题目内容

1×1+2×2+3×3+…+1997×1997所得结果的个位数字是
5
5
分析:尾数1、2、3、…9、0平方的个位数分别为1、4、9、6、5、6、9、4、1、0,而其和的个位数为(1+4+9+6+5+6+9+4+1+0)为5,则1×1+2×2+3×3+…2000×2000的个位数为0(200×5),然后求出1998×1998+1999×1999+2000×2000的个位数,进而得出结论.
解答:解:尾数1、2、3、…9、0平方的个位数分别为1、4、9、6、5、6、9、4、1、0,
而其和的个位数为5,则1×1+2×2+3×3+…2000×2000的个位数为0(200×5),
而1998×1998+1999×1999+2000×2000的个位数为:4+1+0=5,
所以1×1+2×2+3×3+…1997×1997的个位数字是:10-5=5;
故答案为:5.
点评:判断出1×1+2×2+3×3+…2000×2000的个位数为0,1998×1998+1999×1999+2000×2000的个位数是5,是解答此题的关键.
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观察已知算式,寻找规律填空.
(1)1=1×2÷2
1+2=2×3÷2
1+2+3=3×4÷2
1+2+3+4=4×
5
5
÷2
1+2+3+4+5=
5
5
×
6
6
÷
2
2

1+2+3+4+5+6+7=
7
7
×
8÷2
8÷2

1+2+3+…+n=
n
n
×
(n+1)÷2
(n+1)÷2

(2)1×2=1×2×3÷3
1×2+2×3=2×3×4÷3
1×2+2×3+3×4=3×4×5÷
3
3

1×2+2×3+3×4+4×5=4×5×
6
6
÷
3
3

1×2+2×3+3×4+4×5+5×6=
5
5
×
6
6
×
7÷3
7÷3

1×2+2×3+3×4+…+n×(n+1)=
n
n
×
(n+1)
(n+1)
×
(n+2)
(n+2)
÷
3
3

(3)1×2×3=1×2×3×4÷4
1×2×3+2×3×4=2×3×4×5÷4
1×2×3+2×3×4+3×4×5=3×4×5×
6
6
÷4
1×2×3+2×3×4+3×4×5+4×5×6=
4
4
×
5
5
×
6
6
×
7
7
÷
4
4

1×2×3+2×3×4+3×4×5+4×5×6+5×6×7=
5
5
×
6
6
×
7
7
×
8
8
÷
4
4

1×2×3+2×3×4+…+n×(n+1)×(n+2)=
n
n
×
(n+1)
(n+1)
×
(n+2)
(n+2)
×
(n+3)
(n+3)
÷
4
4

猜一猜:
1×2×3×4+2×3×4×5+3×4×5×6=
3×4×5×6×7÷5
3×4×5×6×7÷5
按从大到小的顺序写出5个正数和5个负数.
正数:
5
5
4
4
3
3
2
2
1
1

负数:
-1
-1
-2
-2
-3
-3
-4
-4
-5
-5

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