题目内容

(1)(lg2)2+lg5lg20-=
0
0

(2)2-(
1
2
)+
(-4)0
2
-
1
2
-1
+2
3
×
612
×
3
3
2
=
5
5
分析:(1)利用对数的运算性质和lg2+lg5=1即可算出;
(2)利用指数幂的运算性质即可算出.
解答:解:(1)原式=(lg2)2+lg5•(2lg2+lg5)=lg22+2lg2•lg5+lg25=(lg2+lg5)2=1;
(2)原式=
1
2
+
1
2
-(
2
+1)+2
633×12×(
3
2
)2
=
2
-
2
-1+2×3=5.
故答案分别为0,5.
点评:熟练掌握指数幂和对数的运算性质是解题的关键.
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