$15,000 invested at 0.60% compounded semiannually after a period of 30 years.
What is $17, 953.42(204)
100
Given the equation f(x) =1/x -5, the inverse function f-1(x) has the same vertical and horizontal asymptote as f(x).
What is false (switch the asymptote equations' x's and y's)
200
The transformations of the graph 5x - 3 + 2
What is right 3, up 2
200
Solve eln(2x)=27
What is x = 27/2
200
Evaluate log512
What is approximately 1.54?
200
$3,400 invested at 8% compounded continuously after a period of 4.3 years.
What is $4795.96(7361)
200
The function y = ax where 0 < a < 1 is a decreasing function.
What is true
300
The transformations of the graph -(4)x + 2 - 1
What is left 2, down 1, up&down flip
300
The inverse of e-x+1-2
What is -ln(x+2)+1
300
Condense 0.4log(x-3)-0.75log(5+y)-0.5log(w)
What is log[(x-3)^(2/5)/((5+y)^(3/4)w^(1/2))]
300
Find the principal needed now to get $1,000,000 after 50 years 7% compounded monthly.
What is $30,506.02(137) -- $30,506.03
300
Every odd function is one-to-one.
What is false (any odd function which fails the horizontal line test)
400
The anchor points of the graph log3(5-x)
What is (9, 0) and (7, 1)
400
The inverse of log1/2(x) + 3
What is (0.5)x-3
400
Expand ln (x2y)^(1/2)/(w3p4)
What is lnx + 0.5lny -3lnw -4lnp
400
The half-life of radium is 1690 years. If 1 gram is present now, how much is be present in 100 years
What is .9598g
400
If f(g(x)) = x, then g is the inverse function of f.
What is false (the other composition must also equal x)
500
The kind of flip (up/down or left/right) of the graph (1/3)^(-x)
What is left/right
500
Solve 6x-2 = 72x + 1
What is (log67 + 2)/(1 - 2log67)
500
Expand log[3x2/(x+3)^(1/5)]
What is log3 + 2logx - 1/5log(x+3)
500
A certain radioactive material decays according to the function: A(t)=A0e-0.0155t, where A0 is the initial amount present and A is the amount present at time t (in years). What is the half-life of this material?
What is 44.719 years
500
If f(x) is a one-to-one function and the graph of f lies in quadrants I and III, then the graph of its inverse lies in quadrants I and IV.