Which statement describes the end behavior of the exponential function f (x) = 2x - 3?

a For very high x-values, f (x) moves toward positive infinity.

b For very high x-values, f (x) moves toward negative infinity.

c For very high x-values, f (x) moves toward the horizontal asymptote.

d For very low x-values of x, f (x) moves toward negative infinity.

Question

Macie Bates

Mathematics

1 March, 08:09

Which statement describes the end behavior of the exponential function f (x) = 2x - 3?

a For very high x-values, f (x) moves toward positive infinity.

b For very high x-values, f (x) moves toward negative infinity.

c For very high x-values, f (x) moves toward the horizontal asymptote.

d For very low x-values of x, f (x) moves toward negative infinity.

+3

Answers (1)

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Stephanie Cardenas · Answer 1

The correct answer is a. for very high x-values, f (x) moves towards positive infinity.

This can always be determined by two factors.

1) is it linear or something else?

2) Is the lead coefficient positive or negative.

In this case, since the x is not being raised to a power or is not raised to a power itself, we know that there are no asymptotes. That takes care of #1 for us.

As for #2, since the coefficient of x (which is the highest power here) is positive, that means it continues to get bigger. If it were negative it would be the opposite. So, the correct answer is that as x gets bigger, f (x) moves towards positive infinity.