PERMUTATIONS AND COMBINATIONS || GRADE 10 MATHEMATICS Q3

WOW MATH

4 Apr 202119:04

Summary

TLDRThis video lesson explains the key differences between permutation and combination, focusing on when to use each concept in problem-solving. The video provides examples and practical scenarios to illustrate how order matters in permutations and does not matter in combinations. It covers several real-world problems, such as arranging players, selecting team members, and choosing toppings for pizzas. Detailed step-by-step solutions demonstrate how to apply formulas for both permutation and combination, helping learners grasp the concepts clearly. This tutorial serves as a useful guide for understanding and applying these mathematical concepts.

Takeaways

😀 Permutation refers to the arrangement of objects where order matters, while combination refers to selections where order does not matter.
😀 An example of permutation is the arrangement of the numbers 2, 3, 4, 5, where the order of the numbers matters.
😀 An example of combination is choosing 4 toppings for a pizza from 5 different options, where the order in which toppings are selected does not matter.
😀 When a problem involves choosing a specific number of items and order is important, it is a permutation problem.
😀 If the problem involves selecting items where the order is irrelevant, it is a combination problem.
😀 For instance, when choosing 5 cars for a race, order matters, making it a permutation problem.
😀 For selecting 5 players from 7, the order of selection does not matter, so it is a combination problem.
😀 A scenario with 3 guitar players seating in fixed seats is a permutation because the order of seating matters.
😀 The formula for permutation is n! / (n-r)! and for combination it is n! / [(n-r)! r!], with n being the total objects and r the number of objects chosen.
😀 Analyzing problems correctly requires identifying if the order matters (permutation) or if the selection is just about choosing items (combination).

Q & A

What is the main difference between permutation and combination?
-The main difference is that in permutation, the order of the objects is important, while in combination, the order is not important.
In the example of arranging the numbers 5, 4, 3, and 2, what type of problem is this an example of?
-This is an example of permutation because the arrangement or order of the numbers is important.
If the problem involves selecting a team of 5 players from a group of 7, is it a permutation or combination?
-This is an example of combination because the order of the players does not matter when selecting the team.
When determining the number of ways 3 guitar players can be seated in the first three seats of an orchestra, what concept is being used?
-This is a permutation problem because the arrangement of the players in specific seats is important.
In a problem where 3 paintings are to be chosen from a collection of 10 artworks for display, what is being calculated?
-This is an example of combination because the order of the paintings does not matter when selecting them.
What kind of problem is posed when determining how many different pizzas can be made with 5 toppings and choosing 4?
-This is a combination problem because the order in which the toppings are chosen does not matter.
In a problem where 18 out of 47 students will ride in a van, does it involve permutation or combination?
-This is a combination problem because the order of the students does not matter.
How do you differentiate between a situation requiring permutation and one requiring combination?
-Permutation is used when the order of selection matters, while combination is used when the order does not matter.
How is the formula for a combination calculated, and can you give an example from the script?
-The combination formula is n! / (r!(n-r)!), where 'n' is the total number of objects, and 'r' is the number of objects being selected. For example, the combination of 8 taken 7 at a time gives 8 possible selections.
In the example where a team of 6 valuable players needs to choose a captain and co-captain, which method is used, permutation or combination?
-This is a permutation problem because the roles of captain and co-captain require the order of selection to be important.