SlideShare a Scribd company logo

11X1 t10 01 graphing quadratics (2011)

β€’
β€’
N
Nigel Simmons
EducationTechnology
1 of 91
Download to read offline
The Quadratic Polynomial and the Parabola
The Quadratic Polynomial and the Parabola Quadratic polynomial –
The Quadratic Polynomial and the Parabola Quadratic polynomial – ax 2  bx  c
The Quadratic Polynomial and the Parabola Quadratic polynomial – ax 2  bx  c Quadratic function –
The Quadratic Polynomial and the Parabola Quadratic polynomial – ax 2  bx  c Quadratic function – y ο€½ ax 2  bx  c
The Quadratic Polynomial and the Parabola Quadratic polynomial – ax 2  bx  c Quadratic function – y ο€½ ax 2  bx  c Quadratic equation –
The Quadratic Polynomial and the Parabola Quadratic polynomial – ax 2  bx  c Quadratic function – y ο€½ ax 2  bx  c Quadratic equation – ax 2  bx  c ο€½ 0
The Quadratic Polynomial and the Parabola Quadratic polynomial – ax 2  bx  c Quadratic function – y ο€½ ax 2  bx  c Quadratic equation – ax 2  bx  c ο€½ 0 Coefficients –
The Quadratic Polynomial and the Parabola Quadratic polynomial – ax 2  bx  c Quadratic function – y ο€½ ax 2  bx  c Quadratic equation – ax 2  bx  c ο€½ 0 Coefficients – a, b, c
The Quadratic Polynomial and the Parabola Quadratic polynomial – ax 2  bx  c Quadratic function – y ο€½ ax 2  bx  c Quadratic equation – ax 2  bx  c ο€½ 0 Coefficients – a, b, c Indeterminate –
The Quadratic Polynomial and the Parabola Quadratic polynomial – ax 2  bx  c Quadratic function – y ο€½ ax 2  bx  c Quadratic equation – ax 2  bx  c ο€½ 0 Coefficients – a, b, c Indeterminate – x
The Quadratic Polynomial and the Parabola Quadratic polynomial – ax 2  bx  c Quadratic function – y ο€½ ax 2  bx  c Quadratic equation – ax 2  bx  c ο€½ 0 Coefficients – a, b, c Indeterminate – x Roots –
The Quadratic Polynomial and the Parabola Quadratic polynomial – ax 2  bx  c Quadratic function – y ο€½ ax 2  bx  c Quadratic equation – ax 2  bx  c ο€½ 0 Coefficients – a, b, c Indeterminate – x Roots – Solutions to the quadratic equation
The Quadratic Polynomial and the Parabola Quadratic polynomial – ax 2  bx  c Quadratic function – y ο€½ ax 2  bx  c Quadratic equation – ax 2  bx  c ο€½ 0 Coefficients – a, b, c Indeterminate – x Roots – Solutions to the quadratic equation Zeroes –
The Quadratic Polynomial and the Parabola Quadratic polynomial – ax 2  bx  c Quadratic function – y ο€½ ax 2  bx  c Quadratic equation – ax 2  bx  c ο€½ 0 Coefficients – a, b, c Indeterminate – x Roots – Solutions to the quadratic equation Zeroes – x intercepts of the quadratic function
The Quadratic Polynomial and the Parabola Quadratic polynomial – ax 2  bx  c Quadratic function – y ο€½ ax 2  bx  c Quadratic equation – ax 2  bx  c ο€½ 0 Coefficients – a, b, c Indeterminate – x Roots – Solutions to the quadratic equation Zeroes – x intercepts of the quadratic function e.g. Find the roots of x 2 ο€­ 1 ο€½ 0
The Quadratic Polynomial and the Parabola Quadratic polynomial – ax 2  bx  c Quadratic function – y ο€½ ax 2  bx  c Quadratic equation – ax 2  bx  c ο€½ 0 Coefficients – a, b, c Indeterminate – x Roots – Solutions to the quadratic equation Zeroes – x intercepts of the quadratic function e.g. Find the roots of x 2 ο€­ 1 ο€½ 0 x2 ο€­1 ο€½ 0 x2 ο€½ 1
The Quadratic Polynomial and the Parabola Quadratic polynomial – ax 2  bx  c Quadratic function – y ο€½ ax 2  bx  c Quadratic equation – ax 2  bx  c ο€½ 0 Coefficients – a, b, c Indeterminate – x Roots – Solutions to the quadratic equation Zeroes – x intercepts of the quadratic function e.g. Find the roots of x 2 ο€­ 1 ο€½ 0 x2 ο€­1 ο€½ 0 x2 ο€½ 1 x ο€½ ο‚±1
The Quadratic Polynomial and the Parabola Quadratic polynomial – ax 2  bx  c Quadratic function – y ο€½ ax 2  bx  c Quadratic equation – ax 2  bx  c ο€½ 0 Coefficients – a, b, c Indeterminate – x Roots – Solutions to the quadratic equation Zeroes – x intercepts of the quadratic function e.g. Find the roots of x 2 ο€­ 1 ο€½ 0 x2 ο€­1 ο€½ 0 x2 ο€½ 1 x ο€½ ο‚±1  the roots are x ο€½ ο€­1 and x ο€½ 1
Graphing Quadratics
Graphing Quadratics The graph of a quadratic function is a parabola.
Graphing Quadratics The graph of a quadratic function is a parabola. y ο€½ ax 2  bx  c
Graphing Quadratics The graph of a quadratic function is a parabola. y ο€½ ax 2  bx  c a
Graphing Quadratics The graph of a quadratic function is a parabola. y ο€½ ax 2  bx  c y a x
Graphing Quadratics The graph of a quadratic function is a parabola. y ο€½ ax 2  bx  c y a x aο€Ύ0
Graphing Quadratics The graph of a quadratic function is a parabola. y ο€½ ax 2  bx  c y a x aο€Ύ0 concave up
Graphing Quadratics The graph of a quadratic function is a parabola. y ο€½ ax 2  bx  c y y a x x aο€Ύ0 concave up
Graphing Quadratics The graph of a quadratic function is a parabola. y ο€½ ax 2  bx  c y y a x x aο€Ύ0 aο€Ό0 concave up
Graphing Quadratics The graph of a quadratic function is a parabola. y ο€½ ax 2  bx  c y y a x x aο€Ύ0 aο€Ό0 concave up concave down
Graphing Quadratics The graph of a quadratic function is a parabola. y ο€½ ax 2  bx  c y y a x x aο€Ύ0 aο€Ό0 concave up concave down c
Graphing Quadratics The graph of a quadratic function is a parabola. y ο€½ ax 2  bx  c y y a x x aο€Ύ0 aο€Ό0 concave up concave down c = y intercept
Graphing Quadratics The graph of a quadratic function is a parabola. y ο€½ ax 2  bx  c y y a x x aο€Ύ0 aο€Ό0 concave up concave down c = y intercept zeroes (roots)
Graphing Quadratics The graph of a quadratic function is a parabola. y ο€½ ax 2  bx  c y y a x x aο€Ύ0 aο€Ό0 concave up concave down c = y intercept zeroes (roots) = x intercepts
Graphing Quadratics The graph of a quadratic function is a parabola. y ο€½ ax 2  bx  c y y a x x aο€Ύ0 aο€Ό0 concave up concave down c = y intercept zeroes (roots) = x intercepts ο€­b xο€½ 2a
Graphing Quadratics The graph of a quadratic function is a parabola. y ο€½ ax 2  bx  c y y a x x aο€Ύ0 aο€Ό0 concave up concave down c = y intercept zeroes (roots) = x intercepts ο€­b xο€½ = axis of symmetry 2a
Graphing Quadratics The graph of a quadratic function is a parabola. y ο€½ ax 2  bx  c y y a x x aο€Ύ0 aο€Ό0 concave up concave down c = y intercept zeroes (roots) = x intercepts ο€­b xο€½ = axis of symmetry Note: AOS is the average of the zeroes 2a
Graphing Quadratics The graph of a quadratic function is a parabola. y ο€½ ax 2  bx  c y y a x x aο€Ύ0 aο€Ό0 concave up concave down c = y intercept zeroes (roots) = x intercepts ο€­b xο€½ = axis of symmetry Note: AOS is the average of the zeroes 2a vertex
Graphing Quadratics The graph of a quadratic function is a parabola. y ο€½ ax 2  bx  c y y a x x aο€Ύ0 aο€Ό0 concave up concave down c = y intercept zeroes (roots) = x intercepts ο€­b xο€½ = axis of symmetry Note: AOS is the average of the zeroes 2a vertex x value is the AOS
Graphing Quadratics The graph of a quadratic function is a parabola. y ο€½ ax 2  bx  c y y a x x aο€Ύ0 aο€Ό0 concave up concave down c = y intercept zeroes (roots) = x intercepts ο€­b xο€½ = axis of symmetry Note: AOS is the average of the zeroes 2a vertex x value is the AOS y value is found by substituting AOS into the function.
Graphing Quadratics The graph of a quadratic function is a parabola. y ο€½ ax 2  bx  c y y a x x aο€Ύ0 aο€Ό0 concave up concave down c = y intercept zeroes (roots) = x intercepts ο€­b xο€½ = axis of symmetry Note: AOS is the average of the zeroes 2a vertex x value is the AOS y value is found by substituting AOS into the function. (It is the maximum/minimum value of the function)
e.g. Graph y ο€½ x 2  8 x  12
e.g. Graph y ο€½ x 2  8 x  12 a=1>0 y x
e.g. Graph y ο€½ x 2  8 x  12 a = 1 > 0  concave up y x
e.g. Graph y ο€½ x 2  8 x  12 a = 1 > 0  concave up c = 12 y y ο€½ x 2  8 x  12 x
e.g. Graph y ο€½ x 2  8 x  12 a = 1 > 0  concave up c = 12  y intercept is  0,12  y x
e.g. Graph y ο€½ x 2  8 x  12 a = 1 > 0  concave up c = 12  y intercept is  0,12  y 12 x
e.g. Graph y ο€½ x 2  8 x  12 a = 1 > 0  concave up c = 12  y intercept is  0,12  zeroes y 12 x
e.g. Graph y ο€½ x 2  8 x  12 a = 1 > 0  concave up c = 12  y intercept is  0,12  zeroes x 2  8 x  12 ο€½ 0 y y ο€½ x 2  8 x  12 12 x
e.g. Graph y ο€½ x 2  8 x  12 a = 1 > 0  concave up c = 12  y intercept is  0,12  zeroes x 2  8 x  12 ο€½ 0 y y ο€½ x 2  8 x  12  x  6  x  2  ο€½ 0 12 x
e.g. Graph y ο€½ x 2  8 x  12 a = 1 > 0  concave up c = 12  y intercept is  0,12  zeroes x 2  8 x  12 ο€½ 0 y y ο€½ x 2  8 x  12  x  6  x  2  ο€½ 0 12 x ο€½ ο€­6 or x ο€½ ο€­2 x
e.g. Graph y ο€½ x 2  8 x  12 a = 1 > 0  concave up c = 12  y intercept is  0,12  zeroes x 2  8 x  12 ο€½ 0 y y ο€½ x 2  8 x  12  x  6  x  2  ο€½ 0 12 x ο€½ ο€­6 or x ο€½ ο€­2  x intercepts are  ο€­6,0  and  ο€­2,0  x
