What is the probability that it will snow on Christmas day in Huntingdon?

Slides:

Advertisements

Similar presentations

The Monty Hall Problem Madeleine Jetter 6/1/2000.

Advertisements

ABC Welcome to the Monty Hall show! Behind one of these doors is a shiny new car. Behind two of these doors are goats Our contestant will select a door.

Discrete Probability Rosen 5.1.

The Monty Hall Problem. Warm up example (from Mondays In Class Problems) Suppose there are 50 red balls and 50 blue balls in each of two bins (200 balls.

Probability and Statistics

CHAPTER 40 Probability.

AP STATISTICS Simulation “Statistics means never having to say you're certain.”

Section 16.1: Basic Principles of Probability

1 Probability Part 1 – Definitions * Event * Probability * Union * Intersection * Complement Part 2 – Rules Part 1 – Definitions * Event * Probability.

Games, Logic, and Math Kristy and Dan. GAMES Game Theory Applies to social science Applies to social science Explains how people make all sorts of decisions.

Statistics Lecture 6. Last day: Probability rules Today: Conditional probability Suggested problems: Chapter 2: 45, 47, 59, 63, 65.

1 Many people debate basic questions of chance in games such as lotteries. The Monty Hall problem is a fun brain teaser that Marilyn vos Savant addressed.

PROBABILITY MODELS. 1.1 Probability Models and Engineering Probability models are applied in all aspects of Engineering Traffic engineering, reliability,

1 Section 5.1 Discrete Probability. 2 LaPlace’s definition of probability Number of successful outcomes divided by the number of possible outcomes This.

Learning Goal 13: Probability Use the basic laws of probability by finding the probabilities of mutually exclusive events. Find the probabilities of dependent.

Statistics and Data Analysis Professor William Greene Stern School of Business IOMS Department Department of Economics.

Catch the Spirit of Mathematical Practices Mathematics Investigations Door 1Door 2 Door 3 Let’s Make a Deal...  Contestant picks one of three doors (1,

COMP14112: Artificial Intelligence Fundamentals L ecture 3 - Foundations of Probabilistic Reasoning Lecturer: Xiao-Jun Zeng

Using Technology to Conduct a Simulation

1 9/8/2015 MATH 224 – Discrete Mathematics Basic finite probability is given by the formula, where |E| is the number of events and |S| is the total number.

Independence and Dependence 1 Krishna.V.Palem Kenneth and Audrey Kennedy Professor of Computing Department of Computer Science, Rice University.

C4, L1, S1 Probabilities and Proportions. C4, L1, S2 I am offered two lotto cards: –Card 1: has numbers –Card 2: has numbers Which card should I take.

Algebra 1 Probability & Odds. Objective  Students will find the probability of an event and the odds of an event.

Bayes Net Lab. 1. Absolute Independence vs. Conditional Independence For any three random variables X, Y, and Z, a)is it true that if X  Y, then X 

1 9/23/2015 MATH 224 – Discrete Mathematics Basic finite probability is given by the formula, where |E| is the number of events and |S| is the total number.

Candy Land Castle By Danielle Rott and Michaela Layton.

Section 7.1. Section Summary Finite Probability Probabilities of Complements and Unions of Events Probabilistic Reasoning.

Chapter 7 With Question/Answer Animations. Section 7.1.

Lecture 14 3/6/08Lecture 142 Birthday Problem In a classroom of 21 people, what is the probability that at least two people have the same birthday? Event.

1.3 Simulations and Experimental Probability (Textbook Section 4.1)

Homework Homework due now. Reading: relations

C4, L1, S1 Chapter 3 Probability. C4, L1, S2 I am offered two lotto cards: –Card 1: has numbers –Card 2: has numbers Which card should I take so that.

Topic 2: Intro to probability CEE 11 Spring 2002 Dr. Amelia Regan These notes draw liberally from the class text, Probability and Statistics for Engineering.

Monty Hall problem. Joint probability distribution  In the study of probability, given two random variables X and Y, the joint distribution of X and.

Switch Doors? By Jan Bryson and Andrew Derer Switch Doors? Photo Courtesy of Hatos-Hall Productions.

1 Week of August 28, 2006 Refer to Chapter

Reasoning with Probs How does evidence lead to conclusions in situations of uncertainty? Bayes Theorem Data fusion, use of techniques that combine data.

The Monty Hall Simulation

Introduction Lecture 25 Section 6.1 Wed, Mar 22, 2006.

What is the probability of picking an ace? Probability =

Independence and Dependence 1 Krishna.V.Palem Kenneth and Audrey Kennedy Professor of Computing Department of Computer Science, Rice University.

1 Learning Objectives Bayes’ Formula The student will be able to solve problems involving finding the probability of an earlier event conditioned on the.

