Section 5.4. Greatest Common Factor and Least Common Multiple. Solution. Greatest Common Factor and Least Common Multiple
|
|
|
- Leslie Fletcher
- 5 years ago
- Views:
Transcription
1 Greatest Common Factor and Least Common Multiple Section 5.4 Greatest Common Factor and Least Common Multiple Find the greatest common factor by several methods. Find the least common multiple by several methods. Copyright 06, 0, and 008 Pearson Education, Inc. Copyright 06, 0, and 008 Pearson Education, Inc. Greatest Common Factor The greatest common factor (GCF) of a group of natural numbers is the largest number that is a factor of all of the numbers in the group. Example: 0, 4, and : All have and 4 as common factors (but no higher numbers), so 4 is GCF. (Prime Factors Method) Step Write the prime factorization of each number. Step Choose all primes common to all factorizations, with each prime raised to the least exponent that appears. Form the product of all the numbers in Step ; this product is the greatest common factor. Copyright 06, 0, and 008 Pearson Education, Inc. Copyright 06, 0, and 008 Pearson Education, Inc. 4 Example: Greatest Common Factor by Prime Factors Method Find the greatest common factor of 60 and 50. The prime factorizations are below. 60 = 5 50 = 5 The GCF is 5 = 90. Step Write the numbers in a row. Step Divide each of the numbers by a common prime factor. Try, then, and so on. Divide the quotients by a common prime factor. Continue until no prime will divide into all the quotients. Step 4 The product of the primes in steps and is the greatest common factor. Copyright 06, 0, and 008 Pearson Education, Inc. 5 Copyright 06, 0, and 008 Pearson Education, Inc. 6
2 Find the greatest common factor of, 8, and Divide by Divide by No common factors Since there are no common factors in the last row, the GCF is = 6. Copyright 06, 0, and 008 Pearson Education, Inc. 7 (Euclidean Algorithm) To find the greatest common factor of two unequal numbers:. Divide the larger by the smaller.. Note the remainder, and divide the previous divisor by this remainder.. Continue the process until a remainder of 0 is obtained. 4. The greatest common factor is the last positive remainder obtained. Copyright 06, 0, and 008 Pearson Education, Inc. 8 common factor of 60 and 68. Step common factor of 60 and 68. Step Step Copyright 06, 0, and 008 Pearson Education, Inc. 9 Copyright 06, 0, and 008 Pearson Education, Inc. 0 Least Common Multiple common factor of 60 and 68. The GCF is. Step Step Done The least common multiple (LCM) of a group of natural numbers is the smallest natural number that is a multiple of all of the numbers in the group. Example: 0 and x 50 = 500, but least common multiple is 50. (5 x 0 = x 50). Copyright 06, 0, and 008 Pearson Education, Inc. Copyright 06, 0, and 008 Pearson Education, Inc.
3 (Prime Factors Method) Step Write the prime factorization of each number. Step Choose all primes belonging to any factorization, with each prime raised to the power indicated by the greatest exponent that it has in any factorization. Form the product of all the numbers in Step ; this product is the least common multiple. Example: Finding the LCM Find the least common multiple of 60 and 50. The prime factorizations are below. 60 = 5 50 = 5 The LCM is 5 = Copyright 06, 0, and 008 Pearson Education, Inc. Copyright 06, 0, and 008 Pearson Education, Inc. 4 Step Write the numbers in a row. Step Divide each of the numbers by a common prime factor. Try, then, and so on. Divide the quotients by a common prime factor. When no prime will divide all quotients, but a prime will divide some of them, divide where possible and bring any nondivisible quotients down. Continued on next slide (step continued) Continue until no prime will divide any two quotients. Step 4 The product of the prime divisors in steps and as well as all remaining quotients is the least common multiple. [This is not as bad as it sounds.] Copyright 06, 0, and 008 Pearson Education, Inc. 5 Copyright 06, 0, and 008 Pearson Education, Inc. 6 Find the least common multiple of, 8, and Divide by Divide by No common factors (Formula) The least common multiple of m and n is given by mn LCM =. greatest common factor of m and n The LCM is 5 = 80. Copyright 06, 0, and 008 Pearson Education, Inc. 7 Copyright 06, 0, and 008 Pearson Education, Inc. 8
