What are we doing today? Have calculator handy Notes: Basic Combinatorics Go over quiz Homework.

Slides:



Advertisements
Similar presentations
Counting Principles Probability.
Advertisements

Warm-Up Problem Can you predict which offers more choices for license plates? Choice A: a plate with three different letters of the alphabet in any order.
Combinations, Permutations, and the Fundamental Counting Principle.
Section 9.1b… Combinations. What are they??? With permutations, we take n objects, r at a time, and different orderings of these objects are considered.
How many possible outcomes can you make with the accessories?
Chapter 2: The Next Step… Conditional Probability.
When dealing with the occurrence of more than one event, it is important to be able to quickly determine how many possible outcomes exist.
Warm Up Use an inequality symbol to make each expression true a x 10 4 ___________ 5, 430 b. 32 ÷ ¼ ___________ 32 ÷4 c. 0.72___________¾.
Warm-Up Complete in notes.
Permutations and Combinations AII Objectives:  apply fundamental counting principle  compute permutations  compute combinations  distinguish.
Do Now Suppose Shaina’s coach has 4 players in mind for the first 4 spots in the lineup. Determine the number of ways to arrange the first four batters.
Permutations and Combinations Multiplication counting principle: This is used to determine the number of POSSIBLE OUTCOMES when there is more than one.
Probability Jeopardy Q $100 Q $200 Q $300 Q $400 Q $500 Final Jeopardy
Permutations and Combinations Standards: MM1D1b. Calculate and use simple permutations and combinations.
Notes 9.1 – Basic Combinatorics. I. Types of Data 1.) Discrete Data – “Countable”; how many? 2.) Continuous Data – “uncountable”; measurements; you can.
Today in Algebra 2? Turn in graded worksheet Notes: Permutations and Combinations –NEED A GRAPHING CALCULATOR Homework.
10-8 Counting Principles Course 3 Warm Up Warm Up Problem of the Day Problem of the Day Lesson Presentation Lesson Presentation.
13-1 Permutations and Combinations
Methods of Counting Outcomes BUSA 2100, Section 4.1.
At the local deli you can add two toppings to your sandwich. Draw a tree diagram to show how many ways you can select two different toppings for your sandwich.
Warm Up 1.A restaurant offers a Sunday brunch. With your meal you have your choice of 3 salads, 4 sides, 3 entrees and 5 beverages and you can have either.
Sullivan Algebra and Trigonometry: Section 14.2 Objectives of this Section Solve Counting Problems Using the Multiplication Principle Solve Counting Problems.
There are 3 horses (labeled A, B and C) racing for different places. Draw tree diagram to show 1. In how many ways can the horses be placed as 1 st, 2.
Sec: Outcome – result of a single trial. Sample space – List of all possible outcomes. Event – consists of one or more outcomes of a trial. Independent.
COMBINATIONS Factorials help visualize placeholders Example: You can choose up to 5 different ice cream toppings. What is the total number of possibilities.
Arrangements How many ways can I arrange the following candles?
Permutations and Combinations
Warm Up Which of the following are combinations?
Permutations and Combinations. Objectives:  apply fundamental counting principle  compute permutations  compute combinations  distinguish permutations.
Permutations and Combinations Review: Counting Principle 1.) Carol has 4 skirts, 3 shirts, and 3 pairs of shoes. How many different outfits are possible?
6.7 Permutations & Combinations. Factorial: 4! = 4*3*2*1 On calculator: math ==> PRB ==> 4 7! = 5040 Try 12!
37. Permutations and Combinations. Fundamental Counting Principle Fundamental Counting Principle states that if an event has m possible outcomes and another.
MATH 2311 Section 2.1. Counting Techniques Combinatorics is the study of the number of ways a set of objects can be arranged, combined, or chosen; or.
Warm up How many possible pizzas could you make with 3 types of meats, 2 types of cheeses, and 2 types of sauces? 5 * 4 * 3 * 2 * 1 =
Permutations and Combinations
MATH260 Ch. 5: Probability Theory part 4 Counting: Multiplication, Permutations, Combinations.
Multiplication Counting Principle How many ways can you make an outfit out of 2 shirts and 4 pants? If there are m choices for step 1 and n choices for.
Probability and Counting Rules 4-4: Counting Rules.
Permutations and Combinations AII Objectives:  apply fundamental counting principle  compute permutations  compute combinations  distinguish.
Fri 4/29 Lesson 11 – 1 Learning Objective: To use permutations & combinations to count possibilities Hw: 11-1 Fundamental Counting WS.
Multiplication Counting Principle How many ways can you make an outfit out of 2 shirts and 4 pants? If there are m choices for step 1 and n choices for.
Permutations and Combinations. Fundamental Counting Principle Fundamental Counting Principle states that if an event has m possible outcomes and another.
Permutations and Combinations
Multiplication Counting Principle
Warm Up Which of the following are combinations?
MATH 2311 Section 2.1.
Copyright © 2016, 2013, and 2010, Pearson Education, Inc.
Other Topping Sauce Ice Cream Vanilla Choc. Straw
Permutations and Combinations
8.3 Counting Apply the fundamental counting principle
Warm Up Permutations and Combinations Evaluate  4  3  2  1
Welcome Stand Quietly * Take out math folder
Wednesday by Dave And Brian
Permutations and Combinations
Lesson 11-1 Permutations and Combinations
Permutations and Combinations
Warm Up Which of the following are combinations?
13-1 Combinations and Permutations
Permutation & COmbination
104- Ch. 11 part 1; 260- Ch. 5 pt. 2 master_prob_pc.pptx
Welcome Stand Quietly * Take out math folder
Permutations and Combinations
How many possible outcomes can you make with the accessories?
MATH 2311 Section 2.1.
Counting Principle.
Standard DA-5.2 Objective: Apply permutations and combinations to find the number of possibilities of an outcome.
Exercise How many different lunches can be made by choosing one of four sandwiches, one of three fruits, and one of two desserts? 24.
WUE Seventeen applicants want to interview with SAS. In how many ways can the 8 time slots be assigned? How many different ways can the letters of the.
Permutations and Combinations
MATH 2311 Section 2.1.
Presentation transcript:

