Which statement describes the behavior of the function f(x) = 2x/1-x2?

The graph approaches -2 as x approaches infinity.
The graph approaches 0 as x approaches infinity.
The graph approaches 1 as x approaches infinity.
The graph approaches 2 as x approaches infinity.

to eliminate any ambiguity. The graph of this function passes thru the origin (0,0) and has vertical asymptotes at x = -1 and x = + 1. The function is negative on (-1,0) and positive on (0,1).

Additionally, there are two horizontal asymptotes. As x grows large and negative, f(x) approaches zero from above. As x grows large and positive, f(x) approaches zero from below.

JoshuaOjeda0603 JoshuaOjeda0603 · Answer 2 · 2021-12-01T17:59:00+01:00

JoshuaOjeda0603 JoshuaOjeda0603

01-12-2021

Answer:

A and B

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Which statement describes the behavior of the function f(x) = 2x/1-x2? The graph approaches -2 as x approaches infinity. The graph approaches 0 as x approaches infinity. The graph approaches 1 as x approaches infinity. The graph approaches 2 as x approaches infinity.

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Which statement describes the behavior of the function f(x) = 2x/1-x2?

The graph approaches -2 as x approaches infinity.
The graph approaches 0 as x approaches infinity.
The graph approaches 1 as x approaches infinity.
The graph approaches 2 as x approaches infinity.