4 Example: LCM Formula Find the LCM of 60 and 50. The GCF is 90. [from earlier example] LCM = = = Available Methods Greatest Common Factor Least Common Multiple Prime factor method Prime factor method Dividing by prime factors Euclidean method Dividing by prime factors Formula using GCF Copyright 06, 0, and 008 Pearson Education, Inc. 9 Example: (Is this GCF or LCM?) Two traffic signals on adjacent streets in a certain town run on a continuous cycle. The signal on First Street has a cycle time (start of red in one direction to next start of red in same direction) of 00 seconds. The signal on Second Street has a cycle time of 0 seconds. The two signals each begin a northbound red phase at :00 p.m. What is the next time that the signals will begin a cycle at the same time? Example: (Is this GCF or LCM?) We want the number of full cycles at both First and Second Street so that the cycles will again begin at the same time. Next time implies we want the smallest necessary number of cycles (multiples) to accomplish this. So it s a Least Common Multiple problem. LCM of 00 and 0: LCM of 00 and 0: [done] [done] LCM = x 5 x 0 x = 00 4
5 00 seconds is the next time the signals will begin a cycle at the same time. 00 / 60 = minutes Remember On a quiz or exam, you may use any of these methods for finding the Greatest Common Factor or Least Common Multiple! So, next time is ::40. 5
MATH LEVEL 2 LESSON PLAN 3 FACTORING Copyright Vinay Agarwala, Checked: 1/19/18
MATH LEVEL 2 LESSON PLAN 3 FACTORING 2018 Copyright Vinay Agarwala, Checked: 1/19/18 Section 1: Exact Division & Factors 1. In exact division there is no remainder. Both Divisor and quotient are factors
Multiple : The product of a given whole number and another whole number. For example, some multiples of 3 are 3, 6, 9, and 12.
1.1 Factor (divisor): One of two or more whole numbers that are multiplied to get a product. For example, 1, 2, 3, 4, 6, and 12 are factors of 12 1 x 12 = 12 2 x 6 = 12 3 x 4 = 12 Factors are also called
The prime factorization of 150 is 5 x 3 x 2 x 5. This can be written in any order.
Outcome 1 Number Sense Worksheet CO1A Students will demonstrate understanding of factors of whole numbers by determining the prime factors, greatest common factor, least common multiple, square root and
Adding Fractions with Different Denominators. Subtracting Fractions with Different Denominators
Adding Fractions with Different Denominators How to Add Fractions with different denominators: Find the Least Common Denominator (LCD) of the fractions Rename the fractions to have the LCD Add the numerators
Number Sense and Decimal Unit Notes
Number Sense and Decimal Unit Notes Table of Contents: Topic Page Place Value 2 Rounding Numbers 2 Face Value, Place Value, Total Value 3 Standard and Expanded Form 3 Factors 4 Prime and Composite Numbers
MATH 135 Algebra, Solutions to Assignment 7
MATH 135 Algebra, Solutions to Assignment 7 1: (a Find the smallest non-negative integer x such that x 41 (mod 9. Solution: The smallest such x is the remainder when 41 is divided by 9. We have 41 = 9
8-1 Factors and Greatest Common Factors
The whole numbers that are multiplied to find a product are called factors of that product. A number is divisible by its factors. You can use the factors of a number to write the number as a product. The
Section 1 WHOLE NUMBERS COPYRIGHTED MATERIAL. % π. 1 x
Section 1 WHOLE NUMBERS % π COPYRIGHTED MATERIAL 1 x Operations and Place Value 1 1 THERE S A PLACE FOR EVERYTHING Find each sum, difference, product, or quotient. Then circle the indicated place in your
Class 6 Natural and Whole Numbers
ID : in-6-natural-and-whole-numbers [1] Class 6 Natural and Whole Numbers For more such worksheets visit www.edugain.com Answer the questions (1) Find the largest 3-digit number which is exactly divisible
Improper Fractions. An Improper Fraction has a top number larger than (or equal to) the bottom number.
Improper Fractions (seven-fourths or seven-quarters) 7 4 An Improper Fraction has a top number larger than (or equal to) the bottom number. It is "top-heavy" More Examples 3 7 16 15 99 2 3 15 15 5 See
3.1 Factors and Multiples of Whole Numbers
Math 1201 Date: 3.1 Factors and Multiples of Whole Numbers Prime Number: a whole number greater than 1, whose only two whole-number factors are 1 and itself. The first few prime numbers are 2, 3, 5, 7,
UNIT 4 PRACTICE PROBLEMS
UNIT 4 PRACTICE PROBLEMS 1. Solve the following division problems by grouping the dividend in divisor size groups. Write your results as equations. a. 13 4 = Division Equation: Multiplication Equation:
Mathematics Numbers: Applications of Factors and Multiples Science and Mathematics Education Research Group
a place of mind F A C U L T Y O F E D U C A T I O N Department of Curriculum and Pedagogy Mathematics Numbers: Applications of Factors and Multiples Science and Mathematics Education Research Group Supported
The factors of a number are the numbers that divide exactly into it, with no remainder.
