Exponential Functions Jeopardy Template

Exponents

Growth or Decay

Compound Interest

Exponential Functions

Exponential Equations

100

37⁰

What is 1?

100

John has a population of two rabbits. Each month his rabbit population doubles. What will the population be after 4 months.

What is 32?

100

What is the formula for compound interest

What is

A(x)=P(1+(r/n))^(nt)

100

Evaluate f(x) = 4(3)^x for x = 2.

What is 36?

100

Solve this equation for x 2^x = 16

What is x = 4

200

x⁴ * x⁵

What is x⁹?

200

Micah has a rabbit population of 2 rabbits. Every month a pair of rabbits has four babies. Write an equation to represent this model.

What is

2(3)^x

200

Find the balance in the account after the given period. $8000 principal earning 3% compounded annually, 6 years.

What is $9552.42

200

The population of a city is 35,000 and decreases by 4% each year due to a zombie infestation. What will the population be after 15 years.

What is The population will be 18,973?

200

10(3)^x = 90

What is x = 2

300

-(15p)⁰

What is 1?

300

The population of Janesville is 30,000. Every year it decreases by 30%. Write an equation to represent this situation.

What is

P(x)=30,000(1-.3)^x

300

Find the balance in the account. $3000 deposit earning 3.3% compounded monthly, after 2 years.

What is $3204.39

300

The table show water in a bathtub at different times. Min. 0 1 2 3 Gal 63 45 27 9 Is the table representing a linear or exponential function? What this the common difference or ratio?

What is Linear, common difference -18

300

6^(x+1) = 36

What is x = 1

400

4^-2h^-4j^3

What is

j^3/(16h^4)

j^3 ____ 16h^4

400

The population of the Harbor School increases by 15% every three years. If the population today is 500, write an equation that can help predict the population after x years.

What is

H(x)=500(1.15)^(x/3)

400

Determine the amount of interest earned on a $2500 investment if it is invested at 5.25% annual interest compounded monthly for four years.

What is $5828.78

400

A population of 70 foxes in a wilderness is modeled by the equation F(x) = 70(2)^x, where x models the number of 12-year periods. How many foxes will there be after 24 years.

What is 280

400

125=5^(x-6)

What is x = -3

500

(6t^-1)/(11(uv)^-3w^4)

What is

(6(uv)^3)/(11tw^4)

500

A payday loan company makes loans between $100 and $1000 available to customers. Every 14 days, customers are charged 30% interest with compounding. In 2013, Remi took out a $300 payday loan. Write an equation that can be used to calculate the amount she would owe, in dollars, after t days if she did not make payments.

What is

A(t)=300(1.30)^(6/14)

500

Determine the amount of interest earned on a $100,000 investment if it is invested at 5.2% annual interest compounded quarterly for 12 years.

What is $85,888.87

500

The Rickerts decided to set up an account for their daughter to pay for her college education. The day their daughter was born, they deposited $1000 in an account that pays 1.8% annual interest compounded monthly. How much will the Rickert’s daughter have in her college account when she turns 18 years old?

What is $1,382.31?

500

243^(k+2) * 9^(2k-1) = 9

What is -2/3