Question

設(shè)函數(shù)f(x)=x|x-1|+m,g(x)=lnx.

(1)當(dāng)m=2時,求函數(shù)y=f(x)在[1,m]上的最大值.

(2)記函數(shù)p(x)=f(x)-g(x),若函數(shù)p(x)有零點(diǎn),求m的取值范圍.

Answer 1

 (1)當(dāng)m=2,x∈[1,2]時,

f(x)=x·(x-1)+2=x²-x+2=+.

因?yàn)楹瘮?shù)y=f(x)在[1,2]上單調(diào)遞增,

所以f(x)_max=f(2)=4,即f(x)在[1,2]上的最大值為4.

(2)函數(shù)p(x)的定義域?yàn)?0,+∞),函數(shù)p(x)有零點(diǎn),即方程f(x)-g(x)=x|x-1|-lnx+m=0有解,即m=lnx-x|x-1|有解,令h(x)=lnx-x|x-1|.

當(dāng)x∈(0,1]時,h(x)=x²-x+lnx.

因?yàn)閔′(x)=2x+-1≥2-1>0當(dāng)且僅當(dāng)2x=時取“=”,所以函數(shù)h(x)在(0,1]上是增函數(shù),所以h(x)≤h(1)=0.

當(dāng)x∈(1,+∞)時,h(x)=-x²+x+lnx.

因?yàn)閔′(x)=-2x++1==

-<0,所以函數(shù)h(x)在(1,+∞)上是減函數(shù),所以h(x)<h(1)=0,所以方程m=lnx-x|x-1|有解時,m≤0,即函數(shù)p(x)有零點(diǎn)時,m的取值范圍為(-∞,0].