5-minute check on activity 4-1 click the mouse button or press the space bar to display the answers....
TRANSCRIPT
5-Minute Check on Activity 4-15-Minute Check on Activity 4-15-Minute Check on Activity 4-15-Minute Check on Activity 4-1
Click the mouse button or press the Space Bar to display the answers.Click the mouse button or press the Space Bar to display the answers.
1. Which direction does y = 3x2 open?
2. Which function’s graph is narrower, f(x) =4x2 or g(x) = ½x2?
Solve the following equations for x
3. 8 = 2x2
4. 27 = 3x2
5. y = 15 and y = 3x2
up
f(x)
4 = x2 4 = x ± 2 = x
9 = x2 9 = x ± 3 = x
15 = 3x2 5 = x2 ± 5 = x
Baseball and the Sears Tower
Activity 4 - 2
Objectives• Identify functions of the form y = ax² + bx + c as
quadratic functions
• Explore the role of a as it relates to the graph of y = ax² + bx + c
• Explore the role of b as it relates to the graph of y = ax² + bx + c
• Explore the role of c as it relates to the graph of y = ax² + bx + c
• Note: a ≠ 0 in objectives above
Vocabulary• Quadratic term – the term, ax², in the quadratic
equation; determines the opening direction and steepness of the curve
• Linear term – the term, bx, in the quadratic equation; helps determine the turning point
• Constant term – the term, c, in the quadratic equation; also graphically the y-intercept
• Coefficients – the numerical factors of the quadratic and linear terms (a and b)
• Turning point – the maximum or minimum location on the parabola; where it turns back
Activity
Imagine yourself standing on the roof of the 1450-foot-high Sears Tower in Chicago. When you release and drop a baseball from the roof of the tower, the ball’s height above the ground, H (in feet), can be modeled as a function of the time (in seconds), since it was dropped. This height function is defined by:
H(t) = -16t² + 1450
acceleration constant due to gravity
Height offset
Activity Continued
Complete the table to the right:
How far does the ball fall in thefirst second?
How far does it fall during the2nd second?
What is the average rate of change of H with respect to tin the first second?
During the 2nd second?
Time, t (sec) Ht, H = -16t² + 1450
0
1
2
3
4
5
6
7
8
9
10
1450
1434
1386
1306
1194
1050
874
666
426
154
-150
1450 – 1434 = 16 feet
1434– 1386 = 16 feet
16 feet / sec
48 feet / sec
Activity Continued
When does the ball hit the ground?
What is the practical domainof the height function?
What is the practical range ofthe height function?
Now graph the function using the table to the right
Time, t (sec) Ht, H = -16t² + 1450
0 1450
1 1434
2 1386
3 1306
4 1194
5 1050
6 874
7 666
8 426
9 154
10 -150
About 9.5 seconds
0 ≤ t ≤ 9.5 seconds
0 ≤ H ≤ 1450 feet
Activity Continued
Is the shape of the curve the path of the ball?
Time, t (sec) Ht, H = -16t² + 1450
0 1450
1 1434
2 1386
3 1306
4 1194
5 1050
6 874
7 666
8 426
9 154
10 -150
H
t
800
600
400
200
1400
1200
1000
No, the ball falls straight down
Quadratic Function
• Standard form: y = ax² + bx + c• Quadratic term: ax²– Determines Direction
a > 0 then parabola opens upa < 0 then parabola opens down
– Determines Width: The bigger |a|, the narrower the graph
• Linear term: bx– If b = 0, then turning point on y-axis– If b ≠ 0, then turning point not on y-axis
• Constant term: c– y-intercept is at (0, c)
The Effects of a in y = ax² + bx + cGraph the following quadratic functions:
a) f(x) = x²
b) g(x) = ½x²
c) h(x) = 2x²
d) j(x) = -2x²
y
x
The Effects of b in y = ax² + bx + c
Graph the following quadratic functions:
a) f(x) = x²
b) g(x) = x² - 4x
c) h(x) = x² + 6x
d) j(x) = -x² + 6x
y
x
The Effects of c in y = ax² + bx + c
Graph the following quadratic functions:
a) f(x) = x²
b) g(x) = x² - 4
c) h(x) = x² + 3
d) j(x) = -x² + 4
y
x
Match the Function with the Graph
f(x) = x² + 4x + 4 g(x) = 0.2x² + 4 h(x) = -x² + 3x
y
x
y
x
y
x
g(x) f(x) h(x)
Summary and Homework
• Summary– Quadratic function: y = ax² + bx + c– Graph of a quadratic function is a parabola– The a coefficient determines the width and direction
of the parabola– If b = 0, then the turning point is on the y-axis;
if b ≠ 0, then the turning point won’t be on the y-axis– The c term is always the y-intercept of the parabola
• Homework– page 416 – 420; problems 1-3, 7-11, 14