9.4: FACTORING TO SOLVE ax 2 + bx + c = 0

Factoring: A process used to break down any polynomial into simpler polynomials. 9.4: FACTORING TO SOLVE ax2 + bx + c = 0 Zero-Product Property: For any real numbers a and b, If ab= 0 Then a= 0 or b = 0.

Procedure: 1) Always look for the GCF of all the terms FACTORING ax2 + bx + c = 0 2) Factor the remaining terms – pay close attention to the value of coefficient a and follow the proper steps. 3) Re-write the original polynomial as a product of the polynomials that cannot be factored any further.

GOAL:

SOLVING BY FACTORING: Ex: What are the solutions of: x2+5x+6?

FACTORING: To factor a quadratic trinomial with a coefficient of 1 in the x2, we must look at the b and c coefficients: x2+5x+6 = 0 x2+bx+c  b= +5  c = +6 Look at the factors of C:  c = +6: (1)(6), (2)(3) Take the pair that equals to b when adding the two integers. In our case it is 2x3 since 2+3 = 5= b Thus the factored form is: (x+2)(x+3)

FACTORING: To find the solutions (x-intercepts) we go one step further: (x+2)(x+3) = 0 Using the Zero-Product property (x+2)(x+3) = 0 (x+2) = 0 (x+3) = 0 x+2 = 0 x+3 = 0 X = -2 X = -3 The solutions are x = -3, and -2.

SOLVING BY FACTORING: Ex: What is the solutions of the equation: 5x2+11x+2?

To factor a quadratic trinomial with a coefficient ≠ 1 in the x2, we must look at the b and ac coefficients: FACTORING TO SOLVE: 5x2+11x+2 = 0 ax2+bx+c  b= +11  ac =(5)(2) Look at the factors of ac: ac = +10 : (1)(10), (2)(5) Take the pair that equals to b when adding the two integers. In our case it is 1x10 since 1+10 =11= b

Re-write using factors of ac that = b. 5x2+11x+2 5x2+ 1x + 10x + 2 Look at the GCF of the first two terms: 5x2+ 1x  x(5x + 1) Look at the GCF of the last two terms: 10x + 2  2(5x + 1) Look at the GCF of both:  x(5x + 1) + 2(5x + 1) Thus the factored form is: (5x+1) (x+2)

FACTORING: To find the solutions (x-intercepts) we go one step further: (5x+1) (x+2)= 0 Using the Zero-Product property (5x+1) (x+2) = 0 (5x+1) = 0 (x+2) = 0 5x = -1 x+2 = 0 X = -1/5 X = -2 The solutions are x = -2, and -1/5.

YOU TRY IT: Ex: What are the solutions of: 6x2+13x+5?

SOLUTION: To factor a quadratic trinomial with a coefficient ≠ 1 in the x2, we must look at the b and ac coefficients: 6x2+13x+5 = 0 ax2+bx+c  b= +13  ac =(6)(5) Look at the factors of C: ac = +30 :(1)(30), (2)(15), (3)(10) Take the pair that equals to b when adding the two integers. In our case it is 3x10 since 3+10 =13= b

Re-write using factors of ac that = b. 6x2+13x+5  6x2+ 3x + 10x + 5 Look at the GCF of the first two terms: 6x2+ 3x  3x(2x + 1) Look at the GCF of the last two terms: 10x + 5  5(2x + 1) Look at the GCF of both:  3x(2x + 1)+5(2x + 1) Thus the factored form is:(3x+5)(2x+1)

FACTORING: To find the solutions (x-intercepts) we go one step further: (2x+1) (3x+5)= 0 Using the Zero-Product property (2x+1) (3x+5) = 0 (2x+1) = 0 (3x+5) = 0 2x = -1 3x = -5 X = -1/2 X = -5/3 The solutions are x = -1/2, and -5/3.

YOU TRY IT: Ex: What are the solutions of: 3x2+4x = 15?

