EVEN/ODD FUNCTION

Question 1

Question

Follow the steps to determine if the function is odd, even, or neither.

Image:

8b08b826-c983-40d8-8622-5ef125df3852 (image/png)

Answer

-6
18
neither

Question 2

Question

Follow the steps to determine if the function is odd, even, or neither.

Image:

9d8be305-afc5-4555-b0c5-d04ad936d84b (image/png)

Answer

18
18
even

Question 3

Question

Follow the steps to determine if the function is odd, even, or neither.

Image:

d2189294-1ea2-415f-8e7f-7073abc24fac (image/png)

Answer

192
0
neither

Question 4

Question

Follow the steps to determine if the function is odd, even, or neither.

Image:

0d1e91b8-5379-4dd7-8755-4851696342e9 (image/png)

Answer

-7
-11
neither

Question 5

Question

Follow the steps to determine if the function is odd, even, or neither.

Image:

a0a829df-a248-40ac-83f6-0021f845875e (image/png)

Answer

-153
-89
neither

Question 6

Question

Even, Odd, or Neither?

Image:

a8fb7878-f35d-4a07-be03-630a8ab1f753 (image/png)

Answer

Even
Odd
Neither

Question 7

Question

Even, Odd, or Neither?

Image:

6b5a78bd-c007-41ba-abad-bca9f3623020 (image/png)

Answer

Even
Odd
Neither

Question 8

Question

The graph is an even function because the degree is 2.

Image:

ba187e5b-3f30-4d2c-9eb9-4ed7e44feada (image/png)

Answer

True
False

Question 9

Question

The graph is an odd function because it symmetric about the origin.

Image:

b5ebb68e-3fa8-4090-ab66-69b12ddf560f (image/png)

Answer

True
False

Question 10

Question

The graph is an odd function because it is linear.

Image:

967ee9bc-c53f-4775-85c4-03ca41a4eb36 (image/png)

Answer

True
False

Question 11

Question

The graph is an even function because it is reflected over the y-axis.

Image:

7596f7de-2222-4f16-9ce6-25b4e8ff7fca (image/png)

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.

Answer

Image:
29cfac94-657a-4a56-bafe-6f2d1e931be3 (image/png)
Image:
bf077d0a-073c-45ed-bac0-3fd91b6d7ed6 (image/png)
Image:
4885bad0-3814-4233-b661-57534f901f2d (image/png)
Image:
78a859fb-d550-48ae-95fb-5149d222de79 (image/png)
Image:
33cb4c23-6869-41de-9faf-765eb99a62db (image/png)
Image:
023f259f-9f57-45cf-97a1-698d5e1be140 (image/png)

Question 15

Question

Select all of the following that represent ODD functions.

Answer

Image:
867d8d81-128a-44a6-98e3-d53ff37770d8 (image/png)
Image:
66cf71c1-4b18-4694-8545-d460cd8bd932 (image/png)
Image:
daa344a0-3b36-4c0a-910b-58f726a6d581 (image/png)
Image:
04fbeba9-e6ae-4fdf-a471-9738ce20fb71 (image/png)
Image:
7a69e44d-53ec-479b-8b52-34984839dc1e (image/png)

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EVEN/ODD FUNCTION

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Resource summary

Question 1

Question 2

Question 3

Question 4

Question 5

Question 6

Question 7

Question 8

Question 9

Question 10

Question 11

Question 12

Question 13

Question 14

Question 15

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	Created by Staci Gallun over 7 years ago