Answer:
It is a many-to-one function ⇒ answer B
Step-by-step explanation:
* To solve this problem lets revise some important notes
- We use the vertical line to check the graph is function or not
# If the vertical line cuts the graph in any part of it in only 1 point
then the graph represents a function
# If the vertical line cuts the graph in any part of it in more than 1
point then the graph doesn't represent a function
- We use the horizontal line to check the graph is one-to-one function
or many-to-one function
# If the horizontal line cuts the graph in any part of it in only 1 point
then the graph represents one-to-one function
# If the horizontal line cuts the graph in any part of it in more than 1
point then the graph represents many-to-one function
* Now lets use these notes to solve the problem
- Look to the attached graph
∵ The vertical lines x = -2 and x = 2 intersect the graph of f(x) in
only one point
∵ Any vertical line will cut the graph of f(x) in only one point
∴ f(x) is a function
- So answers A and C are not true, because it succeeds the vertical
line test and it is a function
∵ The horizontal lines y = -4, y = 4, and y = 11 intersect the graph of f(x)
in more the one point one point
∴ f(x) is many-to-one function
- So answer D is not true, because f(x) is many-to-one function
∴ Answer B is true because f(x) is many-to-one function
