作业帮函数f(x)=In(4+3x-x²)的单调递减区间是 A.(负无穷,3/2] B.[3/2,正无穷) C.(-1,3/2] D.[3/2,4)
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函数f(x)=In(4+3x-x²)的单调递减区间是 A.(负无穷,3/2] B.[3/2,正无穷) C.(-1,3/2] D.[3/2,4)
函数f(x)=In(4+3x-x²)的单调递减区间是 A.(负无穷,3/2] B.[3/2,正无穷) C.(-1,3/2] D.[3/2,4)
函数f(x)=In(4+3x-x²)的单调递减区间是 A.(负无穷,3/2] B.[3/2,正无穷) C.(-1,3/2] D.[3/2,4)
考查的是复合函数的单调性
把复合函数分成二次函数和对数函数
函数f(x)=log1/2 (6-x-x²)的定义域:
6-x-x²>0
x²+x-6<0
(x+3)(x-2)<0
-3<x<2
故定义域:(-3,2)
令t=-x²-x+6=-(x+1/2)²+25/4
则函数t在(-3,-1/2)上递增,在[-1/2,2)上递减
又函数y=log1/2(x)在定义域上单调递减
故函数f(x)=log1/2 (6-x-x²)的单调增区间是:[-1/2,2)
选B.