PC - Exponential and Logarithmic Functions

#1 Give the end behavior limits for y = -2(3)^x.

Answer:

#10 Find the percent of increase/decrease for y = 3(1.2)^x.

Answer:

#11 Find the percent of increase/decrease for y = 2(.85)^x.

Answer:

#12 Find the percent of increase/decrease for y = (2)^x.

Answer:

#13 Find the percent of increase/decrease for y = 4(5.2)^X.

Answer:

#14 Find the percent of increase/decrease for y = 8(.98)^x.

Answer:

#15 Write an exponential function to model an initial amount of 9.2 that increases 20% per year.

Answer:

#16 Write an exponential function to model an initial amount of 3 that increases 12% per year.

Answer:

#17 Write an exponential function to model an initial amount of 6.3 that decreases 16% per year.

Answer:

#18 Write an exponential function to model an initial amount of 1.6 that decreases 0.5% per year.

Answer:

#19 Write an exponential function to model an initial amount of 4 that decreases 10% every 5 years.

Answer:

#2 Give the end behavior limits for y = -3(¾)^x.

Answer:

#20 Graph y = 2(1/2)^x.

Answer:

#21 Graph y = -2(2)^x.

Answer:

#3 Give the end behavior limits for y = 4(2)^x.

Answer:

#30 Write the formula for the inverse of: f(x) = 2(4)^x

Answer:

#31 Write the formula for the inverse of: f(x) = 3^(x-2)

Answer:

#32 Write the formula for the inverse of: f(x) = 2^x + 3

Answer:

#33 Write the formula for the inverse of: f(x) = log₃(x) - 2

Answer:

#34 Write the formula for the inverse of: f(x) = log₄(x+1) - 3

Answer:

#35 Graph y = 2log(x-1).

Answer:

#36 Graph y = -log(x) + 3.

Answer:

#37 Graph y = log₃(x+2) - 1.

Answer:

#38 Graph y = log₂(x+3) + 1.

Answer:

#4 Give the end behavior limits for y = -¼(½)^x.

Answer:

#42 Write as a single log term: lnx² - 3ln(xy)

Answer:

#43 Write as a single log term: 2logx + 3log y

Answer:

#44 Write as a single log term: 5logx + log(xy)

Answer:

#45 Write as a single log term: 3log₂x - 2log₂x

Answer:

#46 Expand to a sum or difference of logs: log(x³/y⁴)

Answer:

#47 Expand to a sum or difference of logs: ln(x²y³)

Answer:

#48 Expand to a sum or difference of logs: log₂((x²y⁴)/m³))

Answer:

#49 Evaluate, rounding to the nearest thousandth: log₃4

Answer:

#5 Give the end behavior limits for y = 4(0.3)^x.

Answer:

#50 Evaluate, rounding to the nearest thousandth: log₅200

Answer:

#51 Evaluate, rounding to the nearest thousandth: log₆42

Answer:

#52 Solve, rounding to the nearest thousandth, if necessary: 7 + 2log(5x) = 11

Answer:

#53 Solve, rounding to the nearest thousandth, if necessary: log(x-16) = 2 - log(x-1)

Answer:

#54 Solve, rounding to the nearest thousandth, if necessary: log(x+3) = log(3x+1)

Answer:

#55 Solve, rounding to the nearest thousandth, if necessary: log₂x = 5

Answer:

#56 Solve, rounding to the nearest thousandth, if necessary: 4^(x+3) = 2^(5x+1)

Answer:

#57 Solve, rounding to the nearest thousandth, if necessary: 6^x = 3

Answer:

#58 Solve, rounding to the nearest thousandth, if necessary: 2^x = 15

Answer:

#59 Solve, rounding to the nearest thousandth, if necessary: 2^(x-1) = 3^(x+4)

Answer:

#6 Give the end-behavior limits for y = -3(4)^x.

Answer:

#60 In 1985, there were 285 cell phone subscribers in a town. The number of subscribers increased by 75% per year after 1985. How many subscribers were there in 1994?

Answer:

#61 Each year a school sponsors a tennis tournament. Play starts with 128 participants. During each round, half the players are eliminated. How many players remain after 5 rounds?

Answer:

#62 You buy a new computer for $2100. The computer's value decreases by 45% each year. When will the computer's value be $600?

Answer:

#63 You drink a beverage with 120 mg of caffeine. Each hour, the caffeine in your system decreases by about 12%. How long until you have 10 mg of caffeine?

Answer:

#64 Write an exponential model for this data: x y 0 2 1 7 2 24.5

Answer:

#7 Give the domain and range for y = -2(6)^x.

Answer:

#8 Give the domain and range for y = 4(0.3)^x.

Answer:

#9 Give the domain and range for y = 4(2)^x.

Answer:

#25 Describe the transformations from y=3^x. y=-(3)^x

reflect over the x-axis

#27 Describe the transformations from y=log₃x. y=-4 log₃x

reflect over the x-axis, stretch vertically by factor 4

#41 Describe the transformation(s) from y=log₅x for y=-½log₅(3x).

shrink horizontally by factor 1/3, reflect over the x-axis, and shrink vertically by factor 1/2

#23 Describe the transformations from y=3^x. y=¾(3)^x + 1

shrink vertically by factor 3/4, and translate 1 unit up

#22 Describe the transformations from y=3^x. y=2(3)^x

stretch vertically by factor 2

#40 Describe the transformation(s) from y=log₅x for y=3log₅(x).

stretch vertically by factor 3

#24 Describe the transformations from y=3^x. y=(3)^(x-1)

translate 1 unit right

#26 Describe the transformations from y=log₃x. y = log₃x - 2

translate 2 units down

#39 Describe the transformation(s) from y=log₅x for y=log₅(x) + 2.

translate 2 units up

#28 Describe the transformations from y=log₃x. y=log₃(x+5)

translate 5 units left

#29 Describe the transformations from y=log₃x. y=log₃(x-8)

translate 8 units right