Graph a 4th degree or higher polynomial function whose graph never cross the horizontal axis more than once

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asked Jan 15, 2023 232k views

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Johannes Jander · Answer 1 · 2023-01-19T22:44:39+0000

Answer:

$f\mleft(x\mright)=x^4$

Explanation:

The Fundamental Theorem of Algebra states that the degree of a polynomial is the maximum number of roots the polynomial has.

For polynomials, the degree of the polynomial represents how many times the function crosses the x-axis or the zeros it has. Then if we want to graph a 4th degree or higher polynomial that crosses the horizontal axis no more than once:

$f\mleft(x\mright)=x^4$

Graph a 4th degree or higher polynomial function whose graph never cross the horizontal-example-1

Graph a 4th degree or higher polynomial function whose graph never cross the horizontal-example-2

Graph a 4th degree or higher polynomial function whose graph never cross the horizontal axis more than once

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