π/4) ln[2/(1+tanu)]du
=∫(0,π/4) ln2du-∫(0,π/4) ln(1+tanu)du
=ln2*(π/4)-∫(0,π/4) ln(1+tant)dt
所册盯以2*∫(0,π/4) ln(1+tant)dt=ln2*(π/4)
∫(0,π/4) ln(1+tant)dt=ln2*(π/8)
所以原式=ln2*(π/8)
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