Factoring Trinomials
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Factoring Trinomials
Factoring Trinomials We will factor trinomials such as x2 7x 12 back into binomials. If the x2 term has no coefficient (other than 1). x2 7x 12 Step 1: List all pairs of numbers that multiply to equal the constant, 12. 12 1 12 2 6 3 4
Factoring Trinomials x2 7x 12 Step 2: Choose the pair that adds up to the middle coefficient. 12 1 12 2 6 3 4 Step 3: Fill those numbers into the blanks in the binomials: ( x 3 )( x 4 ) x2 7x 12 ( x 3)( x 4)
Factoring Trinomials Factor. x2 2x - 24 This time, the constant is negative! 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, -1 24 2 -12, -2 12 3 -8, -3 8 4 -6, - 4 6 Step 2: Which pair adds up to 2? Step 3: Write the binomial factors. x2 2x - 24 ( x - 4)( x 6)
Factor These Trinomials! 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) t2 – 4t – 21 2) x2 12x 32 3) x2 –10x 24 4) x2 3x – 18 5) 2x2 x – 21 6) 3x2 11x 10
Solution #1: 1) Factors of -21: t2 – 4t – 21 1 -21, -1 21 3 -7, -3 7 2) Which pair adds to (- 4)? 3) Write the factors. t2 – 4t – 21 (t 3)(t - 7)
Solution #2: x2 12x 32 1 32 2 16 4 8 1) Factors of 32: 2) Which pair adds to 12 ? 3) Write the factors. x2 12x 32 (x 4)(x 8)
x2 - 10x 24 Solution #3: 1 24 2 12 3 8 4 6 1) Factors of 32: 2) Which pair adds to -10 ? -1 -24 -2 -12 -3 -8 -4 -6 None of them adds to (-10). For the numbers to multiply to 24 and add to -10, they must both be negative! 3) Write the factors. x2 - 10x 24 (x - 4)(x - 6)
Solution #4: 1) Factors of -18: x2 3x - 18 1 -18, -1 18 2 -9, -2 9 3 -6, -3 6 2) Which pair adds to 3 ? 3) Write the factors. x2 3x - 18 (x - 3)(x 18)
Factoring Trinomials Factor. 3x2 14x 8 This time, the x2 term DOES have a coefficient (other than 1)! Step 1: Multiply 3 8 24 (the leading coefficient & constant). 24 1 24 2 12 Step 2: List all pairs of numbers that multiply to equal that product, 24. Step 3: Which pair adds up to 14? 3 8 4 6
Factoring Trinomials Factor. 3x2 14x 8 Step 4: Write temporary factors with the two numbers. ( x 2 )( x 12 ) 3 3 Step 5: Put the original leading coefficient (3) under both numbers. ( x 2 )( x 12 ) 3 3 Step 6: Reduce the fractions, if possible. ( x 2 )( x 4 ) 3 Step 7: Move denominators in front of x. ( 3x 2 )( x 4 ) 4
Factoring Trinomials Factor. 3x2 14x 8 You should always check the factors by distributing, especially since this process has more than a couple of steps. ( 3x 2 )( x 4 ) 3x x 3x 4 2 x 2 4 3x2 14 x 8 3x2 14x 8 (3x 2)(x 4)
Factoring Trinomials Factor 3x2 11x 4 This time, the x2 term DOES have a coefficient (other than 1)! Step 1: Multiply 3 4 12 (the leading coefficient & constant). Step 2: List all pairs of numbers that multiply to equal that product, 12. 12 1 12 2 6 3 4 Step 3: Which pair adds up to 11? None of the pairs add up to 11, this trinomial can’t be factored; it is PRIME.
Factor These Trinomials! 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) t2 – 4t – 21 2) x2 12x 32 3) x2 –10x 24 4) x2 3x – 18 5) 2x2 x – 21 6) 3x2 11x 10
Solution #5: 1) Multiply 2 (-21) - 42; list factors of - 42. 2) Which pair adds to 1 ? 3) Write the temporary factors. 4) Put “2” underneath. 2x2 x - 21 1 -42, -1 42 2 -21, -2 21 3 -14, -3 14 6 -7, -6 7 ( x - 6)( x 7) 2 2 3 5) Reduce (if possible). ( x - 6)( x 7) 2 2 6) Move denominator(s)in front of “x”. ( x - 3)( 2x 7) 2x2 x - 21 (x - 3)(2x 7)
Solution #6: 1) Multiply 3 10 30; list factors of 30. 2) Which pair adds to 11 ? 3) Write the temporary factors. 4) Put “3” underneath. 3x2 11x 10 1 30 2 15 3 10 5 6 ( x 5)( x 6) 3 3 2 5) Reduce (if possible). ( x 5)( x 6) 3 3 6) Move denominator(s)in front of “x”. ( 3x 5)( x 2) 3x2 11x 10 (3x 5)(x 2)