【答案】(1)見(jiàn)解析�;(2)[1,+∞).
【解析】
(1)構(gòu)造函數(shù)
(x>0)���,轉(zhuǎn)化為研究該函數(shù)的零點(diǎn)問(wèn)題即可����;
(2)對(duì)不等式進(jìn)行轉(zhuǎn)化得2x·ln x≤m(x2-1),當(dāng)x≥1時(shí)恒成立�,構(gòu)造函數(shù)
,x≥1����,通過(guò)求導(dǎo)分析函數(shù)的單調(diào)性最值求參數(shù)范圍即可.
(1)證明 設(shè)h(x)=ln x-
(x>0),則h′(x)=+
>0(x>0)���,所以h(x)在(0����,+∞)為單調(diào)遞增函數(shù).
而h(1)<0����,h(e)>0,
所以函數(shù)h(x)有零點(diǎn)且只有一個(gè)零點(diǎn).
所以函數(shù)f(x)有“倒數(shù)點(diǎn)”且只有一個(gè)“倒數(shù)點(diǎn)”.
(2)xf(x)≤m[g(x)-x]等價(jià)于2x·ln x≤m(x2-1)���,
設(shè)d(x)=2ln x-m
����,x≥1.
則
,x≥1���,
易知-mx2+2x-m=0的判別式為Δ=4-4m2.
①當(dāng)m≥1時(shí)��,d′(x)≤0�,d(x)在[1��,+∞)上單調(diào)遞減����,d(x)≤d(1)=0,符合題意�����;
②當(dāng)0<m<1時(shí)���,方程-mx2+2x-m=0有兩個(gè)正根且0<x1<1<x2,則函數(shù)d(x)在(1�,x2)上單調(diào)遞增,此時(shí)d(x)>d(1)=0��,不合題意��;
③當(dāng)m=0時(shí),d′(x)>0��,d(x)在(1���,+∞)上單調(diào)遞增���,此時(shí)d(x)>d(1)=0,不合題意����;
④當(dāng)-1<m<0時(shí),方程-mx2+2x-m=0有兩個(gè)負(fù)根��,d(x)在(1�����,+∞)上單調(diào)遞增��,此時(shí)d(x)>d(1)=0��,不合題意��;
⑤當(dāng)m≤-1時(shí)��,d′(x)≥0,d(x)在(1�,+∞)上單調(diào)遞增,此時(shí)d(x)>d(1)=0����,不合題意.
綜上,實(shí)數(shù)m的取值范圍是[1��,+∞).