Divisibility in the set of integers: The multiples of a number are obtained multiplying the number by each integer. Usually, the set of multiples of a number a is written ȧ. Multiples of 2: 2={..., 6,
Class 8: Factors and Multiples (Lecture Notes)
Class 8: Factors and Multiples (Lecture Notes) If a number a divides another number b exactly, then we say that a is a factor of b and b is a multiple of a. Factor: A factor of a number is an exact divisor
Math 10C Chapter 3 Factors and Products Review Notes
Math 10C Chapter Factors and Products Review Notes Prime Factorization Prime Numbers: Numbers that can only be divided by themselves and 1. The first few prime numbers:,, 5,, 11, 1, 1, 19,, 9. Prime Factorization:
Section 2.1/2.2 An Introduction to Number Theory/Integers. The counting numbers or natural numbers are N = {1, 2, 3, }.
Section 2.1/2.2 An Introduction to Number Theory/Integers The counting numbers or natural numbers are N = {1, 2, 3, }. A natural number n is called the product of the natural numbers a and b if a b = n.
Quantitative Aptitude Preparation Numbers. Prepared by: MS. RUPAL PATEL Assistant Professor CMPICA, CHARUSAT
Quantitative Aptitude Preparation Numbers Prepared by: MS. RUPAL PATEL Assistant Professor CMPICA, CHARUSAT Numbers Numbers In Hindu Arabic system, we have total 10 digits. Namely, 0, 1, 2, 3, 4, 5, 6,
6th Grade. Factors and Multiple.
1 6th Grade Factors and Multiple 2015 10 20 www.njctl.org 2 Factors and Multiples Click on the topic to go to that section Even and Odd Numbers Divisibility Rules for 3 & 9 Greatest Common Factor Least
Objectives: Students will learn to divide decimals with both paper and pencil as well as with the use of a calculator.
Unit 3.5: Fractions, Decimals and Percent Lesson: Dividing Decimals Objectives: Students will learn to divide decimals with both paper and pencil as well as with the use of a calculator. Procedure: Dividing
Table of Contents. Table of Contents 1
Table of Contents 1) The Factor Game a) Investigation b) Rules c) Game Boards d) Game Table- Possible First Moves 2) Toying with Tiles a) Introduction b) Tiles 1-10 c) Tiles 11-16 d) Tiles 17-20 e) Tiles
b) Find all positive integers smaller than 200 which leave remainder 1, 3, 4 upon division by 3, 5, 7 respectively.
Solutions to Exam 1 Problem 1. a) State Fermat s Little Theorem and Euler s Theorem. b) Let m, n be relatively prime positive integers. Prove that m φ(n) + n φ(m) 1 (mod mn). Solution: a) Fermat s Little
Grade 6 Math Circles. Divisibility
Faculty of Mathematics Waterloo, Ontario N2L 3G1 Introduction Grade 6 Math Circles November 12/13, 2013 Divisibility A factor is a whole number that divides exactly into another number without a remainder.
LEAST COMMON MULTIPLES
Tallahassee Community College 14 LEAST COMMON MULTIPLES Use your math book with this lab. STUDY this lab VERY CAREFULLY! I. Multiples 1. Multiples of 4 are the of 4 and the numbers 1, 2,, 4, 5... (NOTICE
What I can do for this unit:
Unit 1: Real Numbers Student Tracking Sheet Math 10 Common Name: Block: What I can do for this unit: After Practice After Review How I Did 1-1 I can sort a set of numbers into irrationals and rationals,
Whole Numbers. Whole Numbers. Curriculum Ready.
Curriculum Ready www.mathletics.com It is important to be able to identify the different types of whole numbers and recognize their properties so that we can apply the correct strategies needed when completing
Class 8: Square Roots & Cube Roots (Lecture Notes)
Class 8: Square Roots & Cube Roots (Lecture Notes) SQUARE OF A NUMBER: The Square of a number is that number raised to the power. Examples: Square of 9 = 9 = 9 x 9 = 8 Square of 0. = (0.) = (0.) x (0.)
