(1)當(dāng)b>0時(shí),若對(duì)任意x∈R都有f(x)≤1,證明a≤2
;
(2)當(dāng)b>1時(shí),證明對(duì)任意x∈[0,1],|f(x)|≤1的充要條件是b-1≤a≤2
.
證明:(1)依題意設(shè)對(duì)任意x∈R都有f(x)≤1,
∵=-b(x-)2+
,
∴f(
)=
≤1.
∵a>0,b>0,∴a≤2
.
(2)必要性:對(duì)任意x∈[0,1],|f(x)|≤
f(x)≥-1,
∴f(1)≥-1,即a-b≥-1.
∴a≥b-1.
對(duì)任意x∈[0,1],|f(x)|≤1
f(x)≤1,
∵b>1,可以推出f(
)≤1,
即a·
-1≤1.
∴a≤
.∴b-1≤a≤
.
充分性:∵b>1,a≥b-1,對(duì)任意x∈[0,1],可以推出ax-bx2≥b(x-x2)-x≥-x≥-1,即ax-bx2≥-1.
∵b>1,a≤2
,
對(duì)任意x∈[0,1],可以推出ax-bx2≤2bx-bx2≤1,即ax-bx2≤1.
∴-1≤f(x)≤1.
綜上,當(dāng)b>1時(shí),對(duì)任意x∈[0,1],|f(x)|≤1的充要條件是b-1≤a≤2
.
