Quadratic EquationsQuadratic Equations
Function of a different shape
There are many uses of parabolas in real-world applications.
Graphs of Quadratic Functions
Graphs of Quadratic Functions
Plotting quadratic curves
If you remember a relation is a correspondence between two sets of
numbers called the domain and range. If each member of the domain is assigned
exactly one member of the range, then the relation is a function.
A function can be represented as a list or a table of ordered pairs, a graph in the coordinate plane, or an equation in two
variables.
If you notice, the right side of the equation y = 3x + 2 is a polynomial. Can you classify
the polynomial by degree?A function of this form (y = mx + b) is called a linear function. Note the graph is a straight
line.
Y = 3x + 2
Now consider the equation
y = x2 + 6x – 1Classify the
polynomial on the right.
A function defined by an equation of this
form y = ax2 + bx + c is called a
quadratic function.Now we are going to investigate this form.
Let’s try a little experiment with your graphing calculator.
Graph the equation y = x2 on the coordinate plane.
Now graph y = 3x2 on the same coordinate plane.
How are the graphs the same?How are they different?
Can you predict how the graph of y = ¼x2 will be similar or different?
HINT: Graph y = x2 first, next graph y = 3x2 to see what differences or similarities are present.Now graph y = ¼x2 to see how the shape of the graph changes.
Type in y = x2 on the graphing calculator. Graph of y = x2
Now graph y = 3x2
Type in y = 3x2 on the graphing calculator.
Graph of y = x2 and y = 3x2 on the same graph.
How are the graphs the same?How are they different?
Can you predict what y = ¼x2 looks?
Graphs of y = x2, y = 3x2, and y = ¼x2.
Type in y = x2, y = 3x2, and y = ¼x2.
What differences do you notice in the new graph y = ¼x2.
These functions (equations) are quadratic functions.
Standard Form of a Quadratic Function
A quadratic function - is a function that can be written in the form y = ax2 + bx + c, where a ≠ 0. This form is called the standard form of
a quadratic function.
Ex: y = 5x2 y = x2 + 7 y = x2 –x -3
The variable in a quadratic function is squared (x2), so the
graph forms a curved line called a
parabola. All quadratic functions
have the same shape.
The graph of y = x2 forms this U-shaped graph called a parabola.
You can fold a parabola so that the
two sides match exactly. This
property is called symmetry. The fold
or line that divides the parabola into
two matching halves is called the axis of
symmetry.
Axis of symmetry
The highest or lowest point of a parabola is its vertex,
which is on the axis of symmetry.
If a > 0 in (a positive number)
y = ax2 + bx + cthe parabola opens upward. The vertex is the minimum point or lowest point of the
graph.If a < 0 in (a negative number)
y = -ax2 + bx + cthe parabola opens
downward. The vertex is the maximum point or highest
point of the graph
Minimum point
Maximum point
Identifying a VertexIdentify the vertex of each graph. Tell whether it is a minimum or maximum.
On the left is the graph of a parabola. Below
are examples of equations of parabolas.
y = x2
x = y2
y = x2 + 2x + 3
Graphing y = ax2Graphing y = ax2
You can use the fact that a parabola is symmetric
to graph it quickly.
First, find the coordinates of the vertex and several points on either side of the vertex. Then reflect
the points across the axis of symmetry. For
functions of the form of y = ax2, the vertex is at the
origin.Make a table for the
function y = x2 using x = 0, 1, 2, and 4.
Try this
Remember our original experiment when we graphed y = x2 and y = 3x2
Make a table for y = x2 using x = 0, 1, 2, 4.Graph the points on the graph then reflect the x-values to the other side of the graph.
Try another
Make a table of values and graph the quadratic function f(x) = -2x2 using x = 0,
1, 2, 4
Remember these are functions so we
also use the function notation
f(x)
Graphing y = ax2 + cGraphing y = ax2 + c
Graphing y = ax2 + c (y = 2x2 + 4)
The value of c, the constant term in a quadratic function, translates the graph
up or down.
Make a table and graph y = 2x2
Make a table and graphY = 2x2 + 3
Try it
Graph y = x2 and y = x2 - 4
This time let’s use the same
graph for both.
Real world application
Real World ProblemYou can model the height of an object moving under
the influence of gravity using a quadratic function.
As an object falls, its speed continues to
increase. You can find the height of a falling object using the function h = -
16t2 + c.The height h is in feet, the time t is in seconds, and the initial height of the
object c is in feet.
seconds
heig
ht
(feet)
Seagull drops a clam to break the shell so it can eat it. The gull drops the clam from 50 feet in the air.
The graph shows at 0 seconds the object is at 50 feet, after one second the object has already fallen to 34 feet, and at 1½ seconds the object has hit the ground
Try one
Suppose a squirrel is in a tree 60 feet off the ground. She drops an acorn. The function h = -16t2 + 60 gives the height h of the
acorn in feet after t seconds. Make a table and graph this function.
Graph each function
• y = -x2
• y = 2x2
• y = 3x2 – 6
• y = -½x2 + 3
Match the graph
Can you match these graphs with their functions?
f(x) = x2 + 4 f(x) = -x2 + 2
Graph of a Quadratic Function
Graph of a Quadratic Function
f(x) = ax2 + bx + c
So far we have investigated the graphs of y = ax2 and y = ax2 + c. In these functions c has
always been 0, which means the axis of symmetry has always been the y-axis.
In the quadratic function y = ax2 + bx + c, the value of b affects the position of the axis
of symmetry, moving it left or right.In the next slide we are going to consider functions in the form of y = ax2 + bx + c
Notice that both graphs have the same y-intercept. This is because in both equations c
= 0
y = 2x2 + 2x
Y = 2x2 + 4x
The axis of symmetry changes with each change in the b value.
