How else can we find them? What are they? EMERGING Due: Friday 11 th December Circle the square numbers.

Slides:

Advertisements

Similar presentations

Trial and Improvement Practice © T Madas.

Advertisements

MULTIPLICATION Ms. Behling 3 rd grade math. STANDARD USED Represent and solve problems involving multiplication and division. CCSS.Math.Content.3.OA.A.1.

Click On The Pictures To Start Finished? Click Here!

Lesson 5.07 Basic Exponents

Exponents Lesson 2-8.

Turning words into math. * u squared plus 3 * Identify the variable * Look at the words “squared” & “plus” * Think how can “squared” be notated * “plus”

Factoring Rainbows Created By Jennifer Conner. First, here is some NEW vocabulary: Prime Number: any number whose only factors are 1 and itself Composite.

Factoring Polynomials

Inverse Operations ExpressionInverse Operation How do you get the variable by itself? x + 5 x x x ÷ 20 x3x3.

Radicals NCP 503: Work with numerical factors

Overview Definitions Basic matrix operations (+, -, x) Determinants and inverses.

© T Madas From the numbers in the list below, find: the square numbers.

Square Root The square root of a nonnegative number is a number that, when multiplied by itself, is equal to that nonnegative number. Square roots have.

Properties of Addition and Multiplication. Commutative Property In the sum you can add the numbers in any order. a+b = b+a In the product you can multiply.

Powers and roots. Square each number a) 7 b) 12 c) 20 d) 9 e) 40 a) 49 b) 144 c) 400 d) 81 e) 1600.

By Jeff and Connor This is a pentagon that is showing that kids will be crossing. This pentagon has 5 equal sides and 2 right angles.

Exam Technique Read the question Highlight the important information! Read the question again Then answer the question Mark a Minute.

Numerical Relationships

6.4 Solving Polynomial Equations. One of the topics in this section is finding the cube or cube root of a number. A cubed number is the solution when.

Multiples and Factors.

Multiplication Review of Vertical Mulitplication Problems Video on My Website.

Exponents Mr. Platt. What is an exponent? An An exponent tells how many times a number called the base is used as a factor. 3 4 Base Exponent.

Tuesday, July 1 Special Factoring. Difference of Squares Example: m 2 – 64 (m) 2 – (8) 2 (m + 8)(m – 8)

Special Factoring. Difference of Squares General Formula: (x) 2 – (y) 2 = (x + y)(x – y)

The #’s 1, 4, 9, 16, 25.…are called. The #’s 1, 4, 9, 16, 25.…are called perfect squares / square numbers.

PROPERTIES OF REAL NUMBERS. COMMUTATIVE PROPERTY OF ADDITION What it means We can add numbers in any order Numeric Example Algebraic Example

Squares and Square Roots Year 6/7. Square Numbers How to Square A Number To square a number, just multiply it by itself... Example: What is 3 squared?

Multiplying Fractions. Fraction Multiplication Here are some fraction multiplication problems Can you tell how to multiply fraction from these examples?

Index notation LO:-To understand and be able to use cubes of numbers, index notation and other integer powers.

1.4 Exponents Mme DiMarco.  Learning Goal: using exponents to represent repeated multiplication Learning Goal.

Lesson 7.2: Cube roots Objectives: To determine the cube root of a number. To Solve a cube root equation. EQ: How do you evaluate a cube root expression?

Multiplication Property of Exponents Today’s Objective: I can multiply exponential expressions.

Essential Question? How can you use exponents to represent repeated multiplication of the same number? We know how to use repeated addition:

Copyright © Cengage Learning. All rights reserved. Functions 1 Basic Concepts.

Difference of Squares Recall that, when multiplying conjugate binomials, the product is a difference of squares. E.g., (x - 7)(x + 7) = x Therefore,

Difference of Squares Recall that, when multiplying conjugate binomials, the product is a difference of squares. E.g., (x - 7)(x + 7) = x Therefore,

5.3 Notes – Add, Subtract, & Multiply Polynomials.

Activity based around:

Recall (a + b)(a – b) = a2 – b2 Perfect Square Variables x2 = (x)2

Here you can learn all about 2-D shapes

Round to the nearest 1000.

Factors, multiple, primes: Types of numbers from prime factors

Maths Unit 15 – Indices and Standard Form

Square Numbers and Square Roots

Square and Cube Numbers

AA Notes 4.3: Factoring Sums & Differences of Cubes

Square and Cube Roots.

Here you can learn all about 2-D shapes

Warm-Up ***Multiply.

AA-Block Notes 4.4: Factoring Sums & Differences of Cubes

Simplifying Radicals.

T H S E R M A U B.

Times Tables in Year 6 SATs

Factoring Difference of Squares a2 – b2

X values y values. x values y values Domain Range.

SECTION 8-4 – MULTIPLYING SPECIAL CASES

Completing the Ellipse

BETONLINEBETONLINE A·+A·+

Exponents- the basics.

Factoring Polynomials, Special Cases

Presentation transcript:

How else can we find them? What are they? EMERGING Due: Friday 11 th December Circle the square numbers

How else can we find them? What are they? DEVELOPING Due: Friday 11 th December

SECURE Due: Friday 11 th December To cube a number, we multiply it by itself. Then by itself again. E.g: 3 x 3 = 9 then 9 x 3 = 27 Which of the following are cubed numbers (put a ring round them)? Here is a list of numbers: From the list, write a)a square number b)a multiple of 15 c)a cubed number