FACTORING: Since a ≠ 1, we still look at the b and ac coefficients: 3x2+4x-15 = 0 ax2+bx+c  b= +4  ac =(3)(-15) Look at the factors of ac: ac = -45 : (-1)(45), (1)(-45) (-3)(15), (3)(-15) (-5)(9), (5)(-9) Take the pair that equals to b when adding the two integers. In our case it is (-5)(9)since -5+9 =+4 =b

Re-write: using factors of ac that = b. 3x2+4x-15 3x2-5x + 9x -15 Look at the GCF of the first two terms: 3x2- 5x  x(3x - 5) Look at the GCF of the last two terms: 9x -15  3(3x -5) Look at the GCF of both:  x(3x - 5) + 3(3x - 5) Thus the factored form is: (3x-5) (x+3)

FACTORING: To find the solutions (x-intercepts) we go one step further: (3x-5) (x+3)= 0 Using the Zero-Product property (3x-5) (x+3) = 0 (3x-5) = 0 (x+3) = 0 3x = 5 x = -3 X = 5/3 x = -3 The solutions are x = -3and 5/3.

REAL-WORLD: You want to make a frame for the photo. You want the frame to be the same width all the way around and the total area to be 315 in2. What should the outer dimensions of the frame be?

SOLUTION: Adding an x to both sides of the picture we get: 2x +11 A = b h 2x +17 A = (2x +11)(2x +17) 315 = (2x +11)(2x +17)  FOIL 315 = 4x2 + 56x + 187

To solve we now put it in the ax2+bx+c = 0 form: SOLUTION: 315 = 4x2 + 56x + 187 4x2 + 56x + 187-315 = 0 4x2 + 56x -128 = 0 4(x2 + 14x -32) = 0 4(x+16)(x-2) = 0 (x+16)= 0 (x-2) = 0 x = 2 x = -16

VIDEOS: SOLVING BY FACTORING Solving by factoring: http://www.khanacademy.org/math/algebra/quadratics/factoring_quadratics/v/Example%201:%20Solving%20a%20quadratic%20equation%20by%20factoring http://www.khanacademy.org/math/trigonometry/polynomial_and_rational/quad_formula_tutorial/v/solving-quadratic-equations-by-completing-the-square

VIDEOS: SOLVING BY FACTORING Solving by factoring: http://www.khanacademy.org/math/algebra/quadratics/factoring_quadratics/v/Example%202:%20Solving%20a%20quadratic%20equation%20by%20factoring http://www.khanacademy.org/math/trigonometry/polynomial_and_rational/quad_formula_tutorial/v/solving-quadratic-equations-by-completing-the-square

CLASSWORK:Page 508-509: Problems: 4, 7, 15, 21, 25, 36, 37.

9.4: FACTORING TO SOLVE ax 2 + bx + c = 0

9.4: FACTORING TO SOLVE ax 2 + bx + c = 0

Presentation Transcript

Factoring Trinomials of the form ax 2 +bx+c with a ‡ 0.

Factoring Quadratic Expressions ax 2 + bx + c

8.5: FACTORING AX 2 + BX + C where A=1.

4.4 “Solve ax 2 + bx + c by Factoring”

8.6: FACTORING ax 2 + bx + c where a ≠ 1

8.5 Factoring + bx + c

AC Method of factoring ax 2 + bx +c

Chapter 6.5 – factoring ax^2+bx+c

9-6 X-box Factoring ax 2 +bx+c

4.3 – Solve x 2 + bx + c = 0 by Factoring

Factoring Trinomials 9-4 ax 2 + bx +c

Factoring ax 2 +bx+c when a is not 1

Factoring ax 2 +bx +c

1-7 and 1-8 Factoring x 2 + bx + c and ax 2 + bx + c

expanded form y = ax 2 +bx+c

Ch 8.5 (part 2) Factoring ax 2 + bx + c using the Grouping method

Factoring ax 2 + bx + c by the p-q Method

Factoring ax 2 + bx + c

Factoring x 2 + bx + c

Factoring ax 2 – c

Factoring: “ax 2 +bx+….wha?”

5.4 – Factoring ax 2 + bx + c