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1、______________________________________________________________________________________________________________对数的换底公式及其推论一、复习引入:对数的运算法则如果a>0,a1,M>0,N>0有:log(MN)logMlogN(1)aaaMloglogMlogN(2)aNaalogMnnlogM(nR)(3)aa二、新授内容:1.对数换底公式:logNlogNm(a>0,a1,m>0,m1,N>0)alogam证明:设logN=x,则ax=Na两边取以m为底
2、的对数:logaxlogNxlogalogNmmmmlogNlogN从而得:xm∴logNmlogaalogamm2.两个常用的推论:①logbloga1,logblogcloga1ababcn②logbnlogb(a,b>0且均不为1)ammalgblga证:①logbloga1ablgalgblgbnnlgbn②logbnlogbamlgammlgama三、讲解范例:精品资料_______________________________________________________________________________________
3、_______________________例1已知log3=a,log7=b,用a,b表示log5623421解:因为log3=a,则log2,又∵log7=b,2a33log56log73log2ab3∴log5633342log42log7log21abb133351log3例2计算:①0.2②log3log2log4324912555解:①原式=155log3110.2log5533115153②原式=log3log2log2222342442例3设x,y,z(0,)且3x4y6z1111求证;2比较3x,4y,6
4、z的大小x2yz证明1:设3x4y6zk∵x,y,z(0,)∴k1lgklgklgk取对数得:x,y,zlg3lg4lg611lg3lg42lg3lg42lg32lg2lg61∴x2ylgk2lgk2lgk2lgklgkz64lgklg34lg64lg818123x4y()lgklgk0lg3lg4lg3lg4lg3lg4∴3x4y9lgklg46lg36lg6416又:4y6z()lgklgk0lg4lg6lg2lg6lg2lg6精品资料_____________________________________
5、_________________________________________________________________________∴4y6z∴3x4y6z例4已知logx=logc+b,求xaa分析:由于x作为真数,故可直接利用对数定义求解;另外,由于等式右端为两实数和的形式,b的存在使变形产生困难,故可考虑将logc移到等式左端,a或者将b变为对数形式解法一:由对数定义可知:xalogacbalogacabcab解法二:x由已知移项可得logxlogcb,即logbaaacx由对数定义知:abxcabc解法三:blogablogx
6、logclogablogcabxcabaaaaa四、课堂练习:①已知log9=a,18b=5,用a,b表示log45183618解:∵log9=a∴log1log2a∴log2=1a181821818∵18b=5∴log5=b18log45log9log5ab∴log4518181836log361log22a1818②若log3=p,log5=q,求lg583精品资料_____________________________________________________________________________________________
7、_________________1解:∵log3=p∴log3=plog33plog2823233plog5log53pq又∵log5q∴lg5333log10log2log513pq333三、小结本节课学习了以下内容:换底公式及其推论四、课后作业:logx1.证明:a1logblogxaab证法1:设logxp,logxq,logbraaba则:xapx(ab)qaqbqbar∴ap(ab)qaq(
