Chance Experiments with Outcomes That Are Not Equally Likely

Slides:

Advertisements

Similar presentations

Designing Investigations to Predict Probabilities Of Events.

Advertisements

Probability,Fractions,Patterns, and Functions LEAP Review.

CMT Jeopardy(6) Part 2 Objectives Objective Objectives 1-24 Objectives 1-24 Objectives 1-24 Q $100 Q $200 Q $300 Q $400 Q $500 Q $100 Q $200.

A B C In Even Head Toss, a carnival game the object is to flip a head and roll an even number. What are the favorable outcomes? H2, H4, H6 T2, T4. T6.

Probability Lesson

Probability Abney Elementary.

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.

Creating Tree Diagrams to find Theoretical Probability

Probability What are your Chances? Overview Probability is the study of random events. The probability, or chance, that an event will happen can be described.

7.11 Probability, Fractions, and Spinners. Mental Math There are 5 red and 5 blue blocks in a bag. What are the chances of picking a red block? What are.

Number of Siblings Number of Students

EXPLORING PROBABILITY GRADE 3.

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.

Calculating Probabilities for Chance Experiments with Equally Likely Outcomes.

Finding Theoretical Probability Using an Area Model

Choose a level. 1 Star Question Her is part of a price list for a fruit and vegetable stall. 2 apples and 3 cauliflowers would count as 5 portions. How.

Probabilities and Collecting Data. At a school carnival, there is a game in which students spin a large spinner. The spinner has 4 equal sections numbered.

Estimating Probabilities by Collecting Data

Probability: Simple and Compound Independent and Dependent Experimental and Theoretical.

Find the probability and odds of simple events.

Probability Independent Study Instructor: Dianne Phillips By: Jason Mitchell.

Level34567 Probability Skills I can use the probability words impossible, certain and even chance to describe the probability of an event occurring. I.

Warm-Up 1. What is Benford’s Law?

Warm-Up Exercises EXAMPLE 1 Find a theoretical probability T-shirts You and your friends designed T-shirts with silk screened emblems, and you are selling.

Determining Probabilities Using Tree Diagrams and Tables.

Bell Work FRACTIONDECIMALPERCENTWORDS. You have probably heard a weather forecaster say that the chance of rain tomorrow is 40%. Have you thought about.

Certain Definitely will happen Impossible Will not happen Impossible Will not happen What is the probability of picking a red tile? Is it certain or impossible.

Probability I can predict appropriate probability of a given event using words and numbers.

What is probability? How does it happen in our lives?

Problems 1 – 9 Problems 10 – Q $100 Q $200 Q $300 Q $400 Q $500 Q $100 Q $400 Q $200 Q $500 Q $300 Q $400 Website Problems 12 – 16 Problems 17 –

Lesson 7.8 Simple Probability Essential Question: How do you find the probability of an event?

Probability MOST LIKELY LEAST LIKELY PROBABLY Created by Lindsey Roberts-Walstrom West Hartford Public Schools.

250 trials 350 trials Probability: Relative Frequency An estimate of the probability of an event happening can be obtained by looking back at experimental.

9-1 Probability An activity involving chance, such as rolling a cube, is called an experiment. Each repetition or observation of an experiment is a trial,

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.

 What do you think it means for an event to have a probability of ½ ?  What do you think it means for an event to have a probability of 1/4 ?

Chance Experiments with Outcomes that are not Equally Likely.

EXAMPLE 3 Standardized Test Practice SOLUTION The theoretical probability of stopping on each of the four colors is.Use the outcomes in the table to find.

Experimental Probability

It’ll definitely happen!!! It’ll NEVER happen!!! It might happen There is a strong chance it’ll happen It is not very likely it’ll happen. Tomorrow will.

1. A sample space consists of 18 separate events that are equally likely. What is the probability of each? A) 0 C) 1 B) 1 D)

1. ____1.Sarah rolled a number cube 30 times and recorded the results. She found that she rolled an even number 16 times. What does represent? a.theoretical.

Calculating Probabilities Statistics and Probability.

PROBABILITY TEST REVIEW

KS4 Mathematics D6 Probability.

(Single and combined Events)

Station 1 Julie has a stack of game cards that includes red, green, and blue cards. She draws a card and records the results. The table shows Julie’s.

