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第1个回答 2019-05-10
(√2/2)ln|csc(x+π/4)-cot(x+π/4)|+C
解题过程如下:
∫1/(sinx+cosx)dx
=(√2/2)∫1/[(√2/2)sinx+(√2/2)cosx] dx
=(√2/2)∫1/sin(x+π/4) dx
=(√2/2)∫csc(x+π/4) dx
=(√2/2)ln|csc(x+π/4)-cot(x+π/4)|+C
扩展资料
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
本回答被网友采纳第2个回答 2011-11-30
解:设t=tan(x/2),则x=2arctant,sinx=2t/(1+t²),cosx=(1-t²)/(1+t²),dx=2dt/(1+t²)
故 ∫dx/(1+sinx+cosx)=∫[2dt/(1+t²)]/[1+2t/(1+t²)+(1-t²)/(1+t²)]
=∫[2dt/(1+t²)]/[2(1+t)/(1+t²)]
=∫dt/(1+t)
=ln│1+t│+C (C是积分常数)
=ln│1+tan(x/2)│+C。本回答被网友采纳
故 ∫dx/(1+sinx+cosx)=∫[2dt/(1+t²)]/[1+2t/(1+t²)+(1-t²)/(1+t²)]
=∫[2dt/(1+t²)]/[2(1+t)/(1+t²)]
=∫dt/(1+t)
=ln│1+t│+C (C是积分常数)
=ln│1+tan(x/2)│+C。本回答被网友采纳
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