Using Technology to Conduct a Simulation. Warm Up 1.During a raffle drawing, half of the ticket holders will receive a prize. The winners are equally.

Slides:

Advertisements

Similar presentations

My External Parts By: Teachers of Students with Autism - CHS.

Advertisements

Probability Lesson

PROBABILITY misconceptions (adapted from Louise Addison, 2007) ALL THE PROBABILITY STATEMENTS ARE FALSE.

EXAMPLE 1 Standardized Test Practice SOLUTION Let events A and B be getting the winning ticket for the gift certificate and movie passes, respectively.

C AMPUS & S TUDENT C ENTERS Learning Objectives At the conclusion of this module you will:  Understand how to request raffle tickets  Learn how to.

Bell Work A card is drawn at random from the cards shown and not replaced. Then, a second card is drawn at random. Find each probability. 1. P(two even.

The Scientific Method Try This: Eye Color Quest.

Lesson 18b – Do Now Do now Expectations: No talking for any reason, please. 1) A tube of sweets contains 10 red sweets, 7 blue sweets, 8 green sweets and.

Probability and Odds Algebra Seminar

Punnett Squares C Kohn, Waterford WI.

Experimental Probability of Simple Events

6.14 SOL 6.14 The student, given a problem situation, will

Experimental Probability of Simple Events

Fraction Compare Chance Parts of a whole Equivalent.

Probability Distributions Random Variables * Discrete Probability Distributions * Mean, Variance, and Standard Deviation * Expected Value.

Quick Start Expectations 1.Fill in planner and HWRS HW: Pg #14, 38-40, Get a signature on HWRS 3.On desk: journal, HWRS, LS packet, bin,

Probability Notes Probability: How likely it is that a particular event will occur. When the outcomes are equally likely, the probability of an event is.

3.5 Probabilities Using Combinations. Scratch Tickets What is your probability of winning grand prize? Numbers are are picked Order of picking.

I can explore how to express the relationship between two quantities

Math Project By: Tj Troup. Problem Each of three hats has colored marbles inside. The first hat has 5 green and 4 red. The second has six blue, and five.

Probability and Odds Foundations of Algebra. Odds Another way to describe the chance of an event occurring is with odds. The odds in favor of an event.

Presented by Heather Sparks, NBCT 2009 Oklahoma Teacher of the Year.

Probability – 1.6. Write each number as a percent Probability – Warm Up

  Question? Alternative Beta version Trigonometry Part 3.

10-2 Experimental Probability Course 3 Warm Up Warm Up Problem of the Day Problem of the Day Lesson Presentation Lesson Presentation.

PBIS Reward System Southwest Middle School November 30, 2011.

Lesson 4-5 Objectives: To apply ratios to probability.

Holt CA Course Experimental Probability Warm Up Warm Up California Standards California Standards Lesson Presentation Lesson PresentationPreview.

10-2 Experimental Probability Course 3 Warm Up Warm Up Problem of the Day Problem of the Day Lesson Presentation Lesson Presentation.

6 th Annual Fundraising Event September 26 th – September 30 th.

Making Predictions with Theoretical Probability. Warm Up You flip a coin three times. 1.Create a tree diagram to find the sample space. 2.How many outcomes.

Probability of Simple Events

10-2 Experimental Probability Course 3 Warm Up Warm Up Experimental Probability Experimental Probability Theoretical vs. Experimental Probability Theoretical.

Probability TRUE OR FALSE?.

Probability Quiz. Question 1 If I throw a fair dice 30 times, how many FIVES would I expect to get?

Goals for Math – Wed. Jan. 20 th While Mr. D interviews… students complete Three 10 min. tasks! 1)Math Journal – REFLECT p.142. Explain how to use a protractor.

Experimental Probability

Quick Start Expectations 1.Fill in planner and HWRS HW: Pg #14, 38-40, Get a signature on HWRS 3.On desk: labsheet 3.4, HWRS, pencil, pen.

6.14 SOL 6.14 The student, given a problem situation, will a) construct circle graphs; b) draw conclusions and make predictions, using circle graphs; and.

WDYE? 3.4: Simulations Learning Target: I will design a simulation to find experimental probabilities. HW: Complete the WDYE Investigation 3.4 p. 12 and.

Quiz 10-1 thru Is counting the number of ways to form a 3 person committee out of 10 people a combination or a permutation? 2.How many different.

What are the differences between bar graphs and picture graphs?

CP Math 12-4 Conditional and Unconditional Probability. (Sequential events)

Probability Write down the probability of each event.

SWBAT: -Distinguish between discrete and continuous random variables -Construct a probability distribution and its graph -Determine if a distribution is.

1 Expected Value CSCE 115 Revised Nov. 29, Probability u Probability is determination of the chances of picking a particular sample from a known.

Mrs. Rivas 1. How many 2-letter pairs of 1 vowel and 1 consonant can you make from the English alphabet? Consider “y” to be a consonant. There are 26 letter.

Probability and Odds PSSA Unit.

Independent & Dependent Events

Client: Staples Objective: To grow the number of Staples Twitter followers and leverage their JetBlue and STAPLES Center partnerships. Mechanics: To enter,

1.9 Probability.

Lesson 11.8 – 11.9 Compound Probability

Find Probabilities of Independent and Dependent Events

Experimental Probability

The Name Game What’s in a name?.

Attendance and Punctuality

Be A Hero to Local Heroes!

Agenda 1).go over lesson 6 2). Review 3).exit ticket.

Experiment Explain whether or not each of these statements is right.

Can I color yellow?. Can I color yellow?

Section 12.7 Probability of Compound Events

Warm Up Problem of the Day Lesson Presentation Lesson Quizzes.

Winter Reading Challenge Read SIX books in SIX weeks

What Color is it?.

Probability LG: To conduct chance experiments, identify and describe possible outcomes and recognise variation in results.

Freebird Midnight Train to GA

Exploratory Challenge: Game Show—Picking Blue!

Mrs. Newson’s New Reward Program

How likely it is that some events will occur?

Presentation transcript:

Using Technology to Conduct a Simulation

Warm Up 1.During a raffle drawing, half of the ticket holders will receive a prize. The winners are equally likely to win one of three prizes: a book, a gift certificate to a restaurant, or a movie ticket. If there are 300 ticket holders, predict the number of people who will win a movie ticket. 2.In Mr. Jawarani’s first period math class, there are 9 students with hazel eyes, 10 students with brown eyes, 7 students with blue eyes, and 2 students with green eyes. Mr. Jawarani picks a student at random. Which color eyes is the student most likely to have? Explain.