(a-1)x^2-(a-2)x-1>0
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1、 当a=1时,原不等式变为 x-1>0,即 x > 1
2、当a不等于1时,x^2 - [(a-1)/(a-1)]x - 1/(a-1) >0
x^2 - 2 [(a-2)/2(a-1)]x + [(a-1)/2(a-1)]^2 -[(a-1)/2(a-1)]^2 - 1/(a-1) >0
[ x- (a-2)/2(a-1)]^2 - [a/2(a-1)]^2 >0
[ x- (a-2)/2(a-1)]^2 > [a/2(a-1)]^2
分两种情况讨论
(1) x- (a-2)/2(a-1) > a/2(a-1)
x > a/2(a-1) + (a-2)/2(a-1)
x > 1
(2) x- (a-2)/2(a-1) >-[ a/2(a-1)]
x > (a-2)/2(a-1) - [ a/2(a-1)]
x > -1/(a-1) = 1/(1-a)
综上,x >1 或x >1/(1-a)
此类不等式的解答思路:先分情况讨论二次项系数是否为0,然后再详细讨论二次项不为0的情况
2、当a不等于1时,x^2 - [(a-1)/(a-1)]x - 1/(a-1) >0
x^2 - 2 [(a-2)/2(a-1)]x + [(a-1)/2(a-1)]^2 -[(a-1)/2(a-1)]^2 - 1/(a-1) >0
[ x- (a-2)/2(a-1)]^2 - [a/2(a-1)]^2 >0
[ x- (a-2)/2(a-1)]^2 > [a/2(a-1)]^2
分两种情况讨论
(1) x- (a-2)/2(a-1) > a/2(a-1)
x > a/2(a-1) + (a-2)/2(a-1)
x > 1
(2) x- (a-2)/2(a-1) >-[ a/2(a-1)]
x > (a-2)/2(a-1) - [ a/2(a-1)]
x > -1/(a-1) = 1/(1-a)
综上,x >1 或x >1/(1-a)
此类不等式的解答思路:先分情况讨论二次项系数是否为0,然后再详细讨论二次项不为0的情况
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