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VIDEO: Algebra Applications: Exponential Functions, 4

VIDEO: Algebra Applications: Exponential Functions, 4

Topic

Exponential Functions

Description

Earthquake magnitude measurement is linked to seismic wave amplitude using logarithmic functions. The segment demonstrates how exponential functions model intensity while sine curves represent wave behavior. Key terms include seismic waves, amplitude, and logarithmic scale. Applications highlight the relationship between magnitude, intensity, and amplitude, emphasizing rapid changes in earthquake power.

In this video, we explore the relevance of Exponential Functions to real-world contexts. It demonstrates key applications and connections that help students understand exponential functions deeply.

Teacher’s Script: "In this video, we will examine Earthquake magnitude measurement is linked to seismic wave amplitude using logarithmic functions. This is an excellent way to connect exponential functions to everyday phenomena. Get ready to think critically about how these mathematical concepts come to life in various scenarios."

For a complete collection of videos related to Exponential Functions click on this link: Algebra Applications: Exponential Functions Collection.


Brief Review of Exponents

When a number is raised to a power, exponents are involved. Here are the key components of an exponential expression.

Exponents make it easier to write expressions that would otherwise be cumbersome to write. See how much easier it is to write 310 instead of the expression on the right? 

3 to the power of 10 equals 3 times 3 times 3 times 3 times 3 times 3 times 3 times 3 times 3 times 3

Count the number of 3's in the expression on the right. Do you see that there are ten 3's? The expression 310 is a shorthand way of writing 3 multiplied ten times.

In the expression below, 3 is called the base and 10 is called the exponent. The base is multiplied by itself 10 times.

310

Exponents are a different form of writing numbers. With this new form come new properties that are unique to exponents. The next section goes over these properties, also known as the Laws of Exponents.

Laws of Exponents

The Laws of Exponents are a set of properties that pertain to all exponential expressions. Study the definition below.

Laws of Exponents. 
The rules for simplifying exponents when multiplying or dividing expressions with a common base and different exponents.

To learn more about exponents, click on this link. It is a presentation that goes over the Laws of Exponents in more detail. To see examples that use the Laws of Exponents, click on this link

In summary:

  • If you're multiplying two exponents that have the same base, then simply add the exponents.
  • If you're dividing two exponents that have the same base, then subtract the exponents.
  • If you're raising an exponential expression to a power, the new exponent is the product of the two exponents.

 

Exponential Expressions

Example 1

What is the value of x?

8 to the power of x equals 32

In order to work with the Laws of Exponents, make sure the terms have the same base. Both 8 and 32 can be written as powers of 2:

8 equals 2 cubed and 32 equals 2 to the power of 5

Rewrite the original expression with these powers of 2:

2 to the power of 3 x equals 2 to the power of 5

With a common base, you can now solve for x:

Solving the equation 3 x = 5.

Example 2

If 4x - 5y = 10, what is the value of this expression?

16 to the power of x over 2 to the power of y

Find a common base for the numerator and denominator, then simplify the expression:

2 to the power of 4 x over 2 to the power of 5 y equals 2 to the power of 4 x minus 5 y

Do you notice that the exponent for 2 is the same as the left side of the linear equation? Replace the exponents

Solving an exponential equation.

Example 3

Rewrite this expression as an exponential expression with a power of 5.

fourth root of 125

First, write the numerical expression as an exponential expression:

fourth root of 125 equals 125 to the power of 1 fourth

Next, rewrite 125 as a power of 5:

125 to the power of 1 fourth equals open parentheses 5 cubed close parentheses to the power of 1 fourth

Finally, rewrite the entire expression:

fourth root of 125 equals 5 to the power of 3 over 4

Exponential Functions

An exponential function is of this form:

f(x) = a•bcx

In this function the terms a, b, and c are numbers and x is the independent variable. Here’s one of the simplest exponential functions:

f(x) = 2x

This is the graph of the function.

Graph of an exponential function.

As you can see from the graph, the values of f(x) increase dramatically for small increases in input values of x. Here are some other examples of exponential functions.

 

Graph of an exponential function.

Graph of an exponential function.

Graph of an exponential function.

Equation for an exponential function

Equation for an exponential function

Equation for an exponential function

 

Exponential Growth and Decay

In the examples you saw previously, the graphs of the exponential functions were continuously increasing. But this isn't always the case.

When the the graph of an exponential function is continuously increasing, This is an example of exponential growth. Here is an example.

f(x) = 10x

Exponential Growth

When the the graph of an exponential function is continuously decreasing, This is an example of exponential decay. Here is an example.

f(x) = 10-x

Exponential Decay

Exponential Models

Mathematical functions are often used to develop mathematical models of real-world phenomena. For example, linear functions are useful for modeling constant speed, and many other applications. Quadratic functions can be used to model the motion of objects in the air due to the influence of gravity.

