题目内容

计算
1+
1
12
+
1
22
+
1+
1
22
+
1
32
+
1+
1
32
+
1
42
1+
1
20092
+
1
20102
=______.
∵n(n+1)
1+
1
n2
+
1
(n+1)2
=
n2(n+1)2+2n(n+1)+1
=n(n+1)+1,
1+
1
n2
+
1
(1+n)2
=
n(n+1)+1
n(n+1)
=1+
1
n
-
1
n+1

∴原式=(1+
1
1
-
1
2
)+(1+
1
2
-
1
3
)+(1+
1
3
-
1
4
)+…+(1+
1
2009
-
1
2010
)
=2009+1-
1
2010
=2009
2009
2010

故答案为2009
2009
2010
练习册系列答案
相关题目
计算:1
1
2
×
5
7
-(-
5
7
)×2
1
2
+(-
1
2
)÷1
2
5
计算:-14+(-
1
2
23=
 
-
2
32
÷(-1
1
2
)3=
 
观察下列等式;
1
1×2
=1-
1
2
1
2×3
=
1
2
-
1
3
1
3×4
=
1
3
-
1
4
将以上三个等式两边分别相加得;
1
1×2
+
1
2×3
+
1
3×4
=1-
1
2
+-
1
3
+
1
3
-
1
4
=1-
1
4
=
3
4

(1)猜想并写出
1
n(n+1)
=
 

(2)计算
1
1×2
+
1
2×3
+
1
3×4
+…+
1
2009×2010

(3)计算
1
2
+
1
6
+
1
12
+
1
20
+…+
1
90

(4)计算
1
4
+
1
12
+
1
24
+
1
40
+…+
1
180
(1)计算:
1
12
-
(1-
3
)2
+(2-
5
)0+(-
1
2
)-1
(2)先化简,再求值:
x2-2x
x2-1
÷(x-1-
2x-1
x+1
),其中x=
2
+1
计算.
(1)24+16÷(-2)2÷(-10);            
(2)(
2
3
+
1
2
)÷(-
1
12
)×(-12)

违法和不良信息举报电话:027-86699610 举报邮箱:58377363@163.com

精英家教网