分式(a-1/b)/(b-1/a)化简结果是什么呢?
问题描述:
分式(a-1/b)/(b-1/a)化简结果是什么呢?
答
(a-1/b)/(b-1/a)
=[(ab-1)/b]/[(ab-1)/a]
=a/b
答
=[(ab-1)/b]/[(ab-1)/a]=a/b
答
a/b
答
因为 |a-b|=b/a |a-b| -1
(1/a-1/b)*)√(a-b-1)=(1/a-1/b)*|a-b-1| [ 因为 a-b-1 |a-b-1|=-(a-b-1)=b+1-a]
所以原式=(1/a-1/b)*(b-a+1)
分类讨论(1):当 a-b>0 |a-b|=a-b=b/a => b=a^2/(a+1) => 1/b=(a+1)/a^2
原式=[1/a-(a+1)/a^2]*[a^2/(a+1)-a+1]
=[a/a^2-(a+1)/a^2]*[(a^2+1-a^2)/(a+1)]
=[-1/a^2]*[1/(a+1)]
(2)当 a原式=[1/a-(a-1)/a^2]*[a^2/(a-1)+1-a]
=[a/a^2-(a-1)/a^2]*[(2a-1)/(a-1)]
=(2a-1)/a^2*(a-1)
答
(a-1/b)/(b-1/a)
={(ab-1)/b}/{(ab-1)/a}
=a/b