题目内容
+lg25+lg4+7log72=________.
[解析]
计算下列各式的值:
=__________.
计算:
已知log2[log (log2x)]=log3[log (log3y)]
=log5[log (log5z)]=0.
试比较x,y,z的大小.
log242+log243+log244等于( )
A.1 B.2
C.24 D.
2log2+()+lg20-lg2-(log32)·(log23)+(-1)lg1.
如图所示为函数①y=ax、②y=bx、③y=logcx、④y=logdx的图象,其中a、b、c、d均大于0且不等于1,则a、b、c、d大小关系为( )
A.a>b>c>d B.a>b>d>c
C.b>a>c>d D.b>a>d>c
log4________0.
+lg25+lg4+7log72=________.
[解析] 
+lg25+lg4+7log72=________. [解析] 
=__________.
(log2x)]=log3[log
(log3y)]
(log5z)]=0.
+(
)
+lg20-lg2-(log32)·(log23)+(
-1)lg1.
4________0.