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

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Presentation transcript:

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

The bigger number must be positive Discuss What must the numbers in the middle be in order for their product to be negative? What must the numbers in the middle be in order for their sum to be positive? The bigger number must be positive

The bigger number must be negative Discuss What must the numbers in the middle be in order for their product to be negative? What must the numbers in the middle be in order for their sum to be negative? The bigger number must be negative

Your turn: Fill in the missing boxes with the correct signs x2 – 4x – 12 ≡ (x 6)(x 2) b2 + 5b – 24 ≡ (b 8)(b 3) p2 - 11p + 18 ≡ (p 9)(p 2) e2 - 7e - 30 ≡ (e 10)(e 3)

The area of a rectangle can be given by the expression x2 – 10x + 16 cm2 Draw a diagram to represent the information you have been given. Can you add any further information to your diagram? Is there any other information you can deduce?

A = x2 – 10x + 16 cm2 How do we calculate the area of a rectangle? What type of expression have we been given? How could we re-write the expression we have been given for the area as 2 things that are multiplying each other? We can write a quadratic identity by factorising How does this help? Use this slide if your students don’t come up with any good answers!

What else could we now calculate? (x – 8) A = x2 – 10x + 16 cm2 (x – 2) x2 – 10x + 16 ≡ (x – 8)(x – 2) What does this tell us? What else could we now calculate? Perimeter

In pairs … The area of a rectangle can be given by the expression a2 – 2a – 8 cm2. By representing the information in a diagram, find an expression for the perimeter of the rectangle.

The area of a square can be given by the expression In pairs … The area of a square can be given by the expression b2 - 8b + 16 cm2. By representing the information in a diagram, find an expression for the perimeter of the rectangle.

Find an expression for the area of the rectangle. In pairs … Below is a rectangle. The length is 3x - 1 cm. The perimeter is 10x cm. Find an expression for the area of the rectangle.

In pairs … The perimeter of a rectangle is 8x + 16. Find an expression for the area of the rectangle. Extension: Can you find more than one expression? Pupils may all have different answers here. Use this as a discussion point. Why are they able to have different expressions for the area from the same perimeter expression

In pairs … The perimeter of a rectangle is 8x + 16. Find an expression for the area of the rectangle. Extension: Can you find more than one expression? Why are you able to find more than one expression? Pupils may all have different answers here. Use this as a discussion point. Why are they able to have different expressions for the area from the same perimeter expression