LESSON PLAN IN MATHEMATICS 6
I. OBJECTIVES
Content Standards: Demonstrates understanding of pie graphs and experimental probability
Performance Standards: Is able to create and interpret representations of data (tables and pie graphs) and apply experimental probability in mathematical problems and real-life situations
Most Essential Learning
Competencies: makes simple predictions of events based on the results of experiments
Specific Objectives: a. Define experimental probability
b. Differentiate experimental and theoretical probability
c. Solve problems involving experimental probability
d. Collaborate in accomplishing the task
II. SUBJECT MATTER
A. Solid Figures
B. K to 12 MELC, M6GE-IIIa-28, p. 224; 21st Century Mathletes, pp. 341-350
C. TV, slides presentation, graphic organizers
D. Wise decision-making, Cooperation
III. PROCEDURE
A. ELICIT
Review learners on probability using Spin-A-Wheel.
Learners will be randomly chosen to spin the wheel and answer the question about probability. If the learner gets the question right, he/she will receive the prize on the wheel.
a. What is the probability that the spinner will stop to Arroz Caldo?
b. What is the probability that the spinner will stop to Donut?
c. What is the probability that the spinner will stop to something sweet?
d. What is the probability that the spinner will stop to something soft?
e. What is the probability that the spinner will stop to something dry?
B. ENGAGE
Film Showing
· Show a videoclip of “How It’s Made: Cookie Sandwiches”.
Ask: How does the factory assure the quality of their product?
Do you think they need to taste all the products to check their quality?
Why or why not?
C. EXPLORE
Cooperative Work/Group Activity
· Divide the class in groups of 5-6 members. Remind them of proper decorum during group activity. Emphasize cooperation to successfully accomplish the given task.
· Each group will be assigned a product that they need to try and experiment on.
Group Number | Product | Question |
1 | Mixed Nuts | What is the probability of getting a green pea? |
2 | Cheese Ring | What is the probability of getting a crispy cheese ring? |
3 | Chocolates | What is the probability of getting a strawberry chocolate? |
4 | Crackers | What is the probability of getting a soft cracker? |
5 | Sweet Corn | What is the probability of getting a crispy sweet corn? |
· Allow the group to tally/encode their data using the sample table below:
Example:
Expected Outcome | Tally | Frequency | Probability |
Crispy |
|
|
|
Not Crispy/Soft |
|
|
|
Total Number of Trials |
| ||
D. EXPLAIN
Class Reporting/Presentation
· Allow each group representative to present their answers to the class. Remind them of proper decorum during group reporting/presentation.
· Facilitate discussion and sharing of ideas.
· After the presentation of each group, present the Venn Diagram to differentiate Theoretical and Experimental Probability.
D. ELABORATE
· Show a picture of Guimaras and Manggahan Festival. Discuss that Guimaras mango is famous as one of the sweetest if not the sweetest mango in the world.
· Present the following real-life scenario:
3 out of first 10 mangoes in a basket tasted sour. If this trend continues, how many sour mangoes are expected in the basket of 60 mangoes?
· Provide differentiated ways to solve the problem
a. Pictorial Approach (Block Model)
60 mangoes
6 | 6 | 6 | 6 | 6 | 6 | 6 | 6 | 6 | 6 |
P(sour)= 3/10
1 block = 6 3 blocks = 18
b. Abstract Approach (Algorithm)
x 60 =
x
=
= 18
Therefore, there are 18 sour mangoes expected to be in the basket.
· Let the learners solve the following problem in pairs. They may choose pictorial or abstract approach in finding the solution.
In a doll factory, the experimental probability of having a doll with broken leg is 2 out of 10. If the factory produces 50 dolls, how many of these are expected to have a broken leg?
E. EVALUATE
Formative Assessment
· Direction: Accomplish independently.
The spinner was spun 20 times. Use the results to complete the table.
Expected Outcome | Frequency | Probability |
BLUE | 2 |
|
RED | 5 |
|
YELLOW | 9 |
|
GREEN | 1 |
|
ORANGE | 3 |
|
F. EXTEND
Assignment
· Direction: Create your own problem on experimental probability. You may create problems relating to other subjects like Science, AP or TLE.
Prepared by:
JAYLORD S. LOSABIA
Master Teacher I