Section 7.1. Probability of an Event We first define these key terms: An experiment is a procedure that yields one of a given set of possible outcomes.

Monty Hall This is a old problem, but it illustrates the concept of conditional probability beautifully. References to this problem have been made in much.

What do we call the graph of a normal distribution? The graph is symmetric about what vertical line?

Homework Questions. Binomial Theorem Binomial  Bi – means 2 – two outcomes  Win/lose, girl/boy, heads/tails  Binomial Experiments.

Ray Karol 2/26/2013. Let’s Make a Deal Monte Hall Problem Suppose you’re on a game show, and you’re given a choice of three doors: Behind one door is.

Ch 11.7 Probability. Definitions Experiment – any happening for which the result is uncertain Experiment – any happening for which the result is uncertain.

Probabilities What is the probability that among 23 people (this class) there will be a shared birthday?

Starter In a certain game show, a contestant is presented with three doors. Behind one of the doors is an expensive prize; behind the others are goats.

Random Thoughts 2012 (COMP 066)

Why Be Random? What is it about chance outcomes being random that makes random selection seem fair? Two things: Nobody can guess the outcome before it.

Where are we in CS 440? Now leaving: sequential, deterministic reasoning Entering: probabilistic reasoning and machine learning.

Graphical Models in Brief

The Monty Hall Problem Madeleine Jetter 6/1/2000.

Monty Hall This is a old problem, but it illustrates the concept of conditional probability beautifully. References to this problem have been made in much.

Discrete Math for CS CMPSC 360 LECTURE 32 Last time: Review. Today:

A Problem that will delight your fancy

Probabilities and Proportions

Probability Die Difference and Uncertainty

Lecture 2: Probability.

Probability, Games & Sentiment Analysis

Lesson Day 2 – Teacher Notes

The Monty Hall Game PLAY Teacher’s Notes.

STATISTICS AND PROBABILITY

Prisoners of Probability

Probability Rules.

Let’s Win a Lollipop! Door 1 Door 2 Door 3 Win! You pick...and stay with and the Lose. You pick...and stay with... Door 1 Door 2 Door 3 ...and.

Presentation transcript:

What is the probability that it will snow on Christmas day in Huntingdon?

Lesson Objective Understand that some situations are too difficult to model using equally likely outcomes so probabilities need to be found using an alternative technique Understand how we can estimate the probability of an event using relative frequency

The Relative Frequency of an event Number of times the event occurs in the experiment The total number of trials in the experiment = Eg I check the weather every day in April. It rains on 8 of the days, what is the relative frequency of it raining in April? Eg Records suggest that the relative frequency of a bus being late in the morning is 0.1 Over a term of 34 days, on how many days would I expect the bus to be late?

The Monty Hall Problem MCPT Mathematics and Technology

About Let’s Make a Deal Let’s Make a Deal was a game show hosted by Monty Hall and Carol Merril. It originally ran from 1963 to 1977 on network TV. The highlight of the show was the “Big Deal,” where contestants would trade previous winnings for the chance to choose one of three doors and take whatever was behind it--maybe a car, maybe livestock. Let’s Make a Deal inspired a probability problem that can confuse and anger the best mathematicians.

Suppose you’re a contestant on Let’s Make a Deal.

You are asked to choose one of three doors. The grand prize is behind one of the doors; The other doors hide silly consolation gifts which Monty called “zonks”.

You choose a door. Monty, who knows what’s behind each of the doors, reveals a zonk behind one of the other doors. He then gives you the option of switching doors or sticking with your original choice.

You choose a door. The question is: should you switch? Monty, who knows what’s behind each of the doors, reveals a zonk behind one of the other doors. He then gives you the option of switching doors or sticking with your original choice.

X X Win

X X

X X

X X

True or Not? At the start of the game there is a 1 / 3 chance of me picking the car. I now know one of the doors which has a zonk behind it, so there are two doors left, one of which has the car and one of which has a zonk. Therefore the chances of me winning the car is now 1 / 2 for either door. Conclusion: There is no point me changing my door Is this true?

We are going to simulate the game in pairs. One player in each pair will be Monty (the host) and the other player will be the contestant ‘The Changers’ will play the game and always change the door they select ‘The Stickers’ will play the game but never change the door they select. Each pair needs to play the game 10 times and record how many wins

The correct answer: You should change your choice, because the probability of you winning the car if you do is 2/3. You pick a door randomly Pick a door With a Zonk Pick a door With a Zonk Pick a door With a Car Keep Win a Zonk Keep Win a Zonk Keep Win a Car Change Win a Car Change Win a Car Change Win a Zonk

Plenary questions: Why do we need to use relative frequency? How do you calculate the relative frequency? Do you think you will get better results by calculating relative frequencies based on 10 experiments or 50 experiments?