447,139 views
17 votes
17 votes
consider the function shown on the graph (picture below )“the graphed function is ____ (a radical/ a polynomial) function with an ____(even/odd) degree

consider the function shown on the graph (picture below )“the graphed function is-example-1
User Darius Jahandarie
by
2.7k points

2 Answers

24 votes
24 votes

Answer: the graph function is a polynomial function with an odd degree.

Step-by-step explanation: answer above

User Danvy
by
3.5k points
15 votes
15 votes

Solution:

The graph of a radical function is as shown below:

The graph of a polynomial is as shown below:

Given the graph function below:

The graph is a thus a polynomial graph.

A polynomial graph will have an even degree when the curve is symmetrical about the y-axis, where as when the curve is symmetrical about the origin, the polynomial graph will have an odd degree.

From the given graph, we observe that the curve is symmetrical about the y-axis.

Thus, the graph function is a polynomial function with an even degree.

consider the function shown on the graph (picture below )“the graphed function is-example-1
consider the function shown on the graph (picture below )“the graphed function is-example-2
consider the function shown on the graph (picture below )“the graphed function is-example-3
User Brunobastosg
by
2.5k points
Welcome to QAmmunity.org, where you can ask questions and receive answers from other members of our community.