
Evaluating Polynomials to Support Graphs
Presentation
•
Mathematics
•
8th - 12th Grade
•
Medium
+2
Standards-aligned
Heather Eve
Used 2+ times
FREE Resource
9 Slides • 20 Questions
1
Evaluating Polynomials to Support Graphs
By Heather Eve
2
This lesson will review some skills and strategies that you should already know, and then you will be introduced to new skills and ideas.
Please continue to add to your notes as you go through this lesson!
Subject | Subject
Some text here about the topic of discussion
3
Review Questions
Some text here about the topic of discussion
4
Multiple Choice
What is the degree of this polynomial?
2x4 - 3x5 + x
-3
2
4
5
5
Multiple Choice
What is the coefficient of this term?
9x3
None
9
3
x
6
Multiple Choice
7
Multiple Choice
8
Review: Evaluating A Function
To "evaluate" a function is to analyze what happens at a specific point. For example, if you have an input, what is the output? Or vice versa.
In common terms we simply say "Plug it in" Be mindful of which variable you are working with!
Subject | Subject
Some text here about the topic of discussion
9
Review: Evaluating A Function
Don't forget! An exponent means you multiply the same number that many times.
EXAMPLE:
y=x3 for x=-3 --> (-3)(-3)(-3) =-27
Subject | Subject
Some text here about the topic of discussion
10
Multiple Choice
If f(x) = x2+ 3, find f(-2)
-1
1
7
-7
11
Fill in the Blanks
Type answer...
12
Multiple Choice
Evaluate the polynomial.
f(a)=2a3−3a2−3a at a=2
-2
9
-4
-3
13
Multiple Choice
Evaluate the polynomial
f(m)=m4+m3−32m2+3m+46 at m=5
88
150
11
25
14
Review: Zeroes Of A Function
Zeroes are places where y=0. You can find these by using any of the following strategies:
Looking at a graph if available
Factoring and setting each factor equal to 0
Using the quadratic formula, for quadratics only
(We will review more strategies specifically for polynomials soon!)
Subject | Subject
Some text here about the topic of discussion
15
Review: Zeroes Of A Function
For a polynomial graph:
If the function crosses through the x-axis it is a real zero.
If the function appears to bounce off of the x-axis, it is a real zero with a multiplicity of 2.
If the function appears to bounce in mid-air (turns around but not near the x-axis), there will be at least 2 imaginary zeroes.
Subject | Subject
Some text here about the topic of discussion
16
Multiple Choice
17
Multiple Choice
Which root has a multiplicity of 2?
-1
2
4
-4
18
Multiple Choice
19
Multiple Choice
What are the zeroes of the equation
y = (x - 2)(x + 4)
x = -2 or x = 4
x = 2 or x = -4
x2 - 2x - 8
I don't know
20
Multiple Choice
What are the zeroes of the function
f(x) = x(x + 6)(x - 1)
x = -6 or x = 1
x = 6 or x = -1
x = 0, x = -6 or x = 1
x = 0, x = 6 or x = -1
21
Multiple Choice
If f(x) = 2x(x + 1)(3x - 4). What are the solutions to f(x) = 0?
x = -1 or x = 4/3
x = 0, x = -1, or x = 4/3
x = 2, x = -1, or x = 3/4
x = -1 or x = 4/3
22
Multiple Choice
What are the zeroes of this graph?
x = -4, x = 0, x = 3, x =7
x = -7, x = -3, x = 0, x = -4,
(0,0)
x = -4, x = 3, x =7
23
Multiple Choice
f(x) = (x+2)(x-3)2(x-4)
Which choice best describes the zeros?
-2, 3 (multiplicity 2), 4
-2 (multiplicity 2), 3, 4
2, -3 (multiplicity 2), -4
2 (multiplicity 2), -3, -4
24
NEW! Estimate a Max/Minimum Value
(Without needing a graph!)
In every polynomial, you can guarantee that between two zeroes--> as long as each zero has a multiplicity of one there will be a max or min somewhere in the middle. (if it has a multiplicity of two, AKA a bounce, then it IS a max or a min!)
You can use an x value to evaluate the function and find the y value!
Subject | Subject
Some text here about the topic of discussion
25
NEW! Estimate a Max/Minimum Value
(Without needing a graph!)
EXAMPLE:
A polynomial has zeroes at -4, -2, 0, and 2.
This means that a max/min must exist between -4 and -2, so plug in -3! This will get you on or near one of the extrema.
A max/min must also exist between -2 and 0, so plug in -1! This will get you on or near another one of the extrema.
A max/min must also exist between 0 and 2, so plug in 1! This will get you on or near another one of the extrema.
Subject | Subject
Some text here about the topic of discussion
26
Multiple Choice
Which of the following points could possibly be a max or min for a polyomial with zeros: 9, 3, -2, 0
(-6,0)
(6,23)
(3,4)
(11,-2)
(-4,-2)
27
Multiple Choice
Which of the following points could possibly be a max or min for this polynomial: f(x)= (x-3)(x+2)(x-5)
(5,5)
(-3,-48)
(-2,0)
(4,-6)
(6,24)
28
Multiple Choice
Which of the following points could possibly be a max or min for this polynomial: f(x)= 2x3+5x2+4x+1 (it has two zeros at x=-1 and a zero at x=-0.5)
(-0.5,0)
(-1,0)
(0,1)
(1,12)
(1,10)
29
Multiple Choice
Which of the following points could possibly be a max or min for this polynomial: f(x)= 6x3-32x2+6x+20 (part of it is shown on the graph)
(5,0)
(1,0)
(0,1)
(-1,-24)
(3,-88)
Evaluating Polynomials to Support Graphs
By Heather Eve
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