【答案】(Ⅰ)函數(shù)f(x)在(1,+∞)上是增函數(shù)���;(Ⅱ)見解析.
【解析】試題分析:(Ⅰ)代入
���,求導(dǎo),通過導(dǎo)數(shù)恒為正值進(jìn)行證明��;(Ⅱ)求導(dǎo)��,通過討論參數(shù)的取值����,研究函數(shù)的極值點與所給區(qū)間的關(guān)系,進(jìn)而研究函數(shù)在所給區(qū)間上的單調(diào)性和極值����、最值進(jìn)行求解.
試題解析:(Ⅰ)當(dāng)a=﹣2時,f(x)=x2﹣2lnx�����,當(dāng)x∈(1����,+∞)��,
,故函數(shù)f(x)在(1���,+∞)上是增函數(shù).
(Ⅱ)
����,當(dāng)x∈[1�,e],2x2+a∈[a+2�,a+2e2].
若a≥﹣2,f'(x)在[1�����,e]上非負(fù)(僅當(dāng)a=﹣2����,x=1時,f'(x)=0)����,
故函數(shù)f(x)在[1,e]上是增函數(shù)�����,此時[f(x)]min=f(1)=1.
若﹣2e2<a<﹣2,當(dāng)
時�����,f'(x)=0����;當(dāng)
時,f'(x)<0����,
此時f(x)是減函數(shù);當(dāng)
時����,f'(x)>0,此時f(x)是增函數(shù).
故[f(x)]min=
=
若a≤﹣2e2���,f'(x)在[1����,e]上非正(僅當(dāng)a=﹣2e2�,x=e時,f'(x)=0)�,
故函數(shù)f(x)在[1,e]上是減函數(shù)�,此時[f(x)]min=f(e)=a+e2.
綜上可知,當(dāng)a≥﹣2時�,f(x)的最小值為1,相應(yīng)的x值為1���;
當(dāng)﹣2e2<a<﹣2時�����,f(x)的最小值為�����,相應(yīng)的x值為
�;
當(dāng)a≤﹣2e2時���,f(x)的最小值為a+e2��,相應(yīng)的x值為e
