课程： 14.11 答复-第11章:指数和对数函数

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答复 - Ch 11:指数和对数函数

Section 11.2 One-to-One Functions
::第11.2款.一对一职能

Review
::回顾

Not a function
::非函数函数

Function, but not one-to-one
::函数, 但不是一对一

Yes, a one-to-one function
::是, 一对一函数
12, 6, 18
20, 21, 110

A function, but not one-to-one
::函数,但不是一对一

Yes, a one-to-one function
::是, 一对一函数

Yes, a one-to-one function
::是, 一对一函数

If $\begin{align*}n\end{align*}$ is even, it is not one-to-one, but is still a function.
::如果n为偶数,则不是一对一,但仍是一个函数。

Not a function of $\begin{align*}x\end{align*}$
::不是 x 函数的 x

Not a function
::非函数函数

Function, but not one-to-one
::函数, 但不是一对一

Not a function
::非函数函数

Yes, a one-to-one function
::是, 一对一函数

Yes, a one-to-one function
::是, 一对一函数

Explore More
::探索更多

If a graph passes the horizontal line test, the graph represents a one-to-one function.
::如果图形通过水平线测试,该图代表一对一的函数。

Answers will vary but could include, for example, any linear function in the form of $\begin{align*}y=mx+b,\end{align*}$ or any function that passes the horizontal line test.
::答案会有所不同,但可以包括,例如,y=mx+b形式的任何线性函数,或通过水平线测试的任何函数。

Answers will vary but could include, for example, any function in the form $\begin{align*}y={x}^{n},\end{align*}$ where n is even. A function is not one-to-one if it fails the horizontal line test.
::答案会有所不同,但可以包括,例如,以y=xn形式出现的任何函数,n是偶数。如果一个函数不通过水平线测试,则该函数不是一对一。

A function is strictly increasing when, if $\begin{align*}{x}_{1}<{x}_{2},\end{align*}$ then $\begin{align*}f({x}_{1})<f({x}_{2})\end{align*}$ . All functions that are strictly increasing are one-to-one. A function is strictly decreasing if, when $\begin{align*}{x}_{1}<{x}_{2}\end{align*}$ , then $\begin{align*}f\left({x}_{1}\right)>f\left({x}_{2}\right).\end{align*}$ All functions that are strictly decreasing are one-to-one.
::如果 x1 < x2, 然后f(x1) < f(x2) , 函数将严格递增。如果, 当 x1 < x2, 然后f(x1) > f(x2) 所有严格递增的函数都是一对一时, 函数将严格递减。如果, 当 x1 < x2, 然后f(x1) > f(x2) 所有严格递减的函数都是一对一时, 函数将严格递减。

Section 11.3 Inverse Functions
::第11.3节反向职能

Review
::回顾

$\begin{align*}\left(3,2\right),\left(8,\text{-}4\right),\left(9,\text{-}5\right),\left(1,1\right).\end{align*}$ Yes, the inverse is a function.
:3,2,(8,4),(9,5),(1,1)。是的,反之亦然。

$\begin{align*}\left(\text{-}6,9\right),\left(\text{-}5,8\right),\left(3,7\right),\left(3,4\right).\end{align*}$ No, the inverse is not a function.
:6,9,(5,8,),(3,7,),(3,4(4,4)。)不,反之,不是一种职能。

$\begin{align*}\left(\text{-}2,\text{-}4\right),\left(0,\text{-}3\right),\left(1,\text{-}1\right),\left(3,0\right),\left(4,4\right).\end{align*}$ Yes, the inverse is a function.
:二)-4,(0)-3,(1)-1,(3)-0,(4)4,是的,反之亦然。

$\begin{align*}y=\tfrac{1}{6}x+\tfrac{3}{2}\end{align*}$
::y=16x+32

$\begin{align*}y=\tfrac{1-3x}{4x}\end{align*}$ ; $\begin{align*}x\neq 0\end{align*}$
::y= 1 - 3x4x; x% 0

