Evaluate: ln (1/(³√(e^2)))

How much will a $4000 investment be worth after 5 years if it is invested at 8% interest compounded quarterly?

Solve: log₈x = -1/3

Solve: (1/10)^y = 100^y+3

Graph and find domain and range.

f(x) = 4*2^(x+1) -2

Evaluate: 

e^{\ln e^3}

How long does it take an investment to double in value if it is invested at 12 % compounded monthly? 

Express in terms of log₄A and log₄B: log₄(A²/√(B))

Solve: 

36\sqrt{6} = 6^{2x+1}

Describe how the graph of

g(x) = -\frac{1}{2}*3^{x+1}+4

 is related to the graph of 

f(x) =3^x

Solve: ln x + ln 3 = ln (x+4)

The population of a certain type of bacteria doubles every 10 hours. How long will it take the population to triple?

Solve: log_ax + log_a(2x+3) = log_a2

(sqrt{\frac{1}{27}})^{x+1} = 9^{x-1}

Each year, the number of pay phones in millions decreases by 10%.  The number of pay phones in 1999 was 2.9 million. Graph the function modeling the the number of pay phones from 1999 to 2009.

Condense: 

ln 4 - 3 - ln2

Jonathan wants to have $5000 in 4 years. It is compounded continuously at a rate of 4%. How much does he need to invest?

Condense into one logarithm: 

1-3log_5 x

Solve: 5^x - 6^x =0

Solve: 3e^2x + 2 = 50

A colony of bacteria has 6.5 x 10⁶ members at 8AM and 9.75 x 10⁶ members at 10:30AM. Find its population at noon.

Solve: log₃(x+2) + log₃6 = 3