e.g. Graph y ο€½ x 2  8 x  12 a = 1 > 0  concave up c = 12  y intercept is  0,12  zeroes x 2  8 x  12 ο€½ 0 y y ο€½ x 2  8 x  12  x  6  x  2  ο€½ 0 12 x ο€½ ο€­6 or x ο€½ ο€­2  x intercepts are  ο€­6,0  and  ο€­2,0  –6 –2 x
e.g. Graph y ο€½ x 2  8 x  12 a = 1 > 0  concave up c = 12  y intercept is  0,12  zeroes x 2  8 x  12 ο€½ 0 y y ο€½ x 2  8 x  12  x  6  x  2  ο€½ 0 12 x ο€½ ο€­6 or x ο€½ ο€­2  x intercepts are  ο€­6,0  and  ο€­2,0  AOS –6 –2 x
e.g. Graph y ο€½ x 2  8 x  12 a = 1 > 0  concave up c = 12  y intercept is  0,12  zeroes x 2  8 x  12 ο€½ 0 y y ο€½ x 2  8 x  12  x  6  x  2  ο€½ 0 12 x ο€½ ο€­6 or x ο€½ ο€­2  x intercepts are  ο€­6,0  and  ο€­2,0  AOS x ο€½ ο€­b 2a –6 –2 x
e.g. Graph y ο€½ x 2  8 x  12 a = 1 > 0  concave up c = 12  y intercept is  0,12  zeroes x 2  8 x  12 ο€½ 0 y y ο€½ x 2  8 x  12  x  6  x  2  ο€½ 0 12 x ο€½ ο€­6 or x ο€½ ο€­2  x intercepts are  ο€­6,0  and  ο€­2,0  AOS x ο€½ ο€­b 2a ο€­8 ο€½ 2 –6 –2 x ο€½ ο€­4
e.g. Graph y ο€½ x 2  8 x  12 a = 1 > 0  concave up c = 12  y intercept is  0,12  zeroes x 2  8 x  12 ο€½ 0 y y ο€½ x 2  8 x  12  x  6  x  2  ο€½ 0 12 x ο€½ ο€­6 or x ο€½ ο€­2  x intercepts are  ο€­6,0  and  ο€­2,0  AOS x ο€½ ο€­b OR x ο€½ ο€­6 ο€­ 2 2a 2 ο€­8 ο€½ 2 –6 –2 x ο€½ ο€­4
e.g. Graph y ο€½ x 2  8 x  12 a = 1 > 0  concave up c = 12  y intercept is  0,12  zeroes x 2  8 x  12 ο€½ 0 y y ο€½ x 2  8 x  12  x  6  x  2  ο€½ 0 12 x ο€½ ο€­6 or x ο€½ ο€­2  x intercepts are  ο€­6,0  and  ο€­2,0  AOS x ο€½ ο€­b OR x ο€½ ο€­6 ο€­ 2 2a 2 ο€­8 ο€½ ο€­4 ο€½ 2 –6 –2 x ο€½ ο€­4
e.g. Graph y ο€½ x 2  8 x  12 a = 1 > 0  concave up c = 12  y intercept is  0,12  zeroes x 2  8 x  12 ο€½ 0 y y ο€½ x 2  8 x  12  x  6  x  2  ο€½ 0 12 x ο€½ ο€­6 or x ο€½ ο€­2  x intercepts are  ο€­6,0  and  ο€­2,0  AOS x ο€½ ο€­b OR x ο€½ ο€­6 ο€­ 2 2a 2 ο€­8 ο€½ ο€­4 ο€½ 2 –6 –2 x ο€½ ο€­4
e.g. Graph y ο€½ x 2  8 x  12 a = 1 > 0  concave up c = 12  y intercept is  0,12  zeroes x 2  8 x  12 ο€½ 0 y y ο€½ x 2  8 x  12  x  6  x  2  ο€½ 0 12 x ο€½ ο€­6 or x ο€½ ο€­2  x intercepts are  ο€­6,0  and  ο€­2,0  AOS x ο€½ ο€­b OR x ο€½ ο€­6 ο€­ 2 2a 2 ο€­8 ο€½ ο€­4 ο€½ 2 –6 –2 x ο€½ ο€­4 vertex
e.g. Graph y ο€½ x 2  8 x  12 a = 1 > 0  concave up c = 12  y intercept is  0,12  zeroes x 2  8 x  12 ο€½ 0 y y ο€½ x 2  8 x  12  x  6  x  2  ο€½ 0 12 x ο€½ ο€­6 or x ο€½ ο€­2  x intercepts are  ο€­6,0  and  ο€­2,0  AOS x ο€½ ο€­b OR x ο€½ ο€­6 ο€­ 2 2a 2 ο€­8 ο€½ ο€­4 ο€½ 2 –6 –2 x ο€½ ο€­4 y ο€½  ο€­4   8  ο€­4   12 2 vertex
e.g. Graph y ο€½ x 2  8 x  12 a = 1 > 0  concave up c = 12  y intercept is  0,12  zeroes x 2  8 x  12 ο€½ 0 y y ο€½ x 2  8 x  12  x  6  x  2  ο€½ 0 12 x ο€½ ο€­6 or x ο€½ ο€­2  x intercepts are  ο€­6,0  and  ο€­2,0  AOS x ο€½ ο€­b OR x ο€½ ο€­6 ο€­ 2 2a 2 ο€­8 ο€½ ο€­4 ο€½ 2 –6 –2 x ο€½ ο€­4 y ο€½  ο€­4   8  ο€­4   12 2 vertex ο€½ ο€­4
e.g. Graph y ο€½ x 2  8 x  12 a = 1 > 0  concave up c = 12  y intercept is  0,12  zeroes x 2  8 x  12 ο€½ 0 y y ο€½ x 2  8 x  12  x  6  x  2  ο€½ 0 12 x ο€½ ο€­6 or x ο€½ ο€­2  x intercepts are  ο€­6,0  and  ο€­2,0  AOS x ο€½ ο€­b OR x ο€½ ο€­6 ο€­ 2 2a 2 ο€­8 ο€½ ο€­4 ο€½ 2 –6 –2 x ο€½ ο€­4 y ο€½  ο€­4   8  ο€­4   12 2 vertex ο€½ ο€­4  vertex is  ο€­4, ο€­4 
e.g. Graph y ο€½ x 2  8 x  12 a = 1 > 0  concave up c = 12  y intercept is  0,12  zeroes x 2  8 x  12 ο€½ 0 y y ο€½ x 2  8 x  12  x  6  x  2  ο€½ 0 12 x ο€½ ο€­6 or x ο€½ ο€­2  x intercepts are  ο€­6,0  and  ο€­2,0  AOS x ο€½ ο€­b OR x ο€½ ο€­6 ο€­ 2 2a 2 ο€­8 ο€½ ο€­4 ο€½ 2 –6 –2 x ο€½ ο€­4 y ο€½  ο€­4   8  ο€­4   12 2 vertex (–4, –4) ο€½ ο€­4  vertex is  ο€­4, ο€­4 
e.g. Graph y ο€½ x 2  8 x  12 a = 1 > 0  concave up c = 12  y intercept is  0,12  zeroes x 2  8 x  12 ο€½ 0 y y ο€½ x 2  8 x  12  x  6  x  2  ο€½ 0 12 x ο€½ ο€­6 or x ο€½ ο€­2  x intercepts are  ο€­6,0  and  ο€­2,0  AOS x ο€½ ο€­b OR x ο€½ ο€­6 ο€­ 2 2a 2 ο€­8 ο€½ ο€­4 ο€½ 2 –6 –2 x ο€½ ο€­4 y ο€½  ο€­4   8  ο€­4   12 2 vertex (–4, –4) ο€½ ο€­4  vertex is  ο€­4, ο€­4 
(ii) Find the quadratic with; a) roots 3 and 6
(ii) Find the quadratic with; a) roots 3 and 6 y ο€½ a  x 2 ο€­ 9 x  18 
(ii) Find the quadratic with; a) roots 3 and 6 y ο€½ a  x 2 ο€­ 9 x  18  ο€­  6  3 6ο‚΄3
(ii) Find the quadratic with; a) roots 3 and 6 b) monic roots 3  2 and 3 ο€­ 2 y ο€½ a  x 2 ο€­ 9 x  18  ο€­  6  3 6ο‚΄3
(ii) Find the quadratic with; a) roots 3 and 6 b) monic roots 3  2 and 3 ο€­ 2 y ο€½ a  x 2 ο€­ 9 x  18  y ο€½ x2 ο€­ 6x  7 ο€­  6  3 6ο‚΄3 c) roots 2 and 8 and vertex (5,3) y ο€½ a  x 2 ο€­ 10 x  16   5,3 : 3 ο€½ a  52 ο€­ 10  5   16  3 ο€½ ο€­9a 1 aο€½ο€­ 3  y ο€½ ο€­  x ο€­ 10 x  16  1 2 3
(ii) Find the quadratic with; a) roots 3 and 6 b) monic roots 3  2 and 3 ο€­ 2 y ο€½ a  x 2 ο€­ 9 x  18  y ο€½ x2 ο€­ 6x  7 ο€­  6  3 6ο‚΄3  ο€­ 3 2 3ο€­ 2  3  2 3 ο€­ 2 
(ii) Find the quadratic with; a) roots 3 and 6 b) monic roots 3  2 and 3 ο€­ 2 y ο€½ a  x 2 ο€­ 9 x  18  y ο€½ x2 ο€­ 6x  7 ο€­  6  3 6ο‚΄3  ο€­ 3 2 3ο€­ 2  3  2 3 ο€­ 2  c) roots 2 and 8 and vertex (5,3)
(ii) Find the quadratic with; a) roots 3 and 6 b) monic roots 3  2 and 3 ο€­ 2 y ο€½ a  x 2 ο€­ 9 x  18  y ο€½ x2 ο€­ 6x  7 ο€­  6  3 6ο‚΄3  ο€­ 3 2 3ο€­ 2  3  2 3 ο€­ 2  c) roots 2 and 8 and vertex (5,3) y ο€½ a  x 2 ο€­ 10 x  16 
(ii) Find the quadratic with; a) roots 3 and 6 b) monic roots 3  2 and 3 ο€­ 2 y ο€½ a  x 2 ο€­ 9 x  18  y ο€½ x2 ο€­ 6x  7 ο€­  6  3 6ο‚΄3  ο€­ 3 2 3ο€­ 2  3  2 3 ο€­ 2  c) roots 2 and 8 and vertex (5,3) y ο€½ a  x 2 ο€­ 10 x  16   5,3 : 3 ο€½ a  52 ο€­ 10  5   16 
(ii) Find the quadratic with; a) roots 3 and 6 b) monic roots 3  2 and 3 ο€­ 2 y ο€½ a  x 2 ο€­ 9 x  18  y ο€½ x2 ο€­ 6x  7 ο€­  6  3 6ο‚΄3  ο€­ 3 2 3ο€­ 2  3  2 3 ο€­ 2  c) roots 2 and 8 and vertex (5,3) y ο€½ a  x 2 ο€­ 10 x  16   5,3 : 3 ο€½ a  52 ο€­ 10  5   16  3 ο€½ ο€­9a 1 aο€½ο€­ 3
(ii) Find the quadratic with; a) roots 3 and 6 b) monic roots 3  2 and 3 ο€­ 2 y ο€½ a  x 2 ο€­ 9 x  18  y ο€½ x2 ο€­ 6x  7 ο€­  6  3 6ο‚΄3  ο€­ 3 2 3ο€­ 2  3  2 3 ο€­ 2  c) roots 2 and 8 and vertex (5,3) y ο€½ a  x 2 ο€­ 10 x  16   5,3 : 3 ο€½ a  52 ο€­ 10  5   16  3 ο€½ ο€­9a 1 aο€½ο€­ 3  y ο€½ ο€­  x ο€­ 10 x  16  1 2 3
(iii) Solve; a) x 2  5 x  6 ο€Ύ 0
(iii) Solve; a) x 2  5 x  6 ο€Ύ 0  x  2  x  3 ο€Ύ 0
(iii) Solve; a) x 2  5 x  6 ο€Ύ 0 y  x  2  x  3 ο€Ύ 0 –3 –2 x
(iii) Solve; a) x 2  5 x  6 ο€Ύ 0 y  x  2  x  3 ο€Ύ 0 –3 –2 x
(iii) Solve; a) x 2  5 x  6 ο€Ύ 0 y  x  2  x  3 ο€Ύ 0 –3 –2 x Q: for what values of x is the parabola above the x axis?
(iii) Solve; a) x 2  5 x  6 ο€Ύ 0 y  x  2  x  3 ο€Ύ 0 –3 –2 x Q: for what values of x is the parabola above the x axis?
(iii) Solve; a) x 2  5 x  6 ο€Ύ 0 y  x  2  x  3 ο€Ύ 0 x ο€Ό ο€­3 or x ο€Ύ ο€­2 –3 –2 x Q: for what values of x is the parabola above the x axis?
(iii) Solve; a) x 2  5 x  6 ο€Ύ 0 y  x  2  x  3 ο€Ύ 0 x ο€Ό ο€­3 or x ο€Ύ ο€­2 –3 –2 x Q: for what values of x is the parabola above the x axis? b) ο€­ x 2 ο€­ 3 x ο‚³ ο€­4
(iii) Solve; a) x 2  5 x  6 ο€Ύ 0 y  x  2  x  3 ο€Ύ 0 x ο€Ό ο€­3 or x ο€Ύ ο€­2 –3 –2 x Q: for what values of x is the parabola above the x axis? b) ο€­ x 2 ο€­ 3 x ο‚³ ο€­4 x 2  3x ο€­ 4 ο‚£ 0
(iii) Solve; a) x 2  5 x  6 ο€Ύ 0 y  x  2  x  3 ο€Ύ 0 x ο€Ό ο€­3 or x ο€Ύ ο€­2 –3 –2 x Q: for what values of x is the parabola above the x axis? b) ο€­ x 2 ο€­ 3 x ο‚³ ο€­4 x 2  3x ο€­ 4 ο‚£ 0  x  4  x ο€­ 1 ο‚£ 0
(iii) Solve; a) x 2  5 x  6 ο€Ύ 0 y  x  2  x  3 ο€Ύ 0 x ο€Ό ο€­3 or x ο€Ύ ο€­2 –3 –2 x Q: for what values of x is the parabola above the x axis? b) ο€­ x 2 ο€­ 3 x ο‚³ ο€­4 y x 2  3x ο€­ 4 ο‚£ 0  x  4  x ο€­ 1 ο‚£ 0 –4 1 x
(iii) Solve; a) x 2  5 x  6 ο€Ύ 0 y  x  2  x  3 ο€Ύ 0 x ο€Ό ο€­3 or x ο€Ύ ο€­2 –3 –2 x Q: for what values of x is the parabola above the x axis? b) ο€­ x 2 ο€­ 3 x ο‚³ ο€­4 y x 2  3x ο€­ 4 ο‚£ 0  x  4  x ο€­ 1 ο‚£ 0 –4 1 x
(iii) Solve; a) x 2  5 x  6 ο€Ύ 0 y  x  2  x  3 ο€Ύ 0 x ο€Ό ο€­3 or x ο€Ύ ο€­2 –3 –2 x Q: for what values of x is the parabola above the x axis? b) ο€­ x 2 ο€­ 3 x ο‚³ ο€­4 y x 2  3x ο€­ 4 ο‚£ 0  x  4  x ο€­ 1 ο‚£ 0 –4 1 x Q: for what values of x is the parabola below the x axis?
(iii) Solve; a) x 2  5 x  6 ο€Ύ 0 y  x  2  x  3 ο€Ύ 0 x ο€Ό ο€­3 or x ο€Ύ ο€­2 –3 –2 x Q: for what values of x is the parabola above the x axis? b) ο€­ x 2 ο€­ 3 x ο‚³ ο€­4 y x 2  3x ο€­ 4 ο‚£ 0  x  4  x ο€­ 1 ο‚£ 0 –4 1 x Q: for what values of x is the parabola below the x axis?
(iii) Solve; a) x 2  5 x  6 ο€Ύ 0 y  x  2  x  3 ο€Ύ 0 x ο€Ό ο€­3 or x ο€Ύ ο€­2 –3 –2 x Q: for what values of x is the parabola above the x axis? b) ο€­ x 2 ο€­ 3 x ο‚³ ο€­4 y x 2  3x ο€­ 4 ο‚£ 0  x  4  x ο€­ 1 ο‚£ 0 ο€­4 ο‚£ x ο‚£ 1 –4 1 x Q: for what values of x is the parabola below the x axis?
Exercise 8A; 1adf, 2adf, 3bd, 4bd, 5c, 6ade, 7d, 9ace, 12c, 13b, 14a