$\begin{align*}y={x}^{2}-7\end{align*}$
::y=x2-7 y=x2-7

$\begin{align*}y=\pm \sqrt{x-5}; \ x\ge 5\end{align*}$
::yx - 5; x=5

$\begin{align*}y=\sqrt[3]{x+11}\end{align*}$
::y=3x+11

$\begin{align*}y={x}^{5}-16\end{align*}$
::y=x5 - 16 y=x5 - 16

$\begin{align*}y=\tfrac{7}{x-1}; \ x\neq 1\end{align*}$
::y= 7x- 1; x% 1

$\begin{align*}y=\frac{8x}{x-1};x\neq 1\end{align*}$
::y=8xx- 1;x% 1

Yes, since $\begin{align*}f(g(x))=x\end{align*}$ .
::是,自f(g(x))=x

No, since $\begin{align*}f(g(x))\neq x\end{align*}$ .
::否,自f(g(x))___x

No, since $\begin{align*}f(g(x))\neq x\end{align*}$ .
::否,自f(g(x))___x

Yes, since $\begin{align*}f(g(x))=x\end{align*}$ .
::是,自f(g(x))=x

Explore More
::探索更多

$\begin{align*}C=\frac{5}{9}F-32\end{align*}$ . If you substitute $\begin{align*}F=\frac{9}{5}C+32\end{align*}$ into the equation $\begin{align*}C=\frac{5}{9}F-32\end{align*}$ , you end up with $\begin{align*}C=C\end{align*}$ .
::C=59F-32. 如果在方程式C=59F-32中用 F=95C+32替代F=95C+32,最后用C=C。

No, they do not.
::不,他们没有。

$\begin{align*}r\cong 1.954\end{align*}$ or $\begin{align*}r=\frac{2\sqrt{3\pi }}{\pi }.\end{align*}$
::r1.954或r=23。

$\begin{align*}d={p}^{\frac{3}{2}}.\end{align*}$
::d=p32。 =p32。 =p32。 =p32。

Finding the inverse of $\begin{align*}y=x\end{align*}$ , you would switch $\begin{align*}x\end{align*}$ and $\begin{align*}y\end{align*}$ in the equation, which would give you the same equation.
::查找 y=x 的反方向, 您可以在方程中切换 x 和 y , 这样您就会得到相同的方程。

If a function is a constant, such as $\begin{align*}f(x)=b\end{align*}$ , then it does not have an inverse, but it will also fail the horizontal line test, so it is not actually a function.
::如果函数是一个常数,如f(x)=b,则该函数没有反函数,但也会失败水平线测试,因此它实际上不是一个函数。

Let $\begin{align*}U\end{align*}$ be the number of U.S. dollars, and $\begin{align*}B\end{align*}$ be the number of bitcoins. Then $\begin{align*}U=B\times \frac{1U}{0.00082B},\end{align*}$ and the inverse would be $\begin{align*}B=U\times \frac{0.00082B}{1U},\end{align*}$ and 1 bitcoin is worth $1,219.51.
::以美元计数, B 以比特币计数。然后U=Bx1UN000082B, 反比特币为B=Ux0.00082BU, 1比特币值1 219.51美元。

Section 11.4 Exponential Functions
::第11.4节

Review
::回顾

a. No. b. No. c. No. d. Yes, $\begin{align*}y=\text{-}{2}^{x}.\end{align*}$
::a. b. b. c. d. 是,y=-2x.

a. Growth. b. Growth. c. Decay. d. Growth. e. Decay
::a. 增长b. 增长c. 增长c. 下降 d. 增长e. 下降

$\begin{align*}y\end{align*}$ -intercept: $\begin{align*}\left(0,1\right)\end{align*}$ ; Horizontal Asymptote: $\begin{align*}y=0\end{align*}$ ; Domain: all real numbers; Range: $\begin{align*}y>0\end{align*}$ .

