Show:
Graphs (7A)
Logs (7B)
Expand/Condense (7C)
Solve (7D)
Applications (7E)
100

Is this growth or decay?

y=4(2/3)^x

What is growth?

100

Write in log form: 

3^4=81

What is 

log_3(81)=4

100

Condense

log (m) + log (p)

What is 

log (mp)

100

log_(1/4)x=-3

What is x = 64?


100

The value if $1000 earns 5% interest every year for 10 years.

What is $1628.89

200

Is this growth or decay?

y=5(0.84)^x

What is decay?

200

Write in log form:

8^-2=1/64

What is 

log_8(1/64)=-2

200

Condense

log (7) + log (a) - 2log (b)

What is 

log((7a)/b^2)

200

Solve:

log(4)+log(y)=log(12)

What is y=3 ?

200

The value if 500 loses 15% every day for 20 days.

What is 19.4 ?

300

The asymptote for 

y=2^x-5

What is 

y=-5

300

Write in exponential form: 

Log_2(16)=4

What is 

2^4=16

300

Expand

log (yx^3)

What is 

log(y) +3log(x)

300

7^x=250

What is x = 2.8 ?

300

The equation you would solve to find out how long it would take to double a $1000 investment earning 6% compounded continuously.

What is 

2000=1000e^(0.06t)

400

The domain for 

y=3^(x+4)

What is all real numbers?

400

Write in exponential form:

Log_5(1/125)=-3

What is 

5^-3=1/125

400

Condense

log(x+2) + log(3)

What is 

log(3x+6)

400

(1/6)^(2x)= (6)^(2x-8)

What is x = 2 ?

400
The equation you would solve to find out how long it would take a $500 investment earning 4% interest compounded monthly to be worth $800. 

What is 

800=500(1+0.04/12)^(12t)

500

The asymptote for 

y=log_5(x+2)-1

What is 

x> -2

500

Write in exponential form:

Ln(148.4)=5

What is 

e^5=148.4

500

Expand: 

log_4((xy^2)/3)

What is

log_4(x)+2Log_4(y)-Log_4(3)

500

log_3x+log_3(x-6)=3

x=9

(x=-3 is extraneous)

500

The population decreases by 12% every year. If it starts with 80,000 people how long will it take for there to be 60,000 people?

What is approximately 2.3 years?