要使g(x)≤0的解集为R.
2
则需要方程-3x+5x+c=0的根的判别式Δ≤0,
25
即Δ=25+12c≤0,解得c≤-.
12
252
∴当c≤-时,ax+bx+c≤0的解集为R.
12
21.已知y=f(x)是二次函数,且f(0)=8及f(x+1)-f(x)=-2x+1 (1)求f(x)的解析式; (2)求函数
y?log3f(x)的单调递减区间及值域..
【答案】 (1)设
f(x)?ax2?bx?c
f(0)=8得c=8
f(x+1)-f(x)=-2x+1得 a=-1,b=2
?f(x)??x2?2x?8
(2)y?log3f(x)=log3(?x2?2x?8)?log3[?(x?1)2?9]
2当?x?2x?8?0时,?2?x?4
单调递减区间为(1 ,4) .值域(??,2]
2x22.已知定义在实数集R上的奇函数f(x)有最小正周期2,且当x?(0,1)时,f(x)?x
4?1(Ⅰ)求函数f(x)在(?1,1)上的解析式; (Ⅱ)判断f(x)在(0,1)上的单调性; (Ⅲ)当?取何值时,方程f(x)??在(?1,1)上有实数解? 【答案】(Ⅰ)∵f(x)是x∈R上的奇函数,∴f(0)=0. 设x∈(-1,0), 则-x∈(0,1),
2?x2x2xf(?x)??x?x??f(x),?f(x)??x,
4?14?14?1?2x,x?(?1,0),??x4?1?? ?f(x)??0,x?0?2x?,x?(0,1).x??4?1(Ⅱ)设0?x1?x2?1,
(2x1?2x2)?(2x1?2x2?2x2?2x1)(2x1?2x2)(1?2x1?x2) f(x1)?f(x2)??, x1x2x1x2(4?1)(4?1)(4?1)(4?1)∵0?∴
2x?x?20?1, x1?x2?1,∴2x?2x,1212f(x1)?f(x2)?0
∴f(x)在(0,1)上为减函数. (Ⅲ)∵f(x)在(0,1)上为减函数,
212021?f(x)?0,即f(x)?(,). ∴1524?14?1 同理,f(x)在(?1,0)上时,f(x)?(?1,?2). 251221又f(0)?0,当??(?,?)?(,),或??0时,
2552方程
f(x)??在x?(?1,1)上有实数解.