::y 拦截 : (0, 1) ; 水平单点 : y=0; 域 : 所有真实数字; 范围 : y>0 。

$\begin{align*}y\end{align*}$ -intercept: $\begin{align*}\left(0,1\right)\end{align*}$ ; Horizontal Asymptote: $\begin{align*}y=0\end{align*}$ ; Domain: all real numbers; Range: $\begin{align*}y>0\end{align*}$ .

::y 拦截 : (0, 1) ; 水平单点 : y=0; 域 : 所有真实数字; 范围 : y>0 。

$\begin{align*}y\end{align*}$ -intercept: $\begin{align*}\left(0,\text{-}1\right)\end{align*}$ ; Horizontal Asymptote: $\begin{align*}y=0\end{align*}$ ; Domain: all real numbers; Range: $\begin{align*}y<0\end{align*}$ .

::y 截取 : (0, - 1); 水平渐渐淡化 : y=0; 域 : 所有真实数字 ; 范围 : y < 0 。

$\begin{align*}y\end{align*}$ -intercept: $\begin{align*}\left(0,\text{-}1\right)\end{align*}$ ; Horizontal Asymptote: $\begin{align*}y=\text{-}2\end{align*}$ ; Domain: all real numbers; Range: $\begin{align*}y>\text{-}2\end{align*}$ .

::y 拦截 : (0 , - 1 ); 水平单点 : y= 2; 域 : 所有实际数字; 范围 : y> 2 。

$\begin{align*}y\end{align*}$ -intercept: $\begin{align*}\left(0,2\right)\end{align*}$ ; Horizontal Asymptote: $\begin{align*}y=1\end{align*}$ ; Domain: all real numbers; Range: $\begin{align*}y>1\end{align*}$ .

::y 拦截 : (0 , 2 ) ; 水平单点 : y= 1; 域 : 所有真实数字; 范围 : y > 1 。

$\begin{align*}y\end{align*}$ -intercept: $\begin{align*}\left(0,216\right)\end{align*}$ ; Horizontal Asymptote: $\begin{align*}y=0\end{align*}$ ; Domain: all real numbers; Range: $\begin{align*}y>0\end{align*}$ .

::y 拦截 0, 216 ) ; 水平定时 : y=0; 域 : 所有实际数字; 范围 : y>0 。

$\begin{align*}y\end{align*}$ -intercept: $\begin{align*}\left(0,0.64\right)\end{align*}$ ; Horizontal Asymptote: $\begin{align*}y=0\end{align*}$ ; Domain: all real numbers; Range: $\begin{align*}y>0\end{align*}$ .

::y 拦截 : (0,0. 0. 64); 水平淡化 : y=0; 域 : 所有真实数字; 范围 : y>0 。

y-intercept: $\begin{align*}\left(0,2.75\right)\end{align*}$ ; Horizontal Asymptote: $\begin{align*}y=3\end{align*}$ ; Domain: all real numbers; Range: $\begin{align*}y<3\end{align*}$ .

::y 拦截 : (0, 2. 75); 水平淡化 : y= 3; 域 : 所有真实数字; 范围 : y < 3 。

$\begin{align*}y\end{align*}$ -intercept: $\begin{align*}\left(0,338\right)\end{align*}$ ; Horizontal Asymptote: $\begin{align*}y=\text{-}5\end{align*}$ ; Domain: all real numbers; Range: $\begin{align*}y>\text{-}5\end{align*}$ .

::y 拦截 0, 338 ) ; 水平单数 : y= 5; 域 : 所有实际数字; 范围 : y> 5 。

$\begin{align*}y\end{align*}$ -intercept: $\begin{align*}\left(0,5.78\right)\end{align*}$ ; Horizontal Asymptote: $\begin{align*}y=4\end{align*}$ ; Domain: all real numbers; Range: $\begin{align*}y>4\end{align*}$ .

::y 界面 : (0, 5. 78); 水平单数 : y= 4; 域 : 所有真实数字; 范围 : y> 4 。

$\begin{align*}y\end{align*}$ -intercept: $\begin{align*}\left(0,1.99\right)\end{align*}$ ; Horizontal Asymptote: $\begin{align*}y=2\end{align*}$ ; Domain: all real numbers; Range: $\begin{align*}y<2\end{align*}$ .

