高中数学对数运算所有公式。 高中数学的对数运算法则
\u9ad8\u4e2d\u6570\u5b66\u5bf9\u6570\u4e0e\u6307\u6570\u7684\u8f6c\u6362\u516c\u5f0f1\u5bf9\u6570
\u2460\u8d1f\u6570\u548c\u96f6\u6ca1\u6709\u5bf9\u6570;
\u2461a>0\u4e14a\u22601,n>0;
\u2462loga1=0,logaa=1,alogan=n,logaab=b.
\u7279\u522b\u5730\uff0c\u4ee510\u4e3a\u5e95\u7684\u5bf9\u6570\u53eb\u5e38\u7528\u5bf9\u6570\uff0c\u8bb0\u4f5clog10n,\u7b80\u8bb0\u4e3algn\uff1b\u4ee5\u65e0\u7406\u6570e(e=2.718
28\u2026)\u4e3a\u5e95\u7684\u5bf9\u6570\u53eb\u505a\u81ea\u7136\u5bf9\u6570\uff0c\u8bb0\u4f5clogen\uff0c\u7b80\u8bb0\u4e3alnn.
2\u5bf9\u6570\u5f0f\u4e0e\u6307\u6570\u5f0f\u7684\u4e92\u5316
\u5bf9\u6570\u7684\u8fd0\u7b97\u6027\u8d28
\u5982\u679ca>0,a\u22601,m>0,n>0,\u90a3\u4e48
(1)loga(mn)=logam+logan.
(2)logamn=logam-logan.
(3)logamn=nlogam
(n\u2208r).
2.\u6307\u6570
\u6307\u6570\u5f0f\u4e0e\u5bf9\u6570\u5f0f\u7684\u4e92\u5316\uff0c\u5fc5\u987b\u5e76\u4e14\u53ea\u9700\u7d27\u7d27\u6293\u4f4f\u5bf9\u6570\u7684\u5b9a\u4e49\uff1aa^b=nlogan=b.
\u5b9a\u4e49\uff1a
\u3000\u3000\u82e5a^n=b(a>0\u4e14a\u22601)
\u3000\u3000\u5219n=log(a)(b)
\u3000\u3000\u57fa\u672c\u6027\u8d28\uff1a
\u3000\u30001\u3001a^(log(a)(b))=b
\u3000\u30002\u3001log(a)(MN)=log(a)(M)+log(a)(N);
\u3000\u30003\u3001log(a)(M\u00f7N)=log(a)(M)-log(a)(N);
\u3000\u30004\u3001log(a)(M^n)=nlog(a)(M)
\u3000\u3000\u63a8\u5bfc
\u3000\u30001\u3001\u56e0\u4e3an=log(a)(b)\uff0c\u4ee3\u5165\u5219a^n=b\uff0c\u5373a^(log(a)(b))=b\u3002
\u3000\u30002\u3001MN=M\u00d7N
\u3000\u3000\u7531\u57fa\u672c\u6027\u8d281(\u6362\u6389M\u548cN)
\u3000\u3000a^[log(a)(MN)] = a^[log(a)(M)]\u00d7a^[log(a)(N)]
\u3000\u3000\u7531\u6307\u6570\u7684\u6027\u8d28
\u3000\u3000a^[log(a)(MN)] = a^{[log(a)(M)] + [log(a)(N)]}
\u3000\u3000\u53c8\u56e0\u4e3a\u6307\u6570\u51fd\u6570\u662f\u5355\u8c03\u51fd\u6570\uff0c\u6240\u4ee5
\u3000\u3000log(a)(MN) = log(a)(M) + log(a)(N)
\u3000\u30003\u3001\u4e0e\uff082\uff09\u7c7b\u4f3c\u5904\u7406
\u3000\u3000MN=M\u00f7N
\u3000\u3000\u7531\u57fa\u672c\u6027\u8d281(\u6362\u6389M\u548cN)
\u3000\u3000a^[log(a)(M\u00f7N)] = a^[log(a)(M)]\u00f7a^[log(a)(N)]
\u3000\u3000\u7531\u6307\u6570\u7684\u6027\u8d28
\u3000\u3000a^[log(a)(M\u00f7N)] = a^{[log(a)(M)] - [log(a)(N)]}
\u3000\u3000\u53c8\u56e0\u4e3a\u6307\u6570\u51fd\u6570\u662f\u5355\u8c03\u51fd\u6570\uff0c\u6240\u4ee5
\u3000\u3000log(a)(M\u00f7N) = log(a)(M) - log(a)(N)
\u3000\u30004\u3001\u4e0e\uff082\uff09\u7c7b\u4f3c\u5904\u7406
\u3000\u3000M^n=M^n
\u3000\u3000\u7531\u57fa\u672c\u6027\u8d281(\u6362\u6389M)
\u3000\u3000a^[log(a)(M^n)] = {a^[log(a)(M)]}^n
\u3000\u3000\u7531\u6307\u6570\u7684\u6027\u8d28
\u3000\u3000a^[log(a)(M^n)] = a^{[log(a)(M)]*n}
\u3000\u3000\u53c8\u56e0\u4e3a\u6307\u6570\u51fd\u6570\u662f\u5355\u8c03\u51fd\u6570\uff0c\u6240\u4ee5
