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What is the end behavior of the function f of x equals negative 4 times the cube root of x? as x β†’ –[infinity], f(x) β†’ –[infinity], and as x β†’ [infinity], f(x) β†’ [infinity]. as x β†’ –[infinity], f(x) β†’ [infinity], and as x β†’ [infinity], f(x) β†’ –[infinity]. as x β†’ –[infinity], f(x) β†’ 0, and as x β†’ [infinity], f(x) β†’ 0. as x β†’ 0, f(x) β†’ –[infinity], and as x β†’ [infinity], f(x) β†’ 0.

Respuesta :

The end behavior of the function is as:

as β†’βˆž, f(x)β†’+∞ and as xβ†’-∞, f(x)β†’+∞

What is end behavior?

The x-axis "endpoints" of a function's graph are referred to as its "end behavior" in this context.

How do determine the end behavior of a function?

choosing the polynomial function's greatest degree. The highest degree term will dominate the graph since it will expand more quickly than the other terms as x gets very big or very small.

Function f(x)=2βˆ›x has the following graph:

The behavior of the function at its conclusion is because it leads to infinity.

as Β xβ†’βˆž, f(x)β†’+∞ and as xβ†’-∞, f(x)β†’+∞

To know more about Β behavior of a function visit:

https://brainly.com/question/14361710

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