Ms. K, Algebra 2: Exponential & Logarithmic Functions (Intro)

Exponential Graphs

Transformations of Exponential Functions

Logarithms

Talk the Talk

Mix

100

Is this function represent exponential GROWTH or DECAY?

f(x) = 1.2(0.99)^x

EXPONENTIAL DECAY

100

Consider the function:

f(x)=2^(x-1) +5.

What is the parent function?

f(x) = 2^x

100

What is the OUTPUT of a LOGARITHMIC function? Use one word!

an EXPONENT

Logarithms are the inverse of exponential functions and used when solving exponential equations where the exponent is unknown. The output of a logarithm is an exponent.

100

What do you call of 2 value in the exponential equation?

f(x)=2∙5^x

INITIAL VALUE

When the base of this function is raised to an input of 0, the result is 1. So your are left with the coefficient being multiplied by 1. This means the coefficient is the INITIAL VALUE or what you started with before the function began to grow or decay.

100

Evaluate:

log₇ 7²¹

200

Write the END BEHAVIOR of this graph.

x → -∞, y →

x → +∞, y →

x -> -oo, y -> 3

x -> +oo, y -> +oo

200

Consider the function: f(x) = 3^(x+2) - 8.

What is the parent function? Describe all transformations the function has undergone from the parent function.

Parent function: f(x) = 3^x

Transformations:

Horizontal translation: 2 units left

Vertical translation: 8 units down

200

Evaluate the logarithms below:

a) log₂(64)

b) log₅(125)

a) 6

b) 3

200

What do you call of 5 value in the logarithmic equation?

y = log₅ x

Base

200

How many times b more than a if

log a = 2 and log b = 4?

100

If log a = 2, then a=100

If log b = 4, then b=10000

b/a=10000/100=100

300

Does this exponential function model GROWTH or DECAY?

y=0.75(7/6)^x+3

GROWTH

The common ratio (r) in this equation is greater than 1 which indicated decay (the outputs are getting bigger by a factor of 7/6 for every increase of 1 in the input.

300

Identify the TRANSFORMATIONS applied to f(x) in order to create g(x). Be specific.

f(x) = 4^x

g(x) = -2(4)^x-3 - 5

HORIZONTAL SHIFT (TRANSLATION): 3 units right

VERTICAL SHIFT (TRANSLATION): down 5 units

REFLECTED over the x-axis

VERTICAL STRETCH by a factor of 2

300

Write the logarithm in EXPONENTIAL form.

7^-2=1/49

300

What can you say about the graphs of exponential and logarithmic functions? Be specific.

Since exponential and logarithmic functions are inverse functions, their graphs are symmetrical along the line y=x.

300

Solve for x:

log₃ x = -4

x = 1/81

Solution:

3^-4 = (1/3)⁴ = 1/81

400

Write the exponential equation for the table below.

f(x) = 5(3)^x

400

The blue graph is of f(x)=2^x. Find the equation of the green graph g(x) which has been transformed.

g(x)=2^((x-4))-3

400

Estimate the value of log₃ (90) WITHOUT a calculator.

xapprox4.1

Since 3⁴=81 and 3⁵=243, we can see x must be between 4 and 5. Since 90 is much closer to 81 than 243, we can estimate the value to be slightly over 4.

400

Convert to exponential form: log₃ 81 = 4

3⁴ = 81

400

Solve for x:

log₄ (-16) = x

undefined

The domain of the logarithmic function is any positive number.

500

Write the equation of the exponential graph.

y=0.5(1.5)^x

500

Graph the function:

f(x)=2^(x-3) + 2.

500

y=log_3((x-5)/2)-4

The inverse of an exponential function is a logarithm. So rewrite the original function in logarithmic form by switching x and y and then isolating y.

500

Convert this to logarithmic form: 4⁵=1024

log₄ 1024 = 5

500

Convert 5 to a log statement if the base is 6.

5 = log₆ 7776