Factorising Quadratics with coefficient a not equal to 1

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Συνεισφορά από: Adam Mlynarczyk

In fact 2 and 10 do that 2 x 10 = 20 and 2 + 10 = 12

Factorise: 2x²+12x+10

Step 1: Find two numbers that multiply to give a x c, and add to give b

In this example a x c = 2 x 10 = 20 and b = 12,so we want two numbers that multiply to give 20and add up to give 12.

2x²+12x+10=2x²+2x+10x+10=2x(x+1)+10(x+1)

Step 2: Use these numbers to rewrite the middle term.

Factorise: 2x²+12x+10

Step 3: Factorise the first two terms 2x²+2x and the last two terms 10x+10 seperately

2x²+2x=2x(x+1) and 10x+10=10(x+1)

2x²+12x+10 = 2x²+2x+10x+10

Step 4: Now we get clearly visible common factor for these two terms above. The common factor here is (x+1). We can take the common factor in front of the bracket.

From Step 3 we know that:

2x²+12x+10=2x²+2x+10x+10=2x(x+1)+10(x+1)

Factorise: 2x²+12x+10

so we finally factorised the expression in question:

2x(x+1)+10(x+1) = (x+1)(2x+10)

2x²+12x+10 = (x+1)(2x+10)

In fact 4 and 6 do that 4 x 6 = 24 and 4 + 6 = 10

Factorise: 2x²+10x+12

Step 1: Find two numbers that multiply to give a x c, and add to give b

In this example a x c = 2 x 12 = 24 and b = 10,so we want two numbers that multiply to give 24and add up to give 10.

2x²+10x+12=2x²+4x+6x+12=2x(x+2)+6(x+2)

Step 2: Use these numbers to rewrite the middle term.

Factorise: 2x²+10x+12

Step 3: Factorise the first two terms 2x²+4x and the last two terms 6x+12 seperately

2x²+4x=2x(x+2) and 6x+12=6(x+2)

2x²+10x+12 = 2x²+4x+6x+12

Step 4: Now we get clearly visible common factor for these two terms above. The common factor here is (x+2). We can take the common factor in front of the bracket.

From Step 3 we know that:

2x²+10x+12=2x²+4x+6x+12=2x(x+2)+6(x+2)

Factorise: 2x²+10x+12

so we finally factorised the expression in question:

2x(x+2)+6(x+2) = (x+2)(2x+6)

2x²+10x+12 = (x+2)(2x+6)

In fact 3 and 12 do that 3 x 12 = 36 and 3 + 12 = 15

Factorise: 3x²+15x+12

Step 1: Find two numbers that multiply to give a x c, and add to give b

In this example a x c = 3 x 12 = 36 and b = 15,so we want two numbers that multiply to give 36and add up to give 15.

3x²+15x+12=3x²+3x+12x+12=3x(x+1)+12(x+1)

Step 2: Use these numbers to rewrite the middle term.

Factorise: 3x²+15x+12

Step 3: Factorise the first two terms 3x²+3x and the last two terms 12x+12 seperately

3x²+3x=3x(x+1) and 12x+12=12(x+1)

3x²+15x+12 = 3x²+3x+12x+12

Step 4: Now we get clearly visible common factor for these two terms above. The common factor here is (x+1). We can take the common factor in front of the bracket.

From Step 3 we know that:

3x²+15x+12=3x²+3x+12x+12=3x(x+1)+12(x+1)

Factorise: 3x²+15x+12

so we finally factorised the expression in question:

3x(x+1)+12(x+1) = (x+1)(3x+12)

3x²+15x+12 = (x+1)(3x+12)

Step 4: The common factor for these two terms above is (x+4). Take it in front of the bracket.

You could also split the 15x into 12x+3x instead.

3x²+15x+12=3x²+12x+3x+12=3x(x+4)+3(x+4)

Factorise: 3x²+15x+12

so we finally factorised the expression in question:

3x(x+4)+3(x+4) = (x+4)(3x+3)

3x²+15x+12 = (x+4)(3x+3)

In fact 2 and 12 do that 2 x 12 = 24 and 2 + 12 = 15

Factorise: 4x²+14x+6

Step 1: Find two numbers that multiply to give a x c, and add to give b

In this example a x c = 4 x 6 = 24 and b = 14,so we want two numbers that multiply to give 24and add up to give 14.

