由根与系数的关系得kOPkOQ2y0?r2,…………………………10分 ?2x0?r2又kOPkOQ22x0y0?r2112222?1得5r2?4,??,即x0?4y0?5r,结合?y0??,由此得224x0?r44r?25.……12分 522.【命题意图】本题考查导数的几何意义,导数的应用,着重考查运算求解能力,函数与方程思想以及转化与化归思想.
【解析】(Ⅰ)依题意f'?x??ex?e?1?lnx?,故f'?1??2e,…………………………2分 又f?1??e,故曲线y?f?x?在点?1 , f?1??处的切线方程为y?2ex?e.……………………4分
(Ⅱ)f?x??ex2?ex?exlnx?ex2?ex?exlnx?ex2?0,
令g?x??ex?exlnx?ex2?x?0?,于是问题转化为g?x??0在?0 ,…………5 ???上恒成立,分
易知g'?x??ex?e?1?lnx??2ex,设m?x??g'?x?,则m'?x??ex?令??x??ex?ex,则?'?x??ex?e,由?'?x??0,得x?1, 当0?x?1时,?'?x??0,当x?1时,?'?x??0, ∴函数??x?在?0 , 1?上递减,在?1 , ???上递增,
∴当0?x?1时,??x????1??0,当x?1时,??x????1??0,
∴?x??0 , ???都有??x??0,即ex?ex?0②.………………………… 8分 由①②知当x?0时,m'?x??ex?ee?2e?2ex??2e?0, xxe?2e①, x ???上递增, ∴函数y?g'?x?在?0 ,∴当0?x?1时,g'?x??g'?1??0,当x?1时,g'?x??g'?1??0, 1?上递减,在?1 , ???上递增, ∴函数y?g?x?在?0 ,∴当0?x?1时,g?x??g?1??0③,当x?1时,g?x??g?1??0④,…………11分
由③④知?x??0 , ???,都有g?x??0⑤,当且仅当x?1时,不等式⑤取等号, ∴f?x??ex2.…………………………………………12分