Clear your desk for your quiz. Unit 2 Day 8 Expected Value Average expectation per game if the game is played many times Can be used to evaluate and.

Slides:

Advertisements

Similar presentations

Theoretical Probability

Advertisements

Probability What are your Chances?

Probability Three basic types of probability: Probability as counting

Introduction to Philosophy Lecture 6 Pascal’s wager

A measurement of fairness game 1: A box contains 1red marble and 3 black marbles. Blindfolded, you select one marble. If you select the red marble, you.

Algebra 1 Ch 2.8 – Probability & Odds.

Take out a coin! You win 4 dollars for heads, and lose 2 dollars for tails.

AP Biology Laws of Probability Probability & Genetics.

Math notebook, pencil, and possibly calculator. Definitions  An outcome is the result of a single trial of an experiment.  The sample space of an experiment.

Learn to estimate probability using theoretical methods.

Probability Chapter 11 1.

Games of probability What are my chances?. Roll a single die (6 faces). –What is the probability of each number showing on top? Activity 1: Simple probability:

Probability And Expected Value ————————————

Random Variables A Random Variable assigns a numerical value to all possible outcomes of a random experiment We do not consider the actual events but we.

Expected Value.  In gambling on an uncertain future, knowing the odds is only part of the story!  Example: I flip a fair coin. If it lands HEADS, you.

UNR, MATH/STAT 352, Spring Head Tail Tossing a symmetric coin You are paying $1 How much should you get to make the game fair?

Bell Work: Factor x – 6x – Answer: (x – 8)(x + 2)

1. What’s the probability that the spinner will land on blue? 2. Samuel has a bowl of fruit containing 3 apples, 2 oranges and 5 pears. If he randomly.

Chapter 16: Random Variables

What are the chances of that happening?. What is probability? The mathematical expression of the chances that a particular event or outcome will happen.

A multiple-choice test consists of 8 questions

Warm up: Solve each system (any method). W-up 11/4 1) Cars are being produced by two factories, factory 1 produces twice as many cars (better management)

Topic 1: Probability and Sample Space

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

Quiz Time! Clear your desk except for a pencil & calculator!

Dependent and Independent Events. Events are said to be independent if the occurrence of one event has no effect on the occurrence of another. For example,

1.3 Simulations and Experimental Probability (Textbook Section 4.1)

Chapter 16: Random Variables

CALCULATE THE PROBABILITY OF AN EVENT. 1.ANSWER THIS QUESTION: IS THE EVENT POSSIBLE? STOP: DON’T CONTINUE. THE PROBABILITY OF THE EVENT IS O GO TO NUMBER.

1.4 Equally Likely Outcomes. The outcomes of a sample space are called equally likely if all of them have the same chance of occurrence. It is very difficult.

Lesson Objective Understand what we mean by a Random Variable in maths Understand what is meant by the expectation and variance of a random variable Be.

Expected Value.

© 2011 MARS University of NottinghamBeta Version Projector resources: Evaluating Statements About Probability Projector Resources.

5.1 Probability in our Daily Lives.  Which of these list is a “random” list of results when flipping a fair coin 10 times?  A) T H T H T H T H T H 

Warm Up If Babe Ruth has a 57% chance of hitting a home run every time he is at bat, run a simulation to find out his chances of hitting a homerun at least.

Fair and Unfair Games Laura Smiley. What makes a game… FairUnfair.

WOULD YOU PLAY THIS GAME? Roll a dice, and win $1000 dollars if you roll a 6.

Warm up Decide if the following represent permutations or combinations. Then calculate the desired results. 1. How many different four digit numbers can.

Homework An experiment consists of rolling a fair number cube. Find each probability. 1. P(rolling an odd number) 2. P(rolling a prime number) An experiment.

Introduction to Probability – Experimental Probability.

What is the probability of two or more independent events occurring?

The Mean of a Discrete Random Variable Lesson

A very good way of working out complicated probability problems is to draw them. The best way of drawing them is to make a probability tree.

Jane wins $21 if a die roll shows a six, and she loses $2 otherwise

Probability Events: In the language of probability, something that could or has happened is called an event. The following are all events: 2. Getting.

How likely is something to happen..  When a coin is tossed, there are two possible outcomes: heads (H) or tails (T) We say the probability of a coin.

Expected Value and Fair Game S-MD.6 (+) Use probabilities to make fair decisions (e.g., drawing by lots, using a random number generator). S-MD.7 (+) Analyze.

Theoretical Probability

Counting and Probability. Imagine tossing two coins and observing whether 0, 1, or 2 heads are obtained. Below are the results after 50 tosses Tossing.

In games of chance the expectations can be thought of as the average outcome if the game was repeated multiple times. Expectation These calculated expectations.

16.6 Expected Value.

You Bet Your Life - So to Speak

Sequences, Series, and Probability

Game Theory “How to Win the Game!”.

Expected Value.

PROBABILITY The probability of an event is a value that describes the chance or likelihood that the event will happen or that the event will end with.

Probability What are your Chances?

Multiply the probability of the events together.

Probability And Expected Value ————————————

Probability Trees By Anthony Stones.

Expected Value.

Probability Die Difference and Uncertainty

Probability And Expected Value ————————————

Investigation 2 Experimental and Theoretical Probability

Probability of two events

Expected Value.

Probability True or False?.

Fun… Tree Diagrams… Probability.

Calculating Probabilities

Statistics and Probability-Part 5

Presentation transcript:

Clear your desk for your quiz

Unit 2 Day 8

Expected Value Average expectation per game if the game is played many times Can be used to evaluate and compare alternatives in order to make decisions Expected value is used to estimate what we can expect to happen

Expected Value A game gives payoffs a 1, a 2, …, a n with probabilities P 1, P 2, …, P n. The expected value (or expectation) E of this game is In other words, multiply the payoff of each outcome by the chance of getting that outcome and add all these together.

Example A die is rolled and you receive $1 for each point that shows. What is your expectation? To calculate the expected value: What is the probability for each face of the die? What is the payoff for each face of the die?

Solution What is the probability for each face of the die? – Each face of the die has probability 1/6 of showing What is the payoff for each face of the die? – $1 for a 1, $2 for a 2, $3 for a 3, $4 for a 4, $5 for a 5, $6 for a 6

Solution Thus, the expected value is: This means that if you play this game many times, you will make, on average $3.50 per game.

A $20 bill, two $10 bills, three $5 bills and four $1 bills are placed in a bag. If a bill is chosen at random, what is the expected value for the amount chosen? (1/10)*($20) + (2/10)*($10) + (3/10)*($5) + (4/10)*($1) = 59/10 = $5.90

In a game you flip a coin twice, and record the number of heads that occur. You get 10 points for 2 heads, zero points for 1 head, and 5 points for no heads. What is the expected value for the number of points you’ll win per turn? (1/4)*(10) + (2/4)*(0) + (1/4)*(5) = 15/4 = 3.75

Your Turn! Find the expected value (or expectation) of the games described. Mike wins $2 if a coin toss shows heads and $1 if it shows tails. Jane wins $10 if a die roll shows a six, and she loses $1 otherwise. A coin is tossed twice. Albert wins $2 for each heads and must pay $1 for each tails.

Solutions Mike wins $2 if a coin toss shows heads and $1 if it shows tails. $1.50 Jane wins $10 if a die roll shows a six, and she loses $1 otherwise $0.83 A coin is tossed twice. Albert wins $2 for each heads and must pay $1 for each tails. $1.00