Recommended

Form 5 formulae and note
Form 5 formulae and noteForm 5 formulae and note
Form 5 formulae and notesmktsj2
Β 
Lesson 15: Inverse Trigonometric Functions
Lesson 15: Inverse Trigonometric FunctionsLesson 15: Inverse Trigonometric Functions
Lesson 15: Inverse Trigonometric FunctionsMatthew Leingang
Β 
Lesson03 The Concept Of Limit 027 Slides
Lesson03 The Concept Of Limit 027 SlidesLesson03 The Concept Of Limit 027 Slides
Lesson03 The Concept Of Limit 027 SlidesMatthew Leingang
Β 
X2 T04 01 curve sketching - basic features/ calculus
X2 T04 01 curve sketching - basic features/ calculusX2 T04 01 curve sketching - basic features/ calculus
X2 T04 01 curve sketching - basic features/ calculusNigel Simmons
Β 
Spm Add Maths Formula List Form4
Spm Add Maths Formula List Form4Spm Add Maths Formula List Form4
Spm Add Maths Formula List Form4guest76f49d
Β 
Inverse trigonometric functions
Inverse trigonometric functionsInverse trigonometric functions
Inverse trigonometric functionsLeo Crisologo
Β 
A type system for the vectorial aspects of the linear-algebraic lambda-calculus
A type system for the vectorial aspects of the linear-algebraic lambda-calculusA type system for the vectorial aspects of the linear-algebraic lambda-calculus
A type system for the vectorial aspects of the linear-algebraic lambda-calculusAlejandro DΓ­az-Caro
Β 
1533 game mathematics
1533 game mathematics1533 game mathematics
1533 game mathematicsDr Fereidoun Dejahang
Β 

Recommended

Form 5 formulae and note
Form 5 formulae and noteForm 5 formulae and note
Form 5 formulae and notesmktsj2
Β 
Lesson 15: Inverse Trigonometric Functions
Lesson 15: Inverse Trigonometric FunctionsLesson 15: Inverse Trigonometric Functions
Lesson 15: Inverse Trigonometric FunctionsMatthew Leingang
Β 
Lesson03 The Concept Of Limit 027 Slides
Lesson03 The Concept Of Limit 027 SlidesLesson03 The Concept Of Limit 027 Slides
Lesson03 The Concept Of Limit 027 SlidesMatthew Leingang
Β 
X2 T04 01 curve sketching - basic features/ calculus
X2 T04 01 curve sketching - basic features/ calculusX2 T04 01 curve sketching - basic features/ calculus
X2 T04 01 curve sketching - basic features/ calculusNigel Simmons
Β 
Spm Add Maths Formula List Form4
Spm Add Maths Formula List Form4Spm Add Maths Formula List Form4
Spm Add Maths Formula List Form4guest76f49d
Β 
Inverse trigonometric functions
Inverse trigonometric functionsInverse trigonometric functions
Inverse trigonometric functionsLeo Crisologo
Β 
A type system for the vectorial aspects of the linear-algebraic lambda-calculus
A type system for the vectorial aspects of the linear-algebraic lambda-calculusA type system for the vectorial aspects of the linear-algebraic lambda-calculus
A type system for the vectorial aspects of the linear-algebraic lambda-calculusAlejandro DΓ­az-Caro
Β 
1533 game mathematics
1533 game mathematics1533 game mathematics
1533 game mathematicsDr Fereidoun Dejahang
Β 
004 parabola
004 parabola004 parabola
004 parabolaphysics101
Β 
Injective hulls of simple modules over Noetherian rings
Injective hulls of simple modules over Noetherian ringsInjective hulls of simple modules over Noetherian rings
Injective hulls of simple modules over Noetherian ringsMatematica Portuguesa
Β 
11X1 T05 03 equation of lines (2010)
11X1 T05 03 equation of lines (2010)11X1 T05 03 equation of lines (2010)
11X1 T05 03 equation of lines (2010)Nigel Simmons
Β 
The Lambda Calculus and The JavaScript
The Lambda Calculus and The JavaScriptThe Lambda Calculus and The JavaScript
The Lambda Calculus and The JavaScriptNorman Richards
Β 
125 7.3 and 7.5
125 7.3 and 7.5125 7.3 and 7.5
125 7.3 and 7.5Jeneva Clark
Β 
cswiercz-general-presentation
cswiercz-general-presentationcswiercz-general-presentation
cswiercz-general-presentationChris Swierczewski
Β 
Call-by-value non-determinism in a linear logic type discipline
Call-by-value non-determinism in a linear logic type disciplineCall-by-value non-determinism in a linear logic type discipline
Call-by-value non-determinism in a linear logic type disciplineAlejandro DΓ­az-Caro
Β 
16 partial derivatives
16 partial derivatives16 partial derivatives
16 partial derivativesmath267
Β 
Linear law
Linear lawLinear law
Linear lawsabariahosman
Β 
Lista exercintegrais
Lista exercintegraisLista exercintegrais
Lista exercintegraisUniversidade de SΓ£o Paulo USP
Β 
Mcgill3
Mcgill3Mcgill3
Mcgill3Arthur Charpentier
Β 
Figures
FiguresFigures
FiguresDrradz Maths
Β 
11X1 T11 02 parabola as a locus (2011)
11X1 T11 02 parabola as a locus (2011)11X1 T11 02 parabola as a locus (2011)
11X1 T11 02 parabola as a locus (2011)Nigel Simmons
Β 
11 x1 t11 09 locus problems (2013)
11 x1 t11 09 locus problems (2013)11 x1 t11 09 locus problems (2013)
11 x1 t11 09 locus problems (2013)Nigel Simmons
Β 
11X1 T10 04 maximum & minimum problems (2011)
11X1 T10 04 maximum & minimum problems (2011)11X1 T10 04 maximum & minimum problems (2011)
11X1 T10 04 maximum & minimum problems (2011)Nigel Simmons
Β 
11 x1 t11 01 locus (2013)
11 x1 t11 01 locus (2013)11 x1 t11 01 locus (2013)
11 x1 t11 01 locus (2013)Nigel Simmons
Β 
11X1 T11 05 the discriminant (2011)
11X1 T11 05 the discriminant (2011)11X1 T11 05 the discriminant (2011)
11X1 T11 05 the discriminant (2011)Nigel Simmons
Β 
11 x1 t13 06 tangent theorems 2 (2012)
11 x1 t13 06 tangent theorems 2 (2012)11 x1 t13 06 tangent theorems 2 (2012)
11 x1 t13 06 tangent theorems 2 (2012)Nigel Simmons
Β 
11 x1 t13 07 products of intercepts (2012)
11 x1 t13 07 products of intercepts (2012)11 x1 t13 07 products of intercepts (2012)
11 x1 t13 07 products of intercepts (2012)Nigel Simmons
Β 
Goodbye slideshare UPDATE
Goodbye slideshare UPDATEGoodbye slideshare UPDATE
Goodbye slideshare UPDATENigel Simmons
Β 
11 x1 t10 01 graphing quadratics (2013)
11 x1 t10 01 graphing quadratics (2013)11 x1 t10 01 graphing quadratics (2013)
11 x1 t10 01 graphing quadratics (2013)Nigel Simmons
Β 
Graphing Quadratic Functions.pptx
Graphing Quadratic Functions.pptxGraphing Quadratic Functions.pptx
Graphing Quadratic Functions.pptxMaeAnn84
Β 