::y 拦截 : (0, 1. 99); 水平淡化 : y=2; 域 : 所有真实数字; 范围 : y < 2 。

Explore More
::探索更多

a. 63 games. b. 67 games.
::a. 63场比赛. b. 67场比赛。

a. $16,288.95. b. $26,532.98.
::a. 16 288.95美元b. 26 532.98美元。

7,737 people
::7 737,373人

a. $\begin{align*}y=50{\left(0.90\right)}^{x}.\end{align*}$ b. $29.52. c. after about 6.5 weeks.
::ay=50(0.90)x.b.29.52.c.在大约6.5周之后。

$\begin{align*}1.845\times {10}^{19}\end{align*}$ grains of rice.
::1.845×1019谷物大米。

8.824978

$\begin{align}{2}^{3.14}\end{align}$	8.8152409
$\begin{align}{2}^{3.141}\end{align}$	8.8213533
$\begin{align}{2}^{3.1415}\end{align}$	8.8244111
$\begin{align}{2}^{3.14159}\end{align}$	8.8249616
$\begin{align}{2}^{3.141592}\end{align}$	8.8249738
$\begin{align}{2}^{\pi }\end{align}$	8.8249778

7. This graph represents an exponential function, since there is a common ratio of 1.06. The savings increase as the years increase. (Please note this sample graph is based on years since 2010.)
::7. 本图代表指数函数,因为共同比率为1.06,随着年数增加,节省额会增加。 (请注意,本样本图以2010年以来的年份为基础。 )

Section 11.5 The Number e
::第11.5节编号e

Review
::回顾

a. Growth since $\begin{align*}x\end{align*}$ is positive. b. Growth since there is a reflection in the $\begin{align*}x\end{align*}$ -axis. c. Decay since $\begin{align*}x\end{align*}$ is negative. d. Decay since $\begin{align*}x\end{align*}$ is negative.
::a. 由于x为正数而增长;b. 由于X轴反射为负数而增长;c. 由于x为负数而衰减;d. 由于x为负数而衰减;b. 由于x为负数而增长;c. 由于x为负数而衰减。

$\begin{align*}{e}^{9}\end{align*}$
::e9

$\begin{align*}\frac{{e}^{4}}{4}\end{align*}$
::e44

$\begin{align*}5{e}^{\text{-}7}\end{align*}$
::5e-7

$\begin{align*}6{e}^{1}\end{align*}$
::6e1

$\begin{align*}\frac{9}{16{e}^{6}}\end{align*}$
::916e6

Explore More
::探索更多

a. 173,325 people. b. Between 2024 and 2025, the population will double.
::a. 173 325人b. 在2024年至2025年期间,人口将翻一番。

a. $19,666. b. $7,530.
::a. 19 666美元,b. 7 530美元。

a. $\begin{align*}A=7,\!500{e}^{0.045t}.\end{align*}$ b. $171. c. $10,750.
::a. A=7 500e0.045t. b. 171.c. 10 750美元。

6,000 g
::6 000克 6 000克
$105.17
2.716666667
42.10

Section 11.6 Evaluating Logarithms
::第11.6节评价对数

Review
::回顾

$\begin{align*}{log}_{3}5=x\end{align*}$
::log35=x

$\begin{align*}{log}_{a}b=x\end{align*}$
::对数ab=x

$\begin{align*}{log}_{5}2.5=x\end{align*}$
::log52.5=x

$\begin{align*}{2}^{x}=32\end{align*}$
::2x=32

$\begin{align*}{\left(\frac{1}{3}\right)}^{\text{-}2}=x\end{align*}$
:13)-2=x

$\begin{align*}{a}^{b}=y\end{align*}$
::ab=y
2
-3
-1
6
6
0
2.079
3.585
1.445

Explore More
::探索更多

230.71 degrees
::230.71度

249.00 km/hr
::249.00公里/小时

1,150.51 N
::1 150.51 N

Approximately 37.22 lbs
::约37.22磅

Section 11.7 Logarithmic Functions
::第11.7节对数函数

Review
::回顾

Asymptote: $\begin{align*}x=0\end{align*}$ ; Domain: $\begin{align*}\left(0,\infty \right)\end{align*}$ ; Range: $\begin{align*}\left(\text{-}\infty ,\infty \right)\end{align*}$ .

