4.1 Exponential functions (Page 4/16)

Precalculus

Page 4 / 16

Evaluating a real-world exponential model

At the beginning of this section, we learned that the population of India was about $1.25$ billion in the year 2013, with an annual growth rate of about $1.2 % .$ This situation is represented by the growth function $P (t) = 1.25 {(1.012)}^{t},$ where $t$ is the number of years since $2013.$ To the nearest thousandth, what will the population of India be in $2031?$

To estimate the population in 2031, we evaluate the models for $t = 18,$ because 2031 is $18$ years after 2013. Rounding to the nearest thousandth,

P (18) = 1.25 {(1.012)}^{18} \approx 1.549

There will be about 1.549 billion people in India in the year 2031.

Got questions? Get instant answers now!

Try It

The population of China was about 1.39 billion in the year 2013, with an annual growth rate of about $0.6 % .$ This situation is represented by the growth function $P (t) = 1.39 {(1.006)}^{t},$ where $t$ is the number of years since $2013.$ To the nearest thousandth, what will the population of China be for the year 2031? How does this compare to the population prediction we made for India in [link] ?

About $1.548$ billion people; by the year 2031, India’s population will exceed China’s by about 0.001 billion, or 1 million people.

Got questions? Get instant answers now!

Finding equations of exponential functions

In the previous examples, we were given an exponential function, which we then evaluated for a given input. Sometimes we are given information about an exponential function without knowing the function explicitly. We must use the information to first write the form of the function, then determine the constants $a$ and $b,$ and evaluate the function.

How To

Given two data points, write an exponential model.

If one of the data points has the form $(0, a),$ then $a$ is the initial value. Using $a,$ substitute the second point into the equation $f (x) = a {(b)}^{x},$ and solve for $b .$
If neither of the data points have the form $(0, a),$ substitute both points into two equations with the form $f (x) = a {(b)}^{x} .$ Solve the resulting system of two equations in two unknowns to find $a$ and $b .$
Using the $a$ and $b$ found in the steps above, write the exponential function in the form $f (x) = a {(b)}^{x} .$

Writing an exponential model when the initial value is known

In 2006, 80 deer were introduced into a wildlife refuge. By 2012, the population had grown to 180 deer. The population was growing exponentially. Write an algebraic function $N (t)$ representing the population $(N)$ of deer over time $t .$

We let our independent variable $t$ be the number of years after 2006. Thus, the information given in the problem can be written as input-output pairs: (0, 80) and (6, 180). Notice that by choosing our input variable to be measured as years after 2006, we have given ourselves the initial value for the function, $a = 80.$ We can now substitute the second point into the equation $N (t) = 80 b^{t}$ to find $b :$

\begin{array}{l} N (t) & = 80 b^{t} \\ 180 & = 80 b^{6} & Substitute using point (6, 180) . \\ \frac{9}{4} & = b^{6} & Divide and write in lowest terms . \\ b & = {(\frac{9}{4})}^{\frac{1}{6}} & Isolate b using properties of exponents . \\ b & \approx 1.1447 \begin{matrix}  \end{matrix} & Round to 4 decimal places . \end{array}

NOTE: Unless otherwise stated, do not round any intermediate calculations. Then round the final answer to four places for the remainder of this section.

The exponential model for the population of deer is $N (t) = 80 {(1.1447)}^{t} .$ (Note that this exponential function models short-term growth. As the inputs gets large, the output will get increasingly larger, so much so that the model may not be useful in the long term.)

We can graph our model to observe the population growth of deer in the refuge over time. Notice that the graph in [link] passes through the initial points given in the problem, $(0, 80)$ and $(6, 180) .$ We can also see that the domain for the function is $[0, \infty),$ and the range for the function is $[80, \infty) .$

Graph of the exponential function, N(t) = 80(1.1447)^t, with labeled points at (0, 80) and (6, 180). — Graph showing the population of deer over time, $N (t) = 80 {(1.1447)}^{t},$ $t$ years after 2006

Got questions? Get instant answers now!

Questions & Answers

how does the planets on our solar system orbit

cheten Reply

how many Messier objects are there in space

satish Reply

did you g8ve certificate

Richard Reply

what are astronomy

Issan Reply

Astronomy (from Ancient Greek ἀστρονομία (astronomía) 'science that studies the laws of the stars') is a natural science that studies celestial objects and phenomena. It uses mathematics, physics, and chemistry in order to explain their origin and evolution.

