Register
What can we conclude if, in general, the graph of a polynomial function exhibits the following end behavior? As x → -00, f(x) → -- and as x > 0, f(x) →. The polynomial function is of even degree and the
170k views
5 votes
What can we conclude if, in general, the graph of a polynomial function exhibits the

following end behavior? As x → -00, f(x) → -- and as x > 0, f(x) →.
The polynomial function is of even degree and the leading coefficient is positive.
The polynomial function is of odd degree and the leading coefficient is negative.
The polynomial function is of odd degree and the leading coefficient is positive.
The polynomial function is of even degree and the leading coefficient is negative.

User Kursus
by
5.4k points

2 Answers

1 vote

There's missing information. What does f(x) approach as x approaches negative infinity and infinity?

User Bretddog
by
5.4k points
5 votes

Answer:

1st answer: The polynomial function for this graph is of

odd degree and the leading coefficient is negative

2nd answer: The polynomial function for this graph is of even

degree and the leading coefficient is negative

Degree and Leading Coefficient

Explanation:

User Vincent Fourmond
by
5.5k points
Ask a Question
Welcome to QAmmunity.org, where you can ask questions and receive answers from other members of our community.

6.5m questions

8.6m answers

Other Questions

What is the least common denominator of the four fractions 20 7/10 20 3/4 18 9/10 20 18/25
What is 0.12 expressed as a fraction in simplest form
Solve using square root or factoring method plz help!!!!.....must click on pic to see the whole problem
What is the initial value and what does it represent? $4, the cost per item $4, the cost of the catalog $6, the cost per item $6, the cost of the catalog?
What is distributive property ?
Link Copied!