Grade 6 Module 2 Lessons 1-19
Eureka Math Homework Helper 2015 201 Grade Module 2 Lessons 1-19 Eureka Math, A Story of R a t i o s Published by the non-profit Great Minds. Copyright 2015 Great Minds. No part of this work may be reproduced,
Implementation / Programming: Random Number Generation
Introduction to Modeling and Simulation Implementation / Programming: Random Number Generation OSMAN BALCI Professor Department of Computer Science Virginia Polytechnic Institute and State University (Virginia
Sample pages. Multiples, factors and divisibility. Recall 2. Student Book
52 Recall 2 Prepare for this chapter by attempting the following questions. If you have difficulty with a question, go to Pearson Places and download the Recall from Pearson Reader. Copy and complete these
Multiples and Divisibility
Multiples and Divisibility A multiple of a number is a product of that number and an integer. Divisibility: A number b is said to be divisible by another number a if b is a multiple of a. 45 is divisible
Radical Expressions and Graph (7.1) EXAMPLE #1: EXAMPLE #2: EXAMPLE #3: Find roots of numbers (Objective #1) Figure #1:
Radical Expressions and Graph (7.1) Find roots of numbers EXAMPLE #1: Figure #1: Find principal (positive) roots EXAMPLE #2: Find n th roots of n th powers (Objective #3) EXAMPLE #3: Figure #2: 7.1 Radical
Intermediate A. Help Pages & Who Knows
& Who Knows 83 Vocabulary Arithmetic Operations Difference the result or answer to a subtraction problem. Example: The difference of 5 and is 4. Product the result or answer to a multiplication problem.
GCSE Maths Revision Factors and Multiples
GCSE Maths Revision Factors and Multiples Adam Mlynarczyk www.mathstutor4you.com 1 Factors and Multiples Key Facts: Factors of a number divide into it exactly. Multiples of a number can be divided by it
MATH STUDENT BOOK. 6th Grade Unit 4
MATH STUDENT BOOK th Grade Unit 4 Unit 4 Fractions MATH 04 Fractions 1. FACTORS AND FRACTIONS DIVISIBILITY AND PRIME FACTORIZATION GREATEST COMMON FACTOR 10 FRACTIONS 1 EQUIVALENT FRACTIONS 0 SELF TEST
1 = 3 2 = 3 ( ) = = = 33( ) 98 = = =
Math 115 Discrete Math Final Exam December 13, 2000 Your name It is important that you show your work. 1. Use the Euclidean algorithm to solve the decanting problem for decanters of sizes 199 and 98. In
A C E. Answers Investigation 3. Applications = 0.42 = = = = ,440 = = 42
Answers Investigation Applications 1. a. 0. 1.4 b. 1.2.54 1.04 0.6 14 42 0.42 0 12 54 4248 4.248 0 1,000 4 6 624 0.624 0 1,000 22 45,440 d. 2.2 0.45 0 1,000.440.44 e. 0.54 1.2 54 12 648 0.648 0 1,000 2,52
+ 4 ~ You divided 24 by 6 which equals x = 41. 5th Grade Math Notes. **Hint: Zero can NEVER be a denominator.**
Basic Fraction numerator - (the # of pieces shaded or unshaded) denominator - (the total number of pieces) 5th Grade Math Notes Mixed Numbers and Improper Fractions When converting a mixed number into
Place Value (Multiply) March 21, Simplify each expression then write in standard numerical form. 400 thousands thousands = thousands =
Do Now Simplify each expression then write in standard numerical form. 5 tens + 3 tens = tens = 400 thousands + 600 thousands = thousands = Add When adding different units: Example 1: Simplify 4 thousands
Description Reflect and Review Teasers Answers
1 Revision Recall basics of fractions A fraction is a part of a whole like one half (1/ one third (1/3) two thirds (2/3) one quarter (1/4) etc Write the fraction represented by the shaded part in the following
The Chinese Remainder Theorem
The Chinese Remainder Theorem 8-3-2014 The Chinese Remainder Theorem gives solutions to systems of congruences with relatively prime moduli The solution to a system of congruences with relatively prime
CS 3233 Discrete Mathematical Structure Midterm 2 Exam Solution Tuesday, April 17, :30 1:45 pm. Last Name: First Name: Student ID:
CS Discrete Mathematical Structure Midterm Exam Solution Tuesday, April 17, 007 1:0 1:4 pm Last Name: First Name: Student ID: Problem No. Points Score 1 10 10 10 4 1 10 6 10 7 1 Total 80 1 This is a closed
Additional Practice. Name Date Class
Additional Practice Investigation 1 1. For each of the following, use the set of clues to determine the secret number. a. Clue 1 The number has two digits. Clue 2 The number has 13 as a factor. Clue 3
Numbers (8A) Young Won Lim 5/22/17
Numbers (8A Copyright (c 2017 Young W. Lim. Permission is granted to copy, distribute and/or modify this document under the terms of the GNU Free Documentation License, Version 1.2 or any later version