4x²+14x+6=4x²+2x+12x+6=2x(2x+1)+6(2x+1)

Step 2: Use these numbers to rewrite the middle term.

Factorise: 4x²+14x+6

Step 3: Factorise the first two terms 4x²+2x and the last two terms 12x+6 seperately

4x²+2x=2x(2x+1) and 12x+6=6(2x+1)

4x²+14x+6 = 4x²+2x+12x+6

Step 4: Now we get clearly visible common factor for these two terms above. The common factor here is (2x+1). Let's take the common factor in front of the bracket.

From Step 3 we know that:

4x²+14x+6=4x²+2x+12x+6=2x(2x+1)+6(2x+1)

Factorise: 4x²+14x+6

so we finally factorised the expression in question:

2x(2x+1)+6(2x+1) = (2x+1)(2x+6)

4x²+14x+6 = (2x+1)(2x+6)

So 15 and -8 do that 15x(-8) =-120 and 15+(-8) = 7

Swap order and

add minus sign

Factorise: 6x²+7x-20

In this example a x c = 6 x (-20) = -120 and b = 7,so we want two numbers that multiply to give -120and add up to give 7. One of the number needs to bepositive and the other number needs to be negative.

Factors of 120:

Step 1: Find two numbers that multiply to give a x c, and add to give b

-120,-60,-40,-30,-24,-20,-15,-12,-10, -8, -6, -5, -4, -3, -2, -1

1, 2, 3, 4, 5, 6, 8, 10, 12, 15, 20, 24, 30, 40, 60, 120

Step 2: Use these numbers to rewrite the middle term.

Factorise: 6x²+7x-20

Step 3: Factorise the first two terms 6x²+15x and the last two terms -8x-20 seperately

6x²+7x-20=6x²+15x-8x-20=3x(2x+5)-4(2x+5)

6x²+15x=3x(2x+5) and -8x-20=-4(2x+5)

6x²+7x-20 = 6x²+15x-8x-20

Step 4: Now we get clearly visible common factor for these two terms above. The common factor here is (2x+5). Let's take the common factor in front of the bracket.

From Step 3 we know that:

6x²+7x-20=6x²+15x-8x-20=3x(2x+5)-4(2x+5)

Factorise: 6x²+7x-20

so we finally factorised the expression in question:

3x(2x+5)-4(2x+5) = (2x+5)(3x-4)

6x²+7x-20 = (2x+5)(3x-4)

Factorise: 4x²+10x+6

Step 1: Find two numbers that multiply to give a x c, and add to give b

In fact 4 and 6 do that 4 x 6 = 24 and 4 + 6 = 10

In this example a x c = 4 x 6 = 24 and b = 10,so we want two numbers that multiply to give 24and add up to give 10.

Step 2: Use these numbers to rewrite the middle term.

Factorise: 4x²+10x+6

Step 3: Factorise the first two terms 4x²+4x and the last two terms 6x+6 seperately

4x²+10x+6=4x²+4x+6x+6=4x(x+1)+6(x+1)

4x²+4x=4x(x+1) and 6x+6=6(x+1)

4x²+10x+6 = 4x²+4x+6x+6

Step 4: Now we get clearly visible common factor for these two terms above. The common factor here is (x+1). Let's take the common factor in front of the bracket.

From Step 3 we know that:

4x²+10x+6=4x²+4x+6x+6=4x(x+1)+6(x+1)

Factorise: 4x²+10x+6

so we finally factorised the expression in question:

4x(x+1)+6(x+1) = (x+1)(4x+6)

4x²+10x+6 = (x+1)(4x+6)

In fact 5 and 12 do that 5 x 12 = 60 and 5 + 12 = 17

Factorise: 3x²+17x+20

Step 1: Find two numbers that multiply to give a x c, and add to give b

In this example a x c = 3 x 20 = 60 and b = 17,so we want two numbers that multiply to give 60and add up to give 17.

3x²+17x+20=3x²+5x+12x+20=x(3x+5)+4(3x+5)

Step 2: Use these numbers to rewrite the middle term.

Factorise: 3x²+17x+20

Step 3: Factorise the first two terms 3x²+5x and the last two terms 12x+20 seperately

3x²+5x=x(3x+5) and 12x+20=4(3x+5)

3x²+17x+20 = 3x²+5x+12x+20

Step 4: Now we get clearly visible common factor for these two terms above. The common factor here is (3x+5). Let's take the common factor in front of the bracket.

