展开全部
(4)原式=lnx/[2(1-x^2)]|<2,+∞>-∫<2,+∞>dx/[2x(1-x^2)]
=(1/6)ln2-(1/2)∫<2,+∞>[1/x+x/(1-x^2)]dx
=(1/6)ln2-(1/2)[lnx-(1/2)ln|1-x^2|]|<2,+∞>
=(1/6)ln2+(1/2)[ln2-(1/2)ln3]
=(2/3)ln2-(1/4)ln3.
注:x-->+∞时x/√|1-x^2|-->1.
=(1/6)ln2-(1/2)∫<2,+∞>[1/x+x/(1-x^2)]dx
=(1/6)ln2-(1/2)[lnx-(1/2)ln|1-x^2|]|<2,+∞>
=(1/6)ln2+(1/2)[ln2-(1/2)ln3]
=(2/3)ln2-(1/4)ln3.
注:x-->+∞时x/√|1-x^2|-->1.
本回答被提问者采纳
已赞过
已踩过<
评论
收起
你对这个回答的评价是?
上海桦明教育科技
2024-12-15 广告
考研通常是在大四进行。大学生一般会选择在大四上学期参加12月份的全国硕士研究生统一招生考试,如果顺利通过考试,次年9月即可入读研究生。当然,也有部分同学会选择在大三期间开始备考,提前为考研做好知识和心理准备。但这并不意味着他们能在大三就参加...
点击进入详情页
本回答由上海桦明教育科技提供
展开全部
原式=∫(2,+∞) lnx*x/[(x+1)^2*(x-1)^2]dx
=(1/4)*∫(2,+∞) lnx*[1/(x-1)^2-1/(x+1)^2]dx
=(1/4)*∫(2,+∞) lnx/(x-1)^2dx-(1/4)*∫(2,+∞) lnx/(x+1)^2dx
=(-1/4)*∫(2,+∞) lnxd[1/(x-1)]+(1/4)*∫(2,+∞) lnxd[1/(x+1)]
=(-1/4)*lnx/(x-1)|(2,+∞)+(1/4)*∫(2,+∞) dx/x(x-1)+(1/4)*lnx/(x+1)|(2,+∞)-(1/4)*∫(2,+∞) dx/x(x+1)
=(1/4)*ln2+(1/4)*∫(2,+∞) [1/(x-1)-1/x]dx-(1/12)*ln2-(1/4)*∫(2,+∞) [1/x-1/(x+1)]dx
=(1/6)*ln2+(1/4)*ln|(x-1)/x||(2,+∞)-(1/4)*ln|x/(x+1)||(2,+∞)
=(1/6)*ln2+(1/4)*ln2-(1/4)*ln3+(1/4)*ln2
=(2/3)*ln2-(1/4)*ln3
=(1/4)*∫(2,+∞) lnx*[1/(x-1)^2-1/(x+1)^2]dx
=(1/4)*∫(2,+∞) lnx/(x-1)^2dx-(1/4)*∫(2,+∞) lnx/(x+1)^2dx
=(-1/4)*∫(2,+∞) lnxd[1/(x-1)]+(1/4)*∫(2,+∞) lnxd[1/(x+1)]
=(-1/4)*lnx/(x-1)|(2,+∞)+(1/4)*∫(2,+∞) dx/x(x-1)+(1/4)*lnx/(x+1)|(2,+∞)-(1/4)*∫(2,+∞) dx/x(x+1)
=(1/4)*ln2+(1/4)*∫(2,+∞) [1/(x-1)-1/x]dx-(1/12)*ln2-(1/4)*∫(2,+∞) [1/x-1/(x+1)]dx
=(1/6)*ln2+(1/4)*ln|(x-1)/x||(2,+∞)-(1/4)*ln|x/(x+1)||(2,+∞)
=(1/6)*ln2+(1/4)*ln2-(1/4)*ln3+(1/4)*ln2
=(2/3)*ln2-(1/4)*ln3
本回答被网友采纳
已赞过
已踩过<
评论
收起
你对这个回答的评价是?
推荐律师服务:
若未解决您的问题,请您详细描述您的问题,通过百度律临进行免费专业咨询
