Unit 3, Lesson 13
A Radical Identity
Integrated Math 3
13.1
Warm-up
Standards Alignment
Building On
HSA-SSE.B.3.a
Factor a quadratic expression to reveal the zeros of the function it defines.
Addressing
HSA-SSE.A.2
Use the structure of an expression to identify ways to rewrite it. For example, see as , thus recognizing it as a difference of squares that can be factored as .
Instructional Routines
NoneMaterials
NoneActivity Narrative
In this Warm-up, students take the first steps to build a quadratic function in standard form from two known zeros. Students should recognize the structure (MP7) of a family of quadratic expressions that have the same two zeros. The family of expressions differ only by a constant multiple.
Launch
Arrange students in groups of 2. Give students 2–3 minutes to quietly read the task and make a plan, then ask students to work through the task with a partner, and finally finish the Warm-up with a whole-class discussion.
Activity
None- Let .
- For what values of is the function equal to 0? Recall that these values are called zeros.
- Rewrite the equation in standard form, .
- For this function, how are and related to the zeros?
- Is this the only quadratic function with zeros at 3 and 4?
- Let .
- What are the zeros of ?
- Rewrite the equation in standard form.
Student Response
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Building on Student Thinking
Activity Synthesis
The purpose of this discussion is for students to see the connection between the factored and standard forms and recognize that the family of functions that have the same two zeros have equations that differ only by a constant multiple.
Select groups to share their solutions. Display the equation for all to see.
Highlight the solution to the last question and note that all quadratic functions with zeros at 3 and 4 are of the form .
Display the functions and . Ask students:
- “Do the two functions have the same zeros? Explain your reasoning.” (Yes. Each function is 0 when and when .)
- “What is another quadratic function that has zeros when and when ?” (any constant multiple of , such as )
- “Are the functions equivalent?” (No, because when , for example, the first function is and the second function is .)
13.2
Activity
Instructional Routines
NoneMaterials
NoneActivity Narrative
In this activity, students reconstruct the standard form of a quadratic equation from the solutions guaranteed by the quadratic formula. The activity gives students an opportunity to practice rewriting expressions that include a square root and see how some complex-looking expressions can be rewritten into simpler forms.
Students must use the structure of the zeros to find ways to rewrite the expressions in simpler forms (MP7).
Launch
Arrange students in groups of 2.
Ask students about methods they know will solve a quadratic equation such as . (completing the square, factoring, quadratic formula)
If no students mention the quadratic formula, ask students if they can recall the formula and what it means. Display the quadratic formula for all to see.
Ensure that students recall that the quadratic formula gives the solutions to the quadratic equation .
Engagement: Provide Access by Recruiting Interest. Provide choice. Invite students to start with either the first or second question.
Supports accessibility for: Organization, Attention
Supports accessibility for: Organization, Attention
13.3
Activity
Instructional Routines
MLR8: Discussion SupportsMaterials
NoneActivity Narrative
In this activity, students use the difference of squares identity to rewrite expressions that have a square root.
Because calculators can be found readily, rationalizing a denominator is not as important of a skill as it once was. On the other hand, the technique of multiplying an expression by a version of 1 to change the form of the expression without changing its value is useful in later mathematics courses. The identities (when ) and may seem trivial to students but are useful for rewriting expressions.
Lesson Synthesis
The purpose of the discussion is to highlight the identities used in this lesson and show some uses of the identities. Ask students to describe the identities they used in this lesson. Display the identities for all to see.
- when and
- when
Display the expression .
Ask students how they can use these identities to rewrite the expression so that there are no square roots in the denominator. (Multiply by , which is allowed because this does not change the value of the expression, because of the last two identities listed. Then, by the third identity listed, the expression becomes , which is equal to . This can be made even more simple if we multiply the fraction by and rewrite the expression as .)
Student Lesson Summary
Mathematical identities can be useful in a variety of situations.
In an earlier course, we learned how to derive the quadratic formula using the method of completing the square on a quadratic equation. We can check the formula by reconstructing the standard form of a quadratic equation using the zeros guaranteed by the quadratic formula. We can start with writing the factored form using the zeros as .
After distributing the left side of the equation, it nicely becomes .
Identities can also be used to rewrite expressions to be in a form that is clearer to understand. For example, the value of the fraction is not very easy to estimate without a calculator. Let’s rewrite the expression using two identities: the difference of squares identity, , and the identity when .
In this form, we can estimate that is approximately 2.5 and is a little more than 1, so the expression has a value of approximately 1.25. Checking on a calculator, we can see that the original fraction and the final expression are equal and have a value of approximately 1.232, which is close to our estimation.