Unit 2 - Lesson 3 (More Proportions)

Mister Ng

28 Oct 202410:49

Summary

TLDRIn this instructional video, the teacher revisits the concept of proportions, explaining that they consist of two equal ratios. Through examples, students learn to identify equivalent ratios using cross-multiplication and simplification techniques. The lesson also emphasizes equivalent fractions as another method to demonstrate proportional relationships. Students are encouraged to practice these concepts with a worksheet provided in Google Classroom. By integrating real-life examples and various engagement strategies, the instructor aims to deepen students' understanding of proportions and their practical applications.

Takeaways

😀 A proportion is defined as two equal ratios.
😀 To check if two ratios are proportional, you can use cross-multiplication.
😀 Example of non-proportional ratios: 42/3 and 30/5, as 42 × 5 does not equal 3 × 30.
😀 Example of proportional ratios: 9/64 and 48/12, since both yield the same product when cross-multiplied.
😀 Simplifying ratios can also help determine if they are proportional.
😀 Example: 8/32 simplifies to 1/4, which is proportional to 3/12 (also simplifies to 1/4).
😀 Equivalent fractions can be used to check for proportionality by multiplying the numerator and denominator by the same number.
😀 Example: The fraction 2/3 generates equivalent fractions like 4/6, 6/9, and so on.
😀 Students are encouraged to practice finding proportions through a worksheet available on Google Classroom.
😀 Calculators can be used for calculations to make the process easier for students.

Q & A

What is the main topic of Unit 2, Day 3?
-The main topic is understanding proportions, specifically the concept of equivalent ratios.
How does the instructor define a proportion?
-A proportion is defined as two ratios that are equal.
What method does the instructor use to determine if the ratios 42/3 and 30/5 are proportional?
-The instructor uses cross-multiplication to check if the two ratios are proportional.
What were the results of the cross-multiplication for the ratios 42/3 and 30/5?
-The results showed that 42 * 5 equals 210, while 3 * 30 equals 90, indicating that the ratios are not proportional.
What is the outcome when cross-multiplying the ratios 9/64 and 48/12?
-Both calculations equal 576, which confirms that the ratios 9/64 and 48/12 are proportional.
What technique does the instructor suggest for simplifying ratios?
-The instructor suggests finding a common number that divides both terms of the ratio to simplify it.
How does the instructor demonstrate the concept of simplifying ratios using 8 and 32?
-The instructor shows that 8 goes into 8 once and into 32 four times, simplifying the ratio to 1/4.
What example does the instructor give to explain equivalent fractions?
-The instructor uses 2/3 and shows how multiplying the numerator and denominator by the same number results in equivalent fractions like 4/6 and 6/9.
What is a disadvantage of using the equivalent fractions method to determine proportionality?
-It can be time-consuming and complex, making it less practical for quick calculations.
What assignment does the instructor give at the end of the lesson?
-Students are assigned to complete a worksheet available on Google Classroom and can use their laptops for calculations.