基本性質:
1、a^(log(a)(b))=b
2、log(a)(a^b)=b
3、log(a)(MN)=log(a)(M)+log(a)(N);
4、log(a)(M÷N)=log(a)(M)-log(a)(N);
5、log(a)(M^n)=nlog(a)(M)
6、log(a^n)M=1/nlog(a)(M)
推導
1、因為n=log(a)(b),代入則a^n=b,即a^(log(a)(b))=b。
2、因為a^b=a^b
令t=a^b
所以a^b=t,b=log(a)(t)=log(a)(a^b)
3、MN=M×N
由基本性質1(換掉M和N)
a^[log(a)(MN)] = a^[log(a)(M)]×a^[log(a)(N)] =(M)*(N)
由指數的性質
a^[log(a)(MN)] = a^{[log(a)(M)] + [log(a)(N)]}
兩種方法只是性質不同,採用方法依實際情況而定
又因為指數函式是單調函式,所以
log(a)(MN) = log(a)(M) + log(a)(N)
4、與(3)類似處理
MN=M÷N
a^[log(a)(M÷N)] = a^[log(a)(M)]÷a^[log(a)(N)]
a^[log(a)(M÷N)] = a^{[log(a)(M)] - [log(a)(N)]}
log(a)(M÷N) = log(a)(M) - log(a)(N)
5、與(3)類似處理
M^n=M^n
由基本性質1(換掉M)
a^[log(a)(M^n)] = {a^[log(a)(M)]}^n
a^[log(a)(M^n)] = a^{[log(a)(M)]*n}
log(a)(M^n)=nlog(a)(M)
基本性質4推廣
log(a^n)(b^m)=m/n*[log(a)(b)]
推導如下:
由換底公式(換底公式見下面)[lnx是log(e)(x),e稱作自然對數的底]
log(a^n)(b^m)=ln(b^m)÷ln(a^n)
換底公式的推導:
設e^x=b^m,e^y=a^n
則log(a^n)(b^m)=log(e^y)(e^x)=x/y
x=ln(b^m),y=ln(a^n)
得:log(a^n)(b
基本性質:
1、a^(log(a)(b))=b
2、log(a)(a^b)=b
3、log(a)(MN)=log(a)(M)+log(a)(N);
4、log(a)(M÷N)=log(a)(M)-log(a)(N);
5、log(a)(M^n)=nlog(a)(M)
6、log(a^n)M=1/nlog(a)(M)
推導
1、因為n=log(a)(b),代入則a^n=b,即a^(log(a)(b))=b。
2、因為a^b=a^b
令t=a^b
所以a^b=t,b=log(a)(t)=log(a)(a^b)
3、MN=M×N
由基本性質1(換掉M和N)
a^[log(a)(MN)] = a^[log(a)(M)]×a^[log(a)(N)] =(M)*(N)
由指數的性質
a^[log(a)(MN)] = a^{[log(a)(M)] + [log(a)(N)]}
兩種方法只是性質不同,採用方法依實際情況而定
又因為指數函式是單調函式,所以
log(a)(MN) = log(a)(M) + log(a)(N)
4、與(3)類似處理
MN=M÷N
由基本性質1(換掉M和N)
a^[log(a)(M÷N)] = a^[log(a)(M)]÷a^[log(a)(N)]
由指數的性質
a^[log(a)(M÷N)] = a^{[log(a)(M)] - [log(a)(N)]}
又因為指數函式是單調函式,所以
log(a)(M÷N) = log(a)(M) - log(a)(N)
5、與(3)類似處理
M^n=M^n
由基本性質1(換掉M)
a^[log(a)(M^n)] = {a^[log(a)(M)]}^n
由指數的性質
a^[log(a)(M^n)] = a^{[log(a)(M)]*n}
又因為指數函式是單調函式,所以
log(a)(M^n)=nlog(a)(M)
基本性質4推廣
log(a^n)(b^m)=m/n*[log(a)(b)]
推導如下:
由換底公式(換底公式見下面)[lnx是log(e)(x),e稱作自然對數的底]
log(a^n)(b^m)=ln(b^m)÷ln(a^n)
換底公式的推導:
設e^x=b^m,e^y=a^n
則log(a^n)(b^m)=log(e^y)(e^x)=x/y
x=ln(b^m),y=ln(a^n)
得:log(a^n)(b