Numbers (8A) Young Won Lim 5/24/17
Numbers (8A Copyright (c 2017 Young W. Lim. Permission is granted to copy, distribute and/or modify this document under the terms of the GNU Free Documentation License, Version 1.2 or any later version
Numbers (8A) Young Won Lim 6/21/17
Numbers (8A Copyright (c 2017 Young W. Lim. Permission is granted to copy, distribute and/or modify this document under the terms of the GNU Free Documentation License, Version 1.2 or any later version
Chapter 4 Number Theory
Chapter 4 Number Theory Throughout the study of numbers, students Á should identify classes of numbers and examine their properties. For example, integers that are divisible by 2 are called even numbers
Removing the Fear of Fractions from Your Students Thursday, April 16, 2015: 9:30 AM-10:30 AM 157 A (BCEC) Lead Speaker: Joseph C.
Removing the Fear of Fractions from Your Students Thursday, April 6, 20: 9:0 AM-0:0 AM 7 A (BCEC) Lead Speaker: Joseph C. Mason Associate Professor of Mathematics Hagerstown Community College Hagerstown,
Divide Multi-Digit Numbers
Lesson 1.1 Reteach Divide Multi-Digit Numbers When you divide multi-digit whole numbers, you can estimate to check if the quotient is reasonable. Divide 399 4 42. Step 1 Estimate, using compatible numbers.
Name: Class: Date: Class Notes - Division Lesson Six. 1) Bring the decimal point straight up to the roof of the division symbol.
Name: Class: Date: Goals:11 1) Divide a Decimal by a Whole Number 2) Multiply and Divide by Powers of Ten 3) Divide by Decimals To divide a decimal by a whole number: Class Notes - Division Lesson Six
QUANTITATIVE APTITUDE
QUANTITATIVE APTITUDE HCF AND LCM Important Points : Factors : The numbers which exactly divide a given number are called the factors of that number. For example, factors of 15 are 1, 3, 5 and 15. Common
Computation in Positional Systems
Survey of Math - MAT 40 Page: Computation in Positional Systems Addition To operate in other Bases, unlike the book, I think that it is easier to do the calculations in Base 0, and then convert (using
Reteach Factors and Greatest Common Factors
Name Date Class Reteach Factors and Greatest Common Factors A prime number has exactly two factors, itself and 1. The number 1 is riot a prime number. To write the prime factorization of a number, factor
Section 1.6 Dividing Whole Numbers
Section 1.6 Dividing Whole Numbers We begin this section by looking at an example that involves division of whole numbers. Dale works at a Farmer s Market. There are 245 apples that he needs to put in
A C E. Answers Investigation 1. Applications. b. No; 6 18 = b. n = 12 c. n = 12 d. n = 20 e. n = 3
Answers Applications 1. a. Divide 24 by 12 to see if you get a whole number. Since 12 2 = 24 or 24 12 = 2, 12 is a factor b. Divide 291 by 7 to see if the answer is a whole number. Since 291 7 = 41.571429,
ALGEBRA: Chapter I: QUESTION BANK
1 ALGEBRA: Chapter I: QUESTION BANK Elements of Number Theory Congruence One mark questions: 1 Define divisibility 2 If a b then prove that a kb k Z 3 If a b b c then PT a/c 4 If a b are two non zero integers
5. Find the least number which when multiplied with will make it a perfect square. A. 19 B. 22 C. 36 D. 42
1. Find the square root of 484 by prime factorization method. A. 11 B. 22 C. 33 D. 44 2. Find the cube root of 19683. A. 25 B. 26 C. 27 D. 28 3. A certain number of people agree to subscribe as many rupees
T101 DEPARTMENTAL FINAL REVIEW
T101 DEPARTMENTAL FINAL REVIEW REVISED SPRING 2009 *******This is only a sampling of some problems to review. Previous tests and reviews should also be reviewed.*** 1) a) Find the 14th term of the arithmetic
Illustrated Fractions
Illustrated Fractions Jetser Carasco Copyright 008 by Jetser Carasco All materials on this book are protected by copyright and cannot be reproduced without permission. 1 Table o contents Lesson #0: Preliminaries--------------------------------------------------
Equivalent Fractions
Grade 6 Ch 4 Notes Equivalent Fractions Have you ever noticed that not everyone describes the same things in the same way. For instance, a mother might say her baby is twelve months old. The father might
Solutions for the 2nd Practice Midterm
Solutions for the 2nd Practice Midterm 1. (a) Use the Euclidean Algorithm to find the greatest common divisor of 44 and 17. The Euclidean Algorithm yields: 44 = 2 17 + 10 17 = 1 10 + 7 10 = 1 7 + 3 7 =
