Use one sheet of your own paper. Quiz procedure Print your name legibly at the top left corner. Sign your name below your printed name. Joe Schafer.

Slides:

Advertisements

Similar presentations

Chapter 4: Section 6 Compound Probability.

Advertisements

Ms. Hahn’s Classroom Procedures

Welcome to CGMS Science Ms. Baker The Science Queen.

Playing Cards Deck of 52 uniquely designed playing cards.

1 Business 90: Business Statistics Professor David Mease Sec 03, T R 7:30-8:45AM BBC 204 Lecture 13 = Finish Chapter “ Basic Probability” (BP) Agenda:

1 Business 90: Business Statistics Professor David Mease Sec 03, T R 7:30-8:45AM BBC 204 Lecture 12 = Start Chapter “ Basic Probability” (BP) Agenda: 1)

UNR, MATH/STAT 352, Spring Radar target detection How reliable is the signal on the screen? (Is it a target of a false alarm?)

Laws of Probability What is the probability of throwing a pair of dice and obtaining a 5 or a 7? These are mutually exclusive events. You can’t throw.

VOCABULARY  Deck or pack  Suit  Hearts  Clubs  Diamonds  Spades  Dealer  Shuffle  Pick up  Rank  Draw  Set  Joker  Jack 

Find all the factors pairs of 20.

The first thing to do Draw a 2×3 grid and put a multiplication sign in the top left hand corner.

Compound Probability Pre-AP Geometry. Compound Events are made up of two or more simple events. I. Compound Events may be: A) Independent events - when.

Algebra II 10.2: Use Combinations Quiz : Friday, 12/13.

Classroom Procedures Mrs. Mirick Enter the Classroom  Walk quietly into the room.  Sharpen pencils, turn in homework, get your spiral from.

Page 973, 10.3, % 9.43% % 11. Permutation 12. Permutation 13. Combination 14. Combination, 18%

Two Way Tables Venn Diagrams Probability. Learning Targets 1. I can use a Venn diagram to model a chance process involving two events. 2. I can use the.

TASK 9/11 IF THIS IS YOUR FIRST DAY – SEE ME!!!!!! WRITE THIS DOWN ON YOUR LEARNING TARGET SHEET: 2 I know the difference between observation, inference,

6 th Grade Art & Introduction to Art Miss McDaniel Room 215 This powerpoint will be on my website.

1.What is the probability of rolling dice twice and getting a 4 and then a 7? Are these independent or dependent? 2.If you choose two cards from a deck,

Do Now 9/28/10 Take out your HW from last night. Take out your HW from last night. Textbook page 31-32, #3-11, all Textbook page 31-32, #3-11,

Welcome to 7th Grade American History with Mrs. Rostas

Notes Over 12.4 Probability of Events A standard six-sided number cube is rolled. Find the probability of the given event. 1. an even number or a one.

Expected Value. Expected Value - Definition The mean (average) of a random variable.

Warm Up- #1 1. Take a seat. Assigned seats will be given in a few minutes. 2. Please follow all instructions given by teacher. Objective: Students will.

Algebra II 10.3: Define and Use Probability Quiz : tomorrow.

 Probability: the chance that a particular event will occur.  When do people use probability ◦ Investing in stocks ◦ Gambling ◦ Weather.

Mrs. Ruch’s Class Procedures Entering Class: If homework is graded, turn it in the turn in slot. If homework is not graded, have sitting on corner of desk.

Block I Instructor Dr. Kathy Conway. Introductions Move to new group based on the color of your card Introduce yourself Complete Group sheet (Leave your.

Eng. Khaled seif.

Conditional Probability. Suppose you roll two dice Does the result of one of the dice affect what the result of the second one will be? No These are independent.

A Collection of Probability Questions. 1. Determine the probability of each of the following situations a) A red card is drawn from a standard deck There.

Probability What’s the chance of that happening? MM1D2 a, b, c.