What are we doing today? Have calculator handy Notes: Basic Combinatorics Go over quiz Homework

Definitions Independent Events: –the outcome of one event does not affect the outcome of any other event. Dependent Events: –the outcome of one event does affect the outcome of another event.

Basic Counting Principle Suppose one event can be chosen in p different ways and another independent event can be chosen in q different ways. Then the two events can be chosen successively in pq ways. This can be extended to any number of events, just multiply the number of choices for each event.

Example How many sundaes are possible if you can only choose one from each of the following categories? ice cream flavors: chocolate, vanilla, strawberry, rocky road sauce: hot fudge, caramel toppings: cherries, whipped cream, sprinkles (4)(2)(3) = 24 different sundaes

Example How many different license plates can be made if each plate consists of 2 digits followed by 3 letters followed by 1 digit? Unless told otherwise, always assume all letters of the alphabet, all digits 0-9, and repetition is allowed. Treat each space as an event. (10)(10)(26)(26)(26)(10) =17,576,000 possible combinations.

Example A test consists of 8 multiple choice questions. How many ways can the 8 questions be answered if each question has 4 possible answers? (4)(4)(4)(4)(4)(4)(4)(4) = 4 8 = 65,536

Factorials n! definition: product of consecutive numbers from 1 to n. Example 8! = (8)(7)(6)(5)(4)(3)(2)(1) = 40,320

Permutations An arrangement of objects in a specific order or selecting all of the objects. The number of permutations of n objects taken r at a time, denoted P(n,r) or nPr, is

Example There are ten drivers in a race. How many outcomes of first, second, and third place are possible? = 720 ways

Example There are 30 students in the Art Club, how many ways can the club select the President, Vice President, and Secretary for the club? 30 P 3 = 24,360 ways

Combinations An arrangement of objects in which order does not matter. Difference between permutations and combinations: –Combinations: grouping of objects –Permutation: putting objects in specific places or positions, or selecting all of the objects.

Permutations vs Combinations Select a committee of 5 people from a group of 33 people. –Combination (order doesn’t matter) Elect a President, Vice President, Treasurer, & Secretary from a group of 40 people. –Permutation (putting in specific places) Pick your favorite soda, and your second favorite soda from a group of 8 sodas. –Permutation (putting in specific places) Buy 3 types of soda at Giant from a group of 30 sodas. –Combination (order doesn’t matter) Arrange the entire set of 12 books on a shelf. –Permutation (arranging all the objects)

Example In a study hall of 20 students, the teacher can send only 6 to the library. How many ways can the teacher send 6 students? 38,760 ways

Example Jessie is at the library and wants to sign out 8 books but she can only sign out 3. How many ways can she choose which books to sign out? = 56 ways

Counting Subsets of an n-set A local pizza shop offers patrons any combination of up to 10 different toppings. How many different pizzas can be ordered if patrons can choose any number of toppings (0 through 10)? Each topping can be seen as a yes or no question so each has 2 options: 2 10 = 1024 different pizzas are possible. (This includes no toppings and picking all toppings)

Homework Pg 708: 1-8, Bring your textbook tomorrow.