Exponential/Logarithmic Equations

Rewriting Base

Log on One Side

Log Both Sides

Properties of Logs

Misc.

100

Solve: 5^x = 125

x = 3

100

Solve: log₄x = 2

x = 16

100

Solve: 3^x = 20

x = 2.73

100

How can I condense log₂(4) + log₂(5x)?

log₂(20x)

100

What is the inverse of a logarithmic function?

An exponential function

200

Solve: 3^x = 81^(x+3)

x = -4

200

Solve: log(x-2) = 1

x = 12

200

Solve: 9^x = 14

x = 1.2

200

How can I condense log₃4 - log₃(x-3)?

log₃(4/x-3)

200

What type of asymptotes do logarithmic graphs have?

Vertical Asymptotes

300

Solve: 16^x = 8^(x+4)

x = 12

300

Solve: log₂(x+1) = 5

x = 31

300

Solve: 5^(x+1) = 30

x = 1.46

300

Expand: log(5x^2)

log(5) + 2log(x)

300

What are the steps to graphing a log function?

1.) Find the inverse

2.) Graph the inverse (exponential)

3.) Switch coordinate points and graph new function (log)

400

What do we need to do when we cannot rewrite the base?

Log both sides

400

Solve: log₃(x^2 - 4) = 2

x = √13

400

Solve: 2^(x+2) = 7^x

x = 1.1

400

In a logarithmic equation with two solutions, how do I check whether they are extraneous?

Plug in for x, argument of each log must be > 0.

400

How does changing the base of a log function affect the graph?

Lower base means the graph will have a steeper curve

500

Solve: 4^(x+1) = 8^(2x-1)

x = 5/4

500

Why is the purpose of rewriting our logarithmic equations?

To get them into an exponential equation and solve for x.

500

Why does applying the log function to both sides of our equation work?

Logs are the inverses of exponential functions, and it allows us to bring down our exponent

500

Solve: log(x) + log(x-4) = log(21)

x = 7

500

What point does every graph of the form y = log_bx, where b > 1, pass through?

(1,0)