More – means the number is bigger like an elephant. Less – means the number is smaller like a mouse.

Name:________________________________________________________________________________Date:_____/_____/__________ Fill-in-the-Blanks: 1.Theoretical probability.

Draw 3 cards without replacement from a standard 52 card deck. What is the probability that: 1.They are all red ? 2.At least one is black ? 3.They are.

Mutually Exclusive Events. In some situations, more than one event could occur during a single trial. In some situations, more than one event could occur.

Warm up 1.Get out a piece of paper. 2.Fold it into thirds. 3.In the first section, write the date at the top 4.Copy and answer the following questions:

Team 7-1 Science, 2 nd Semester Review of some basic policies and procedures.

Have you ever played a game where everyone should have an equal chance of winning, but one person seems to have all the luck? Did it make you wonder if.

Culture Project Objective: I will apply the sociological approach to current issues in society.

Rhythm #12 Review: Dotted Notes Introduce: Identify ties and slurs Class Activity: Drill and practice Quiz: PP12.

Constant of Proportionality Task Cards. Does this show a constant rate of change or not? Why?

Unit 4 Probability Day 3: Independent and Dependent events.

 Jack rolls a 6 sided die 15 times and gets the following results: 4, 6, 1, 3, 6, 6, 2, 5, 6, 5, 4, 1, 6, 3, 2. Based on these results, is Jack rolling.

No Learning Log Today You have 5 minutes to study for today’s quiz. Friday

Algebra II Elements 10.6: Introduction to Probability

Adding Integers.

pencil, red pen, highlighter, GP notebook, calculator

Simple Probability Things to know and do:

11/7/16 Entry 173 – Objective I will review and continue developing my understanding of uniform probability models, including the complement of an event.

Multiplication Rule and Conditional Probability

Make sure you know your 3-digit Student Class I.D. number for Math.

Bellringer: 10/5 AND 10/ Pick up the papers by the door.

Your Algebra 2 Test has 5 true/false and 15 multiple choice questions

Section 4 Review of QAR.

WORLD HISTORY Mr. Chris Sager Spring 2017.

Strong’s GMAS Review, Week 5, Problems 4 - 5

Click on one of the boxes and begin Mutually Exclusive Events

Structure of the Constitution

O.R. IN THE CLASSROOM Paper Cups.

Section 12.2 Theoretical Probability

Probability Chances Are… You can do it! Activity #2.

Section 12.2 Theoretical Probability

Homework Due Friday.

Agenda 11/20 Vocabulary Terms and Practice – 10 minutes

Reminders for final draft

Algebra 2/Trig – Unit 8 Review Name: ________________________

Section 12.2 Theoretical Probability

Red pen, highlighter, GP notebook, calculator

Presentation transcript:

Use one sheet of your own paper. Quiz procedure Print your name legibly at the top left corner. Sign your name below your printed name. Joe Schafer

Quiz procedure When the quiz questions are displayed, write brief answers on your sheet. You will have two minutes. When you are finished, do not leave this room. When the time is up, pass completed quizzes to your left. The left-most person in each row will pass them down to the front of the room. The left-most person in the front row will hand them to me. When I have the quizzes, you may leave the room.

2:00Quiz for Lecture 26 For each situation below, state whether it is based on the Relative Frequency (RF) or Personal Probability (PP) interpretation of probability. (A) There’s a 60% chance that George Mason will beat Florida in basketball this Saturday. (B) If you draw a single card from a deck, the probability of getting a face card (Jack, Queen or King) is 3/13 = 0.23 (C) The chance of rain tomorrow is 40%.

1:50Quiz for Lecture 26 For each situation below, state whether it is based on the Relative Frequency (RF) or Personal Probability (PP) interpretation of probability. (A) There’s a 60% chance that George Mason will beat Florida in basketball this Saturday. (B) If you draw a single card from a deck, the probability of getting a face card (Jack, Queen or King) is 3/13 = 0.23 (C) The chance of rain tomorrow is 40%.

