∴当x?0时,f?x?取到极小值,即f??0??0. ∴b?0.
(2)解:由(1)知,f?x???x?ax?c,
32∵1是函数f?x?的一个零点,即f?1??0,∴c?1?a.
2∵f??x???3x?2ax?0的两个根分别为x1?0,x2?2a3.
∵f?x?在?0,1?上是增函数,且函数f?x?在R上有三个零点, ∴x2?2a3?1,即a?32.
52∴f?2???8?4a??1?a??3a?7??故f?2?的取值范围为????5?,???. 2?32.
(3)解:由(2)知f?x???x?ax?1?a,且a?32.
要讨论直线y?x?1与函数y?f?x?图像的交点个数情况, ?y?x?1,即求方程组?解的个数情况. 32y??x?ax?1?a?由?x3?ax2?1?a?x?1, 得?x3?1??a?x2?1???x?1??0.
即?x?1??x2?x?1??a?x?1??x?1???x?1??0.
2?即?x?1??x???1?a?x??2?a???0.
2∴x?1或x??1?a?x??2?a??0.
由方程x??1?a?x??2?a??0, (*)
2得???1?a??4?2?a??a?2a?7.
22∵a?32,
32?a?22?1.此时方程(*)无实数解.
2若??0,即a?2a?7?0,解得
2若??0,即a?2a?7?0,解得a?22?1.此时方程(*)有一个实数解
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x?2?1.
若??0,即a2?2a?7?0,解得a?22?1.此时方程(*)有两个实数解,分别
a?1?a?2a?722为x1?,x2?a?1?a?2a?722.
且当a?2时,x1?0,x2?1. 综上所述,当
32?a?22?1时,直线y?x?1与函数y?f ?x?的图像有一个交点.
当a?22?1或a?2时,直线y?x?1与函数y?f?x?的图像有二个交点. 当a?22?1且a?2时,直线y?x?1与函数y?f?x?的图像有三个交点
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