From Step 3 we know that:

3x²+17x+20=3x²+5x+12x+20=x(3x+5)+4(3x+5)

Factorise: 3x²+17x+20

so we finally factorised the expression in question:

x(3x+5)+4(3x+5) = (3x+5)(x+4)

3x²+17x+20 = (3x+5)(x+4)

In fact -4 and -6 do that -4x-6=24 and -4+(-6)=-10

Factorise: 3x²-10x+8

Step 1: Find two numbers that multiply to give a x c, and add to give b

In this example a x c = 3 x 8 = 24 and b = -10,so we want two numbers that multiply to give 24and add up to give -10. Both of these numbers needto be negative numbers then.

Step 2: Use these numbers to rewrite the middle term.

Factorise: 3x²-10x+8

Step 3: Factorise the first two terms 3x²-6x and the last two terms -4x+8 seperately

3x²-10x+8=3x²-6x-4x+8=3x(x-2)-4(x-2)

3x²-6x=3x(x-2) and -4x+8=-4(x-2)

3x²-10x+8 = 3x²-6x-4x+8

Step 4: Now we get clearly visible common factor for these two terms above. The common factor here is (x-2). Let's take the common factor in front of the bracket.

From Step 3 we know that:

Factorise: 3x²-10x+8

so we finally factorised the expression in question:

3x²-10x+8=3x²-6x-4x+8=3x(x-2)-4(x-2)

3x(x-2)-4(x-2) = (x-2)(3x-4)

3x²-10x+8 = (x-2)(3x-4)

Factorise: 4x²-10x-14

In this example a x c = 4 x -14 = -56 and b = -10,so we want two numbers that multiply to give -56and add up to give -10. One of the number needs tobe negative and the other needs to be positive.

Step 1: Find two numbers that multiply to give a x c, and add to give b

4 and -14 do that 4x-14=-56 and 4+(-14)=-10

Step 2: Use these numbers to rewrite the middle term.

Factorise: 4x²-10x-14

Step 3: Factorise the first two terms 4x²+4x and the last two terms -14x-14 seperately

4x²-10x-14=4x²+4x-14x-14=4x(x+1)-14(x+1)

4x²+4x=4x(x+1) and -14x-14=-14(x+1)

4x²-10x-14 = 4x²+4x-14x-14

Step 4: Now we get clearly visible common factor for these two terms above. The common factor here is (x+1). Let's take the common factor in front of the bracket.

From Step 3 we know that:

Factorise: 4x²-10x-14

so we finally factorised the expression in question:

4x²-10x-14=4x²+4x-14x-14=4x(x+1)-14(x+1)

4x(x+1)-14(x+1) = (x+1)(4x-14)

4x²-10x-14 = (x+1)(4x-14)

Factorise: 4x²+7x-15

12 and -5 do that 12 x -5 = -60 and 12 + (-5) = 7

Step 1: Find two numbers that multiply to give a x c, and add to give b

In this example a x c = 4 x -15 = -60 and b = 7,so we want two numbers that multiply to give -60and add up to give 7. One of the number needs tobe negative and the other needs to be positive.

Step 2: Use these numbers to rewrite the middle term.

Factorise: 4x²+7x-15

Step 3: Factorise the first two terms 4x²+12x and the last two terms -5x-15 seperately

4x²+7x-15=4x²+12x-5x-15=4x(x+3)-5(x+3)

4x²+12x=4x(x+3) and -5x-15=-5(x+3)

4x²+7x-15 = 4x²+12x-5x-15

Step 4: Now we get clearly visible common factor for these two terms above. The common factor here is (x+3). Let's take the common factor in front of the bracket.

From Step 3 we know that:

Factorise: 4x²+7x-15

so we finally factorised the expression in question:

4x²+7x-15=4x²+12x-5x-15=4x(x+3)-5(x+3)

4x(x+3)-5(x+3) = (x+3)(4x-5)

4x²+7x-15 = (x+3)(4x-5)

Οι μαθητές που έκαναν αυτή την δοκιμασία είδαν επίσης :

GCF Pre-Algebra
8M: 5-1 QC (identifying linear functions)
Expressions and Equations

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