6.已知函數(shù)f(x)=$\left\{\begin{array}{l}{-lnx��,0<x≤e}\\{a(x+e)����,x>e}\end{array}\right.$是(0,+∞)上的減函數(shù)���,且對(duì)任意的m∈(0���,e],n∈(e���,+∞)有f($\frac{m+n}{2}$)<$\frac{f(m)+f(n)}{2}$���,則實(shí)數(shù)a的取值范圍是(-∞,-$\frac{1}{2e}$).
分析 結(jié)合已知中分段函數(shù)為減函數(shù)���,則函數(shù)每一段均為減函數(shù)����,再由對(duì)任意的m∈(0,e]����,n∈(e,+∞)有f($\frac{m+n}{2}$)<$\frac{f(m)+f(n)}{2}$�,可得當(dāng)x=e時(shí),左段函數(shù)值大于右段函數(shù)值���,進(jìn)而得到實(shí)數(shù)a的取值范圍.
解答 解:∵函數(shù)f(x)=$\left\{\begin{array}{l}{-lnx��,0<x≤e}\\{a(x+e)���,x>e}\end{array}\right.$是(0,+∞)上的減函數(shù)�,且對(duì)任意的m∈(0,e]���,n∈(e���,+∞)有f($\frac{m+n}{2}$)<$\frac{f(m)+f(n)}{2}$�,
∴$\left\{\begin{array}{l}a<0\\ a(e+e)<-lne\end{array}\right.$�,
解得:a<-$\frac{1}{2e}$,
故實(shí)數(shù)a的取值范圍是:(-∞���,-$\frac{1}{2e}$)���,
故答案為:(-∞,-$\frac{1}{2e}$)
點(diǎn)評(píng) 本題考查的知識(shí)點(diǎn)是分段函數(shù)的應(yīng)用���,正確理解分段函數(shù)的單調(diào)性是解答的關(guān)鍵,難度中檔.
