Show:
3.1
3.2
3.3
3.4
3.5
3.6
1

Determine if the function is one-to-one:

f(x) = x^3-2x

Yes, it's one-to-one (passes horizontal line test).

1

Graph 

f(x) = 2^x+3 

" Find the domain, range, asymptote"

"Domain : " (-oo, oo)

 "Range : " (3,oo)

 "Asymptote : " y = 3

1

Simplify 

log_3(81) - ln(e^2)

2

1

Expand

log_3(6xy^2)

log_3(6)+log_3(x)+2log_3(y)

1

Solve

5e^(2x)=35

x = ln(7)/2

1

Suppose that $18,000 is invested in a bond fund and the account grows to $23,344.75 in 5 yr 

"Use the model " A=Pe^(rt) " to determine the average rate of return "

"under continuous compounding. Round to the nearest tenth of a percent."

r = 5.2%


2

Given 

h(x) = x-7//4 ", find " h^-1(x)

h^-1(x) = 4x + 7

2

Polo borrows $5000 for 6 years, he has the option to do a simple interest at 6% or do a compounded continuously at 5.5%, which option would be greater?

"Simple = 1800"

"Continuous = 1882.07"

"Continuous would be greater" 

2

Graph 

f(x) = log_5(x+1) - 2 

"State domain, range, and asymptote"

"Domain : " (-1,oo)

"Range : " (-oo,oo)

"Asymptote : " x = -1

2

Simplify 

3log_2(x)-2log_2(y)


log_2(x^3 / y^2)

2

Solve

log_4(x-1)+log_4(x+1)=1

x = +- sqrt5

2

The population of Germany in 2011 was approximately 85.5 million. 

"The model " P=85.5e^(-0.00208t) " represents a short-term "

"model for the population, t years after 2011."

"a) Based on the model, is the population of Germany increasing or decreasing?"

"b) Determine the number of years after 2011 at which the population of "

"Germany would decrease to 80 million if this trend continues. Round to the nearest year."

a. decreasing 

b. 32 yr 

3

Is the function 

f(x) = sqrt(x+3) " one-to-one?" 

"Write the domain, range, and its inverse."

Yes, it's one-to-one

"Domian :" [-3,oo), "Range :"[0,oo) 

"Inverse : " f^-1(x) = x^2 - 3

3

Eddy starts off with $3000 at 4.5% compounded monthly for 5 years, after 5 years where would his amount be at? 

"Amount = 3746.14"

3

Convert: 

"a) " log_7(x) = 3 

"b) " 2^y = 16

"a) " 7^3= x

"b) " log_2(16) = y 

3

Expand

ln((xy)^2/z^3)

2ln(x) + 2ln(y) - 3ln(z)

3

A $2500 bond grows to $3729.56 in 10 yr under continuous compounding. Find the interest rate. Round to the nearest whole percent. 

4%


3

A lab starts with a bacteria culture containing 500 bacteria. The population doubles every 3 hours.

"a) Write a function of the form " P(t) = P_0e^(kt) " to model the population P(t) after t hours"

"b) How many bacteria will there be after 9 hours?"

"c) After how many hours will the population reach 8000 bacteria? Round to the nearest tenth."

"a) " P(t) = 500e^(0.2310t)

"b) " 3996.5

"c) 12 hours"