1:40Quiz for Lecture 26 For each situation below, state whether it is based on the Relative Frequency (RF) or Personal Probability (PP) interpretation of probability. (A) There’s a 60% chance that George Mason will beat Florida in basketball this Saturday. (B) If you draw a single card from a deck, the probability of getting a face card (Jack, Queen or King) is 3/13 = 0.23 (C) The chance of rain tomorrow is 40%.

1:30Quiz for Lecture 26 For each situation below, state whether it is based on the Relative Frequency (RF) or Personal Probability (PP) interpretation of probability. (A) There’s a 60% chance that George Mason will beat Florida in basketball this Saturday. (B) If you draw a single card from a deck, the probability of getting a face card (Jack, Queen or King) is 3/13 = 0.23 (C) The chance of rain tomorrow is 40%.

1:20Quiz for Lecture 26 For each situation below, state whether it is based on the Relative Frequency (RF) or Personal Probability (PP) interpretation of probability. (A) There’s a 60% chance that George Mason will beat Florida in basketball this Saturday. (B) If you draw a single card from a deck, the probability of getting a face card (Jack, Queen or King) is 3/13 = 0.23 (C) The chance of rain tomorrow is 40%.

1:10Quiz for Lecture 26 For each situation below, state whether it is based on the Relative Frequency (RF) or Personal Probability (PP) interpretation of probability. (A) There’s a 60% chance that George Mason will beat Florida in basketball this Saturday. (B) If you draw a single card from a deck, the probability of getting a face card (Jack, Queen or King) is 3/13 = 0.23 (C) The chance of rain tomorrow is 40%.

1:00Quiz for Lecture 26 For each situation below, state whether it is based on the Relative Frequency (RF) or Personal Probability (PP) interpretation of probability. (A) There’s a 60% chance that George Mason will beat Florida in basketball this Saturday. (B) If you draw a single card from a deck, the probability of getting a face card (Jack, Queen or King) is 3/13 = 0.23 (C) The chance of rain tomorrow is 40%.

0:50Quiz for Lecture 26 For each situation below, state whether it is based on the Relative Frequency (RF) or Personal Probability (PP) interpretation of probability. (A) There’s a 60% chance that George Mason will beat Florida in basketball this Saturday. (B) If you draw a single card from a deck, the probability of getting a face card (Jack, Queen or King) is 3/13 = 0.23 (C) The chance of rain tomorrow is 40%.

0:40Quiz for Lecture 26 For each situation below, state whether it is based on the Relative Frequency (RF) or Personal Probability (PP) interpretation of probability. (A) There’s a 60% chance that George Mason will beat Florida in basketball this Saturday. (B) If you draw a single card from a deck, the probability of getting a face card (Jack, Queen or King) is 3/13 = 0.23 (C) The chance of rain tomorrow is 40%.

0:30Quiz for Lecture 26 For each situation below, state whether it is based on the Relative Frequency (RF) or Personal Probability (PP) interpretation of probability. (A) There’s a 60% chance that George Mason will beat Florida in basketball this Saturday. (B) If you draw a single card from a deck, the probability of getting a face card (Jack, Queen or King) is 3/13 = 0.23 (C) The chance of rain tomorrow is 40%.

0:20Quiz for Lecture 26 For each situation below, state whether it is based on the Relative Frequency (RF) or Personal Probability (PP) interpretation of probability. (A) There’s a 60% chance that George Mason will beat Florida in basketball this Saturday. (B) If you draw a single card from a deck, the probability of getting a face card (Jack, Queen or King) is 3/13 = 0.23 (C) The chance of rain tomorrow is 40%.

0:10Quiz for Lecture 26 For each situation below, state whether it is based on the Relative Frequency (RF) or Personal Probability (PP) interpretation of probability. (A) There’s a 60% chance that George Mason will beat Florida in basketball this Saturday. (B) If you draw a single card from a deck, the probability of getting a face card (Jack, Queen or King) is 3/13 = 0.23 (C) The chance of rain tomorrow is 40%.