More Related Content

What's hot

004 parabola
004 parabola004 parabola
004 parabolaphysics101
Β 
Injective hulls of simple modules over Noetherian rings
Injective hulls of simple modules over Noetherian ringsInjective hulls of simple modules over Noetherian rings
Injective hulls of simple modules over Noetherian ringsMatematica Portuguesa
Β 
11X1 T05 03 equation of lines (2010)
11X1 T05 03 equation of lines (2010)11X1 T05 03 equation of lines (2010)
11X1 T05 03 equation of lines (2010)Nigel Simmons
Β 
The Lambda Calculus and The JavaScript
The Lambda Calculus and The JavaScriptThe Lambda Calculus and The JavaScript
The Lambda Calculus and The JavaScriptNorman Richards
Β 
125 7.3 and 7.5
125 7.3 and 7.5125 7.3 and 7.5
125 7.3 and 7.5Jeneva Clark
Β 
cswiercz-general-presentation
cswiercz-general-presentationcswiercz-general-presentation
cswiercz-general-presentationChris Swierczewski
Β 
Call-by-value non-determinism in a linear logic type discipline
Call-by-value non-determinism in a linear logic type disciplineCall-by-value non-determinism in a linear logic type discipline
Call-by-value non-determinism in a linear logic type disciplineAlejandro DΓ­az-Caro
Β 
16 partial derivatives
16 partial derivatives16 partial derivatives
16 partial derivativesmath267
Β 

What's hot (12)

004 parabola
004 parabola004 parabola
004 parabola
Β 
Injective hulls of simple modules over Noetherian rings
Injective hulls of simple modules over Noetherian ringsInjective hulls of simple modules over Noetherian rings
Injective hulls of simple modules over Noetherian rings
Β 
11X1 T05 03 equation of lines (2010)
11X1 T05 03 equation of lines (2010)11X1 T05 03 equation of lines (2010)
11X1 T05 03 equation of lines (2010)
Β 
The Lambda Calculus and The JavaScript
The Lambda Calculus and The JavaScriptThe Lambda Calculus and The JavaScript
The Lambda Calculus and The JavaScript
Β 
125 7.3 and 7.5
125 7.3 and 7.5125 7.3 and 7.5
125 7.3 and 7.5
Β 
cswiercz-general-presentation
cswiercz-general-presentationcswiercz-general-presentation
cswiercz-general-presentation
Β 
Call-by-value non-determinism in a linear logic type discipline
Call-by-value non-determinism in a linear logic type disciplineCall-by-value non-determinism in a linear logic type discipline
Call-by-value non-determinism in a linear logic type discipline
Β 
16 partial derivatives
16 partial derivatives16 partial derivatives
16 partial derivatives
Β 
Linear law
Linear lawLinear law
Linear law
Β 
Lista exercintegrais
Lista exercintegraisLista exercintegrais
Lista exercintegrais
Β 
Mcgill3
Mcgill3Mcgill3
Mcgill3
Β 
Figures
FiguresFigures
Figures
Β 

Viewers also liked

11X1 T11 02 parabola as a locus (2011)
11X1 T11 02 parabola as a locus (2011)11X1 T11 02 parabola as a locus (2011)
11X1 T11 02 parabola as a locus (2011)Nigel Simmons
Β 
11 x1 t11 09 locus problems (2013)
11 x1 t11 09 locus problems (2013)11 x1 t11 09 locus problems (2013)
11 x1 t11 09 locus problems (2013)Nigel Simmons
Β 
11X1 T10 04 maximum & minimum problems (2011)
11X1 T10 04 maximum & minimum problems (2011)11X1 T10 04 maximum & minimum problems (2011)
11X1 T10 04 maximum & minimum problems (2011)Nigel Simmons
Β 
11 x1 t11 01 locus (2013)
11 x1 t11 01 locus (2013)11 x1 t11 01 locus (2013)
11 x1 t11 01 locus (2013)Nigel Simmons
Β 
11X1 T11 05 the discriminant (2011)
11X1 T11 05 the discriminant (2011)11X1 T11 05 the discriminant (2011)
11X1 T11 05 the discriminant (2011)Nigel Simmons
Β 
11 x1 t13 06 tangent theorems 2 (2012)
11 x1 t13 06 tangent theorems 2 (2012)11 x1 t13 06 tangent theorems 2 (2012)
11 x1 t13 06 tangent theorems 2 (2012)Nigel Simmons
Β 
11 x1 t13 07 products of intercepts (2012)
11 x1 t13 07 products of intercepts (2012)11 x1 t13 07 products of intercepts (2012)
11 x1 t13 07 products of intercepts (2012)Nigel Simmons
Β 
Goodbye slideshare UPDATE
Goodbye slideshare UPDATEGoodbye slideshare UPDATE
Goodbye slideshare UPDATENigel Simmons
Β 

Viewers also liked (8)

11X1 T11 02 parabola as a locus (2011)
11X1 T11 02 parabola as a locus (2011)11X1 T11 02 parabola as a locus (2011)
11X1 T11 02 parabola as a locus (2011)
Β 
11 x1 t11 09 locus problems (2013)
11 x1 t11 09 locus problems (2013)11 x1 t11 09 locus problems (2013)
11 x1 t11 09 locus problems (2013)
Β 
11X1 T10 04 maximum & minimum problems (2011)
11X1 T10 04 maximum & minimum problems (2011)11X1 T10 04 maximum & minimum problems (2011)
11X1 T10 04 maximum & minimum problems (2011)
Β 
11 x1 t11 01 locus (2013)
11 x1 t11 01 locus (2013)11 x1 t11 01 locus (2013)
11 x1 t11 01 locus (2013)
Β 
11X1 T11 05 the discriminant (2011)
11X1 T11 05 the discriminant (2011)11X1 T11 05 the discriminant (2011)
11X1 T11 05 the discriminant (2011)
Β 
11 x1 t13 06 tangent theorems 2 (2012)
11 x1 t13 06 tangent theorems 2 (2012)11 x1 t13 06 tangent theorems 2 (2012)
11 x1 t13 06 tangent theorems 2 (2012)
Β 
11 x1 t13 07 products of intercepts (2012)
11 x1 t13 07 products of intercepts (2012)11 x1 t13 07 products of intercepts (2012)
11 x1 t13 07 products of intercepts (2012)
Β 
Goodbye slideshare UPDATE
Goodbye slideshare UPDATEGoodbye slideshare UPDATE
Goodbye slideshare UPDATE
Β 

Similar to 11X1 t10 01 graphing quadratics (2011)

11 x1 t10 01 graphing quadratics (2013)
11 x1 t10 01 graphing quadratics (2013)11 x1 t10 01 graphing quadratics (2013)
11 x1 t10 01 graphing quadratics (2013)Nigel Simmons
Β 
Graphing Quadratic Functions.pptx
Graphing Quadratic Functions.pptxGraphing Quadratic Functions.pptx
Graphing Quadratic Functions.pptxMaeAnn84
Β 
Graphquadraticfcns2
Graphquadraticfcns2Graphquadraticfcns2
Graphquadraticfcns2loptruonga2
Β 
Graphing quadratic equations
Graphing quadratic equationsGraphing quadratic equations
Graphing quadratic equationsswartzje
Β 
4.2 stem parabolas revisited
4.2 stem parabolas revisited4.2 stem parabolas revisited
4.2 stem parabolas revisitedmath123c
Β 
11 x1 t05 03 equation of lines (2012)
11 x1 t05 03 equation of lines (2012)11 x1 t05 03 equation of lines (2012)
11 x1 t05 03 equation of lines (2012)Nigel Simmons
Β 
11 x1 t05 03 equation of lines (2013)
11 x1 t05 03 equation of lines (2013)11 x1 t05 03 equation of lines (2013)
11 x1 t05 03 equation of lines (2013)Nigel Simmons
Β 
11X1 T05 03 equation of lines (2011)
11X1 T05 03 equation of lines (2011)11X1 T05 03 equation of lines (2011)
11X1 T05 03 equation of lines (2011)Nigel Simmons
Β 
Quadratic function
Quadratic functionQuadratic function
Quadratic functionvickytg123
Β 
Graphing Quadratic Functions in Standard Form
Graphing Quadratic Functions in Standard FormGraphing Quadratic Functions in Standard Form
Graphing Quadratic Functions in Standard Formcmorgancavo
Β 
Graphing quadratics
Graphing quadraticsGraphing quadratics
Graphing quadraticslothomas
Β 
Graphing Quadratics
Graphing QuadraticsGraphing Quadratics
Graphing Quadraticsswartzje
Β 
Anderson M conics
Anderson M conicsAnderson M conics
Anderson M conicsMrJames Kcc
Β 
sol page 104 #1,2,3.
sol page 104 #1,2,3.sol page 104 #1,2,3.
sol page 104 #1,2,3.Garden City
Β 
11 X1 T02 07 sketching graphs (2010)
11 X1 T02 07 sketching graphs (2010)11 X1 T02 07 sketching graphs (2010)
11 X1 T02 07 sketching graphs (2010)Nigel Simmons
Β 
11 x1 t02 07 sketching graphs (2012)
11 x1 t02 07 sketching graphs (2012)11 x1 t02 07 sketching graphs (2012)
11 x1 t02 07 sketching graphs (2012)Nigel Simmons
Β 

Similar to 11X1 t10 01 graphing quadratics (2011) (20)

11 x1 t10 01 graphing quadratics (2013)
11 x1 t10 01 graphing quadratics (2013)11 x1 t10 01 graphing quadratics (2013)
11 x1 t10 01 graphing quadratics (2013)
Β 
Graphing Quadratic Functions.pptx
Graphing Quadratic Functions.pptxGraphing Quadratic Functions.pptx
Graphing Quadratic Functions.pptx
Β 
Graphquadraticfcns2
Graphquadraticfcns2Graphquadraticfcns2
Graphquadraticfcns2
Β 
Graphing quadratic equations
Graphing quadratic equationsGraphing quadratic equations
Graphing quadratic equations
Β 
Math 10.1
Math 10.1Math 10.1
Math 10.1
Β 
Math 10.1
Math 10.1Math 10.1
Math 10.1
Β 
4.2 stem parabolas revisited
4.2 stem parabolas revisited4.2 stem parabolas revisited
4.2 stem parabolas revisited
Β 
11 x1 t05 03 equation of lines (2012)
11 x1 t05 03 equation of lines (2012)11 x1 t05 03 equation of lines (2012)
11 x1 t05 03 equation of lines (2012)
Β 
11 x1 t05 03 equation of lines (2013)
11 x1 t05 03 equation of lines (2013)11 x1 t05 03 equation of lines (2013)
11 x1 t05 03 equation of lines (2013)
Β 
11X1 T05 03 equation of lines (2011)
11X1 T05 03 equation of lines (2011)11X1 T05 03 equation of lines (2011)
11X1 T05 03 equation of lines (2011)
Β 
Quadratic function
Quadratic functionQuadratic function
Quadratic function
Β 
Graphing Quadratic Functions in Standard Form
Graphing Quadratic Functions in Standard FormGraphing Quadratic Functions in Standard Form
Graphing Quadratic Functions in Standard Form
Β 
Functions
FunctionsFunctions
Functions
Β 
Graphing quadratics
Graphing quadraticsGraphing quadratics
Graphing quadratics
Β 
Quadratic functions
Quadratic functionsQuadratic functions
Quadratic functions
Β 
Graphing Quadratics
Graphing QuadraticsGraphing Quadratics
Graphing Quadratics
Β 
Anderson M conics
Anderson M conicsAnderson M conics
Anderson M conics
Β 
sol page 104 #1,2,3.
sol page 104 #1,2,3.sol page 104 #1,2,3.
sol page 104 #1,2,3.
Β 
11 X1 T02 07 sketching graphs (2010)
11 X1 T02 07 sketching graphs (2010)11 X1 T02 07 sketching graphs (2010)
11 X1 T02 07 sketching graphs (2010)
Β 
11 x1 t02 07 sketching graphs (2012)
11 x1 t02 07 sketching graphs (2012)11 x1 t02 07 sketching graphs (2012)
11 x1 t02 07 sketching graphs (2012)
Β 

