Graph the exponential function $$ g(x)=-\left(\frac{1}{4}\right)^{x}-3 $$

Question

UpStudy AI · Accepted Answer

Certainly! Let's graph the exponential function:

$$
g(x) = -\left(\frac{1}{4}\right)^x - 3
$$

Since I can't provide a visual graph directly, I'll walk you through the key features and how to plot it step by step.

### 1. Understanding the Function

The given function is:

$$
g(x) = -\left(\frac{1}{4}\right)^x - 3
$$

This can be broken down into transformations of the basic exponential function $$ f(x) = a^x $$.

### 2. Basic Exponential Function

Start with the basic exponential function:

$$
f(x) = \left(\frac{1}{4}\right)^x
$$

- **Base Analysis:** The base $$ \frac{1}{4} $$ is between 0 and 1, so the function is **decreasing**.
- **Intercept:** At $$ x = 0 $$, $$ f(0) = 1 $$.
- **Asymptote:** The horizontal asymptote is $$ y = 0 $$.

### 3. Reflection Over the X-axis

Next, apply the negative sign to the function:

$$
f(x) = -\left(\frac{1}{4}\right)^x
$$

- **Reflection:** The graph is reflected over the x-axis.
- **New Intercept:** At $$ x = 0 $$, $$ f(0) = -1 $$.
- **Asymptote:** Remains $$ y = 0 $$, but the graph approaches it from below.

### 4. Vertical Shift

Finally, subtract 3 from the function:

$$
g(x) = -\left(\frac{1}{4}\right)^x - 3
$$

- **Vertical Shift:** The entire graph shifts **downward by 3 units**.
- **New Intercept:** At $$ x = 0 $$, $$ g(0) = -1 - 3 = -4 $$.
- **New Asymptote:** The horizontal asymptote shifts to $$ y = -3 $$.

### 5. Key Points for Plotting

Here are some key points to plot the graph:

| $$ x $$ | $$ g(x) = -\left(\frac{1}{4}\right)^x - 3 $$ |
|---------|--------------------------------------------|
| -2      | $$ -\left(\frac{1}{4}\right)^{-2} - 3 = -16 - 3 = -19 $$ |
| -1      | $$ -\left(\frac{1}{4}\right)^{-1} - 3 = -4 - 3 = -7 $$ |
| 0       | $$ -1 - 3 = -4 $$ |
| 1       | $$ -\frac{1}{4} - 3 = -3.25 $$ |
| 2       | $$ -\frac{1}{16} - 3 \approx -3.0625 $$ |
| 3       | $$ -\frac{1}{64} - 3 \approx -3.015625 $$ |

### 6. Behavior of the Function

- **As $$ x \to \infty $$:** $$ \left(\frac{1}{4}\right)^x \to 0 $$, so $$ g(x) \to -3 $$. The graph approaches the horizontal asymptote $$ y = -3 $$.
- **As $$ x \to -\infty $$:** $$ \left(\frac{1}{4}\right)^x = 4^{-x} \to \infty $$, so $$ g(x) \to -\infty $$.

### 7. Sketching the Graph

1. **Plot the Asymptote:** Draw a horizontal dashed line at $$ y = -3 $$.
2. **Plot Key Points:** Use the table above to plot points at $$ x = -2, -1, 0, 1, 2, 3 $$.
3. **Draw the Curve:** Connect the points with a smooth curve that approaches the asymptote as $$ x $$ increases and decreases without bound as $$ x $$ decreases.

### 8. Graph Summary

- **Y-intercept:** $$ (0, -4) $$
- **Horizontal Asymptote:** $$ y = -3 $$
- **Behavior:** The graph decreases rapidly from left to right, approaching $$ y = -3 $$ as $$ x $$ becomes large.

### 9. Example Plot Points

Here's a quick reference of some points:

| $$ x $$ | $$ g(x) $$ |
|---------|------------|
| -2      | -19        |
| -1      | -7         |
| 0       | -4         |
| 1       | -3.25      |
| 2       | -3.0625    |
| 3       | -3.015625  |

### 10. Visual Representation

While I can't draw the graph here, following the steps above with graph paper or a graphing tool (like Desmos or GeoGebra) will help you visualize the function accurately.

---

**Summary:**

The graph of $$ g(x) = -\left(\frac{1}{4}\right)^x - 3 $$ is a decreasing exponential curve reflected over the x-axis and shifted downward by 3 units. It passes through the point $$ (0, -4) $$, approaches the horizontal asymptote $$ y = -3 $$ as $$ x $$ increases, and decreases without bound as $$ x $$ decreases.
The graph of $$ g(x) = -\left(\frac{1}{4}\right)^x - 3 $$ is a decreasing exponential curve that passes through the point $$ (0, -4) $$, approaches the horizontal asymptote $$ y = -3 $$ as $$ x $$ increases, and decreases without bound as $$ x $$ decreases.

Graph the exponential function \( g(x)=-\left(\frac{1}{4}\right)^{x}-3 \)

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