HWTP- practice for the test

Slides:

Advertisements

Similar presentations

MAT 103 Probability In this chapter, we will study the topic of probability which is used in many different areas including insurance, science, marketing,

Advertisements

Chapter 2 Probability. 2.1 Sample Spaces and Events.

Probability Chapter 11 1.

MAT 103 Probability In this chapter, we will study the topic of probability which is used in many different areas including insurance, science, marketing,

Probability of two events Example A coin is tossed twice. Draw a probability sample space diagram showing all the possible outcomes. What is the probability.

PROBABILITY  A fair six-sided die is rolled. What is the probability that the result is even?

16.4 Probability Problems Solved with Combinations.

13-1 Experimental and Theoretical Probability. Outcome: the possible result of a situation or experiment Even: may be a single outcome or a group of outcomes.

HW2 assignment. 1.A fair coin is tossed 5 times. Find a probability of obtaining (a) exactly 3 heads; (b) at most 3 heads Solution: Binomial distribution.

EXAMPLE 1 Find probabilities of events You roll a standard six-sided die. Find the probability of (a) rolling a 5 and (b) rolling an even number. SOLUTION.

Academy Algebra II/Trig 14.3: Probability HW: worksheet Test: Thursday, 11/14.

Unit 4 – Combinatorics and Probability Section 4.4 – Probability with Combinations Calculator Required.

Copyright (c) 2004 Brooks/Cole, a division of Thomson Learning, Inc. Chapter 2 Probability.

NA387 Lecture 5: Combinatorics, Conditional Probability

The probability that it rains is 70% The probability that it does NOT rain is 30% Instinct tells us that for any event E, the probability that E happens.

Probability Theory 1.Basic concepts 2.Probability 3.Permutations 4.Combinations.

Chapter 7 With Question/Answer Animations. Section 7.1.

Warm Up Write each fraction as a percent Evaluate P P C C 6 25% 37.5%100%

EXERCISE 10 Februari 2010.

Aim: How do we use permutation and combination to evaluate probability? Do Now: Your investment counselor has placed before you a portfolio of 6 stocks.

Warm Up Write each fraction as a percent Evaluate P P C C 6 25% 37.5%100%

Probability Basic Concepts Start with the Monty Hall puzzle

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.

Example Suppose we roll a die and flip a coin. How many possible outcomes are there? Give the sample space. A and B are defined as: A={Die is a 5 or 6}

Do Now. Introduction to Probability Objective: find the probability of an event Homework: Probability Worksheet.

Probability Theory Rahul Jain. Probabilistic Experiment A Probabilistic Experiment is a situation in which – More than one thing can happen – The outcome.

Chapter 7 Section 5.  Binomial Distribution required just two outcomes (success or failure).  Multinomial Distribution can be used when there are more.

Chapter 10 – Data Analysis and Probability 10.7 – Probability of Compound Events.

HWTP 1.How many distinguishable arrangements are there of the letters in the word PROBABILITY? 2.A and B are special dice. The faces of A are 2,2,5,5,5,5.

3.4 Elements of Probability. Probability helps us to figure out the liklihood of something happening. The “something happening” is called and event. The.

Section 1.3 Each arrangement (ordering) of n distinguishable objects is called a permutation, and the number of permutations of n distinguishable objects.

Solutions to the HWPT problems. 1.How many distinguishable arrangements are there of the letters in the word PROBABILITY? Answer: 11!/(2! 2!) 2.A and.

G: SAMPLING WITH AND WITHOUT REPLACEMENT H: SETS AND VENN DIAGRAMS CH 22GH.

6.20 I will describe and determine probability In an experiment where a pair of dice (one red, one green) is thrown and the number facing up on each die.

Probability Final Review. 1.One marble is drawn at random from a bag containing 2 white, 4 red, and 6 blue marbles Find the probability: One – Basic sixth.

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.

PROBABILITY AND STATISTICS WEEK 2 Onur Doğan. Introduction to Probability The Classical Interpretation of Probability The Frequency Interpretation of.

Combinatorial Principles, Permutations, and Combinations

Probability Theory Basic concepts Probability Permutations

Theoretical and Experimental Probability 7-2

Probability of Independent and Dependent Events

Counting Principles Ex. Eight pieces of paper are numbered 1 to 8 and placed in a box. One piece of paper is drawn from the box, its number is written.

EXAMPLE 1 Find probabilities of events

An Introduction to Probability Theory

Bayes’ Theorem.

What Is Probability?.

10.7: Probability of Compound Events Test : Thursday, 1/16

STATISTICS AND PROBABILITY IN CIVIL ENGINEERING

What is Probability? Quantification of uncertainty.

Probability Part 2.

BASIC PROBABILITY Probability – the chance of something (an event) happening # of successful outcomes # of possible outcomes All probability answers must.

MUTUALLY EXCLUSIVE EVENTS

Probability The term probability refers to indicate the likelihood that some event will happen. For example, ‘there is high probability that it will rain.

Finding the Complement of Event E AGENDA:

PROBABILITY AND STATISTICS

Probability: Test Tomorrow

Unit 6 Review Probability Bingo.

Combination and Permutations Quiz!

Probability Problems Solved with

Section 14.5 – Independent vs. Dependent Events

7.3 Conditional Probability, Intersection and Independence

Probability: Test Tomorrow

Additional Rule of Probability

Probability of two events

Probability of Dependent and Independent Events

video Warm-Up Lesson 14 Exit card

Theoretical and Experimental Probability

Presentation transcript:

HWTP- practice for the test How many distinguishable arrangements are there of the letters in the word PROBABILITY? A and B are special dice. The faces of A are 2,2,5,5,5,5 and the faces of B are 3,3,3,6,6,6. The two die are rolled. What is the probability that the number showing on die B is greater than the number showing on die A? Hint: try presenting the event F= “the number showing on die B is greater than the number showing on die A” as a combination of the elementary events using “either or” and “and” operations. 3. The integers 1,2,3,4 are randomly permuted. What is the probability that 4 is to the left of 2? Hint: Find the total number of permutations. What is the share of the permutations keeping 4 to the left of 2?

4. A box contains 8 red, 3 white and 9 blue balls 4. A box contains 8 red, 3 white and 9 blue balls. Three balls are to be drawn without replacement. What is the probability that more blues than whites are drawn? (42) Hint: Present this event as a union of simpler events (use “B” (for blue), “W” and “R” letters. Do not forget that BRR, for example, also satisfies the requirement. 5. A production lot has has 100 units of which 25 are known to be defective. A random sample of 4 units is chosen without replacement. What is the probability that the sample will contain no more than 2 defective units. Hint: (a) Notice that “At most 2 defective” = “0 defective” + “1 defective” + “2 defective”. (b) Notice that the number of outcomes corresponding to “0 defective” is N(0)=C75,4 (meaning that all four units are taken out of 75 non-defective). Using the same approach, find N(1) and N(2). Notice that they are described as intersections (“and”) of two events each. (c) Add together the numbers of outcomes corresponding to all three events in the right- hand side, and divide by the total number of possible selections (4 out of 100). Practice with the Problems 1.6-1.7, 1.12,1.26, 1.30-1.32, 1.39-1.42, 1.49-1.51, 1.81-1.89, 1.93-1.95 From Shaum’s outlines. During the test you can use my Lecture files (PPT printouts) and Mathematica. No other materials are allowed