Comparative Relational Thinking

Slides:

Advertisements

Similar presentations

Addition and Subtraction

Advertisements

Solving Linear Equations

Unit 14 SIMPLE EQUATIONS.

Solving Equations by Adding and Subtracting: Vocabulary Solve: To solve an equation mean to find a solution to the equation. Isolate the variable: Get.

Review of a few Common Core Standard Math Strategies for Operations and Algebraic Thinking, Grade 1 Graphics licensed through: Buttons licensed through.

Integer Operations. 1) What’s the rule for adding integers? *If both addends are Positive: - Add together and the sum is positive (Ex = 12) *If.

1.4 Solving Equations ●A variable is a letter which represents an unknown number. Any letter can be used as a variable. ●An algebraic expression contains.

Let the Adventure Begin!. Flexible Strategies The goal when using these strategies is to eventually be able to add and subtract mentally. With mental.

Big Idea There is more than algorithm for each of the operations with rational numbers. Most algorithms for operations with rational numbers use both mental.

Solving Inequalities Using Addition & Subtraction.

Solving Inequalities by adding or subtracting, checking the inequality & graphing it!! This is so easy you won’t even need one of these!!!

Solving Two- Step Equations Lesson 2-2. Rules to Remember When solving an equation, the goal is to get the variable by itself. Addition and Subtraction.

3.2 Solving Equations by Using Addition and Subtraction Addition Property of Equality –If the same number is added to each side of an equation, the resulting.

Unknown Numbers in Addition, Subtraction, Multiplication, Division LESSON 3POWER UP APAGE 20.

Double-Digit Addition Strategies

Solving Addition and Subtraction Equations Lesson 2.3 and 2.4.

Adding Groups of Ten. ____ tens + ____ tens = ____ tens ____ + ____ = ____.

Solving Inequalities Using Addition & Subtraction.

* Collect the like terms 1. 2a = 2a x -2x + 9 = 6x z – – 5z = 2z - 6.

SECTION 3-3 Solving Algebraic Equations: Multiplication and Division.

Solving 2 step equations. Two step equations have addition or subtraction and multiply or divide 3x + 1 = 10 3x + 1 = 10 4y + 2 = 10 4y + 2 = 10 2b +

SOL 4.22 Demonstrating the Meaning of Equality. Now Lets Review What We Just Learned.

M 4 Lesson 22. Objective Solve additions with up to four addends with totals within 200 with and without two compositions of larger units. Note: Addends.

How can I subtract by using addition? Isn’t addition the opposite of subtraction?

Solving Algebraic Equations. Equality 3 = = = 7 For what value of x is: x + 4 = 7 true?

Opener (5 + 6) • 2 a + (b + c) + (d • e) 18k x2 + 5x + 4y + 7

Comparative Relational Thinking

© 2007 M. Tallman. Addend- a number that is added to another. = addend.

Solving Equations involving Fractions

Comparative Relational Thinking

Problem Solving with Two-Step Equations

Variables, Algebraic Expressions, and Simple Equations

Welcome to Glenallan’s Community Connection with a Math Focus!

Variables on Both Sides with Equations

Warm-Up 13 x 3 14 x 4 12 x 11 9 x 13.

Warm up 11/1/ X ÷ 40.

Using Addition & Subtraction

Solving 1-Step Integer Equations

The Equal Sign and Integers

Algebraic Equations Solving One Step Equations with Whole Numbers

Solving One Step Equations

Solving Two- Step Equations

Using Addition & Subtraction

EQ: How do I solve an equation in one variable?

Chapter 3-3 Solve Equations by Adding/Subtracting

Solving Two-Step Equations Lesson 2-2 Learning goal.

Solving Two- Step Equations

Equations and Inequalities

Problem Solving 2nd Grade.

Solving One and Two Step Equations

Learn to solve equations with integers.

Problem Solving with Two-Step Equations

Section 2.9 Solving One-Step Inequalities by Adding or Subtracting

Solving One Step Equations

Using Addition & Subtraction

Solving Equations By, Michael Wulff The Father of algebra

Solving 1-Step Integer Equations

Solving Two- Step Equations

Simultaneous Equations

Algebra 1 Section 1.3.

K-2 Math Strategies that work

Math Journal Notes Unit 4.

2.NBT.5 Place Value Addition and Subtraction

Using Addition & Subtraction

Solving Linear Equations

2 4 −4 −2 −5 −3 −

Using Addition & Subtraction

Presentation transcript:

Comparative Relational Thinking Addition

765 = 756 5 = 3 + 2 FALSE TRUE Let’s Review Are these equations true or false? 5 = 3 + 2 765 = 756 How do you know? Talk me through your thinking… FALSE TRUE

How do you know the equation is true? Let’s Review Are these equations true or false? 4 + 6 = 3 + 7 4 + 2 = 5 How do you know the equation is true? Talk me through your thinking… FALSE TRUE

How do you know the equation is true? Let’s Review Fill in the blank 4 + 6 = 8 + __ 17 + __= 20 3 + 5 = n + 5 How do you know the equation is true? How did you solve? 2 n = 3 3

What strategies do you use to add? Let’s Review What strategies do you use to add? Count All Make Doubles Friendly Numbers Make a Ten Count On

Why do Friendly Numbers work? 17 + 8 Let’s think about an easy problem. 1 2 3 4 5 6 7 8 I will use the count up strategy first! 17 + 8 = 25

Why do Friendly Numbers work? 17 + 8 Let’s think about an easy problem. Think 8 - 3 = 5, Add 5 more Add 3 to make 20 3 5 Now with friendly numbers… Notice… 3 hops plus 5 hops is equal to 8!!! 17 + 8 = 25

Think about using Friendly Numbers to add… -3 = 43 +3 = 30 27 + 46 Then I add 30 and 43 to find the sum. 30 + 43 = 73 If I add 3 to 27, then I need to take 3 from 46…46-3 = 43 I like to add with multiples of 10, so… I need to add 3 to 27 to make 30. The answer is 73!

Using Friendly Numbers in Comparative Relational Thinking -4 = 13 +4 = 32 Let’s determine if this equation is TRUE or FALSE. 28 + 17 = 32 + 13 28 + 17 = 32 + 13 +4 -4 32 + 13 = 32 + 13 If you add 4 to the 28, you need to take 4 from the 17. You can use friendly numbers. Instead of making a 10, change one addend on one side to match the other side. It does not matter which addend is matched… BOTH addends MATCH, so it is TRUE!!! 17 – 4 is 13. So, I can add 4 to 28 to get 32? I don’t want to solve… I just want to COMPARE

Then I would subtract the value I added. Using Friendly Numbers in Comparative Relational Thinking to find an Unknown Find the unknown. 543 + 767 =  + 550 + 7 - 7 550 760 The unknown is equal to 760!! Then I would subtract the value I added. First, I change the value of one addend to be the same as the addend on the other side of the equal sign.

True or False? 937 + 580 = 940 + 583 false

True or False? 5,845 + 6,782 = 5,832 + 6,795 true

Find the missing addend. 346 + 287 = ___ + 300 287 + 13 = 300 346 – 13 = 333 Answer 333 Or 346 – 46 = 300 287 + 46 = 200 + 120 + 13 = 333

Find the missing addend.