\u3000\u3000log(a)(M^n)=nlog(a)(M)
\u3000\u3000\u57fa\u672c\u6027\u8d284\u63a8\u5e7f
\u3000\u3000log(a^n)(b^m)=m/n*[log(a)(b)]
\u3000\u3000\u63a8\u5bfc\u5982\u4e0b\uff1a
\u3000\u3000\u7531\u6362\u5e95\u516c\u5f0f\uff08\u6362\u5e95\u516c\u5f0f\u89c1\u4e0b\u9762\uff09[lnx\u662flog(e)(x)\uff0ce\u79f0\u4f5c\u81ea\u7136\u5bf9\u6570\u7684\u5e95]
\u3000\u3000log(a^n)(b^m)=ln(b^m)\u00f7ln(a^n)
\u3000\u3000\u7531\u57fa\u672c\u6027\u8d284\u53ef\u5f97
\u3000\u3000log(a^n)(b^m) = [m\u00d7ln(b)]\u00f7[n\u00d7ln(a)] = (m\u00f7n)\u00d7{[ln(b)]\u00f7[ln(a)]}
\u3000\u3000\u518d\u7531\u6362\u5e95\u516c\u5f0f
\u3000\u3000log(a^n)(b^m)=m\u00f7n\u00d7[log(a)(b)] --------------------------------------------\uff08\u6027\u8d28\u53ca\u63a8\u5bfc \u5b8c\uff09
则n=log(a)(b)
基本性质:
1、a^(log(a)(b))=b
2、log(a)(MN)=log(a)(M)+log(a)(N);
3、log(a)(M÷N)=log(a)(M)-log(a)(N);
4、log(a)(M^n)=nlog(a)(M)
推导
1、因为n=log(a)(b),代入则a^n=b,即a^(log(a)(b))=b。
2、MN=M×N
由基本性质1(换掉M和N)
a^[log(a)(MN)] = a^[log(a)(M)]×a^[log(a)(N)]
由指数的性质
a^[log(a)(MN)] = a^{[log(a)(M)] + [log(a)(N)]}
又因为指数函数是单调函数,所以
log(a)(MN) = log(a)(M) + log(a)(N)
3、与(2)类似处理
MN=M÷N
由基本性质1(换掉M和N)
a^[log(a)(M÷N)] = a^[log(a)(M)]÷a^[log(a)(N)]
由指数的性质
a^[log(a)(M÷N)] = a^{[log(a)(M)] - [log(a)(N)]}
又因为指数函数是单调函数,所以
log(a)(M÷N) = log(a)(M) - log(a)(N)
4、与(2)类似处理
M^n=M^n
由基本性质1(换掉M)
a^[log(a)(M^n)] = {a^[log(a)(M)]}^n
由指数的性质
a^[log(a)(M^n)] = a^{[log(a)(M)]*n}
又因为指数函数是单调函数,所以
log(a)(M^n)=nlog(a)(M)
基本性质4推广
log(a^n)(b^m)=m/n*[log(a)(b)]
推导如下:
由换底公式(换底公式见下面)[lnx是log(e)(x),e称作自然对数的底]
log(a^n)(b^m)=ln(b^m)÷ln(a^n)
由基本性质4可得
log(a^n)(b^m) = [m×ln(b)]÷[n×ln(a)] = (m÷n)×{[ln(b)]÷[ln(a)]}
再由换底公式
log(a^n)(b^m)=m÷n×[log(a)(b)] --------------------------------------------(性质及推导 完)
编辑本段函数图象
1.对数函数的图象都过(1,0)点.
2.对于y=log(a)(n)函数,
①,当0<a<1时,图象上函数显示为(0,+∞)单减.随着a 的增大,图象逐渐以(1,0)点为轴顺时针转动,但不超过X=1.
②当a>1时,图象上显示函数为(0,+∞)单增,随着a的增大,图象逐渐以(1.0)点为轴逆时针转动,但不超过X=1.
3.与其他函数与反函数之间图象关系相同,对数函数和指数函数的图象关于直线y=x对称.
编辑本段其他性质
性质一:换底公式
log(a)(N)=log(b)(N)÷log(b)(a)
推导如下:
N = a^[log(a)(N)]
a = b^[log(b)(a)]
综合两式可得
N = {b^[log(b)(a)]}^[log(a)(N)] = b^{[log(a)(N)]*[log(b)(a)]}
又因为N=b^[log(b)(N)]
所以 b^[log(b)(N)] = b^{[log(a)(N)]*[log(b)(a)]}
所以 log(b)(N) = [log(a)(N)]*[log(b)(a)] {这步不明白或有疑问看上面的}
所以log(a)(N)=log(b)(N) / log(b)(a)
公式二:log(a)(b)=1/log(b)(a)
证明如下:
由换底公式 log(a)(b)=log(b)(b)/log(b)(a) ----取以b为底的对数
log(b)(b)=1 =1/log(b)(a) 还可变形得: log(a)(b)×log(b)(a)=1
在实用上,常采用以10为底的对数,并将对数记号简写为lgb,称为常用对数,它适用于求十进伯制整数或小数的对数。例如lg10=1,lg100=lg102=2,lg4000=lg(103×4)=3+lg4,可见只要对某一范围的数编制出对数表,便可利用来计算其他十进制数的对数的近似值。在数学理论上一般都用以无理数e=2.7182818……为底的对数,并将记号 loge。简写为ln,称为自然对数,因为自然对数函数的导数表达式特别简洁,所以显出了它比其他对数在理论上的优越性。历史上,数学工作者们编制了多种不同精确度的常用对数表和自然对数表。但随着电子技术的发展,这些数表已逐渐被现代的电子计算工具所取代。
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