More from Nigel Simmons

Goodbye slideshare
Goodbye slideshareGoodbye slideshare
Goodbye slideshareNigel Simmons
Β 
12 x1 t02 02 integrating exponentials (2014)
12 x1 t02 02 integrating exponentials (2014)12 x1 t02 02 integrating exponentials (2014)
12 x1 t02 02 integrating exponentials (2014)Nigel Simmons
Β 
11 x1 t01 03 factorising (2014)
11 x1 t01 03 factorising (2014)11 x1 t01 03 factorising (2014)
11 x1 t01 03 factorising (2014)Nigel Simmons
Β 
11 x1 t01 02 binomial products (2014)
11 x1 t01 02 binomial products (2014)11 x1 t01 02 binomial products (2014)
11 x1 t01 02 binomial products (2014)Nigel Simmons
Β 
12 x1 t02 01 differentiating exponentials (2014)
12 x1 t02 01 differentiating exponentials (2014)12 x1 t02 01 differentiating exponentials (2014)
12 x1 t02 01 differentiating exponentials (2014)Nigel Simmons
Β 
11 x1 t01 01 algebra & indices (2014)
11 x1 t01 01 algebra & indices (2014)11 x1 t01 01 algebra & indices (2014)
11 x1 t01 01 algebra & indices (2014)Nigel Simmons
Β 
12 x1 t01 03 integrating derivative on function (2013)
12 x1 t01 03 integrating derivative on function (2013)12 x1 t01 03 integrating derivative on function (2013)
12 x1 t01 03 integrating derivative on function (2013)Nigel Simmons
Β 
12 x1 t01 02 differentiating logs (2013)
12 x1 t01 02 differentiating logs (2013)12 x1 t01 02 differentiating logs (2013)
12 x1 t01 02 differentiating logs (2013)Nigel Simmons
Β 
12 x1 t01 01 log laws (2013)
12 x1 t01 01 log laws (2013)12 x1 t01 01 log laws (2013)
12 x1 t01 01 log laws (2013)Nigel Simmons
Β 
X2 t02 04 forming polynomials (2013)
X2 t02 04 forming polynomials (2013)X2 t02 04 forming polynomials (2013)
X2 t02 04 forming polynomials (2013)Nigel Simmons
Β 
X2 t02 03 roots & coefficients (2013)
X2 t02 03 roots & coefficients (2013)X2 t02 03 roots & coefficients (2013)
X2 t02 03 roots & coefficients (2013)Nigel Simmons
Β 
X2 t02 02 multiple roots (2013)
X2 t02 02 multiple roots (2013)X2 t02 02 multiple roots (2013)
X2 t02 02 multiple roots (2013)Nigel Simmons
Β 
X2 t02 01 factorising complex expressions (2013)
X2 t02 01 factorising complex expressions (2013)X2 t02 01 factorising complex expressions (2013)
X2 t02 01 factorising complex expressions (2013)Nigel Simmons
Β 
11 x1 t16 07 approximations (2013)
11 x1 t16 07 approximations (2013)11 x1 t16 07 approximations (2013)
11 x1 t16 07 approximations (2013)Nigel Simmons
Β 
11 x1 t16 06 derivative times function (2013)
11 x1 t16 06 derivative times function (2013)11 x1 t16 06 derivative times function (2013)
11 x1 t16 06 derivative times function (2013)Nigel Simmons
Β 
11 x1 t16 05 volumes (2013)
11 x1 t16 05 volumes (2013)11 x1 t16 05 volumes (2013)
11 x1 t16 05 volumes (2013)Nigel Simmons
Β 
11 x1 t16 04 areas (2013)
11 x1 t16 04 areas (2013)11 x1 t16 04 areas (2013)
11 x1 t16 04 areas (2013)Nigel Simmons
Β 
11 x1 t16 03 indefinite integral (2013)
11 x1 t16 03 indefinite integral (2013)11 x1 t16 03 indefinite integral (2013)
11 x1 t16 03 indefinite integral (2013)Nigel Simmons
Β 
11 x1 t16 02 definite integral (2013)
11 x1 t16 02 definite integral (2013)11 x1 t16 02 definite integral (2013)
11 x1 t16 02 definite integral (2013)Nigel Simmons
Β 
11 x1 t16 01 area under curve (2013)
11 x1 t16 01 area under curve (2013)11 x1 t16 01 area under curve (2013)
11 x1 t16 01 area under curve (2013)Nigel Simmons
Β 

More from Nigel Simmons (20)

Goodbye slideshare
Goodbye slideshareGoodbye slideshare
Goodbye slideshare
Β 
12 x1 t02 02 integrating exponentials (2014)
12 x1 t02 02 integrating exponentials (2014)12 x1 t02 02 integrating exponentials (2014)
12 x1 t02 02 integrating exponentials (2014)
Β 
11 x1 t01 03 factorising (2014)
11 x1 t01 03 factorising (2014)11 x1 t01 03 factorising (2014)
11 x1 t01 03 factorising (2014)
Β 
11 x1 t01 02 binomial products (2014)
11 x1 t01 02 binomial products (2014)11 x1 t01 02 binomial products (2014)
11 x1 t01 02 binomial products (2014)
Β 
12 x1 t02 01 differentiating exponentials (2014)
12 x1 t02 01 differentiating exponentials (2014)12 x1 t02 01 differentiating exponentials (2014)
12 x1 t02 01 differentiating exponentials (2014)
Β 
11 x1 t01 01 algebra & indices (2014)
11 x1 t01 01 algebra & indices (2014)11 x1 t01 01 algebra & indices (2014)
11 x1 t01 01 algebra & indices (2014)
Β 
12 x1 t01 03 integrating derivative on function (2013)
12 x1 t01 03 integrating derivative on function (2013)12 x1 t01 03 integrating derivative on function (2013)
12 x1 t01 03 integrating derivative on function (2013)
Β 
12 x1 t01 02 differentiating logs (2013)
12 x1 t01 02 differentiating logs (2013)12 x1 t01 02 differentiating logs (2013)
12 x1 t01 02 differentiating logs (2013)
Β 
12 x1 t01 01 log laws (2013)
12 x1 t01 01 log laws (2013)12 x1 t01 01 log laws (2013)
12 x1 t01 01 log laws (2013)
Β 
X2 t02 04 forming polynomials (2013)
X2 t02 04 forming polynomials (2013)X2 t02 04 forming polynomials (2013)
X2 t02 04 forming polynomials (2013)
Β 
X2 t02 03 roots & coefficients (2013)
X2 t02 03 roots & coefficients (2013)X2 t02 03 roots & coefficients (2013)
X2 t02 03 roots & coefficients (2013)
Β 
X2 t02 02 multiple roots (2013)
X2 t02 02 multiple roots (2013)X2 t02 02 multiple roots (2013)
X2 t02 02 multiple roots (2013)
Β 
X2 t02 01 factorising complex expressions (2013)
X2 t02 01 factorising complex expressions (2013)X2 t02 01 factorising complex expressions (2013)
X2 t02 01 factorising complex expressions (2013)
Β 
11 x1 t16 07 approximations (2013)
11 x1 t16 07 approximations (2013)11 x1 t16 07 approximations (2013)
11 x1 t16 07 approximations (2013)
Β 
11 x1 t16 06 derivative times function (2013)
11 x1 t16 06 derivative times function (2013)11 x1 t16 06 derivative times function (2013)
11 x1 t16 06 derivative times function (2013)
Β 
11 x1 t16 05 volumes (2013)
11 x1 t16 05 volumes (2013)11 x1 t16 05 volumes (2013)
11 x1 t16 05 volumes (2013)
Β 
11 x1 t16 04 areas (2013)
11 x1 t16 04 areas (2013)11 x1 t16 04 areas (2013)
11 x1 t16 04 areas (2013)
Β 
11 x1 t16 03 indefinite integral (2013)
11 x1 t16 03 indefinite integral (2013)11 x1 t16 03 indefinite integral (2013)
11 x1 t16 03 indefinite integral (2013)
Β 
11 x1 t16 02 definite integral (2013)
11 x1 t16 02 definite integral (2013)11 x1 t16 02 definite integral (2013)
11 x1 t16 02 definite integral (2013)
Β 
11 x1 t16 01 area under curve (2013)
11 x1 t16 01 area under curve (2013)11 x1 t16 01 area under curve (2013)
11 x1 t16 01 area under curve (2013)
Β 

Recently uploaded

Keynote by Prof. Wurzer at Nordex about IP-design
Keynote by Prof. Wurzer at Nordex about IP-designKeynote by Prof. Wurzer at Nordex about IP-design
Keynote by Prof. Wurzer at Nordex about IP-designMIPLM
Β 
Judging the Relevance and worth of ideas part 2.pptx
Judging the Relevance and worth of ideas part 2.pptxJudging the Relevance and worth of ideas part 2.pptx
Judging the Relevance and worth of ideas part 2.pptxSherlyMaeNeri
Β 
Like-prefer-love -hate+verb+ing & silent letters & citizenship text.pdf
Like-prefer-love -hate+verb+ing & silent letters & citizenship text.pdfLike-prefer-love -hate+verb+ing & silent letters & citizenship text.pdf
Like-prefer-love -hate+verb+ing & silent letters & citizenship text.pdfMr Bounab Samir
Β 
Influencing policy (training slides from Fast Track Impact)
Influencing policy (training slides from Fast Track Impact)Influencing policy (training slides from Fast Track Impact)
Influencing policy (training slides from Fast Track Impact)Mark Reed
Β 
ENGLISH 7_Q4_LESSON 2_ Employing a Variety of Strategies for Effective Interp...
ENGLISH 7_Q4_LESSON 2_ Employing a Variety of Strategies for Effective Interp...ENGLISH 7_Q4_LESSON 2_ Employing a Variety of Strategies for Effective Interp...
ENGLISH 7_Q4_LESSON 2_ Employing a Variety of Strategies for Effective Interp...JhezDiaz1
Β 
Introduction to ArtificiaI Intelligence in Higher Education
Introduction to ArtificiaI Intelligence in Higher EducationIntroduction to ArtificiaI Intelligence in Higher Education
Introduction to ArtificiaI Intelligence in Higher Educationpboyjonauth
Β 
Hierarchy of management that covers different levels of management
Hierarchy of management that covers different levels of managementHierarchy of management that covers different levels of management
Hierarchy of management that covers different levels of managementmkooblal
Β 
ACC 2024 Chronicles. Cardiology. Exam.pdf
ACC 2024 Chronicles. Cardiology. Exam.pdfACC 2024 Chronicles. Cardiology. Exam.pdf
ACC 2024 Chronicles. Cardiology. Exam.pdfSpandanaRallapalli
Β 
Crayon Activity Handout For the Crayon A
Crayon Activity Handout For the Crayon ACrayon Activity Handout For the Crayon A
Crayon Activity Handout For the Crayon AUnboundStockton
Β 
DATA STRUCTURE AND ALGORITHM for beginners
DATA STRUCTURE AND ALGORITHM for beginnersDATA STRUCTURE AND ALGORITHM for beginners
DATA STRUCTURE AND ALGORITHM for beginnersSabitha Banu
Β 
Gas measurement O2,Co2,& ph) 04/2024.pptx
Gas measurement O2,Co2,& ph) 04/2024.pptxGas measurement O2,Co2,& ph) 04/2024.pptx
Gas measurement O2,Co2,& ph) 04/2024.pptxDr.Ibrahim Hassaan
Β 
Employee wellbeing at the workplace.pptx
Employee wellbeing at the workplace.pptxEmployee wellbeing at the workplace.pptx
Employee wellbeing at the workplace.pptxNirmalaLoungPoorunde1
Β 
ECONOMIC CONTEXT - PAPER 1 Q3: NEWSPAPERS.pptx
ECONOMIC CONTEXT - PAPER 1 Q3: NEWSPAPERS.pptxECONOMIC CONTEXT - PAPER 1 Q3: NEWSPAPERS.pptx
ECONOMIC CONTEXT - PAPER 1 Q3: NEWSPAPERS.pptxiammrhaywood
Β 
Grade 9 Q4-MELC1-Active and Passive Voice.pptx
Grade 9 Q4-MELC1-Active and Passive Voice.pptxGrade 9 Q4-MELC1-Active and Passive Voice.pptx
Grade 9 Q4-MELC1-Active and Passive Voice.pptxChelloAnnAsuncion2
Β 