::时点 : x=0; 域 : (0, ); 范围 : (- , ) 。

Asymptote: $\begin{align*}x=0\end{align*}$ ; Domain: $\begin{align*}\left(0,\infty \right)\end{align*}$ ; Range: $\begin{align*}\left(\text{-}\infty ,\infty \right)\end{align*}$ .

::时点 : x=0; 域 : (0, ); 范围 : (- , ) 。

Asymptote: $\begin{align*}x=\text{-}1\end{align*}$ ; Domain: $\begin{align*}\left(\text{-}1,\infty \right)\end{align*}$ ; R ange: $\begin{align*}\left(\text{-}\infty ,\infty \right)\end{align*}$ .

::时点 : x=-1; 域 : (-1) ; 范围 : (-) , ) 。

Asymptote: $\begin{align*}x=0\end{align*}$ ; Domain: $\begin{align*}\left(0,\infty \right)\end{align*}$ ; R ange: $\begin{align*}\left(\text{-}\infty ,\infty \right)\end{align*}$ .

::时点 : x=0; 域 : (0, ); 范围 : (- , ) 。

Asymptote: $\begin{align*}x=1\end{align*}$ ; Domain: $\begin{align*}\left(1,\infty \right)\end{align*}$ ; R ange: $\begin{align*}\left(\text{-}\infty ,\infty \right)\end{align*}$ .

::时间点 : x=1; 域 : (1, ); 范围 : (- , ) 。

Asymptote: $\begin{align*}x=\text{-}3\end{align*}$ ; Domain: $\begin{align*}\left(\text{-}3,\infty \right)\end{align*}$ ; R ange: $\begin{align*}\left(\text{-}\infty ,\infty \right)\end{align*}$ .

::时点 : x=-3; 域 : (3) ; 范围 : (-) , 。

Asymptote: $\begin{align*}x=2\end{align*}$ ; Domain: $\begin{align*}\left(\text{-}\infty ,2\right)\end{align*}$ ; R ange: $\begin{align*}\left(\text{-}\infty ,\infty \right)\end{align*}$ .

::时点 : x=2; 域 : (- , 2); 范围 : (- , ) 。

Yes
::是是

No
::否无

No
::否无

Explore More
::探索更多

-3.01 Db
::-3.01 Db

301.03 km/s
::301.03公里/秒

10 times
::10 次 10 次

The graph would be horizontally translated $\begin{align*}a\end{align*}$ units to the right.
::图表将水平转换成向右的单位。

The graph would be reflected in the $\begin{align*}x\end{align*}$ -axis and have a stretch of $\begin{align*}a\end{align*}$ units.
::该图将反映在x轴中,并有一个单位的伸展。

Section 11.8 Logarithm Properties
::第11.8节对数属性

Review
::回顾

$\begin{align*}3x\end{align*}$
::3x 3进

$\begin{align*}\text{-}x\end{align*}$
::-xx

$\begin{align*}x+3\end{align*}$
::x+3 x+3

$\begin{align*}2(x-1)\end{align*}$
::2(x-1)

$\begin{align*}x-7\end{align*}$
::x-7 次-7 次

$\begin{align*}\text{-}6x\end{align*}$
::-6x6x

$\begin{align*}2{\log_{7}{y}}\end{align*}$
::2log7y 2log7y

$\begin{align*}3\left({\log}_{4}{9}+{\log}_{4}{x}\right)\end{align*}$
::3(log49+log4x)

