Exponential functions Jeopardy Template

Exponent rules

Logs

Exponential growth vs. Exponential decay

Word problems

Simplify exponents

100

State rule and answer

12x-8x

Adding/Subtracting Monomials

100

Convert to log form:

3⁴⁼81

Log₃(81)=4

100

Does the function model exponential growth or exponential decay?

f(x) = 3 x (7/4)^x

exponential growth

100

A local hospital receives a shipment of 80 milligrams of a specific medical isotope. The isotope is highly unstable and loses exactly half of its mass every day. How much of the isotope is left after 3 days?

10 milligrams

100

Simplify:

(x⁴y³) (x⁶y⁸)

Answer: x¹⁰y¹¹

200

State the rule and the answer

(K²)(K⁹)

it is product rule

K¹¹

200

Solve:

4^x=30

x=2.4534

200

Does the function model exponential growth or exponential decay?

g(t)= 1.7 x 0.8^t

exponential decay

200

A new car costs $32,000. It depreciates at a rate of 15 years every year. What is the value of the car after 4 years?

After 4 years, the car will be worth $16,704.

200

Simplify:

(x³)²

x⁶

300

State rule and answer

22x⁶/11x³

it is quotient rule

2x³

300

K(f)=32(0.75)^f

Rewrite the equation in terms of K(f)

log_0.75(k(f)/32)=f

300

A phone sells for $600 and loses 25% of its value per year. State whether this model is exponential decay or exponential growth. Then write a function that gives the phone's value, V(t), t years after it is sold.

V(t) = 600 x (0.75)^t

300

A high-end laptop is purchased for $1,200. Each year, it loses 20% of its value. Calculate the value of the laptop after 4 years.

V(4) = $491.52

300

Simplify:

(3/4)^-5

1024/243

400

state the rule and the answer

(B⁵)³

It is power rule

B¹⁵

400

State rule and answer:

log₄84 - log₄12

Rule: quotient rule

Answer:log₄(7)

400

A biologist has a sample of 6000 cells. The biologist introduces a virus that kills 1/3 of the cells every week. Write a function that gives the number of cells remaining C(t) in the sample t weeks after the virus is introduced.

Hence, find how many cells remain after 9 weeks.

C(t)= 6000 x (2/3)⁹

C(9)= 156.073769

400

The population of mosquitoes decreases exponentially. The size of the population, P, after t days is modeled by P = 3200(2)^-t+50, where t>0. (a) Write down the exact size of the initial population.
(b) Find the size of the population after 4 days. (c) Calculate the time it will take for the size of the population to decrease to 60. (d) The population will stabilize when it reaches a size of k. Write down the value of k.

(a) 3250

(b) 250

(d) 50

400

Simplify:

(2x³y^-2)³/4x^-1y⁵

2x¹⁰y^-11 or 2x¹⁰/y¹¹

500

state the rule and answer

(w⁶)²/w¹²

Zero exponent rule

w¹²/w¹²= w⁰= 1

500

Solve:

40(5)^x-10=515

x=1.5996

500

You invest $500 in a savings account that pays 3% compound interest annually. How much money will you have after 5 years?

$579.64

500

A fast-growing tech startup launches a new streaming platform with 50,000 initial subscribers. The marketing team tracks user acquisition data and finds that the subscriber base doubles every 3 years. If this growth rate remains steady, how many years will it take for the platform to reach exactly 200,000 subscribers?

Use the formula, A(t) = A₀x 2^(t/d), where A(t) is final population, A₀is initial population, d is doubling time cycle, and t is total time passes in years.

6 years

500

Simplify:

(x²y^-3/x^-4y⁵)^-2

y¹⁶/x¹²or x^-12y¹⁶