Multiply. (x+3)(x+2) x x + x 2 + 3 x + 3 2 Bellringer part two FOIL = x 2 + 2x + 3x + 6 = x 2 + 5x + 6.

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Presentation transcript:

Multiply. (x+3)(x+2) x x + x x Bellringer part two FOIL = x 2 + 2x + 3x + 6 = x 2 + 5x + 6

We will factor trinomials such as x 2 + 7x + 12 back into binomials. We look for the pattern of products and sums! Factoring Trinomials If the x 2 term has no coefficient (other than 1)... Step 1: List all pairs of numbers that multiply to equal the constant, 12. x 2 + 7x = 1 12 = 2 6 = 3 4

Factoring Trinomials Step 2: Choose the pair that adds up to the middle coefficient. x 2 + 7x = 1 12 = 2 6 = 3 4 Step 3: Fill those numbers into the blanks in the binomials: ( x + )( x + ) 3 4 x 2 + 7x + 12 = ( x + 3)( x + 4)

Factor. x 2 + 2x - 24 This time, the constant is negative! Factoring Trinomials Step 1: List all pairs of numbers that multiply to equal the constant, -24. (To get -24, one number must be positive and one negative.) -24 = 1 -24, = 2 -12, = 3 -8, -3 8 = 4 -6, Step 2: Which pair adds up to 2? Step 3: Write the binomial factors. x 2 + 2x - 24 = ( x - 4)( x + 6)

Factor. 3x x + 8 This time, the x 2 term DOES have a coefficient (other than 1)! Factoring Trinomials Step 2: List all pairs of numbers that multiply to equal that product, = 1 24 = 2 12 = 3 8 = 4 6 Step 3: Which pair adds up to 14? Step 1: Multiply 3 8 = 24 (the leading coefficient & constant).

( 3x + 2 )( x + 4 ) 2 Factor. 3x x + 8 Factoring Trinomials Step 5: Put the original leading coefficient (3) under both numbers. ( x + )( x + ) Step 6: Reduce the fractions, if possible. Step 7: Move denominators in front of x. Step 4: Write temporary factors with the two numbers ( x + )( x + ) ( x + )( x + ) 4 3

( 3x + 2 )( x + 4 ) Factor. 3x x + 8 Factoring Trinomials You should always check the factors by distributing, especially since this process has more than a couple of steps. = 3x x + 8 = 3x x + 3x x √ 3x x + 8 = (3x + 2)(x + 4)

Factor 3x x + 4 This time, the x 2 term DOES have a coefficient (other than 1)! Factoring Trinomials Step 2: List all pairs of numbers that multiply to equal that product, = 1 12 = 2 6 = 3 4 Step 3: Which pair adds up to 11? Step 1: Multiply 3 4 = 12 (the leading coefficient & constant). None of the pairs add up to 11, this trinomial can’t be factored; it is PRIME.

Just because it can’t be factored does not mean that we can’t do anything to it. Next chapter we will use the Quadratic Formula to solve something like this

Factor each trinomial, if possible. The first four do NOT have leading coefficients, the last two DO have leading coefficients. Watch out for signs!! 1) t 2 – 4t – 21 Factor This Trinomial!

Solution #1: t 2 – 4t – 21 1) Factors of -21: 1 -21, , ) Which pair adds to (- 4)? 3) Write the factors. t 2 – 4t – 21 = (t + 3)(t - 7)

Watch out for signs!! 2)x x + 32 Factor This Trinomial!

Solution #2: x x ) Factors of 32: ) Which pair adds to 12 ? 3) Write the factors. x x + 32 = (x + 4)(x + 8)

Watch out for signs!! 3) x 2 –10x + 24 Factor This Trinomial!

Solution #3: x x ) Factors of 24: ) Which pair adds to -10 ? 3) Write the factors. x x + 24 = (x - 4)(x - 6) None of them adds to (-10). For the numbers to multiply to +24 and add to -10, they must both be negative!

Watch out for signs!! 4) x 2 + 3x – 18 Factor These Trinomials!

Solution #4: x 2 + 3x ) Factors of -18: 1 -18, , , ) Which pair adds to 3 ? 3) Write the factors. x 2 + 3x - 18 = (x - 3)(x + 6)

Watch out for signs!! 5) 2x 2 + x – 21 Factor These Trinomials!

Solution #5: 2x 2 + x ) Multiply 2 (-21) = - 42; list factors of , , , , ) Which pair adds to 1 ? 3) Write the temporary factors. 2x 2 + x - 21 = (x - 3)(2x + 7) ( x - 6)( x + 7) 4) Put “2” underneath ) Reduce (if possible). ( x - 6)( x + 7) ) Move denominator(s)in front of “x”. ( x - 3)( 2x + 7)

Watch out for signs!! 6) 3x x + 10 Factor These Trinomials!

Solution #6: 3x x ) Multiply 3 10 = 30; list factors of ) Which pair adds to 11 ? 3) Write the temporary factors. 3x x + 10 = (3x + 5)(x + 2) ( x + 5)( x + 6) 4) Put “3” underneath ) Reduce (if possible). ( x + 5)( x + 6) ) Move denominator(s)in front of “x”. ( 3x + 5)( x + 2)

9.5 Homework Section 9.5, Page 483 (21 – 29, 43 – 54, 59,60

9.6 Homework Section 9.6, page 487 (2-26 even)