Which graph represents the function [tex]f(x) = 2^{x-3} + 3[/tex]?

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06-08-2024
Mathematics

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Which graph represents the function [tex]f(x) = 2^{x-3} + 3[/tex]?

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To identify the graph that represents the function [tex]$ f(x) = 2^{x-3} + 3 $[/tex], let's carefully analyze its shape and properties based on the calculated values:

1. Understanding the Function:
- The function [tex]$ f(x) = 2^{x-3} + 3 $[/tex] involves an exponential term [tex]$ 2^{x-3} $[/tex] which is shifted horizontally by 3 units to the right and vertically by 3 units upwards.

2. Behavior of the Function:
- As [tex]$ x \to -\infty $[/tex]: The term [tex]$ 2^{x-3} $[/tex] approaches 0, so [tex]$ f(x) $[/tex] approaches 3.
- As [tex]$ x \to +\infty $[/tex]: The term [tex]$ 2^{x-3} $[/tex] grows exponentially, so [tex]$ f(x) $[/tex] increases rapidly.
- At [tex]$ x = 3 $[/tex]: [tex]$ f(3) = 2^{3-3} + 3 = 1 + 3 = 4 $[/tex].

3. Key Points and Behavior at Specific Values:
- When [tex]$ x = -10 $[/tex], [tex]$ f(x) \approx 3.0001 $[/tex].
- When [tex]$ x = 0 $[/tex], [tex]$ f(x) = 2^{-3} + 3 = \frac{1}{8} + 3 \approx 3.125 $[/tex].
- When [tex]$ x = 3 $[/tex], [tex]$ f(x) = 4 $[/tex].
- When [tex]$ x = 10 $[/tex], [tex]$ f(x) \approx 1283 $[/tex].

4. General Shape of the Curve:
- The y-values start very close to 3 for very negative x-values. The function rises very slowly initially but starts increasing rapidly as x approaches larger values.
- As we go further to the right, the function grows rapidly without bound.

5. Characteristics of the Graph:
- The function has a horizontal asymptote [tex]$ y = 3 $[/tex] as [tex]$ x \to -\infty $[/tex].
- The curve sharply rises after moving past the point [tex]$ x = 3 $[/tex].

Considering these points, we can summarize:

- The function is close to 3 for large negative values and rises steeply as x becomes positive, particularly past the point [tex]$ x = 3 $[/tex].
- The function crosses the y-axis at around [tex]$ (0, 3.125) $[/tex] and [tex]$ (3, 4) $[/tex].
- The overall shape is an exponential curve that shifts upward by 3 units from the base exponential curve [tex]$ 2^{x-3} $[/tex].

Given these characteristics of [tex]$ f(x) $[/tex], the graph you are looking for will:
- Start close to the line [tex]$ y = 3 $[/tex] on the left-hand side.
- Increase gradually at first.
- Rise steeply as [tex]$ x \to +\infty $[/tex].

The graph that represents the function [tex]$ f(x) = 2^{x-3} + 3 $[/tex] would show this exponential behavior with the described properties.