Recently uploaded (20)

Keynote by Prof. Wurzer at Nordex about IP-design
Keynote by Prof. Wurzer at Nordex about IP-designKeynote by Prof. Wurzer at Nordex about IP-design
Keynote by Prof. Wurzer at Nordex about IP-design
Β 
Judging the Relevance and worth of ideas part 2.pptx
Judging the Relevance and worth of ideas part 2.pptxJudging the Relevance and worth of ideas part 2.pptx
Judging the Relevance and worth of ideas part 2.pptx
Β 
Like-prefer-love -hate+verb+ing & silent letters & citizenship text.pdf
Like-prefer-love -hate+verb+ing & silent letters & citizenship text.pdfLike-prefer-love -hate+verb+ing & silent letters & citizenship text.pdf
Like-prefer-love -hate+verb+ing & silent letters & citizenship text.pdf
Β 
OS-operating systems- ch04 (Threads) ...
OS-operating systems- ch04 (Threads) ...OS-operating systems- ch04 (Threads) ...
OS-operating systems- ch04 (Threads) ...
Β 
Influencing policy (training slides from Fast Track Impact)
Influencing policy (training slides from Fast Track Impact)Influencing policy (training slides from Fast Track Impact)
Influencing policy (training slides from Fast Track Impact)
Β 
ENGLISH 7_Q4_LESSON 2_ Employing a Variety of Strategies for Effective Interp...
ENGLISH 7_Q4_LESSON 2_ Employing a Variety of Strategies for Effective Interp...ENGLISH 7_Q4_LESSON 2_ Employing a Variety of Strategies for Effective Interp...
ENGLISH 7_Q4_LESSON 2_ Employing a Variety of Strategies for Effective Interp...
Β 
Introduction to ArtificiaI Intelligence in Higher Education
Introduction to ArtificiaI Intelligence in Higher EducationIntroduction to ArtificiaI Intelligence in Higher Education
Introduction to ArtificiaI Intelligence in Higher Education
Β 
Hierarchy of management that covers different levels of management
Hierarchy of management that covers different levels of managementHierarchy of management that covers different levels of management
Hierarchy of management that covers different levels of management
Β 
ACC 2024 Chronicles. Cardiology. Exam.pdf
ACC 2024 Chronicles. Cardiology. Exam.pdfACC 2024 Chronicles. Cardiology. Exam.pdf
ACC 2024 Chronicles. Cardiology. Exam.pdf
Β 
9953330565 Low Rate Call Girls In Rohini Delhi NCR
9953330565 Low Rate Call Girls In Rohini Delhi NCR9953330565 Low Rate Call Girls In Rohini Delhi NCR
9953330565 Low Rate Call Girls In Rohini Delhi NCR
Β 
Crayon Activity Handout For the Crayon A
Crayon Activity Handout For the Crayon ACrayon Activity Handout For the Crayon A
Crayon Activity Handout For the Crayon A
Β 
TataKelola dan KamSiber Kecerdasan Buatan v022.pdf
TataKelola dan KamSiber Kecerdasan Buatan v022.pdfTataKelola dan KamSiber Kecerdasan Buatan v022.pdf
TataKelola dan KamSiber Kecerdasan Buatan v022.pdf
Β 
DATA STRUCTURE AND ALGORITHM for beginners
DATA STRUCTURE AND ALGORITHM for beginnersDATA STRUCTURE AND ALGORITHM for beginners
DATA STRUCTURE AND ALGORITHM for beginners
Β 
Model Call Girl in Tilak Nagar Delhi reach out to us at πŸ”9953056974πŸ”
Model Call Girl in Tilak Nagar Delhi reach out to us at πŸ”9953056974πŸ”Model Call Girl in Tilak Nagar Delhi reach out to us at πŸ”9953056974πŸ”
Model Call Girl in Tilak Nagar Delhi reach out to us at πŸ”9953056974πŸ”
Β 
Gas measurement O2,Co2,& ph) 04/2024.pptx
Gas measurement O2,Co2,& ph) 04/2024.pptxGas measurement O2,Co2,& ph) 04/2024.pptx
Gas measurement O2,Co2,& ph) 04/2024.pptx
Β 
Employee wellbeing at the workplace.pptx
Employee wellbeing at the workplace.pptxEmployee wellbeing at the workplace.pptx
Employee wellbeing at the workplace.pptx
Β 
Raw materials used in Herbal Cosmetics.pptx
Raw materials used in Herbal Cosmetics.pptxRaw materials used in Herbal Cosmetics.pptx
Raw materials used in Herbal Cosmetics.pptx
Β 
ECONOMIC CONTEXT - PAPER 1 Q3: NEWSPAPERS.pptx
ECONOMIC CONTEXT - PAPER 1 Q3: NEWSPAPERS.pptxECONOMIC CONTEXT - PAPER 1 Q3: NEWSPAPERS.pptx
ECONOMIC CONTEXT - PAPER 1 Q3: NEWSPAPERS.pptx
Β 
Model Call Girl in Bikash Puri Delhi reach out to us at πŸ”9953056974πŸ”
Model Call Girl in Bikash Puri Delhi reach out to us at πŸ”9953056974πŸ”Model Call Girl in Bikash Puri Delhi reach out to us at πŸ”9953056974πŸ”
Model Call Girl in Bikash Puri Delhi reach out to us at πŸ”9953056974πŸ”
Β 
Grade 9 Q4-MELC1-Active and Passive Voice.pptx
Grade 9 Q4-MELC1-Active and Passive Voice.pptxGrade 9 Q4-MELC1-Active and Passive Voice.pptx
Grade 9 Q4-MELC1-Active and Passive Voice.pptx
Β 

11X1 t10 01 graphing quadratics (2011)

