Download - If a > 0 then the parabola opens up
All quadratic equations can be modeled in the form: y = a(x – s)(x – t) provided a 0.
If a > 0 then the parabola opens up.
If a < 0 then the parabola opens down.
minimum
maximum
3.3 Factored Form of a Quadratic Relation
The zeros are at
y = a(x – s)(x – t)
x = s and x = t.
s tThe axis of symmetry is at
2
s tx
The vertex is at ,2
s ty
2
s tx
,2
s ty
Example 1:
Given: y = x(x – 3)
a) Determine the zeros ofthe parabola.
Let y = 0
0 = x(x – 3)
The zeros are
x = 0 and x = 3.
Given: y = x(x – 3)b) Determine the equation of
the axis of symmetry.
The axis of symmetry is halfway between the zeros.
0 3
2
3
2
3
2x
c) Determine the vertex ofthe parabola.
Substitute 3
2x into the
original equation.
x =
Given: y = x(x – 3)
3
2x
3 33
2 2y
9 9
4 2y
9 18
4 4y
9
4y
3 9The vertex is , or (1.5, 2.25)
2 4
Example 2: Determine the zeros and the axis of symmetry of the following:
a) A = w(20 – w)
20 – w = 020 = ww = 0
The zeros are at 0 and 20The axis of symmetry is halfway between 0 and 20.
2
200 w
w = 10
Determine the zeros and the axis of symmetry of the following:
b) y = 2x(4x – 8)
4x – 8 = 04x = 82x = 0
The zeros are at 0 and 2The axis of symmetry is halfway between 0 and 2.
x = 2x = 0
2
20 x
x = 1
Sketch the graph of: y = (x + 1)(x – 3)
Example 3
The zeros are at – 1 and 3.
Substitute x = 1 into the original equation to find the vertex.
y = (1 + 1)(1 – 3) y = – 4
The x-coordinate of the vertex is at x = 1 3
12
(1, – 4)
Sketch the graph of: y = – (4 – x)(8 – x) Example:
The zeros are at 4 and 8.
The axis of symmetry is at x = 6
Substitute x = 6 in the equation to determine the y value of the vertex.
y = – (4 – 6)(8 – 6)
y = –(– 2)(2)
y = 4
The vertex is at (6, 4).
x
y
Homework
• Pg 155 #1, 2, 4, 5, 7, 18
Determine the equation of the parabola whose x-intercepts are 2 and – 3 and whose y-intercept is 6.
Example 4
y = a(x – s)(x – t)
y = a(x – 2)(x + 3)
sub s = 2 and t = – 3
To find a, substitute (0,6) into the equation.
6 = a(0 – 2)(0 + 3)
6 = a(– 2)(3)
6 = a(– 6)– 1 = a y = – (x – 2)(x + 3)
A person made a golf shot that went over a tree and into the cup. The tree was 15 m high and the distance from the green was 150 m.
150 m
15 m
a) Determine an equation that traces the path of the ball.
b) Determine the height of the ball when it was20 m from the hole.
(75,15)
(150, 0)(0, 0)
y = a(x – s)(x – t) sub s = 0, t = 150
y = a(x – 0)(x – 150) sub point (75, 15)
15 = a(75 – 0)(75 – 150)
15 = a(75)(–75)1
375a
150 m
15 m
(75,15)
(150, 0)(0, 0)
y = a(x – s)(x – t) s = 0, t = 150
1( 150)
375y x x This is the equation of the
flight of the golf ball.
(75,15)
(150, 0)(0, 0)
1( 150)
375y x x
20 m130 m
(130,y)
1130(130 150)
375y
b) Determine the height of the golf ball when it was 20 m from the hole.
The height was 6.9 m.
y = 6.9
Substitute x = 130 into the equation.
Retailing Problem: Maximizing CD Revenue.
Max operates a store that sells CDs.
In order to increase revenue, he decides to increase his price. He knows that over the last six months he has sold an average of 280 Cd’s per day at $20 each.
What unit price will maximize Max’s daily profit?
All CDs sell for $20 each.
Market research indicates that for every $0.50 increase in price, daily sales will drop by five units.
Price = 20 + 0.50x Number of CDs sold = 280 – 5x
Let x represent the number of price increases.
Let 5x represent each loss of sales.
Recall: Revenue = Price × number of units sold
Equation: Revenue = (20 + 0.50x)(280 – 5x)
The zeros are at – 40 and 56
Substitute x = 8 into the equation.
Revenue = (20 + 0.50×8)(280 – 5×8)
= (24.00)(240)
Determine the zeros:
280 – 5x = 0280 = 5x
56 = x
20 + 0.50x = 020 = – 0.50x
– 40 = x
The axis of symmetry is at: 40 56
2
= 8
= $5760.00 is the maximum revenue
Revenue = price × number of CDs sold
His maximum revenue will be $5760.00. The price of each CD will be $24.00 and the number of sales will be 240 per day.
Increase in price
0 $2.50 $5.00 $7.50
$20
$40
$60
$80
$100
$120$140
$160
Incr
ease
in p
rofi
t
Sketch the graph of: y = – (4 – x)(8 – x) Example:
The zeros are at 4 and 8.
The axis of symmetry is at x = 6
Substitute x = 6 in the equation to determine the y value of the vertex.
y = – (4 – 6)(8 – 6)
y = –(– 2)(2)
y = 4
The vertex is at (6, 4).
x
y
Example
The x-intercepts are –1 and – 3 and the y-intercept is –3.
Determine the equation of the parabola.
y = a(x + 1)(x + 3)
sub (0, – 3) into the equation
–3 = a(0 + 3)(0 + 1)
–3 = 3a
–1 = a
equation y = – (x + 1)(x + 3)
Bridges
The second span of the Bluewater Bridge Sarnia, Ontario is supported by a pair of steel parabolic arches. The arches are set in the concrete foundations that are on opposite sides of the St. Clair River 281 m apart. The top of each arch rises 71 m above the river. Determine and algebraic expression that models the arch.
The distances from the center to the zeros is 140.5 m so the zeros are at (–140.5,0) and (140.5,0). The vertex is at (0, 71).
(–140.5,0) (140.5,0)
(0, 71)
y = a(x – s)(x – t)
y = a( x + 140.5)(x – 140.5)
s = –140.5 and t = 140.5
To solve for a, substitute (0, 71)
71 = a(0 + 140.5)(0 – 140.5)
71 = a(–140.5)(140.5)
71 = a(–19740.25)
a 25.19740
71
– 0.004 = a
Equation: y = – 0.004(x – 140.5)(x + 140.5)
Homework
• Pg 156 #3, 6, 8 – 16
• Workbook pg 43 and 44