作业帮解不等式log1/2^(x+1) +log2^[(1/(6-x)] 大于log1/2^12
来源:学生作业帮助网 编辑:作业帮 时间:2024/11/19 03:30:25
![解不等式log1/2^(x+1) +log2^[(1/(6-x)] 大于log1/2^12](/uploads/image/z/2484912-48-2.jpg?t=%E8%A7%A3%E4%B8%8D%E7%AD%89%E5%BC%8Flog1%2F2%5E%28x%2B1%29+%2Blog2%5E%5B%281%2F%286-x%29%5D+%E5%A4%A7%E4%BA%8Elog1%2F2%5E12)
x){|
v>ӟnoQm
EkkVh*<]ɮ>C#"}
tPju|:>PTXȄu6<ٽTЦ
,n6XV,
9
m@g@#Y";TO@y`xk곩@bZlO I#Qk Ӆ
UVhA
Bv:6wO~:
`1p=f
[<;P�ڐ
解不等式log1/2^(x+1) +log2^[(1/(6-x)] 大于log1/2^12
解不等式log1/2^(x+1) +log2^[(1/(6-x)] 大于log1/2^12
解不等式log1/2^(x+1) +log2^[(1/(6-x)] 大于log1/2^12
定义域x+1>0,1/(6-x)>0
6-x>0
所以-1
=-log2^(6-x)
=-lg(6-x)/lg2
=lg(6-x)/lg1/2
=log1/2^(6-x)
所以log1/2^(x+1) +log1/2^(6-x)>log1/2^12
log1/2^[(x+1)(6-x)]>log1/2^12
底数1/2<1
所以log1/2^N是减函数
所以(x+1)(6-x)<12
(x-6)(x+1)>-12
x^2-5x+6>0
(x-2)(x-3)>0
x>3,x<2
结合定义域
-1