Why is it important to develop mathematical models using equations? One of the best features of an accurate mathematical model is that it can be used to make predictions about future behavior about the phenomenon that it models. In fact, scientists, engineers, and other STEM-related jobs rely heavily on mathematical models to predict weather, financial results, and many, many other phenomena.

In the case of exponential functions, how can they be used to model something? Any phenomenon that involves exponential growth and decay can be modeled using an exponential function. Here are some possible uses of exponential models:

  • Radioactive decay can be modeled by an exponential function that exhibits exponential decay
  • Compound interest (see below) can be modeled by an exponential function that exhibits exponential growth

Building an Exponential Model: Compound Interest

A special case involving exponential functions is compound interest. What is compound interest? Usually, the context is of money earning interest in a bank account.

If you put an amount of money P in a bank account, then compound interest means that the value of P increases over time. The variable P is an abbreviation for the Principle, or original amount, that you're saving. 

The exponential model for compound interest begins with P. Let f(x) stand for the future value of the money in the savings account.

f(x) = P • (Exponential Term)

In the case of compound interest, the Exponential Term is the exponential growth term. Let's use the variable G to stand for growth. The function now looks like this:

f(x) = P • Gnt

The exponent, nt, is made up of two terms. The n stands for the number of compounding periods, or the number of times the principal has grown in value. The t stands for the duration of a compounding period. 

There are two formulas that can be used to calculate compound interest. Here is one of the compound interest formulas:

The compound interest formula for the case where the compounding is non-continuous.

This is the formula to use when the compounding periods are non-continuous. Use this formula for continuous compounding:

The compound interest formula for the case where the compounding is continuous.

To see examples of calculating compound interest, click on this link

Compound Interest

Example 1

A savings account earns interest according the formula below. What is the exponential function that models this growth? How much is in the savings account after five years?

“Each year the amount of the account increases by 2.5%. The initial investment was $1750.”

Use the compound interest placeholder formula:

A equals P open parentheses 1 plus r over n close parentheses to the power of n t

In this formula:

A = Current amount in savings

P = Initial investment

r = Interest rate

n = Number of compounding periods

t = Number of years

We know the following:

P = 1750

r = 0.025

n = 1

We can now generate the exponential function that models the growth:

A of T equals 1750 times 1.025 to the power of t

We can use this model to find the amount in savings after 5 years:

Evaluating A of T equals 1750 times 1.025 to the power of t, for t = 5.

 

Inverse of an Exponential Function

Like many functions, exponential functions have inverses. The inverse of an exponential function is known as a logarithmic function.

This is the form of a logarithmic function:

f(x) = loga(x)

Here is the graph of a logarithmic function:

Logarithmic Function

Notice that, unlike an exponential function, a logarithmic function grows slowly.

Here is the graph of the exponential function that is the inverse of the logarithmic function.

Exponential and Logarithmic Function Graphs.

Notice that the graph of the logarithmic function (the red graph) is the mirror image of the exponential graph (the blue graph). This is a property of inverse functions. They are mirror images of each other across the graph of y = x. Imagine a mirror along the graph of y = x. Each function is a mirror image of the other across this line. 

The logarithmic function f(x) = log (x) is "log base 10." It is the inverse of f(x) = 10x. Here are other exponential functions and their corresponding logarithmic inverses:

f(x) = log2(x) is the inverse of f(x) = 2x

f(x) = log3(x) is the inverse of f(x) = 3x

There is a special logarithm, known as the natural logarithm, whose base is the irrational number e. A natural log is written this way:

f(x) = ln(x)

The natural logarithm is the inverse of f(x) = ex. Here are the graphs of the tow functions.

Natural log graph and inverse

Notice that, like the other pair of exponential graphs, the two graphs are mirror images of each other. 

Natural logs and exponential graphs of base e occur often in nature, thus the name "natural." These types of exponential functions are used to model many real-world phenomena.

Common Core Standards CCSS.Math.CONTENT.HSF.LE.A.2
Duration 4.27 minutes
Grade Range 6 - 9
Curriculum Nodes Algebra
    • Exponential and Logarithmic Functions
        • Applications of Exponential and Logarithmic Functions
        • Exponential and Logarithmic Functions and Equations
        • Graphs of Exponential and Logarithmic Functions
Copyright Year 2011
Keywords algebra, applications of exponential functions, seismic wave, trigonometric functions