  • 1. The Quadratic Polynomial and the Parabola
  • 2. The Quadratic Polynomial and the Parabola Quadratic polynomial –
  • 3. The Quadratic Polynomial and the Parabola Quadratic polynomial – ax 2  bx  c
  • 4. The Quadratic Polynomial and the Parabola Quadratic polynomial – ax 2  bx  c Quadratic function –
  • 5. The Quadratic Polynomial and the Parabola Quadratic polynomial – ax 2  bx  c Quadratic function – y ο€½ ax 2  bx  c
  • 6. The Quadratic Polynomial and the Parabola Quadratic polynomial – ax 2  bx  c Quadratic function – y ο€½ ax 2  bx  c Quadratic equation –
  • 7. The Quadratic Polynomial and the Parabola Quadratic polynomial – ax 2  bx  c Quadratic function – y ο€½ ax 2  bx  c Quadratic equation – ax 2  bx  c ο€½ 0
  • 8. The Quadratic Polynomial and the Parabola Quadratic polynomial – ax 2  bx  c Quadratic function – y ο€½ ax 2  bx  c Quadratic equation – ax 2  bx  c ο€½ 0 Coefficients –
  • 9. The Quadratic Polynomial and the Parabola Quadratic polynomial – ax 2  bx  c Quadratic function – y ο€½ ax 2  bx  c Quadratic equation – ax 2  bx  c ο€½ 0 Coefficients – a, b, c
  • 10. The Quadratic Polynomial and the Parabola Quadratic polynomial – ax 2  bx  c Quadratic function – y ο€½ ax 2  bx  c Quadratic equation – ax 2  bx  c ο€½ 0 Coefficients – a, b, c Indeterminate –
  • 11. The Quadratic Polynomial and the Parabola Quadratic polynomial – ax 2  bx  c Quadratic function – y ο€½ ax 2  bx  c Quadratic equation – ax 2  bx  c ο€½ 0 Coefficients – a, b, c Indeterminate – x
  • 12. The Quadratic Polynomial and the Parabola Quadratic polynomial – ax 2  bx  c Quadratic function – y ο€½ ax 2  bx  c Quadratic equation – ax 2  bx  c ο€½ 0 Coefficients – a, b, c Indeterminate – x Roots –
  • 13. The Quadratic Polynomial and the Parabola Quadratic polynomial – ax 2  bx  c Quadratic function – y ο€½ ax 2  bx  c Quadratic equation – ax 2  bx  c ο€½ 0 Coefficients – a, b, c Indeterminate – x Roots – Solutions to the quadratic equation
  • 14. The Quadratic Polynomial and the Parabola Quadratic polynomial – ax 2  bx  c Quadratic function – y ο€½ ax 2  bx  c Quadratic equation – ax 2  bx  c ο€½ 0 Coefficients – a, b, c Indeterminate – x Roots – Solutions to the quadratic equation Zeroes –
  • 15. The Quadratic Polynomial and the Parabola Quadratic polynomial – ax 2  bx  c Quadratic function – y ο€½ ax 2  bx  c Quadratic equation – ax 2  bx  c ο€½ 0 Coefficients – a, b, c Indeterminate – x Roots – Solutions to the quadratic equation Zeroes – x intercepts of the quadratic function
  • 16. The Quadratic Polynomial and the Parabola Quadratic polynomial – ax 2  bx  c Quadratic function – y ο€½ ax 2  bx  c Quadratic equation – ax 2  bx  c ο€½ 0 Coefficients – a, b, c Indeterminate – x Roots – Solutions to the quadratic equation Zeroes – x intercepts of the quadratic function e.g. Find the roots of x 2 ο€­ 1 ο€½ 0
  • 17. The Quadratic Polynomial and the Parabola Quadratic polynomial – ax 2  bx  c Quadratic function – y ο€½ ax 2  bx  c Quadratic equation – ax 2  bx  c ο€½ 0 Coefficients – a, b, c Indeterminate – x Roots – Solutions to the quadratic equation Zeroes – x intercepts of the quadratic function e.g. Find the roots of x 2 ο€­ 1 ο€½ 0 x2 ο€­1 ο€½ 0 x2 ο€½ 1
  • 18. The Quadratic Polynomial and the Parabola Quadratic polynomial – ax 2  bx  c Quadratic function – y ο€½ ax 2  bx  c Quadratic equation – ax 2  bx  c ο€½ 0 Coefficients – a, b, c Indeterminate – x Roots – Solutions to the quadratic equation Zeroes – x intercepts of the quadratic function e.g. Find the roots of x 2 ο€­ 1 ο€½ 0 x2 ο€­1 ο€½ 0 x2 ο€½ 1 x ο€½ ο‚±1
  • 19. The Quadratic Polynomial and the Parabola Quadratic polynomial – ax 2  bx  c Quadratic function – y ο€½ ax 2  bx  c Quadratic equation – ax 2  bx  c ο€½ 0 Coefficients – a, b, c Indeterminate – x Roots – Solutions to the quadratic equation Zeroes – x intercepts of the quadratic function e.g. Find the roots of x 2 ο€­ 1 ο€½ 0 x2 ο€­1 ο€½ 0 x2 ο€½ 1 x ο€½ ο‚±1  the roots are x ο€½ ο€­1 and x ο€½ 1
  • 21. Graphing Quadratics The graph of a quadratic function is a parabola.
  • 22. Graphing Quadratics The graph of a quadratic function is a parabola. y ο€½ ax 2  bx  c
  • 23. Graphing Quadratics The graph of a quadratic function is a parabola. y ο€½ ax 2  bx  c a
  • 24. Graphing Quadratics The graph of a quadratic function is a parabola. y ο€½ ax 2  bx  c y a x
  • 25. Graphing Quadratics The graph of a quadratic function is a parabola. y ο€½ ax 2  bx  c y a x aο€Ύ0
  • 26. Graphing Quadratics The graph of a quadratic function is a parabola. y ο€½ ax 2  bx  c y a x aο€Ύ0 concave up
  • 27. Graphing Quadratics The graph of a quadratic function is a parabola. y ο€½ ax 2  bx  c y y a x x aο€Ύ0 concave up
  • 28. Graphing Quadratics The graph of a quadratic function is a parabola. y ο€½ ax 2  bx  c y y a x x aο€Ύ0 aο€Ό0 concave up
  • 29. Graphing Quadratics The graph of a quadratic function is a parabola. y ο€½ ax 2  bx  c y y a x x aο€Ύ0 aο€Ό0 concave up concave down
  • 30. Graphing Quadratics The graph of a quadratic function is a parabola. y ο€½ ax 2  bx  c y y a x x aο€Ύ0 aο€Ό0 concave up concave down c
  • 31. Graphing Quadratics The graph of a quadratic function is a parabola. y ο€½ ax 2  bx  c y y a x x aο€Ύ0 aο€Ό0 concave up concave down c = y intercept
  • 32. Graphing Quadratics The graph of a quadratic function is a parabola. y ο€½ ax 2  bx  c y y a x x aο€Ύ0 aο€Ό0 concave up concave down c = y intercept zeroes (roots)
  • 33. Graphing Quadratics The graph of a quadratic function is a parabola. y ο€½ ax 2  bx  c y y a x x aο€Ύ0 aο€Ό0 concave up concave down c = y intercept zeroes (roots) = x intercepts
  • 34. Graphing Quadratics The graph of a quadratic function is a parabola. y ο€½ ax 2  bx  c y y a x x aο€Ύ0 aο€Ό0 concave up concave down c = y intercept zeroes (roots) = x intercepts ο€­b xο€½ 2a
  • 35. Graphing Quadratics The graph of a quadratic function is a parabola. y ο€½ ax 2  bx  c y y a x x aο€Ύ0 aο€Ό0 concave up concave down c = y intercept zeroes (roots) = x intercepts ο€­b xο€½ = axis of symmetry 2a
  • 36. Graphing Quadratics The graph of a quadratic function is a parabola. y ο€½ ax 2  bx  c y y a x x aο€Ύ0 aο€Ό0 concave up concave down c = y intercept zeroes (roots) = x intercepts ο€­b xο€½ = axis of symmetry Note: AOS is the average of the zeroes 2a
  • 37. Graphing Quadratics The graph of a quadratic function is a parabola. y ο€½ ax 2  bx  c y y a x x aο€Ύ0 aο€Ό0 concave up concave down c = y intercept zeroes (roots) = x intercepts ο€­b xο€½ = axis of symmetry Note: AOS is the average of the zeroes 2a vertex
  • 38. Graphing Quadratics The graph of a quadratic function is a parabola. y ο€½ ax 2  bx  c y y a x x aο€Ύ0 aο€Ό0 concave up concave down c = y intercept zeroes (roots) = x intercepts ο€­b xο€½ = axis of symmetry Note: AOS is the average of the zeroes 2a vertex x value is the AOS
  • 39. Graphing Quadratics The graph of a quadratic function is a parabola. y ο€½ ax 2  bx  c y y a x x aο€Ύ0 aο€Ό0 concave up concave down c = y intercept zeroes (roots) = x intercepts ο€­b xο€½ = axis of symmetry Note: AOS is the average of the zeroes 2a vertex x value is the AOS y value is found by substituting AOS into the function.
  • 40. Graphing Quadratics The graph of a quadratic function is a parabola. y ο€½ ax 2  bx  c y y a x x aο€Ύ0 aο€Ό0 concave up concave down c = y intercept zeroes (roots) = x intercepts ο€­b xο€½ = axis of symmetry Note: AOS is the average of the zeroes 2a vertex x value is the AOS y value is found by substituting AOS into the function. (It is the maximum/minimum value of the function)
  • 41. e.g. Graph y ο€½ x 2  8 x  12
  • 42. e.g. Graph y ο€½ x 2  8 x  12 a=1>0 y x
  • 43. e.g. Graph y ο€½ x 2  8 x  12 a = 1 > 0  concave up y x
  • 44. e.g. Graph y ο€½ x 2  8 x  12 a = 1 > 0  concave up c = 12 y y ο€½ x 2  8 x  12 x
  • 45. e.g. Graph y ο€½ x 2  8 x  12 a = 1 > 0  concave up c = 12  y intercept is  0,12  y x
  • 46. e.g. Graph y ο€½ x 2  8 x  12 a = 1 > 0  concave up c = 12  y intercept is  0,12  y 12 x
  • 47. e.g. Graph y ο€½ x 2  8 x  12 a = 1 > 0  concave up c = 12  y intercept is  0,12  zeroes y 12 x
  • 48. e.g. Graph y ο€½ x 2  8 x  12 a = 1 > 0  concave up c = 12  y intercept is  0,12  zeroes x 2  8 x  12 ο€½ 0 y y ο€½ x 2  8 x  12 12 x
  • 49. e.g. Graph y ο€½ x 2  8 x  12 a = 1 > 0  concave up c = 12  y intercept is  0,12  zeroes x 2  8 x  12 ο€½ 0 y y ο€½ x 2  8 x  12  x  6  x  2  ο€½ 0 12 x
  • 50. e.g. Graph y ο€½ x 2  8 x  12 a = 1 > 0  concave up c = 12  y intercept is  0,12  zeroes x 2  8 x  12 ο€½ 0 y y ο€½ x 2  8 x  12  x  6  x  2  ο€½ 0 12 x ο€½ ο€­6 or x ο€½ ο€­2 x
  • 51. e.g. Graph y ο€½ x 2  8 x  12 a = 1 > 0  concave up c = 12  y intercept is  0,12  zeroes x 2  8 x  12 ο€½ 0 y y ο€½ x 2  8 x  12  x  6  x  2  ο€½ 0 12 x ο€½ ο€­6 or x ο€½ ο€­2  x intercepts are  ο€­6,0  and  ο€­2,0  x