Probability! 3rd grade Review Created by J. Hicks – ITRT

Finding Theoretical Probability Using an Area Model

Unit 8. Day 5..

Lesson 13.1 Find Probabilities and Odds

Name: _______________________________

2+6.1= 6.6−1.991= 0.7(5.416)= 8.92÷1.6= = Bell Work Cronnelly.

Skill Review Unique has a bag of marbles. There are 4 colors of marbles: red, blue, yellow, and green. The table shows the frequencies of marbles after.

Chapter 1 Study Guide Completed by:.

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

Directions for using an Area Model:

Probability and Chance

Bell Work into a decimal & a percent. 5) 8 9 (1 2 3 ) =

5-8 Probability and Chance

Rebecca Black = Monday.

An activity involving chance, such as rolling a cube, is called an experiment. Each repetition or observation of an experiment is a trial, and each result.

Probability Lesson 4: Non-Equally Likely Events

Finding Theoretical Probability Using an Area Model

Are the outcomes equally likely?

Presentation transcript:

Chance Experiments with Outcomes That Are Not Equally Likely

When Jenna goes to the farmer’s market she usually buys bananas When Jenna goes to the farmer’s market she usually buys bananas. The number of bananas she might buy and their probabilities are shown in the table below.

What is the probability that Jenna buys exactly 3 bananas? What is the probability that Jenna doesn’t buy any bananas? What is the probability that Jenna buys more than 3 bananas? What is the probability that Jenna buys at least 3 bananas? What is the probability that Jenna doesn’t buy exactly 3 bananas?

Notice that the sum of the probabilities in the table is one whole 0 Notice that the sum of the probabilities in the table is one whole 0.1+0.1+0.1+0.2+0.2+0.3=1 0.1+0.1+0.1+0.2+0.2+0.3=1 . This is always true; when we add up the probabilities of all the possible outcomes, the result is always 1. So, taking 1 and subtracting the probability of the event gives us the probability of something NOT occurring.

Jenna’s husband, Rick, is concerned about his diet Jenna’s husband, Rick, is concerned about his diet. On any given day, he eats 0, 1, 2, 3, or 4 servings of fruit and vegetables. The probabilities are given in the table below.

On a given day, find the probability that Rick eats: Two servings of fruit and vegetables. More than two servings of fruit and vegetables. At least two servings of fruit and vegetables. Find the probability that Rick does not eat exactly two servings of fruit and vegetables.

Luis works in an office, and the phone rings occasionally Luis works in an office, and the phone rings occasionally. The possible number of phone calls he receives in an afternoon and their probabilities are given in the table below.

Find the probability that Luis receives 3 or 4 phone calls. Find the probability that Luis receives fewer than 2 phone calls. Find the probability that Luis receives 2 or fewer phone calls. Find the probability that Luis does not receive 4 phone calls.

How would you calculate the probability that Luis receives at least one call? What might be a quicker way of doing this?

When Jenna goes to the farmer’s market, she also usually buys some broccoli. The possible number of heads of broccoli that she buys and the probabilities are given in the table below.

Find the probability that Jenna Buys exactly 3 heads of broccoli. Does not buy exactly 3 heads of broccoli. Buys more than 1 head of broccoli. Buys at least 3 heads of broccoli.

The diagram below shows a spinner designed like the face of a clock The diagram below shows a spinner designed like the face of a clock. The sectors of the spinner are colored red (R), blue (B), green (G), and yellow (Y).

Writing your answers as fractions in lowest terms, find the probability that the pointer stops on the following colors. Red: Blue: Green: Yellow:

Complete the table of probabilities below. Find the probability that the pointer stops in either the blue region or the green region. Find the probability that the pointer does not stop in the green region.

Wordtoon

Carol is sitting on the bus on the way home from school and is thinking about the fact that she has three homework assignments to do tonight. The table below shows her estimated probabilities of completing 0,1,2, or all 3 of the assignments. 1. Writing your answers as fractions in lowest terms, find the probability that Carol completes a. Exactly one assignment. b. More than one assignment. c. At least one assignment. 2. Find the probability that the number of homework assignments Carol completes is not exactly 2.

3. Carol has a bag containing 3 red chips, 10 blue chips, and 7 green chips. Estimate the probability (as a fraction or decimal) of Carol reaching into her bag and pulling out a green chip.