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∫cos(√x)dx
令√x=u,则dx/2√x=du,dx=2(√x)du=2udu,
原式=2∫ucosudu
=2∫ud(sinu)
=2[usinu-∫sinudu]
=2(usinu+cosu)+C
=2[(√x)sin(√x)+cos(√x)]+C
~~~~~~~~~~~~~~~~~~~~~~~~~
∫√x(x+1)^2dx
令√x=t, 则dx=2tdt,带入
=∫t(t^2+1)^2*2tdt
=∫2t^6+4t^4+2t^2dt
=2/7t^7+4/5t^5+2/3t^3+c
反带回
=2/7(√x)^7+4/5(√x)^5+2/3(√x)^3+c
~~~~~~~~~~~~
∫e^x/(1+e^x)^(1/2)dx
=∫2d[(1+e^x)^(1/2)]
=2(1+e^x)^(1/2)+c
令√x=u,则dx/2√x=du,dx=2(√x)du=2udu,
原式=2∫ucosudu
=2∫ud(sinu)
=2[usinu-∫sinudu]
=2(usinu+cosu)+C
=2[(√x)sin(√x)+cos(√x)]+C
~~~~~~~~~~~~~~~~~~~~~~~~~
∫√x(x+1)^2dx
令√x=t, 则dx=2tdt,带入
=∫t(t^2+1)^2*2tdt
=∫2t^6+4t^4+2t^2dt
=2/7t^7+4/5t^5+2/3t^3+c
反带回
=2/7(√x)^7+4/5(√x)^5+2/3(√x)^3+c
~~~~~~~~~~~~
∫e^x/(1+e^x)^(1/2)dx
=∫2d[(1+e^x)^(1/2)]
=2(1+e^x)^(1/2)+c
追问
好像不是我那道题,答案也不对啊
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