题目内容
设g(x)=px-
-2f(x),其中f(x)=lnx.
(Ⅰ)若g(x)在其定义域内为增函数,求实数p的取值范围;
(Ⅱ)证明:f(x)≤x-1;
(Ⅲ)证明:
+
+…+
<
(n∈N*,n≥2).
| p |
| x |
(Ⅰ)若g(x)在其定义域内为增函数,求实数p的取值范围;
(Ⅱ)证明:f(x)≤x-1;
(Ⅲ)证明:
| ln2 |
| 22 |
| ln3 |
| 32 |
| lnn |
| n2 |
| 2n2-n-1 |
| 4(n+1) |
(Ⅰ)∵g(x)=px-
-2lnx(x>0),
∴g′(x)=p+
-
=
.(1分)
令h(x)=px2-2x+p,要使g(x)在(0,+∞)为增函数,
只需h(x)在(0,+∞)上满足:h(x)≥0恒成立,
即px2-2x+p≥0.即 p≥
在(0,+∞)上恒成立.
又∵0<
=
≤
=1(x>0),(4分)
∴p≥1.(5分)
(Ⅱ)证明:要证lnx≤x-1,
即证lnx-x+1≤0(x>0),
设k(x)=lnx-x+1,则k′(x)=
-1=
.(6分)
当x∈(0,1]时,k'(x)>0,∴k(x)为单调递增函数;
当x∈(1,+∞)时,k'(x)<0,∴k(x)为单调递减函数;
∴k(x)max=k(1)=0.(9分)
即lnx-x+1≤0,∴lnx≤x-1.(10分)
(Ⅲ)由(Ⅱ)知lnx≤x-1,又x>0,
∴
≤
=1-
.
∵n∈N*,n≥2,可令x=n2,得
≤1-
.(12分)
∴
≤
(1-
).
∴
+
++
≤
(1-
+1-
++1-
)=
[(n-1)-(
+
++
)]<
[(n-1)-(
+
++
)]
=
[(n-1)-(
-
+
-
++
-
)]
=
[n-1-(
-
)]=
.(14分)
| p |
| x |
∴g′(x)=p+
| p |
| x2 |
| 2 |
| x |
| px2-2x+p |
| x2 |
令h(x)=px2-2x+p,要使g(x)在(0,+∞)为增函数,
只需h(x)在(0,+∞)上满足:h(x)≥0恒成立,
即px2-2x+p≥0.即 p≥
| 2x |
| x2+1 |
又∵0<
| 2x |
| x2+1 |
| 2 | ||
x+
|
| 2 | ||||
2
|
∴p≥1.(5分)
(Ⅱ)证明:要证lnx≤x-1,
即证lnx-x+1≤0(x>0),
设k(x)=lnx-x+1,则k′(x)=
| 1 |
| x |
| 1-x |
| x |
当x∈(0,1]时,k'(x)>0,∴k(x)为单调递增函数;
当x∈(1,+∞)时,k'(x)<0,∴k(x)为单调递减函数;
∴k(x)max=k(1)=0.(9分)
即lnx-x+1≤0,∴lnx≤x-1.(10分)
(Ⅲ)由(Ⅱ)知lnx≤x-1,又x>0,
∴
| lnx |
| x |
| x-1 |
| x |
| 1 |
| x |
∵n∈N*,n≥2,可令x=n2,得
| lnn2 |
| n2 |
| 1 |
| n2 |
∴
| lnn |
| n2 |
| 1 |
| 2 |
| 1 |
| n2 |
∴
| ln2 |
| 22 |
| ln3 |
| 32 |
| lnn |
| n2 |
| 1 |
| 2 |
| 1 |
| 22 |
| 1 |
| 32 |
| 1 |
| n2 |
| 1 |
| 2 |
| 1 |
| 22 |
| 1 |
| 32 |
| 1 |
| n2 |
| 1 |
| 2 |
| 1 |
| 2×3 |
| 1 |
| 3×4 |
| 1 |
| n(n+1) |
=
| 1 |
| 2 |
| 1 |
| 2 |
| 1 |
| 3 |
| 1 |
| 3 |
| 1 |
| 4 |
| 1 |
| n |
| 1 |
| n+1 |
=
| 1 |
| 2 |
| 1 |
| 2 |
| 1 |
| n+1 |
| 2n2-n-1 |
| 4(n+1) |
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