Use the following diagram to create algebraic expressions for the area of the rectangle. How many can you find? x 3 x (x + 3)(x + 4) 4.

Slides:

Advertisements

Similar presentations

Polynomials and Algebra Tiles

Advertisements

Quadratic Rectangles This activity uses the area of squares and rectangles to help expand and factorise simple quadratic expressions. You will need a selection.

LevelLevel 3Level 4Level 5Level 6Level 7Level 8 Algebraic Manipulation I understand the role of the = sign I can work out the missing number in a box.

An alternative to the trial and improvement method Factorising Difficult Quadratics.

Algebra I Chapter 10 Review

Demonstrate Basic Algebra Skills

Example 1 Finding a Combined Area ARCHITECTURE Two methods can be used to find the total area of the two rectangular rooms. A replica of the Parthenon,

We Are Learning To We Are Learning To

2 pt 3 pt 4 pt 5 pt 1 pt 2 pt 3 pt 4 pt 5 pt 1 pt 2 pt 3 pt 4 pt 5 pt 1 pt 2 pt 3 pt 4 pt 5 pt 1 pt 2 pt 3 pt 4 pt 5 pt 1 pt Surface Area of Irregular.

Let’s Work With Algebra Tiles

Alge-Tiles Expanding Binomials. x x2x2 1 –x–x –x2–x2 –1 1 = 0 x –x–x –x2–x2 x2x2.

Algebra Multiple Choice (BCD Questions). A B C D Q1. Simplify -7x+3y+-8y+2x +5x 14x - 5y - 5y 14x + 11y 0x + 5y.

The area of the rectangle is the sum of the areas of the algebra tiles. The area of each square green tile is x² square units. The area of each long green.

Solving a quadratic by factorisation 6x 2 + 7x – 3 = 0 ac = -18 b = 7 Factors are: , , +2 -9, , , Correct pair adding to.

Brackets An introduction to using brackets in algebra.

Find the total area of the rectangles using two different expressions 5 ft 10 ft+ 4 ft 5 ft.

Mathematics Chapter One. Commutative law 5+3=? The order of adding any 2 numbers does not affect the result. This is the same for multiplication and division.

Mathsercise-C Ready? Quadratics Here we go!.

Goal: I will solve linear equations in one variable. ❖ Linear equations in one variable with one solution, infinitely many solutions, or no solutions.

Introduction This chapter focuses on basic manipulation of Algebra It also goes over rules of Surds and Indices It is essential that you understand this.

Chapter 7: Polynomials This chapter starts on page 320, with a list of key words and concepts.

Binomial Expansion and Surds. Part 1

Notes Over 1.2.

Simplify algebraic expressions involving algebraic fractions.

Mystery Rectangle Puzzles:

Multiplying Radicals.

Expanding Brackets and Simplifying

Distributive Property

Review Problems Algebra 1 11-R.

Factoring Expressions

1-6 Combining Like Terms Learn to combine like terms in an expression.

Algebraic Fractions.

Algebra Expanding Brackets and Simplifying

Solving quadratic equations

y7 –Algebraic Expressions

Factorising Quadratics

National 5 Homework: Surds Feedback: /15 grade

Recapping: Writing with algebra

EXPANDING DOUBLE BRACKETS

SOLVING QUADRATIC EQUATIONS USING THE FORMULA

Literacy Research Memory Skill Challenge

Collecting Like terms Brackets 2 Brackets

Maths Unit 14 – Expand, factorise and change the subject of a formula

Area What is the area of these shapes 8 x x2 x x 8x x x 8.

Using Algebra Tiles for Student Understanding

Combining Like Terms.

Quadratics Multiply out (x+16) (x-16) (x+12) (x-12) = ?

3.5 (Part 1) Multiplying Two Binomials

Algebraic Fractions.

Algebraic Fractions.

Evaluating expressions and Properties of operations

Learn to combine like terms in an expression.

ALGEBRA I - REVIEW FOR TEST 3-3

Set Up Vocabulary! FRONT BACK 1) Variable 9) Distributive Property

Area of combined figures

EXPANDING DOUBLE BRACKETS

Solving Quadratic Equations by FACTORING

Further Quadratic Problems

Starter Multiply out the brackets: (x+3)(x+3) (x+2)2 (x-5)2 Factorise:

Starter Questions x 2a 3b 4ab 4 7 a b 3a 5b 8a2b 21ab2

12cm Area 64cm2 Area 100cm2 ? ? Area ?cm2 12cm Area 36cm2

12cm Area 64cm2 Area 100cm2 ? ? Area ?cm2 12cm Area 36cm2

Expanding and Simplifying Algebraic Expressions

1) Expand Brackets 2) Factorise

Area of combined shapes

Recap from year 8: How many different factorised forms can you find?

