To Describe: The degree and leading coefficient of the graph of the polynomial function.
The degree of the polynomial function is even and the leading coefficient is positive.
Given:
Concept Used:
In a graph if left end of the graph rises and right end also rises: the degree of the equation will be even, and the leading coefficient will be positive.
Description:
From the graph of the polynomial function, it is observed that
The end behaviour of the polynomial is
The degree should be even, and the leading coefficient should be positive.
Conclusion:
Therefore, the degree of the polynomial function is even, and the leading coefficient is positive.
Chapter 2 Solutions
Holt Mcdougal Larson Algebra 2: Student Edition 2012
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