  • 52. e.g. Graph y ο€½ x 2  8 x  12 a = 1 > 0  concave up c = 12  y intercept is  0,12  zeroes x 2  8 x  12 ο€½ 0 y y ο€½ x 2  8 x  12  x  6  x  2  ο€½ 0 12 x ο€½ ο€­6 or x ο€½ ο€­2  x intercepts are  ο€­6,0  and  ο€­2,0  –6 –2 x
  • 53. e.g. Graph y ο€½ x 2  8 x  12 a = 1 > 0  concave up c = 12  y intercept is  0,12  zeroes x 2  8 x  12 ο€½ 0 y y ο€½ x 2  8 x  12  x  6  x  2  ο€½ 0 12 x ο€½ ο€­6 or x ο€½ ο€­2  x intercepts are  ο€­6,0  and  ο€­2,0  AOS –6 –2 x
  • 54. e.g. Graph y ο€½ x 2  8 x  12 a = 1 > 0  concave up c = 12  y intercept is  0,12  zeroes x 2  8 x  12 ο€½ 0 y y ο€½ x 2  8 x  12  x  6  x  2  ο€½ 0 12 x ο€½ ο€­6 or x ο€½ ο€­2  x intercepts are  ο€­6,0  and  ο€­2,0  AOS x ο€½ ο€­b 2a –6 –2 x
  • 55. e.g. Graph y ο€½ x 2  8 x  12 a = 1 > 0  concave up c = 12  y intercept is  0,12  zeroes x 2  8 x  12 ο€½ 0 y y ο€½ x 2  8 x  12  x  6  x  2  ο€½ 0 12 x ο€½ ο€­6 or x ο€½ ο€­2  x intercepts are  ο€­6,0  and  ο€­2,0  AOS x ο€½ ο€­b 2a ο€­8 ο€½ 2 –6 –2 x ο€½ ο€­4
  • 56. e.g. Graph y ο€½ x 2  8 x  12 a = 1 > 0  concave up c = 12  y intercept is  0,12  zeroes x 2  8 x  12 ο€½ 0 y y ο€½ x 2  8 x  12  x  6  x  2  ο€½ 0 12 x ο€½ ο€­6 or x ο€½ ο€­2  x intercepts are  ο€­6,0  and  ο€­2,0  AOS x ο€½ ο€­b OR x ο€½ ο€­6 ο€­ 2 2a 2 ο€­8 ο€½ 2 –6 –2 x ο€½ ο€­4
  • 57. e.g. Graph y ο€½ x 2  8 x  12 a = 1 > 0  concave up c = 12  y intercept is  0,12  zeroes x 2  8 x  12 ο€½ 0 y y ο€½ x 2  8 x  12  x  6  x  2  ο€½ 0 12 x ο€½ ο€­6 or x ο€½ ο€­2  x intercepts are  ο€­6,0  and  ο€­2,0  AOS x ο€½ ο€­b OR x ο€½ ο€­6 ο€­ 2 2a 2 ο€­8 ο€½ ο€­4 ο€½ 2 –6 –2 x ο€½ ο€­4
  • 58. e.g. Graph y ο€½ x 2  8 x  12 a = 1 > 0  concave up c = 12  y intercept is  0,12  zeroes x 2  8 x  12 ο€½ 0 y y ο€½ x 2  8 x  12  x  6  x  2  ο€½ 0 12 x ο€½ ο€­6 or x ο€½ ο€­2  x intercepts are  ο€­6,0  and  ο€­2,0  AOS x ο€½ ο€­b OR x ο€½ ο€­6 ο€­ 2 2a 2 ο€­8 ο€½ ο€­4 ο€½ 2 –6 –2 x ο€½ ο€­4
  • 59. e.g. Graph y ο€½ x 2  8 x  12 a = 1 > 0  concave up c = 12  y intercept is  0,12  zeroes x 2  8 x  12 ο€½ 0 y y ο€½ x 2  8 x  12  x  6  x  2  ο€½ 0 12 x ο€½ ο€­6 or x ο€½ ο€­2  x intercepts are  ο€­6,0  and  ο€­2,0  AOS x ο€½ ο€­b OR x ο€½ ο€­6 ο€­ 2 2a 2 ο€­8 ο€½ ο€­4 ο€½ 2 –6 –2 x ο€½ ο€­4 vertex
  • 60. e.g. Graph y ο€½ x 2  8 x  12 a = 1 > 0  concave up c = 12  y intercept is  0,12  zeroes x 2  8 x  12 ο€½ 0 y y ο€½ x 2  8 x  12  x  6  x  2  ο€½ 0 12 x ο€½ ο€­6 or x ο€½ ο€­2  x intercepts are  ο€­6,0  and  ο€­2,0  AOS x ο€½ ο€­b OR x ο€½ ο€­6 ο€­ 2 2a 2 ο€­8 ο€½ ο€­4 ο€½ 2 –6 –2 x ο€½ ο€­4 y ο€½  ο€­4   8  ο€­4   12 2 vertex
  • 61. e.g. Graph y ο€½ x 2  8 x  12 a = 1 > 0  concave up c = 12  y intercept is  0,12  zeroes x 2  8 x  12 ο€½ 0 y y ο€½ x 2  8 x  12  x  6  x  2  ο€½ 0 12 x ο€½ ο€­6 or x ο€½ ο€­2  x intercepts are  ο€­6,0  and  ο€­2,0  AOS x ο€½ ο€­b OR x ο€½ ο€­6 ο€­ 2 2a 2 ο€­8 ο€½ ο€­4 ο€½ 2 –6 –2 x ο€½ ο€­4 y ο€½  ο€­4   8  ο€­4   12 2 vertex ο€½ ο€­4
  • 62. e.g. Graph y ο€½ x 2  8 x  12 a = 1 > 0  concave up c = 12  y intercept is  0,12  zeroes x 2  8 x  12 ο€½ 0 y y ο€½ x 2  8 x  12  x  6  x  2  ο€½ 0 12 x ο€½ ο€­6 or x ο€½ ο€­2  x intercepts are  ο€­6,0  and  ο€­2,0  AOS x ο€½ ο€­b OR x ο€½ ο€­6 ο€­ 2 2a 2 ο€­8 ο€½ ο€­4 ο€½ 2 –6 –2 x ο€½ ο€­4 y ο€½  ο€­4   8  ο€­4   12 2 vertex ο€½ ο€­4  vertex is  ο€­4, ο€­4 
  • 63. e.g. Graph y ο€½ x 2  8 x  12 a = 1 > 0  concave up c = 12  y intercept is  0,12  zeroes x 2  8 x  12 ο€½ 0 y y ο€½ x 2  8 x  12  x  6  x  2  ο€½ 0 12 x ο€½ ο€­6 or x ο€½ ο€­2  x intercepts are  ο€­6,0  and  ο€­2,0  AOS x ο€½ ο€­b OR x ο€½ ο€­6 ο€­ 2 2a 2 ο€­8 ο€½ ο€­4 ο€½ 2 –6 –2 x ο€½ ο€­4 y ο€½  ο€­4   8  ο€­4   12 2 vertex (–4, –4) ο€½ ο€­4  vertex is  ο€­4, ο€­4 
  • 64. e.g. Graph y ο€½ x 2  8 x  12 a = 1 > 0  concave up c = 12  y intercept is  0,12  zeroes x 2  8 x  12 ο€½ 0 y y ο€½ x 2  8 x  12  x  6  x  2  ο€½ 0 12 x ο€½ ο€­6 or x ο€½ ο€­2  x intercepts are  ο€­6,0  and  ο€­2,0  AOS x ο€½ ο€­b OR x ο€½ ο€­6 ο€­ 2 2a 2 ο€­8 ο€½ ο€­4 ο€½ 2 –6 –2 x ο€½ ο€­4 y ο€½  ο€­4   8  ο€­4   12 2 vertex (–4, –4) ο€½ ο€­4  vertex is  ο€­4, ο€­4 
  • 65. (ii) Find the quadratic with; a) roots 3 and 6
  • 66. (ii) Find the quadratic with; a) roots 3 and 6 y ο€½ a  x 2 ο€­ 9 x  18 
  • 67. (ii) Find the quadratic with; a) roots 3 and 6 y ο€½ a  x 2 ο€­ 9 x  18  ο€­  6  3 6ο‚΄3
  • 68. (ii) Find the quadratic with; a) roots 3 and 6 b) monic roots 3  2 and 3 ο€­ 2 y ο€½ a  x 2 ο€­ 9 x  18  ο€­  6  3 6ο‚΄3
  • 69. (ii) Find the quadratic with; a) roots 3 and 6 b) monic roots 3  2 and 3 ο€­ 2 y ο€½ a  x 2 ο€­ 9 x  18  y ο€½ x2 ο€­ 6x  7 ο€­  6  3 6ο‚΄3 c) roots 2 and 8 and vertex (5,3) y ο€½ a  x 2 ο€­ 10 x  16   5,3 : 3 ο€½ a  52 ο€­ 10  5   16  3 ο€½ ο€­9a 1 aο€½ο€­ 3  y ο€½ ο€­  x ο€­ 10 x  16  1 2 3
  • 70. (ii) Find the quadratic with; a) roots 3 and 6 b) monic roots 3  2 and 3 ο€­ 2 y ο€½ a  x 2 ο€­ 9 x  18  y ο€½ x2 ο€­ 6x  7 ο€­  6  3 6ο‚΄3  ο€­ 3 2 3ο€­ 2  3  2 3 ο€­ 2 
  • 71. (ii) Find the quadratic with; a) roots 3 and 6 b) monic roots 3  2 and 3 ο€­ 2 y ο€½ a  x 2 ο€­ 9 x  18  y ο€½ x2 ο€­ 6x  7 ο€­  6  3 6ο‚΄3  ο€­ 3 2 3ο€­ 2  3  2 3 ο€­ 2  c) roots 2 and 8 and vertex (5,3)
  • 72. (ii) Find the quadratic with; a) roots 3 and 6 b) monic roots 3  2 and 3 ο€­ 2 y ο€½ a  x 2 ο€­ 9 x  18  y ο€½ x2 ο€­ 6x  7 ο€­  6  3 6ο‚΄3  ο€­ 3 2 3ο€­ 2  3  2 3 ο€­ 2  c) roots 2 and 8 and vertex (5,3) y ο€½ a  x 2 ο€­ 10 x  16 
  • 73. (ii) Find the quadratic with; a) roots 3 and 6 b) monic roots 3  2 and 3 ο€­ 2 y ο€½ a  x 2 ο€­ 9 x  18  y ο€½ x2 ο€­ 6x  7 ο€­  6  3 6ο‚΄3  ο€­ 3 2 3ο€­ 2  3  2 3 ο€­ 2  c) roots 2 and 8 and vertex (5,3) y ο€½ a  x 2 ο€­ 10 x  16   5,3 : 3 ο€½ a  52 ο€­ 10  5   16 
  • 74. (ii) Find the quadratic with; a) roots 3 and 6 b) monic roots 3  2 and 3 ο€­ 2 y ο€½ a  x 2 ο€­ 9 x  18  y ο€½ x2 ο€­ 6x  7 ο€­  6  3 6ο‚΄3  ο€­ 3 2 3ο€­ 2  3  2 3 ο€­ 2  c) roots 2 and 8 and vertex (5,3) y ο€½ a  x 2 ο€­ 10 x  16   5,3 : 3 ο€½ a  52 ο€­ 10  5   16  3 ο€½ ο€­9a 1 aο€½ο€­ 3
  • 75. (ii) Find the quadratic with; a) roots 3 and 6 b) monic roots 3  2 and 3 ο€­ 2 y ο€½ a  x 2 ο€­ 9 x  18  y ο€½ x2 ο€­ 6x  7 ο€­  6  3 6ο‚΄3  ο€­ 3 2 3ο€­ 2  3  2 3 ο€­ 2  c) roots 2 and 8 and vertex (5,3) y ο€½ a  x 2 ο€­ 10 x  16   5,3 : 3 ο€½ a  52 ο€­ 10  5   16  3 ο€½ ο€­9a 1 aο€½ο€­ 3  y ο€½ ο€­  x ο€­ 10 x  16  1 2 3
  • 76. (iii) Solve; a) x 2  5 x  6 ο€Ύ 0
  • 77. (iii) Solve; a) x 2  5 x  6 ο€Ύ 0  x  2  x  3 ο€Ύ 0
  • 78. (iii) Solve; a) x 2  5 x  6 ο€Ύ 0 y  x  2  x  3 ο€Ύ 0 –3 –2 x
  • 79. (iii) Solve; a) x 2  5 x  6 ο€Ύ 0 y  x  2  x  3 ο€Ύ 0 –3 –2 x
  • 80. (iii) Solve; a) x 2  5 x  6 ο€Ύ 0 y  x  2  x  3 ο€Ύ 0 –3 –2 x Q: for what values of x is the parabola above the x axis?
  • 81. (iii) Solve; a) x 2  5 x  6 ο€Ύ 0 y  x  2  x  3 ο€Ύ 0 –3 –2 x Q: for what values of x is the parabola above the x axis?
  • 82. (iii) Solve; a) x 2  5 x  6 ο€Ύ 0 y  x  2  x  3 ο€Ύ 0 x ο€Ό ο€­3 or x ο€Ύ ο€­2 –3 –2 x Q: for what values of x is the parabola above the x axis?
  • 83. (iii) Solve; a) x 2  5 x  6 ο€Ύ 0 y  x  2  x  3 ο€Ύ 0 x ο€Ό ο€­3 or x ο€Ύ ο€­2 –3 –2 x Q: for what values of x is the parabola above the x axis? b) ο€­ x 2 ο€­ 3 x ο‚³ ο€­4
  • 84. (iii) Solve; a) x 2  5 x  6 ο€Ύ 0 y  x  2  x  3 ο€Ύ 0 x ο€Ό ο€­3 or x ο€Ύ ο€­2 –3 –2 x Q: for what values of x is the parabola above the x axis? b) ο€­ x 2 ο€­ 3 x ο‚³ ο€­4 x 2  3x ο€­ 4 ο‚£ 0
  • 85. (iii) Solve; a) x 2  5 x  6 ο€Ύ 0 y  x  2  x  3 ο€Ύ 0 x ο€Ό ο€­3 or x ο€Ύ ο€­2 –3 –2 x Q: for what values of x is the parabola above the x axis? b) ο€­ x 2 ο€­ 3 x ο‚³ ο€­4 x 2  3x ο€­ 4 ο‚£ 0  x  4  x ο€­ 1 ο‚£ 0
  • 86. (iii) Solve; a) x 2  5 x  6 ο€Ύ 0 y  x  2  x  3 ο€Ύ 0 x ο€Ό ο€­3 or x ο€Ύ ο€­2 –3 –2 x Q: for what values of x is the parabola above the x axis? b) ο€­ x 2 ο€­ 3 x ο‚³ ο€­4 y x 2  3x ο€­ 4 ο‚£ 0  x  4  x ο€­ 1 ο‚£ 0 –4 1 x
  • 87. (iii) Solve; a) x 2  5 x  6 ο€Ύ 0 y  x  2  x  3 ο€Ύ 0 x ο€Ό ο€­3 or x ο€Ύ ο€­2 –3 –2 x Q: for what values of x is the parabola above the x axis? b) ο€­ x 2 ο€­ 3 x ο‚³ ο€­4 y x 2  3x ο€­ 4 ο‚£ 0  x  4  x ο€­ 1 ο‚£ 0 –4 1 x
  • 88. (iii) Solve; a) x 2  5 x  6 ο€Ύ 0 y  x  2  x  3 ο€Ύ 0 x ο€Ό ο€­3 or x ο€Ύ ο€­2 –3 –2 x Q: for what values of x is the parabola above the x axis? b) ο€­ x 2 ο€­ 3 x ο‚³ ο€­4 y x 2  3x ο€­ 4 ο‚£ 0  x  4  x ο€­ 1 ο‚£ 0 –4 1 x Q: for what values of x is the parabola below the x axis?
  • 89. (iii) Solve; a) x 2  5 x  6 ο€Ύ 0 y  x  2  x  3 ο€Ύ 0 x ο€Ό ο€­3 or x ο€Ύ ο€­2 –3 –2 x Q: for what values of x is the parabola above the x axis? b) ο€­ x 2 ο€­ 3 x ο‚³ ο€­4 y x 2  3x ο€­ 4 ο‚£ 0  x  4  x ο€­ 1 ο‚£ 0 –4 1 x Q: for what values of x is the parabola below the x axis?
  • 90. (iii) Solve; a) x 2  5 x  6 ο€Ύ 0 y  x  2  x  3 ο€Ύ 0 x ο€Ό ο€­3 or x ο€Ύ ο€­2 –3 –2 x Q: for what values of x is the parabola above the x axis? b) ο€­ x 2 ο€­ 3 x ο‚³ ο€­4 y x 2  3x ο€­ 4 ο‚£ 0  x  4  x ο€­ 1 ο‚£ 0 ο€­4 ο‚£ x ο‚£ 1 –4 1 x Q: for what values of x is the parabola below the x axis?
  • 91. Exercise 8A; 1adf, 2adf, 3bd, 4bd, 5c, 6ade, 7d, 9ace, 12c, 13b, 14a