Factorise b2 + 9b + 8 b2 - 9b + 8 (b + 8)(b + 1) (b - 8)(b - 1)

Algebraic Manipulation – Higher – GCSE Questions – AQA

Maths Unit 15 – Expand, factorise and change the subject of a formula

Presentation transcript:

Use the following diagram to create algebraic expressions for the area of the rectangle. How many can you find? x 3 x (x + 3)(x + 4) 4

Use the following diagram to create algebraic expressions for the area of the rectangle. How many can you find? x 3 x x2 3x x2 + 7x + 12 4 4x 12

x 3 x(x + 3) x(x + 3) + 4(x + 3) x 4(x + 3) 4 Use the following diagram to create algebraic expressions for the area of the rectangle. How many can you find? x 3 x x(x + 3) x(x + 3) + 4(x + 3) 4 4(x + 3)

x 3 x(x + 4) + 3(x + 4) x x(x + 4) 3(x + 4) 4 Use the following diagram to create algebraic expressions for the area of the rectangle. How many can you find? x 3 x x(x + 4) + 3(x + 4) x(x + 4) 3(x + 4) 4

x 3 (x + 3)(x + 4) x2 + 7x + 12 x x(x + 3) + 4(x + 3) Use the following diagram to create algebraic expressions for the area of the rectangle. How many can you find? x 3 (x + 3)(x + 4) x2 + 7x + 12 x x(x + 3) + 4(x + 3) x(x + 4) + 3(x + 4) 4 The expressions are all equivalent. When expressions are equivalent we use the symbol ≡

(x + 3)(x + 4) ≡x2 + 7x + 12 (x + 4)(x + 3) ≡x(x + 3) + 4(x + 3) Put equivalent expressions together to make an identity Identities are true for all values of x. (x + 3)(x + 4) ≡x2 + 7x + 12 The expression on the left is the fully factorised version. The expression on the right is the fully simplified version. (x + 4)(x + 3) ≡x(x + 3) + 4(x + 3) This combination of expressions is known as the distributive law (x + 3)(x + 4) ≡x(x + 4) + 3(x + 4) And so is this.

Use each diagram to create a quadratic identity b) 2x 3x 6 2x 2x 2 3 ≡ ≡

Fill in the gaps for each identity (3x + 5)(2x + 2) ≡ x2 + 16x + (3d + 4)(4d + 3) ≡ 3d( 4d + ) + 4( d + 3) (3g + 3)(2g + 6) ≡ g2 + 24g + (2 + 4f)(3f +2) ≡ 3f(2 + f)+ ( + 4f) (3h + 2)2 ≡ 9h2 + h +

Fill in the gaps for each identity (3x + 5)(2x + 2) ≡ x2 + 16x + (3d + 4)(4d + 3) ≡ 3d( 4d + ) + 4( d + 3) (3g + 3)(2g + 6) ≡ g2 + 24g + (2 + 4f)(3f +2) ≡ 3f(2 + f)+ ( + 4f) (3h + 2)2 ≡ 9h2 + h + 6 10 3 4 6 18 4 2 2 12 4

Write an expression involving brackets for the area of the red shape 2 2x + 2 Expand and simplify your expression

Write an expression involving brackets for the area of the red shape 2 2x + 2 3x + 2 Expand and simplify your expression

Write an expression involving brackets for the area of the red shape 2 2x + 2 3x + 2 Expand and simplify your expression 4x + 6

Write an expression involving brackets for the area of the red shape Expand and simplify your expression

Write an expression involving brackets for the area of the red shape Expand and simplify your expression

Write an expression involving brackets for the area of the red shape Expand and simplify your expression

In your pairs … ABCH is a square HCFG is a rectangle CDEF is a square They are joined to make an L-shape Show that the area of the L-shape, in cm2 is x2 + 9x + 27

In your pairs … ABCH is a square HCFG is a rectangle CDEF is a square Hints … ABCH is a square HCFG is a rectangle CDEF is a square They are joined to make an L-shape Show that the area of the L-shape, in cm2 is x2 + 9x + 27

In your pairs … ABCH is a square HCFG is a rectangle CDEF is a square Hints … ABCH is a square HCFG is a rectangle CDEF is a square They are joined to make an L-shape Show that the area of the L-shape, in cm2 is x2 + 9x + 27

In your pairs … ABCH is a square HCFG is a rectangle CDEF is a square Hints … ABCH is a square HCFG is a rectangle CDEF is a square They are joined to make an L-shape Show that the area of the L-shape, in cm2 is x2 + 9x + 27

If you have finished, try this one… ABCH is a square HCFG is a rectangle CDEF is a square They are joined to make an L-shape Find as many expressions, in terms of a and b for the area of the L-shape as you can. Show that they are all equivalent. (b + 2) cm (a + b) cm

Write an expression involving brackets for the area of the red shape Expand and simplify your expression

Write an expression involving brackets for the area of the red shape 3 (2x + 3)(3x – 1) – 3(x + 2) Expand and simplify your expression

Write an expression involving brackets for the area of the red shape (2x + 3)(3x + 1) 3 3(x + 2)

Write an expression involving brackets for the area of the red shape + 3 x + 2 6x2 3x 9x 3 3x 6 2x 3 +1 (2x + 3)(3x + 1) – 3(x + 2)

Expand and simplify your expression + 3 x + 2 6x2 3x 9x 3 3x 6 2x 3 +1 (2x + 3)(3x + 1) – 3(x + 2) 6x2 + 11x + 3 – [3x + 6] 6x2 + 11x + 3 – 3x - 6 6x2 + 8x – 3

In your pairs … The diagram shows two rectangles. All dimensions are in cm. Work out an expression, in terms of x, for the shaded area. Give your answer in its simplest form.

Find the area of the shaded region for each shape b) n + 1 h + 2 3h + 1 2n + 1 4 2h + 1 n + 2

Challenge problem Write an expression involving brackets for the area of this trapezium. Expand and simplify your answer y 2y y + 2

Challenge problem Write an expression involving brackets for the area of this trapezium. Expand and simplify your answer y 2y2 + 2y 2y y + 2