答案是ln[x+√(x²+1)]+C
具体步骤如下:
设x=tant,则sint=x/√(x²+1),dx=sec²tdt
∴原式=∫sec²tdt/sect
=∫costdt/cos²t
=∫d(sint)/(1-sin²t)
=(1/2)∫[1/(1+sint)+1/(1-sint)]d(sint)
=(1/2)[ln(1+sint)-ln(1-sint)]+C (C是积分常数)
=(1/2)ln[(1+sint)/(1-sint)]+C
=ln[x+√(x²+1)]+C (把sint=x/√(x²+1)代入,并整理得).
常用积分公式:
1)∫0dx=c
2)∫x^udx=(x^(u+1))/(u+1)+c
3)∫1/xdx=ln|x|+c
4)∫a^xdx=(a^x)/lna+c
5)∫e^xdx=e^x+c
6)∫sinxdx=-cosx+c
7)∫cosxdx=sinx+c
8)∫1/(cosx)^2dx=tanx+c
9)∫1/(sinx)^2dx=-cotx+c
10)∫1/√(1-x^2) dx=arcsinx+c