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Published byBarrie Marsh Modified over 9 years ago
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Creating brackets
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In this powerpoint, we meet 5 different methods of factorising. Type 1 – Common Factor Type 2 – Difference of Two Squares Type 3 – Grouping This involves taking a term outside the brackets. Always try to do this first. Try this when you have two terms with a minus between This is the easiest one to pick – use it when there are 4 terms!
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Types 4 and 5 Quadratic trinomials Use these for expressions with 3 terms. They will be of the format x 2 + bx + c (Type 4) OR ax 2 + bx + c (Type 5) Where a, b and c are just numbers Factorising just makes me sooooo happy!!
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Summary Type When to Use 1. Common factor Always try first before any other method Always try first before any other method Examples: a 2 – 9a ; 2xy + 5x 2 Examples: a 2 – 9a ; 2xy + 5x 2 2. Difference of Two squares When there are only 2 terms which are squares When there are only 2 terms which are squares There must be a minus sign There must be a minus sign Examples: a 2 – 25 ; 81 – 4b 2 ; w 4 – 16 Examples: a 2 – 25 ; 81 – 4b 2 ; w 4 – 16 3. Grouping There are 4 terms. There are 4 terms. Example: a 2 – 4a + 3ab – 12b Example: a 2 – 4a + 3ab – 12b 4. Quadratic Trinomial (I) There are 3 terms. Has a squared term. There are 3 terms. Has a squared term. Examples: a 2 – 9a + 20 ; 6 – 5b + b 2 Examples: a 2 – 9a + 20 ; 6 – 5b + b 2 5. Quadratic Trinomial (II) There are 3 terms. Has a squared term with a number attached in front. There are 3 terms. Has a squared term with a number attached in front. Examples: 2a 2 – 3a – 5 ; 6b – 5b 2 + 3b Examples: 2a 2 – 3a – 5 ; 6b – 5b 2 + 3b
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Type 1 of 5 – common factor Always try this first, regardless of what type it is 3a – 12 =3(a – 4) 3a 2 – 12a = 3a 2 + 6a + 12 = 20ab – 12b 2 = 30a 6 – 15a 5 = 3a(a – 4) 4b(5a – 3b) 15a 5 (2a – 1) 3(a 2 + 2a + 4) Remember – take out the largest factor you can! Always look for a common factor!
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Type 2 of 5 – diff of 2 squares To qualify as a Type 2, an expression must have only 2 terms which are SQUARES must have a MINUS sign separating them Examples a 2 – 9 =(a – 3)(a + 3) 16 – a 2 =(4 – a)(4 + a) (2b) 2 – (3a) 2 = 9b 2 – 25 =(3b – 5)(3b + 5) (2b – 3a)(2b + 3a)
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Combining Types 1 and 2 Example 1.....Factorise 5x 2 – 45 STEP 1Treat as a Type 1, and take out common factor first, 5 Write 5(x 2 – 9) STEP 2Now do expression in brackets as a Type 2 Write 5(x – 3)(x + 3)...ANS! LookMum ! It’s a difference of 2 squares!
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Example 2.....Factorise x 4 – 81 STEP 1Treat as a Type 2, and write as difference of 2 squares..... (x 2 – 9)(x 2 + 9) STEP 2 (x 2 – 9)(x 2 + 9) (x – 3)(x + 3)(x 2 + 9)....ANS!! Now check out the thing in each bracket. We can factorise the first one, but not the second. Y’can’t factorise a SUM of two squares Stupid! x 2 + 9 has to stay as it is. It’s not the same as (x + 3)(x + 3) is it now???
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Example 3.....Factorise 80a 4 – 405b 12 STEP 2 STEP 3 STEP 1Identify common factor, 5 and remove Write 5(16a 4 – 81b 12 ) Now work on the terms in the brackets This is a difference of 2 squares and becomes (4a 2 – 9b 6 ) (4a 2 + 9b 6 ) Now work on the terms in the 1 st bracket. This is a difference of 2 squares and becomes (2a – 3b 3 ) (2a + 3b 3 ). Write Write 5(4a 2 – 9b 6 ) (4a 2 + 9b 6 ) 5(2a – 3b 3 ) (2a + 3b 3 ) (4a 2 + 9b 6 )
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Example 4.....Factorise 9a 2 – (x – 2a) 2 Just treat as difference of 2 squares of the format 9a 2 – b 2 where the b = [x – 2a] Factorising it then becomes = (3a – b)(3a + b) And then replacing the b with [x – 2a] we get = (3a – [x – 2a])(3a + [x – 2a]) Now get rid of square brackets = (3a – x + 2a)(3a + x – 2a) Clean up = (5a – x )(a + x) Ans!! You could check your answer by expanding it and also expanding the original question. They should both give the same thing.