Rafael

vjuvu

Elgoog

what is big bang theory?

Rosemary

what type of activity astronomer do?

Rosemary

Richard

the big bang theory is a theory which states that all matter was compressed together in one place the matter got so unstable it exploded releasing All its contents in the form of hydrogen

Roaul

I want to be an astronomer. That's my dream

Astrit

Who named the the whole galaxy?

Shola Reply

solar Univers

GPOWER

what is space

Richard

what is the dark matter

Richard

what are the factors upon which the atmosphere is stratified

Nicholas Reply

is the big bang the sun

Folakemi Reply

Sokak

bigbang is the beginning of the universe

Sokak

but thats just a theory

Sokak

nothing will happen, don't worry brother.

Vansh

what does comet means

GANGAIN Reply

these are Rocky substances between mars and jupiter

GANGAIN

Comets are cosmic snowballs of frozen gases , rock and dust that orbit the sun. They are mostly found between the orbits of Venus and Mercury.

Aarya

hllo

John

qt rrt

John

r u there

John

hey can anyone guide me abt international astronomy olympiad

sahil

how can we learn right and true ?

Govinda Reply

why the moon is always appear in an elliptical shape

Gatjuol Reply

Because when astroid hit the Earth then a piece of elliptical shape of the earth was separated which is now called moon.

Hemen

what's see level?

lidiya Reply

Did you mean eye sight or sea level

Minal

oh sorry it's sea level

lidiya

according to the theory of astronomers why the moon is always appear in an elliptical orbit?

Gatjuol

hi !!! I am new in astronomy.... I have so many questions in mind .... all of scientists of the word they just give opinion only. but they never think true or false ... i respect all of them... I believes whole universe depending on true ...থিউরি

Govinda

hello

Jackson

Elyana

we're all stars and galaxies a part of sun. how can science prove thx with respect old ancient times picture or books..or anything with respect to present time .but we r a part of that universe

w astronomy and cosmology!

Michele

another theory of universe except big ban

Albash Reply

how was universe born

Asmit Reply

there many theory to born universe but what is the reality of big bang theory to born universe

Asmit

what is the exact value of π?

Nagalakshmi

by big bang

universal

there are many theories regarding this it's on you believe any theory that you think is true ex. eternal inflation theory, oscillation model theory, multiple universe theory the big bang theory etc.

Aarya

I think after Big Bang!

Michele

from where on earth could u observe all the stars during the during the course of an year

Karuna Reply

I think it couldn't possible on earth

Nagalakshmi

in this time i don't Know

Michele

is that so. the question was in the end of this chapter

Karuna

in theory, you could see them all from the equator (though over the course of a year, not at pne time). stars are measured in "declination", which is how far N or S of the equator (90* to -90*). Polaris is the North star, and is ALMOST 90* (+89*). So it would just barely creep over the horizon.

Christopher

Got questions? Join the online conversation and get instant answers!

Jobilize.com Reply

<< Chapter < Page Page > Chapter >>

Practice Key Terms 4

Read also:

Get Jobilize Job Search Mobile App in your pocket Now!

100% Free Mobile Applications
Receive real-time job alerts and never miss the right job again

Source: OpenStax, Precalculus. OpenStax CNX. Jan 19, 2016 Download for free at https://legacy.cnx.org/content/col11667/1.6

Google Play and the Google Play logo are trademarks of Google Inc.

Notification Switch

Would you like to follow the 'Precalculus' conversation and receive update notifications?

Ask

	6 Applying the compound-interest formula By OpenStax Read Online Course
	4 Defining exponential growth By OpenStax Read Online Course
	21 AP Key Terms 21 Lymphatic Immune System By OpenStax Start Key Terms
	5 AP 05 Integumentary System MCQ By OpenStax Start Quiz
	8 Sociology 08 Media and Technology MCQ By OpenStax Start Quiz
	Social Organization Kinship By Richley Crapo Start Assignment
©flickr: Luis	Chemistry Final Review By Madison Christian Start Exam
	19 AP 19 Cardiovascular System Heart Essay By OpenStax Start Flashcards
	How much do you love him? By Zarina Chocolate Start Quiz
	Evolutionary Biology Ecology By Olivia D'Ambrogio Start Quiz
	Young Economist MCQ Test By Robert Murphy Start Test
	2 Muscular System MCQ By Nick Swain Start Quiz