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Which describes the end behavior of the graph of the function f(x)=5x^3-3x^2+x?

Which Describes The End Behavior Of The Graph Of The Function Fx5x33x2x class=

Sagot :

hellohi120
Answer: f(x) = 5x3-3x2+x
f(x) —> - ♾ as x —> - ♾
and f(x) —> ♾ as fx —> ♾

Step-by-step explanation:
We can see it is cubic polynomial with positive leading coefficient.
Degree of polynomial is 3 and leading coefficient +3
End behavior depends on two parameter degree and leading coefficient.
It would be negative infinity as x approaches to negative infinity and positive infinity as x approaches to positive infinity.
We can see in graph also. Please take a look attached graph.
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