0:09Quiz for Lecture 26 For each situation below, state whether it is based on the Relative Frequency (RF) or Personal Probability (PP) interpretation of probability. (A) There’s a 60% chance that George Mason will beat Florida in basketball this Saturday. (B) If you draw a single card from a deck, the probability of getting a face card (Jack, Queen or King) is 3/13 = 0.23 (C) The chance of rain tomorrow is 40%.

0:08Quiz for Lecture 26 For each situation below, state whether it is based on the Relative Frequency (RF) or Personal Probability (PP) interpretation of probability. (A) There’s a 60% chance that George Mason will beat Florida in basketball this Saturday. (B) If you draw a single card from a deck, the probability of getting a face card (Jack, Queen or King) is 3/13 = 0.23 (C) The chance of rain tomorrow is 40%.

0:07Quiz for Lecture 26 For each situation below, state whether it is based on the Relative Frequency (RF) or Personal Probability (PP) interpretation of probability. (A) There’s a 60% chance that George Mason will beat Florida in basketball this Saturday. (B) If you draw a single card from a deck, the probability of getting a face card (Jack, Queen or King) is 3/13 = 0.23 (C) The chance of rain tomorrow is 40%.

0:06Quiz for Lecture 26 For each situation below, state whether it is based on the Relative Frequency (RF) or Personal Probability (PP) interpretation of probability. (A) There’s a 60% chance that George Mason will beat Florida in basketball this Saturday. (B) If you draw a single card from a deck, the probability of getting a face card (Jack, Queen or King) is 3/13 = 0.23 (C) The chance of rain tomorrow is 40%.

0:05Quiz for Lecture 26 For each situation below, state whether it is based on the Relative Frequency (RF) or Personal Probability (PP) interpretation of probability. (A) There’s a 60% chance that George Mason will beat Florida in basketball this Saturday. (B) If you draw a single card from a deck, the probability of getting a face card (Jack, Queen or King) is 3/13 = 0.23 (C) The chance of rain tomorrow is 40%.

0:04Quiz for Lecture 26 For each situation below, state whether it is based on the Relative Frequency (RF) or Personal Probability (PP) interpretation of probability. (A) There’s a 60% chance that George Mason will beat Florida in basketball this Saturday. (B) If you draw a single card from a deck, the probability of getting a face card (Jack, Queen or King) is 3/13 = 0.23 (C) The chance of rain tomorrow is 40%.

0:03Quiz for Lecture 26 For each situation below, state whether it is based on the Relative Frequency (RF) or Personal Probability (PP) interpretation of probability. (A) There’s a 60% chance that George Mason will beat Florida in basketball this Saturday. (B) If you draw a single card from a deck, the probability of getting a face card (Jack, Queen or King) is 3/13 = 0.23 (C) The chance of rain tomorrow is 40%.

0:02Quiz for Lecture 26 For each situation below, state whether it is based on the Relative Frequency (RF) or Personal Probability (PP) interpretation of probability. (A) There’s a 60% chance that George Mason will beat Florida in basketball this Saturday. (B) If you draw a single card from a deck, the probability of getting a face card (Jack, Queen or King) is 3/13 = 0.23 (C) The chance of rain tomorrow is 40%.

0:01Quiz for Lecture 26 For each situation below, state whether it is based on the Relative Frequency (RF) or Personal Probability (PP) interpretation of probability. (A) There’s a 60% chance that George Mason will beat Florida in basketball this Saturday. (B) If you draw a single card from a deck, the probability of getting a face card (Jack, Queen or King) is 3/13 = 0.23 (C) The chance of rain tomorrow is 40%.

Time’s up! Pass the completed quizzes to your left. Left-most person: Pass them down to the front. When I have the quizzes, you may leave the room. See you on Friday.