$\begin{align*}\ln{(5)}\end{align*}$ or 1.609
:5) 或 1.609

$\begin{align*}{\log}_{11}{2}\end{align*}$ or 0.2891
::log112 或 0.2891

$\begin{align*}{\log}_{12}{5}+2{\log}_{12}{z}\end{align*}$
::log125+2log12z

$\begin{align*}{\log}_{6}{5}+{\log}_{6}{x}\end{align*}$
::对数 65+log6x

$\begin{align*}{\log}_{3}{a}+{\log}_{3}{b}+{\log}_{3}{c}\end{align*}$
::对数 3a+log3b+log3c

$\begin{align*}{\log}_{9}{x}+{\log}_{9}{y}-{\log}_{9}{5}\end{align*}$
::log9x+log9y-log95

%7D"> $\begin{align*}\log{(2)}+\log{(x)}-\log{(y)}\end{align*}$
::log(2)+log(x) -log

$\begin{align*}{\log}_{4}{5}-\left({\log}_{4}{9}+{\log}_{4}{y}\right)\end{align*}$
::log45 - (log49+log4y)

$\begin{align*}y=\ln{\left(\frac{x}{3}\right)}-2\end{align*}$
::y=ln( x3)- 2

$\begin{align*}f(x)=7\ln{(5x)}\end{align*}$
:xx)=7ln(5x)

$\begin{align*}y=\tfrac{1}{2}\left(\ln{(x-2)}+3\right)\end{align*}$
::y=12( ln(x-2)+3)

$\begin{align*}g(x)=\frac{1}{3}({5}^{x}+1)\end{align*}$
::g(x)=13(5x+1)

$\begin{align*}y=\text{-}2\cdot {10}^{x}\end{align*}$
::y=-210x

$\begin{align*}y=\frac{{e}^{x+2}}{4}\end{align*}$
::y=ex+24 y=ex+24

Explore More
::探索更多

Answers will vary, but should include examples of the warnings about a log raised to a power, an exponent of a log moved in front of multiple logs, and incorrect uses of the quotient and product rules.
::答复会各有不同,但应包括警告的例子,警告的对象是电源的日志、在多个日志前移动的日志的标语、以及错误使用商数和产品规则。

Yes; you are just applying the power rule.
::是的,你只是在应用权力规则。

In the last step, $\begin{align*}\log\left(\frac{1}{2}\right)\neq \frac{1}{2}\end{align*}$ and $\begin{align*}\log\left(\frac{1}{8}\right)\neq \frac{1}{8}\end{align*}$ . In fact, there's an inverse relationship between the two values.
::在最后一步,对数( 12) \\\ 12 和对数( 18) \\\ 18。事实上, 这两个值之间存在反向关系。

Section 11.9 Simplifying and Expanding Logarithms
::第11.9节简化和扩大对数

Review
::回顾

%5Cright)"> $\begin{align*}2\left(\log(3)+\log(x)-\log(y)\right)\end{align*}$
::2(log(3)+log(x)-log))

%7D-4%7B%5Clog%7D_%7B8%7D%7B(z)%7D"> $\begin{align*}3{\log}_{8}{(x)}+2{\log}_{8}{(y)}-4{\log}_{8}{(z)}\end{align*}$
::3log8(x)+2log8-4log8(z)

%7D%5Cright)"> $\begin{align*}2\left(2+4{\log}_{5}{(x)}-{\log}_{5}{(y)}\right)\end{align*}$
::2(2+4log5(x)-)

%5Cright)"> $\begin{align*}\text{-}2\left(\ln(6)+\ln(x)-3\ln(y)\right)\end{align*}$
:2)(6)+ln(xx)-3ln

%5Cright)"> $\begin{align*}6\left(5-2\ln(x)-3\ln(y)\right)\end{align*}$
::6(5--2ln(x)-3ln)

$\begin{align*}{\log}_{6}{({x}^{2}{y}^{5})}\end{align*}$
::对数 6(x2y5)

$\begin{align*}{\log}_{3}{\left(\tfrac{6y}{4}\right)}\end{align*}$ or $\begin{align*}{\log}_{3}{\left(\tfrac{3y}{2}\right)}\end{align*}$
::log3( 6y4) 或log3( 3y2)