3.1 Factors & Multiples of Whole Numbers.
NC 3.1 Concepts: #1,2,4 PreAP Foundations & Pre-Calculus Math 10 Outcome FP10.1 (3.1, 3.2) 3.1 Factors & Multiples of Whole Numbers. FP 10.1 Part A: Students will demonstrate understanding of factors of
Published in India by. MRP: Rs Copyright: Takshzila Education Services
NUMBER SYSTEMS Published in India by www.takshzila.com MRP: Rs. 350 Copyright: Takshzila Education Services All rights reserved. No part of this publication may be reproduced, stored in a retrieval system,
Modular Arithmetic. Kieran Cooney - February 18, 2016
Modular Arithmetic Kieran Cooney - kieran.cooney@hotmail.com February 18, 2016 Sums and products in modular arithmetic Almost all of elementary number theory follows from one very basic theorem: Theorem.
Squares and Square roots
Squares and Square roots Introduction of Squares and Square Roots: LECTURE - 1 If a number is multiplied by itsely, then the product is said to be the square of that number. i.e., If m and n are two natural
FACTORS, PRIME NUMBERS, H.C.F. AND L.C.M.
Mathematics Revision Guides Factors, Prime Numbers, H.C.F. and L.C.M. Page 1 of 17 M.K. HOME TUITION Mathematics Revision Guides Level: GCSE Higher Tier FACTORS, PRIME NUMBERS, H.C.F. AND L.C.M. Version:
Properties of Logarithms
Properties of Logarithms Warm Up Lesson Presentation Lesson Quiz Algebra 2 Warm Up Simplify. 1. (2 6 )(2 8 ) 2 14 2. (3 2 )(3 5 ) 3 3 3 8 3. 4. 4 4 5. (7 3 ) 5 7 15 Write in exponential form. 6. log x
NUMBER THEORY AMIN WITNO
NUMBER THEORY AMIN WITNO.. w w w. w i t n o. c o m Number Theory Outlines and Problem Sets Amin Witno Preface These notes are mere outlines for the course Math 313 given at Philadelphia
2008 Cedar Ridge Test Solutions
2008 Cedar Ridge Test Solutions 1) The value of 1.4 + 0.03 + 0.009 + 7 is Step 1: Line up all of the decimals in the equation: 1.4 0.03 0.009 + 7 8.439 2) Solve: 4 + 2 x 3 4 2 + 3 = Answer: 8.439 Order
Introduction to Fractions
Introduction to Fractions A fraction is a quantity defined by a numerator and a denominator. For example, in the fraction ½, the numerator is 1 and the denominator is 2. The denominator designates how
Overview. The Big Picture... CSC 580 Cryptography and Computer Security. January 25, Math Basics for Cryptography
CSC 580 Cryptography and Computer Security Math Basics for Cryptography January 25, 2018 Overview Today: Math basics (Sections 2.1-2.3) To do before Tuesday: Complete HW1 problems Read Sections 3.1, 3.2
Grab Bag Math ➊ ➋ ➌ ➍ ➎ ➏ ON THEIR OWN. Can you figure out all the ways to build one-layer rectangular boxes with Snap Cubes?
Grab Bag Math ON THEIR OWN Can you figure out all the ways to build one-layer rectangular boxes with Snap Cubes? ➊ ➋ ➌ ➍ ➎ ➏ Work with a partner. Pick a grab bag from the box. Using the Snap Cubes in the
Whole Numbers WHOLE NUMBERS PASSPORT.
