First of all, pick the number of times a day that you would like to have chocolate (more than once but less than 10) Multiply this number by 2 (just to.

Slides:



Advertisements
Similar presentations
Amazing Math Trick 234X =??? Trick! Trick!
Advertisements

NUMBER TRICKS.
This is a powerpoint to teach number sense tricks
Please turn in your Home-learning, get your notebook and Springboard book, and begin the bell-ringer! Test on Activity 6, 7 and 8 Wednesday (A day) and.
4.2 Factors and Divisibility
Mr Barton’s Maths Notes
Multiplying and Dividing Decimals
Rational and Irrational
Simplifying Exponential Expressions. Exponential Notation Base Exponent Base raised to an exponent Example: What is the base and exponent of the following.
By: Amanda Meiners Western Illinois University
Translating Word Phrases into Algebraic Expressions or Equations
Integers and Introduction to Solving Equations
What are some of the ways you that that we can categorise numbers?
21 st Century Lessons The Properties of Mathematics 1.
Working with Fractions
4.1 Polynomial Functions Objectives: Define a polynomial.
PRESENTATION 3 Signed Numbers
College Algebra Prerequisite Topics Review
A quadratic equation is a second degree polynomial, usually written in general form: The a, b, and c terms are called the coefficients of the equation,
Properties of Logarithms
Chapter 1 Basic Concepts.
Chapter 1 Number Sense See page 8 for the vocabulary and key concepts of this chapter.
Section 1.1 Numbers and Their Properties.
Chapter 1 Foundations for Algebra
Scientific Notation Recognize and use scientific notation.
Numeral Systems Subjects: Numeral System Positional systems Decimal
Signed Numbers, Powers, & Roots
Place value and ordering
NUMBER SENSE AT A FLIP. Number Sense Number Sense is memorization and practice. The secret to getting good at number sense is to learn how to recognize.
Chapter P Prerequisites: Fundamental Concepts of Algebra
Dear Power point User, This power point will be best viewed as a slideshow. At the top of the page click on slideshow, then click from the beginning.
Variables and Expressions Order of Operations Real Numbers and the Number Line Objective: To solve problems by using the order of operations.
Expressions Objective: EE.01 I can write and evaluate numerical expressions involving whole number exponents.
Chapter 1 / Whole Numbers and Introduction to Algebra
C ollege A lgebra Basic Algebraic Operations (Appendix A) L:5 1 Instructor: Eng. Ahmed Abo absa University of Palestine IT-College.
Variables Tutorial 3c variable A variable is any symbol that can be replaced with a number to solve a math problem. An open sentence has at least one.
SCIENTIFIC NOTATION What is it? And How it works?.
Objectives Distinguish between accuracy and precision. Determine the number of significant figures in measurements. Perform mathematical operations involving.
Algebra! The area of mathematics that generalizes the concepts and rules of arithmetic using symbols to represent numbers.
Chapter 1 Review College Algebra Remember the phrase “Please Excuse My Dear Aunt Sally” or PEMDAS. ORDER OF OPERATIONS 1. Parentheses - ( ) or [ ] 2.
Mathemagic!! Cheryl Miner Nebraska Wesleyan University
Chapter 1.  Pg. 4-9  Obj: Learn how to write algebraic expressions.  Content Standard: A.SSE.1.a.
Copyright © 2009 Pearson Education, Inc. Chapter 5 Section 1 - Slide 1 Chapter 1 Number Theory and the Real Number System.
6. 1 Multiplication with Exponents and Scientific Notation 6
Real numbers In algebra, we work with the set of real numbers, which we can model using a number line. Real numbers describe real-world quantities such.
CONFIDENTIAL1 Good Afternoon! Today we will be learning about Review of Expressions, Variables, equations & Functions Let’s warm up : 1) Simplify: 4 x.
Chapter 2 Real Numbers and algebraic expressions ©2002 by R. Villar All Rights Reserved Re-engineered by Mistah Flynn 2015.
Fractions!!.
NUMBER SENSE AT A FLIP.
Variables and Expressions Order of Operations Real Numbers and the Number Line Objective: To solve problems by using the order of operations.
3 + 6a The product of a number and 6 added to 3
Pre-Algebra Q1W8: Properties of Exponents. Objectives I know my perfect squares up to 15. I know the properties of exponents, including : The “zero power”
Slide Copyright © 2009 Pearson Education, Inc. Slide Copyright © 2009 Pearson Education, Inc. Chapter 1 Number Theory and the Real Number System.
Integers. Definition Positive integer – a number greater than zero
BY: KAYLEE J. KAMRYN P. CLOE B. EXPRESSIONS * EQUATIONS * FUNCTIONS * AND INEQUALITIES.
10.7 Operations with Scientific Notation
Algebra.
Read the instruments below
Thinking Mathematically
numerical coefficient
Scientific Notation.
COMPUTING FUNDAMENTALS
RAPID Math.
Introduction to Variables, Algebraic Expressions, and Equations
Introduction to Variables and Algebraic Expressions
CLAST Arithmetic by Joyce
Math unit 1 review.
Chapter 1-1 Variables and expressions PreAlgebrateachers.com
Estimating Non-perfect Radicals Scientific Notation
Presentation transcript:

First of all, pick the number of times a day that you would like to have chocolate (more than once but less than 10) Multiply this number by 2 (just to be bold) Add 5 Multiply it by 50 If you have already had your birthday this year add If you haven't, add Now subtract the four digit year that you were born. You should have a three digit number The first digit is the number of times you would like to have chocolate

By: Amanda Meiners Nicole Maila Eden Malone

Re-gifting Robin Classroom use: Place Value CC: Grade 5 Understanding place value, and analyzing patterns and relationships. Re-gifting Robin

Can I guess your number? Pick any 3 digit number Rearrange the digits in reverse order Subtract from the original. Want a positive difference, subtract accordingly Note: if this is equal to a two digit number, think of it as a “three” digit number with a zero in front when reversing the digits. Take this new number and reverse again This time add the two numbers You will always get Classroom use: Also the place value. Intro to Perfect squares CC: High school-rational and irrational numbers

Proof eg. 534 Claim: Choose any three digit number with distinct digits represented abc. Reverse the digits of this number so you have cba. Subtract the smaller of the two numbers from the larger one so you are left with a new number. Take this new number and reverse the digits again to make another new number. Add the two new numbers. Take the square root of that sum, and you will always be left with 33. Note: if the first difference is equal to a two digit number, think of it as a “three” digit number with a zero in front when reversing the digits. Proof:Imagine an arbitrary three digit number Let the number abc be represented as 100a + 10b + c where a,b,c are distinct numbers in the set {0,1,2,3,4,5,6,7,8,9} Reversing the digits would result in 100c + 10b + a Subtract the second number from the first 100a + 10b + c – (100c + 10b + a) = 100a + 10b + c – 100c – 10b – a = 99a – 99c = 99(a - c) Our new number is 99(a-c) Let x represent a-c.

Since we know a and c are single digit numbers which do not equal each other, and the difference is at least 1, we know that 1 < x < 8 We will take this case by case. 99 * 1 = = * 2 = = * 3 = = * 4 = = * 5 = = * 6 = = * 7 = = * 8 = = 1089 We always get 1089 in EVERY case. The square root of 1089 is 33, hence you always get 33 as an answer. q.e.d.

The Magic Number 9 Think of a four digit number in which all of the digits are different. write the number down but don’t tell anyone what it is Jumble up the four digits and write the new number below the first. If it is smaller or above the first number if it is larger. Subtract the smaller number from the larger number. Add the digits of the total together If the total of this calculation is a two digit number then these two digits should be added together as well. Carry on like this until they are left with a single digit number. Magically, this number will always be a 9! Classroom use: Place Value CC: Perform operations with multi digit whole numbers

Magic Card Trick Give the tricky a set of nine cards and have them pick one without letting you know. Hand cards back with the card selected on top. Place all other cards left in the deck back on top of this. Start dealing the cards out in columns of 10, counting down from 10. When counting down you deal the card value you say STOP and move onto the next column. If you go all the way from 10 to 1, place a cap (turned over card) on the stack. Continue to do this for 4 stacks.

Magic Card Trick (continued) Once you have your 4 stacks count the values (uncapped) stacks together. (capped =0) The added value is the number YOUR card is in the rest of the deck. Reason: Know-the card is always going to be the 44th card, so you need to get through 43 cards. Classroom use: Addition/ Subtraction of double digits involving 11’s

7-Up Pick any 4 digit number and rearrange in reverse order. Subtract the larger value from the smaller value Pick a number to circle in the value Rearrange your number without your circled value and let someone guess your circled value. Classroom use: Place Value and Divisibility rules

7-Up This trick will always work for values 1-8 circled. If the tricky picks to circle 0 or 9 it can go either way. Reason: You add up the digits of the three digit number and divide by 9. The quotient is the answer. Proof is done similarly to two digit, Re-gifting Robin.

Speaking of 9’s… Does =1? Arithmetic Algebra CC: 7 th grade expressions and equations Early High school mathematics

Fold’m Eights Fold the values up in a way so that when looked at read levels starting off with easy and getting more difficult as they go. Make a check list that students need to mark off a certain number by a certain date or end of a chapter. Great pre-curser to nets or a way to have students fill the last 5 minutes of class. CC: Sixth grade Geometry ideas.

Magic Tables Take a look at the 5 cards in front of your group, pick a secret number between 1 and 31. Put all the cards with that number in the center of the group. I will guess your number Reason: Add all the numbers together on the first numbers of the cards given to you: Powers of 2 Example: If the cards in the center have cards that start with 16 and 4, since when added together this would make their number be 20. CC: sixth grade- evaluating exponents with whole numbers Seventh grade- Use properties of operations to generate equivalent expressions High school: rewrite exponential functions using multiple exponents.

CC: 7 th grade students solving real life mathematical problems

Other fun Math-gical Ideas Brain “Bus”ters Equations that contain the initials of words that will make it correct. Input-> Outputs We fed in random inputs into a supercomputer and it came up with unique output. Word Phrasing Have students complete problems that match to answers and letters in the alphabet to complete a fun saying.