$\begin{align*}\log{\left(\tfrac{12{y}^{2}}{x}\right)}\end{align*}$
::日志( 12y2x)

$\begin{align*}{\log}_{6}{\left(\tfrac{x}{y}\right)}\end{align*}$
::对数 6(xy)

$\begin{align*}\log{\left(\tfrac{x}{y}\right)}^{3}\end{align*}$
::log(xy)3 对数

$\begin{align*}\log\left(\tfrac{\sqrt{x+1}}{{y}^{3}}\right)\end{align*}$
::日志(x+1y3)

$\begin{align*}{\log}_{2}{\left({y}^{4}x\right)}\end{align*}$
::log2(y4x)

$\begin{align*}{\log}_{2}{{\left(\tfrac{{5\left(x-3\right)}^{10}}{y}\right)}^{\frac{1}{5}}}\end{align*}$
::log2( 5( x- 3) 10y) 15

$\begin{align*}{\left({log}_{3}{\left(\tfrac{\sqrt{y}}{\sqrt[3]{x}\cdot z}\right)}\right)}^{4}\end{align*}$
:log3(y3xz))4

Section 11.10 Solving Exponential Equations
::第11.10节解决指数等价物

Review
::回顾

2.594
2.219
6.492
5.424
0.285
1.165
3.142
4.869
1.5
3.5
1
3
6
3
2

Explore More
::探索更多

$1,293.83
$39,419.18

Section 11.11 Solving Logarithmic Equations
::第11.11节解决对数等数

Review
::回顾

32,768
498.831
86
170
1.132
1.442

2 is a solution, and -7 is extraneous.
::2是解决办法,7是无关紧要的。

No solution
::无解决方案
8
27
2
3.272

$\begin{align*}\tfrac{4}{3}\end{align*}$ is a solution, and $\begin{align*}\text{-}\tfrac{1}{2}\end{align*}$ is extraneous.
::43是一个解决方案, 而 -12是无关紧要的。

8.633 is a solution, and -4.633 is extraneous.
::8.633是一种解决办法,而-4.633是无关紧要的。
6

Explore More
::探索更多

$\begin{align*}3.16\times {10}^{\text{-}6}\end{align*}$
0.316

a. 251.2. b. 1,584.9
::a. 251.2.b. 1 584.9

Section 11.12 Exponential Growth and Decay Models
::第11.12节指数增长和衰减模型

Review
::回顾

$61,600
$8,089

Yes
::是是
$ 31,200
$ 143,000
$377,000

168,156 people
::168 156人

15 years
::15岁

0.195 grams
::0.195克

747 rabbits
::747只兔子

a. $\begin{align*}A={A}_{0}{e}^{\text{-}0.433217t}\end{align*}$ . b. 1.719383 grams. c. 6.815673 grams.
::a. A=A0e-0.433217t. b. 1.719383克. c. 6.81673克。
0.076017
$35,476

Section 11.13 Compound Interest
::第11.13款复合利息

Review
::回顾

$17,890
$10,759
$40,870
$16,405
$18,529
$7,800
7%
$3,831.14

No, the interest rate is higher at his current bank (5.99%).
::不,他的现期银行利率较高(5.99%)。
$6,127.38

Section 11.14 Connections: How Many People Are Too Many?
::第11.14节:关联:有多少人太多?

