Unit 4, Lesson 14
Solving Exponential Equations
Integrated Math 3
14.1
Warm-up
Standards Alignment
Building On
Addressing
HSF-LE.A.4
For exponential models, express as a logarithm the solution to where , , and are numbers and the base is 2, 10, or ; evaluate the logarithm using technology.
Instructional Routines
NoneMaterials
NoneActivity Narrative
This Warm-up gives students a chance to see and analyze a worked solution to an exponential equation before they solve some in the next activity. An exponential equation with base was chosen purposefully to reinforce that is just a number, and, as such, students can work with it the same way they have worked with equations of other bases previously.
Students should be familiar with the first and last steps in the worked solution, but the second step may give them pause because the exponent is a product (rather than just a variable or a number). Monitor for students who recognize that the product could be treated as a single object and who see the middle two lines as equivalent equations in exponential and logarithmic forms.
Launch
Give students a moment of quiet think time, and then ask them to share their thinking with a partner.
Activity
NoneHere is a solution to the equation .
Explain what happened in each step.
Activity Synthesis
Select students to explain the worked-out solution. If students struggle to explain the transition from to , consider temporarily replacing the with a single variable, such as , and then ask students to interpret to . Once students see these two equations as equivalent, given the definition of logarithm, then return to and the division of each side by 3.
Some students may think that the equation is not completely solved because the logarithm is not evaluated. Remind students that a solution written in log notation is the exact solution, and that evaluating it would give us an approximation (a less-precise solution).
14.2
Activity
Materials
To Gather
Scientific calculatorsActivity Narrative
In this activity students encounter more exponential equations with base . They learn that a logarithm with base has a special name, the natural logarithm, and use the “ln” function on a calculator to estimate its value for different inputs.
To write equivalent equations in exponential form and logarithmic form, students look for and make use of structures similar to those they previously encountered (MP7).
14.3
Activity
Materials
NoneActivity Narrative
In this activity, students use logarithmic expressions to solve exponential equations. A variety of problems are chosen so that some can be solved through exponential reasoning, while others, in order to give an exact answer, require the use of logarithms.
Monitor for students who use these strategies to solve the given equations. The strategies are listed in order of flexibility.
- Refer to the base-10 log table from an earlier lesson (for example: to find , look to the last entry in the table, which gives the value for ).
- Use exponential reasoning (for example: by thinking of 10,000 as and reason that if , then and ).
- Use the definition of logarithm to rewrite equations (for example: if , then is the exponent to which 10 needs to be raised in order to give 315, so ).
Lesson Synthesis
Display the equation . Ask students, “What are some operations that could be done to help solve the equation?” Then ask students to put the steps in order to create a solution.
- Subtract 3 from each side.
- Divide each side by 2.
- Rewrite the equation as a logarithm.
- Add 5 to each side.
Make sure students understand these key takeaways:
- When the unknown value is an exponent, sometimes we can determine its value by reasoning (for example, if , then , so must be -1) or by estimation. But other times, it is difficult to “undo” exponentiation mentally, so we use logarithms to express that unknown exponent.
- The natural logarithm is not fundamentally different from other logarithms, even though the notation commonly used is (though is also sometimes used), and the base involved is expressed as a letter instead of as a number. The relationship between the base, the exponent, and the value of the exponential expression is still the same when the base is as when it is 2, 5, or 10.
Student Lesson Summary
So far we have solved exponential equations by
- Finding whole number powers of the base (for example, the solution to is , and the solution to is ).
- Estimation (for example, the solution of is between 2 and 3 because 300 is between 100 and 1,000).
- Using a logarithm and approximating its value on a calculator (for example, the solution of is ).
Sometimes solving exponential equations takes additional reasoning. Here are a couple of examples.
In the first example, the power of 10 is multiplied by 5, so to find the value of that makes this equation true, each side is divided by 5. From there, the equation is rewritten as a logarithm, giving an exact value for .
In the second example, the expressions on each side of the equation are rewritten as powers of 10: . This means that the exponent on one side and the 3 on the other side must be equal, and leads to an expression to solve where we don't need to use a logarithm.
How do we solve an exponential equation with base , such as ? We can express the solution using the natural logarithm, the logarithm for base . Natural logarithm is written as , or sometimes as . Just like the equation can be rewritten, in logarithmic form, as or , the equation and be rewritten as . Similarly, can be rewritten as .
All this means that we can solve by rewriting the equation as . This says that is the exponent to which base is raised to equal 5.
To estimate the size of , remember that is about 2.7. Because 5 is greater than , this means that is greater than 1. is about , or 7.3. Because 5 is less than , this means that is less than 2. This suggests that is between 1 and 2. Using a calculator we can check that .