WHOLE NUMBERS PASSPORT www.mathletics.co.uk It is important to be able to identify the different types of whole numbers and recognise their properties so that we can apply the correct strategies needed
2. Nine points are distributed around a circle in such a way that when all ( )
1. How many circles in the plane contain at least three of the points (0, 0), (0, 1), (0, 2), (1, 0), (1, 1), (1, 2), (2, 0), (2, 1), (2, 2)? Solution: There are ( ) 9 3 = 8 three element subsets, all
Downloaded from DELHI PUBLIC SCHOOL
Worksheet- 21 Put the correct sign:- 1. 3000 + 300 + 3 3330 2. 20 tens + 6 ones 204 3. Two thousand nine 2009 4. 4880 4080 5. Greatest four digit number smallest five digit number. 6. Predecessor of 200
Quantile Resource Overview
Quantile Resource Overview Resource Title: Lucky Leftovers Games Quantile Skill and Concept: Know and use division facts related to multiplication facts through 144. (QSC162) Divide using single- digit
Order and Compare Rational and Irrational numbers and Locate on the number line
806.2.1 Order and Compare Rational and Irrational numbers and Locate on the number line Rational Number ~ any number that can be made by dividing one integer by another. The word comes from the word "ratio".
Section 1.5 An Introduction to Logarithms
Section. An Introduction to Logarithms So far we ve used the idea exponent Base Result from two points of view. When the base and exponent were given, for instance, we simplified to the result 8. When
Exam 1 7 = = 49 2 ( ) = = 7 ( ) =
Exam 1 Problem 1. a) Define gcd(a, b). Using Euclid s algorithm comute gcd(889, 168). Then find x, y Z such that gcd(889, 168) = x 889 + y 168 (check your answer!). b) Let a be an integer. Prove that gcd(3a
N umber theory provides a rich source of intriguing
c05.qxd 9/2/10 11:58 PM Page 181 Number Theory CHAPTER 5 FOCUS ON Famous Unsolved Problems N umber theory provides a rich source of intriguing problems. Interestingly, many problems in number theory are
Solutions to Exam 1. Problem 1. a) State Fermat s Little Theorem and Euler s Theorem. b) Let m, n be relatively prime positive integers.
Solutions to Exam 1 Problem 1. a) State Fermat s Little Theorem and Euler s Theorem. b) Let m, n be relatively rime ositive integers. Prove that m φ(n) + n φ(m) 1 (mod mn). c) Find the remainder of 1 008
Solutions to Problem Set 6 - Fall 2008 Due Tuesday, Oct. 21 at 1:00
18.781 Solutions to Problem Set 6 - Fall 008 Due Tuesday, Oct. 1 at 1:00 1. (Niven.8.7) If p 3 is prime, how many solutions are there to x p 1 1 (mod p)? How many solutions are there to x p 1 (mod p)?
Determine the Greatest Common Factor: You try: Find the Greatest Common Factor: 40 and and 90. All factors of 40: 1, 2, 4, 5, 8, 10, 20, 40
Determine the Greatest Common Factor: Prime Factor Method 4 96 4 8 2 2 2 2 5 2 2 2 4 3 4 and 96 List Method All factors of 4:, 2, 4, 5, 8,, 2, 4 You try: Find the Greatest Common Factor: 75 and 9 2 2 4
Answers Investigation 2
Applications 1. 2, 8, 2, and 6; the LCM is 2. 2. 1, 30,, 60,, and 0; the LCM is 1. 3. ; the LCM is.. 0; the LCM is 0.. 2; the LCM is 2. 6. 0; the LCM is 0.. 2, 8; the LCM is 2 8. 60; the LCM is 60.. a.
A C E. Answers Investigation 2. Applications. b. They have no common factors except 1.
Applications 1. 24, 48, 72, and 96; the LCM is 24. 2. 15, 30, 45, 60, 75, and 90; the LCM is 15. 3. 77; the LCM is 77. 4. 90; the LCM is 90. 5. 72; the LCM is 72. 6. 100; the LCM is 100. 7. 42, 84; the
Free GK Alerts- JOIN OnlineGK to NUMBERS IMPORTANT FACTS AND FORMULA
Free GK Alerts- JOIN OnlineGK to 9870807070 1. NUMBERS IMPORTANT FACTS AND FORMULA I..Numeral : In Hindu Arabic system, we use ten symbols 0, 1, 2, 3, 4, 5, 6, 7, 8, 9 called digits to represent any number.
