EVEN/ODD FUNCTION

Description

Quiz on EVEN/ODD FUNCTION, created by Staci Gallun on 22/11/2016.
Staci Gallun
Quiz by Staci Gallun, updated more than 1 year ago
Staci Gallun
Created by Staci Gallun about 8 years ago
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Resource summary

Question 1

Question
Follow the steps to determine if the function is odd, even, or neither.
Answer
  • -6
  • 18
  • neither

Question 2

Question
Follow the steps to determine if the function is odd, even, or neither.
Answer
  • 18
  • 18
  • even

Question 3

Question
Follow the steps to determine if the function is odd, even, or neither.
Answer
  • 192
  • 0
  • neither

Question 4

Question
Follow the steps to determine if the function is odd, even, or neither.
Answer
  • -7
  • -11
  • neither

Question 5

Question
Follow the steps to determine if the function is odd, even, or neither.
Answer
  • -153
  • -89
  • neither

Question 6

Question
Even, Odd, or Neither?
Answer
  • Even
  • Odd
  • Neither

Question 7

Question
Even, Odd, or Neither?
Answer
  • Even
  • Odd
  • Neither

Question 8

Question
The graph is an even function because the degree is 2.
Answer
  • True
  • False

Question 9

Question
The graph is an odd function because it symmetric about the origin.
Answer
  • True
  • False

Question 10

Question
The graph is an odd function because it is linear.
Answer
  • True
  • False

Question 11

Question
The graph is an even function because it is reflected over the y-axis.
Answer
  • True
  • False

Question 12

Question
Which statement below best explains what an even function is?
Answer
  • An even function is a function that has an even degree (2,4,6...) and the same end behavior.
  • An even function is a function that is quadratic and has a positive leading coefficient.
  • An even function is symmetric about the y-axis and is equal for all value of x and -x.
  • An even function is a polynomial that can be reflected across the x-axis.

Question 13

Question
Which statement below best explains what an odd function is?
Answer
  • An odd function is symmetric about the origin and for all value of x and -x, f(x)=-f(-x).
  • An odd function is a reflection about the y-axis for all value of x and -x.
  • An odd function has a degree that is odd (1,3,5,...) and a positive leading coefficient.
  • An odd function is linear and has opposite end behaviors.

Question 14

Question
Select all of the following that represent EVEN functions.

Question 15

Question
Select all of the following that represent ODD functions.
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