Since the axis of symmetry is related to the change in the b value, the equation of
the axis of symmetry is related to the ratio b/a
To find the y-value, first substitute a and b into the equation x = -b/2a and solve to find x. Then substitute x back into the original equation to determine y.
x = -b/2a
Let’s try one!
Find the coordinates of the vertex and an equation for the axis of symmetry. Then graph the function.y = x2 – 4x + 3
a = 1, b = -4, and c = 3
x = -b/2a
x = -(-4)/2(1) = 4/2 = 2axis of symmetry: x = 2If x = 2,then y = x2 -4x + 3 = y = 22 - 4(2) + 3 = -1
Use the equation for the axis of symmetry.
x = -b/2a
Substitute the x-value into the original equation and solve for y. the vertex
is(2, -1)
Now make a table.
Since the vertex of the axis of symmetry is (2, -1) and we know the parabola turns upward (a > 0), we can use values on both sides of (2, -1).
X Y
-1 8
0 3
1 0
2 -1
3 0
4 3
5 8
Now graph your points and draw a
curved line.Try this one.
y = -x2 + 4
x y
a = ,b = c =
Find x = -b/2a
x =
Substitute the x-value into the
equation y = -x2 + 4
Now use your vertex as the
middle of your table.
Solve problems
Graph each function. Label the axis of symmetry and the vertex.
1) y = x2 + 4x + 3
2) y = 2x2 – 6x
3) y =x2 + 4x – 4
4) y = 2x2 + 3x + 1
Real world problem
In professional fireworks displays, aerial fireworks carry “stars” upward, ignite them, and project them into the air.
The equation h = -16t2 + 72t + 520 gives the star’s height h in feet at time t in seconds. Since the coefficient of t2 is
negative, the curve opens downward, and the vertex is the maximum point.
Find the t-coordinate of the vertexx = -b/2a = -72/2(-16) = 2.25
After 2.25 seconds, the star will be at its greatest height.
Find the h-coordinate of the vertex.h = -16(2.25)2 + 72(2.25) + 520 = 601
The maximum height of the star will be 601 feet.
TRY THIS
The shape of the Gateway Arch in St. Louis, Missouri, is a catenary curve that resembles a
parabola. The equationh = -0.00635x2 + 4.0005x – 0.07875
represents the parabola, where h is the height in feet and x is the distance from one base in
feet.What is the equation of the axis of
symmetry?
What is the maximum height of the arch?
Using the Quadratic Formula
Using the Quadratic Formula
Solving any quadratic equations.
In our earlier lesson, you solved quadratic
equations by factoring. Another method,
which will solve any quadratic equation, is to use the quadratic formula as seen left.Here values of a, b,
and c are substituted into the formula to
determine x.
Be sure to write a quadratic equation in standard form before using the quadratic
formula.
Solve: x2 + 6 = 5x
x2 -5x + 6 = 0
Solve:x2 + 2 = -3x
You can use the quadratic formula to solve real-
world problems. Suppose a football player kicks a ball and gives it an initial velocity of 47ft/s.
The starting height of the football is 3 ft. If no one catches the football how long will it be in the air?Using the vertical motion
formula and the information given, the
formulah = -16t2 + vt + c
represents this illustration.
VERTICAL MOTIONFORMULA
h = -16t2 + vt + c
The initial upward velocity is v, and the starting height is c
You must decide whether a solution makes sense in the real-world situation. For example, a negative value for time is not a reasonable solution.
Use the vertical motion formula h = -16t2 + vt + c
1) A child tosses a ball upward with a starting velocity of 10 ft/s from a height of 3 ft.
a. Substitute the values into the vertical motion formula. Let h = 0
b. Solve. If it is not caught, how long will the ball be in the air? Round to the nearest tenth of a
second.
2) A soccer ball is kicked with a starting velocity of 50 ft/s from a starting height of 3.5 ft.
a. Substitute the values into the vertical motion formula. Let h = 0
b. Solve. If no one touches the ball, how long will the ball be in the air?
TRY THIS
The function below models the United States population P in millions since 1900, where t is the number of years after 1900.
P = 0.0089t2 + 1.1149t + 78.4491a. Use the function to estimate the US
population the year I graduated from high school.
b. Estimate the US population in 2025.c. Estimate the US population in 2050.
Try Another
A carnival game involves striking a lever that forces a weight up a tube to strike a
bell which will win you a prize. If the weight reaches 20 feet and strikes the bell,
you win. The equationh = -16t2 + 32t + 3
gives the height h of the weight if the initial velocity v is 32 ft/s.
Find the maximum height of the weight.Will the contestant win a prize?
One More
The Sky Concert in Peoria, Illinois, is a 4th of July fireworks display set to music. If a
rocket (firework) is launched with an initial velocity of 39.2 m/s at a height of 1.6 m
above the ground, the equation,h = -4.9t2 + 39.2t + 1.6
represents the rockets height h in meters after t seconds. The rocket will explode at
approximately the highest point.At what height will the rocket explode?
ReviewIf a quadratic equation is written in the form ax2 + bx + c = 0, the solutions
can be found using the quadratic formula.
In the quadratic equation, the expression under the radical sign, b2 – 4ac, is called
the discriminant.1) If b2 – 4ac is a negative number, the
square root cannot be found as a real number. There are no real-number
solutions.2) If b2 – 4ac equals 0, there is only one
solution of the equation.3) If b2 – 4ac is a positive number, there
are two solutions of the equation. The graph of the quadratic intersects the x-
axis twice.