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Type 3 of 5 – Grouping You can tell when you’ve got one of these because there are FOUR TERMS !!! Example 1 Factorise 2a – 4b + ax – 2bx STEP 1 – split it into “2 by 2” = 2a – 4b + ax – 2bx STEP 2 – factorise each pair separately as Type 1 = 2(a – 2b) + x(a – 2b) STEP 3 – take out the (a – 2b) as a common factor = (a – 2b)(2 + x)...ans!! No need to be confused!
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Type 3 of 5 – Grouping Example 2 Factorise xy + 5x – 2y – 10 STEP 1 – split it into “2 by 2” = xy + 5x – 2y – 10 STEP 2 – factorise each pair separately as Type 1 = x(y + 5) – 2 (y + 5) STEP 3 – take out the (y + 5) as a factor = (y + 5)(x – 2) ans!! If these are the same, it’s a good sign!
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Type 3 of 5 – Grouping Example 3 Factorise x 2 – x – 5x + 5 STEP 1 – split it into “2 by 2” = x 2 – x – 5x + 5 STEP 2 – factorise each pair separately as Type 1 = x(x – 1) – 5 (x – 1) STEP 3 – take out the (x – 1) as a factor = (x – 1 )(x – 5) ans!! Ewbewdy!! They’re the same! On my way to a VHA
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Example 4 - harder Factorise x 2 – 4y 2 – 2ax – 4ay STEP 1 – split it into “2 by 2” = x 2 – 4y 2 – 2ax – 4ay STEP 2 – factorise each pair separately = (x – 2y) (x + 2y) STEP 3 – take out the (x + 2y) as a factor = (x + 2y)(x – 2y – 2a) ans!! – 2a (x + 2y) 1 st pair – Type 22 nd pair – Type 1 Awwright! They’re the same!!
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Type 4 of 5 – Easy Quadratic Trinomial Example 1.....Factorise x 2 + 5x + 6 You can usually pick these as they have 3 TERMS STEP 1 – Make 2 brackets (x..............)(x.............) STEP 2 – Look for 2 numbers that Multiply to make +6 Add to make +5 +2 & +3 STEP 3 – Put ‘em in the brackets (x + 2)(x + 3)
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Type 4 of 5 – Easy Quadratic Trinomial Example 2.....Factorise 2x 2 – 6x – 20 STEP 1 – take out a common factor (remember this should be your 1 st step EVERY time!!) = 2(x 2 – 3x – 10) STEP 2 – Ignore the 2. For the expression inside the brackets, look for 2 numbers that Multiply to make – 10 Add to make – 3 +2 & – 5 STEP 3 – Put ‘em in the brackets 2(x + 2)(x – 5)
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Type 4 of 5 – Easy Quadratic Trinomial Example 3.....Factorise 6 + 5x – x 2 STEP 1 – Rearrange into “normal” format with x 2 at the front, then x, then the number = – x 2 + 5x + 6 STEP 2 – Now take out a common factor – 1 STEP 3 – Ignore the minus. Look for 2 numbers that add to – 5, and multiply to – 6. = – (x 2 – 5x – 6) These are +1 and –6. – (x + 1)(x – 6)
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Type 5 of 5 – Harder Quadratic Trinomial Example 1.....Factorise 2x 2 + 5x – 3 STEP 1 – Draw up a fraction like this STEP 2 – Look for two numbers that ADD to make +5 MULT to make – 6 2 × – 3 = – 6 Numbers are +6, – 1 = (x + 3)(2x – 1) ANS Note the 2 in bottom must cancel one whole bracket FULLY! So (2x + 6) becomes (x + 3) With a number in front of the x 2
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Type 5 of 5 – Harder Quadratic Trinomial Example 2.....Factorise 3x 2 + 8x – 3 STEP 1 – Draw up a fraction like this STEP 2 – Look for two numbers that ADD to make +8 MULT to make – 9 3 × – 3 = – 9 Numbers are +9, – 1 = (x + 3)(3x – 1) ANS Note the 3 in bottom must cancel one whole bracket FULLY! So (3x + 9) becomes (x + 3) With a number in front of the x 2
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Type 5 of 5 – Harder Quadratic Trinomial Example 3.....Factorise 6x 2 – 19x + 10 STEP 1 – Draw up a fraction like this STEP 2 – Look for two numbers that ADD to make –19 MULT to make 60 6 × 10 = 60 Numbers are –4, –15 = (3x – 2)(2x – 5) ANS Note the 6 in bottom would not cancel either bracket FULLY! So we broke the 6 into 2 x 3 then cancelled. With a number in front of the x 2
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Now wozn’t that just a barrel of fun??
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