$\begin{align*}y=2.24\times {10}^{\text{-}8}{\left(1.0167\right)}^{x}\end{align*}$
::y=2.24×10-8(1.0167x)

$\begin{align*}y=1.20\times {10}^{\text{-}4}{\left(1.0124\right)}^{x}\end{align*}$
::y=1. 20x10-4(1.0124)x

Model 1: 28.5 billion. Model 2: 20.8 billion
::模式1:285亿,模式2:208亿

Answers will vary, but the predicted model for years 1950 through 2012 is $\begin{align*}y=1.231\times {10}^{\text{-}8}{\left(1.017\right)}^{x},\end{align*}$ which gives a population of 32 billion in 2100.
::答案将有所不同,但1950年至2012年的预测模型为y=1.231x10-8(1.017x),2100年人口为320亿。

$\begin{align*}2.09\times {10}^{7}\end{align*}$ feet
::2.09×107英尺

$\begin{align*}5.49\times {10}^{15}{ft}^{2}\end{align*}$
::5.49×1015ft2

$\begin{align*}7.08\times {10}^{14}{ft}^{2}\end{align*}$
::7.08×1014ft2

$\begin{align*}7.08\times {10}^{12}{ft}^{2}\end{align*}$
::7.08×1012ft2

Model 1: 2850. Model 2: 3133.
::模型1:2850 模型2:3133。

Section 11.15 Connections: Are You an Acid or a Base?
::第11.15节连接:你是酸类还是碱类?

$\begin{align*}\left[{H}^{+}\right]=2.51\times {10}^{\text{-}8}\end{align*}$ when the pH is 7.6, and $\begin{align*}\left[{H}^{+}\right]=3.55\times {10}^{\text{-}8}\end{align*}$ when the pH is 7.45.
::[H+]=2.51×10-8,pH值为7.6,[H+]=3.55×10-8,pH值为7.45。

$\begin{align*}\left[{H}^{+}\right]=7.94\times {10}^{\text{-}8}\end{align*}$ when the pH is 7.1, and $\begin{align*}\left[{H}^{+}\right]=4.47\times {10}^{-8}\end{align*}$ when the pH is 7.35.
::[H+]=7.94×10-8,pH值为7.1;和[H+]=4.47×10-8,pH值为7.35。

章节大纲

常规

答复 - Ch 11:指数和对数函数

Section 11.2 One-to-One Functions ::第11.2款.一对一职能

Section 11.3 Inverse Functions ::第11.3节 反向职能

Section 11.4 Exponential Functions ::第11.4节

Section 11.5 The Number e ::第11.5节 编号e

Section 11.6 Evaluating Logarithms ::第11.6节 评价对数

Section 11.7 Logarithmic Functions ::第11.7节 对数函数

Section 11.8 Logarithm Properties ::第11.8节对数属性

Section 11.9 Simplifying and Expanding Logarithms ::第11.9节 简化和扩大对数

Section 11.10 Solving Exponential Equations ::第11.10节 解决指数等价物

Section 11.11 Solving Logarithmic Equations ::第11.11节 解决对数等数

Section 11.12 Exponential Growth and Decay Models ::第11.12节 指数增长和衰减模型

Section 11.13 Compound Interest ::第11.13款 复合利息

Section 11.14 Connections: How Many People Are Too Many? ::第11.14节:关联:有多少人太多?

Section 11.15 Connections: Are You an Acid or a Base? ::第11.15节连接:你是酸类还是碱类?

Section 11.2 One-to-One Functions
::第11.2款.一对一职能

Section 11.3 Inverse Functions
::第11.3节反向职能

Section 11.4 Exponential Functions
::第11.4节

Section 11.5 The Number e
::第11.5节编号e

Section 11.6 Evaluating Logarithms
::第11.6节评价对数

Section 11.7 Logarithmic Functions
::第11.7节对数函数

Section 11.8 Logarithm Properties
::第11.8节对数属性

Section 11.9 Simplifying and Expanding Logarithms
::第11.9节简化和扩大对数

Section 11.10 Solving Exponential Equations
::第11.10节解决指数等价物

Section 11.11 Solving Logarithmic Equations
::第11.11节解决对数等数

Section 11.12 Exponential Growth and Decay Models
::第11.12节指数增长和衰减模型

Section 11.13 Compound Interest
::第11.13款复合利息

Section 11.14 Connections: How Many People Are Too Many?
::第11.14节:关联:有多少人太多?

Section 11.15 Connections: Are You an Acid or a Base?
::第11.15节连接:你是酸类还是碱类?