Exponential Growth & Exponential Decay

Word Problems

Vocab

Graphs

Equations

True or False?

100

Write an exponential growth function to model the situation. A population of 422,000 increases by 12% each year.

What is y = 422000(1.12)^t

100

In the growth model below, what is the initial amount?

y=2000(1+.04)^t

2000

100

Does the graph represent exponential growth, exponential decay, or a linear model?

Exponential growth

100

Does the equation y = 4^x represent exponential growth or exponential decay?

Exponential growth because the base is "4" and that is bigger than 1!

100

In an exponential equation, if the base "b" is bigger than 1, then the graph will display exponential decay.

False! If the base "b" is greater than 1, then it will be exponential growth!

200

A total of 50,000 contestants participate in an Internet online survivor game. The game randomly kills off 20% of the contestants each day.

Write an exponential decay function that represents the population after t days.

y=50,000(.8)^t

200

In the decay model below, what is the rate(%) of decay?

y=2000(1-.6)^t

60%

200

Does the graph represent exponential growth or exponential decay?

Exponential decay

200

Does the equation y = 0.5^x represent exponential growth or exponential decay?

Exponential decay because the base is 0.5 which is smaller than 1!

200

In an exponential equation, if the base "b" is between 0 and 1, then the graph will display exponential decay.

True! If "b" is between 0 and 1, the graph will be an exponential decay graph!

300

The value of a new car is $25,000. The value decreases by 5% each year. Write a function that represents the value of the car after t years.

y=25,000(.95)^t

300

In the growth model below, what is the time in years?

y=75000(1.3)^5

5 years

300

y = 5(2)^xwhat would the f(-3)=____?

.625

5/8

300

Does the equation y = 5(2)^x represent exponential growth or exponential decay?

Exponential growth because the base is "2" and that is bigger than 1!

300

The value of a car is an example of a situation that would display exponential growth.

False; The value of a car decreases exponentially over time, so it would be exponential decay!

400

At the end of last year, the population of a town was approximately 75,000 people. The population is growing at a rate of 2.4% each year.

Write an exponential growth function that represents the number of contestants after t years.

y=75,000(1.024)^t

400

You must answer BOTH PARTS:

a) Does this model represent growth or decay?

b) In the model below, what is the rate(%)?

y=3500(.75)^t

a) decay

b) 25%

400

Does the graph represent exponential growth, exponential decay, or a linear model?

Linear Model

400

Does the equation y = 2(0.3)^x represent exponential growth or exponential decay?

Exponential decay because the base is "0.3" and that is smaller than 1!

400

The population of NYC is an example of exponential growth

True!

500

A deer population starts at 100. It loses 1/3 of its population every year.

a) What fraction of the population is left after one year?

b) What is the equation?

a) 2/3

b) y=100*(2/3)^x

500

Everybody knows you do not want to eat the last slice of cake. Therefore, everyone always cuts the last slice into a smaller and smaller piece. You know that everyone eats about (2/3)s of the cake slice leaving the rest for the next person. If you started with a slice that was 1 inch wide write the equation for the new width after x people eat from it.

y=1*(1/3)^x

500

Jimmy got money for his birthday. Jimmy can't remember how much money he got originally. He currently has 130 dollars and knows that he spent (1/3) of the money he had every week for 4 weeks.

How much money did he start with?

$658.13

500

A researcher studies deer population. He made the equation y=40*(5/8)^x, where x is the years, and y is the deer population.

What does the 40 and (5/8) mean in words?

40 is the initial population of deer when the study started.

(5/8) means that the deer population losses (3/8) of it's population every year. OR (5/8) of the original population is left after each year.

500

Why did the atheist tell the math teacher he couldn't solve exponential equations?

Because they didn't believe in higher powers.