Investigation Optimization of Perimeter, Area, and Volume Activity #1 Minimum Perimeter
Investigation Optimization of Perimeter, Area, and Volume Activity #1 Minimum Perimeter 1. Choose a bag from the table and record the number from the card in the space below. Each member of your group
FSA Math Review. **Rounding / Estimating** **Addition and Subtraction** Rounding a number: Key vocabulary: round, estimate, about
FSA Math Review **Rounding / Estimating** Rounding a number: Key vocabulary: round, estimate, about 5 or more add one more-----round UP 0-4 just ignore-----stay SAME Find the number in the place value
The congruence relation has many similarities to equality. The following theorem says that congruence, like equality, is an equivalence relation.
Congruences A congruence is a statement about divisibility. It is a notation that simplifies reasoning about divisibility. It suggests proofs by its analogy to equations. Congruences are familiar to us
Sample pages. 3:06 HCF and LCM by prime factors
number AND INDICES 7 2 = 49 6 8 = 48 Contents 10 2 = 100 9 11 = 99 12 2 = 144 11 1 = 14 8 2 = 64 7 9 = 6 11 2 = 121 10 12 = 120 :01 Index notation Challenge :01 Now that s a google :02 Expanded notation
2. Questions on Classwork and Homework form yesterday. 4. Completing the square to solve quadratic
1. Warm -up word problem - 2. Questions on Classwork and Homework form yesterday 3. Number Sense. 4. Completing the square to solve quadratic equations 1 2 3 Apr 12 12:35 PM 4 Apr 13 2:12 PM 5 6 7 factors
Discrete Square Root. Çetin Kaya Koç Winter / 11
Discrete Square Root Çetin Kaya Koç koc@cs.ucsb.edu Çetin Kaya Koç http://koclab.cs.ucsb.edu Winter 2017 1 / 11 Discrete Square Root Problem The discrete square root problem is defined as the computation
IMLEM Meet #2 December, Intermediate Mathematics League of Eastern Massachusetts
IMLEM Meet #2 December, 2016 Intermediate Mathematics League of Eastern Massachusetts Category 1 Mystery 1) Each member of the Tiny Tumblers gymnastics team wears a different 2-digit number between 1 and
Grade 6 LCM and HCF. Answer the questions. Choose correct answer(s) from the given choices. For more such worksheets visit
ID : eu-6-lcm-and-hcf [1] Grade 6 LCM and HCF For more such worksheets visit www.edugain.com Answer the questions (1) Find the greatest number that divides 1283, 402 and 767 leaving remainders 9, 10, and
Solutions for the Practice Final
Solutions for the Practice Final 1. Ian and Nai play the game of todo, where at each stage one of them flips a coin and then rolls a die. The person who played gets as many points as the number rolled
Cryptography, Number Theory, and RSA
Cryptography, Number Theory, and RSA Joan Boyar, IMADA, University of Southern Denmark November 2015 Outline Symmetric key cryptography Public key cryptography Introduction to number theory RSA Modular
p 1 MAX(a,b) + MIN(a,b) = a+b n m means that m is a an integer multiple of n. Greatest Common Divisor: We say that n divides m.
Great Theoretical Ideas In Computer Science Steven Rudich CS - Spring Lecture Feb, Carnegie Mellon University Modular Arithmetic and the RSA Cryptosystem p- p MAX(a,b) + MIN(a,b) = a+b n m means that m
Grade 8 Square and Square Roots
ID : ae-8-square-and-square-roots [1] Grade 8 Square and Square Roots For more such worksheets visit www.edugain.com Answer t he quest ions (1) The total population of a village is a perf ect square. The
Connected Mathematics 2, 6 th and 7th Grade Units 2009 Correlated to: Washington Mathematics Standards for Grade 5
Grade 5 5.1. Core Content: Multi-digit division (Operations, Algebra) 5.1.A Represent multi-digit division using place value models and connect the representation to the related equation. 5.1.B Determine
Lecture 8. Outline. 1. Modular Arithmetic. Clock Math!!! 2. Inverses for Modular Arithmetic: Greatest Common Divisor. 3. Euclid s GCD Algorithm
Lecture 8. Outline. 1. Modular Arithmetic. Clock Math!!! 2. Inverses for Modular Arithmetic: Greatest Common Divisor. 3. Euclid s GCD Algorithm Clock Math If it is 1:00 now. What time is it in 5 hours?