Question

To find \(f \cdot g(x)\), we need to multiply the two functions \(f(x)\) and \(g(x)\) together.

Given: \(f(x) = \frac{\sqrt{x+1}}{3}\) and \(g(x) = \sqrt{x}\)

So, \(f \cdot g(x) = \frac{\sqrt{x+1}}{3} \cdot \sqrt{x}\)

To simplify this expression, we can combine the square roots by multiplying the terms inside the square roots together:

\(f \cdot g(x) = \frac{\sqrt{(x+1)\cdot x}}{3}\).

To multiply the terms inside the square root, we can distribute the \(x\) to both terms inside the parentheses:

\(f \cdot g(x) = \frac{\sqrt{x^2+x}}{3}\).

Therefore, \(f \cdot g(x) = \frac{\sqrt{x^2+x}}{3}\).

To find the domain of the function \(f \cdot g(x)\), we need to consider the domains of both functions \(f(x)\) and \(g(x)\).

Given: \(f(x) = \sqrt{x-2}\) and \(g(x) = \sqrt{5-x}\)

For the function \(f(x) = \sqrt{x-2}\), the radicand (\(x-2\)) must be non-negative.

\(x-2 \geq 0\)

Solving this inequality, we find:

\(x \geq 2\)

So, the domain of \(f(x)\) is \(x \geq 2\).

For the function \(g(x) = \sqrt{5-x}\), the radicand (\(5-x\)) must also be non-negative.

\(5-x \geq 0\)

Solving this inequality, we find:

\(x \leq 5\)

So, the domain of \(g(x)\) is \(x \leq 5\).

To find the intersecting domain, we need to find the common values that satisfy both domains.

The intersecting domain is \(2 \leq x \leq 5\).

Therefore, the domain of \(f \cdot g(x)\) is \(2 \leq x \leq 5\).

In equation form, the domain of \(f \cdot g(x)\) is represented as:

\(2 \leq x \leq 5\)

To graph \(f+g(x)\), we need to find the sum of the functions \(f(x)\) and \(g(x)\).

Given: \(f(x) = \frac{1}{x+4}\) and \(g(x) = \frac{7}{x+4}\)

To find \(f+g(x)\), we add the two functions, keeping the common denominator:

\(f+g(x) = \frac{1}{x+4} + \frac{7}{x+4}\)

To combine the fractions, we need a common denominator:

\(f+g(x) = \frac{1+7}{x+4}\)

Simplifying further, we have:

\(f+g(x) = \frac{8}{x+4}\)

So, the function \(f+g(x)\) is:

\(f+g(x) = \frac{8}{x+4}\)

Now, let's graph this function:

The graph of \(f+g(x) = \frac{8}{x+4}\) would be a hyperbola with a vertical asymptote at \(x=-4\) and the graph passing through the point \((-4, 2)\).

It would look something like this:

(See attached image for the graph)

I apologize for the confusion. As an AI text-based assistant, I am unable to directly provide a visual representation or attachment. However, you can easily graph the function \(f+g(x) = \frac{8}{x+4}\) using online graphing tools or software like Desmos or Wolfram Alpha. Simply enter the equation into the graphing tool and it will generate the graph for you.

To enter the equation \(f+g(x) = \frac{8}{x+4}\) into a graphing tool like Desmos or Wolfram Alpha, follow these steps:

1. Open the graphing tool in your web browser. For Desmos, go to desmos.com/calculator. For Wolfram Alpha, go to wolframalpha.com.

2. In the function input area of the graphing tool, type the equation as \(f+g(x) = \frac{8}{x+4}\).

3. If using Desmos, the equation will be automatically graphed. You can adjust the viewing window or zoom in/out to get a better view of the graph.

4. If using Wolfram Alpha, click the "Graph" button or press Enter to generate the graph. The graph will be displayed on the page.

Note: Make sure the equation is correctly entered, including parentheses and appropriate syntax for fractions.

To find the domain of the function \(\frac{f}{g}(x)\), where \(f(x) = \sqrt{-x}\) and \(g(x) = \frac{1}{x}\), we need to consider the restrictions of the domain for both functions.

For the function \(f(x) = \sqrt{-x}\), the radicand \(-x\) must be non-negative.

\(-x \geq 0\)

Multiplying both sides of the inequality by -1, we get:

\(x \leq 0\)

So, the domain of \(f(x)\) is \(x \leq 0\).

For the function \(g(x) = \frac{1}{x}\), the denominator \(x\) must be non-zero.

\(x \neq 0\)

So, the domain of \(g(x)\) is \(x \neq 0\).

To find the domain of \(\frac{f}{g}(x)\), we need to consider the common domain that satisfies both functions.

The intersecting domain is \(x \leq 0\) and \(x \neq 0\).

Therefore, the domain of \(\frac{f}{g}(x)\) is \(x < 0\).

From the answer choices provided, the correct domain for the function \(\frac{f}{g}(x)\) where \(f(x) = \sqrt{-x}\) and \(g(x) = \frac{1}{x}\) is:

\(\left(-\infty, 0\right)\) (Option: left-parenthesis negative infinity comma 0 right-parenthesis)

To find \(\frac{f}{g}(x)\), we need to divide the two functions \(f(x)\) and \(g(x)\).

Given: \(f(x) = \frac{1}{x+2}\) and \(g(x) = \frac{1}{x-3}\)

To find \(\frac{f}{g}(x)\), we divide the two functions:

\(\frac{f}{g}(x) = \frac{\frac{1}{x+2}}{\frac{1}{x-3}}\)

To divide fractions, we multiply the first fraction by the reciprocal of the second fraction:

\(\frac{f}{g}(x) = \frac{1}{x+2} \cdot \frac{x-3}{1}\)

Simplifying further, we have:

\(\frac{f}{g}(x) = \frac{x-3}{x+2}\)

Therefore, \(\frac{f}{g}(x) = \frac{x-3}{x+2}\).

To find the range of \(f \cdot g(x)\), we need to multiply the two functions \(f(x)\) and \(g(x)\) together.

Given: \(f(x) = \sqrt{x}\) and \(g(x) = 3x + 2\)

To find \(f \cdot g(x)\), we multiply the functions:

\(f \cdot g(x) = \sqrt{x} \cdot (3x + 2)\)

To simplify this expression, we can distribute the square root to both terms inside the parentheses:

\(f \cdot g(x) = \sqrt{x} \cdot 3x + \sqrt{x} \cdot 2\)

Simplifying further, we have:

\(f \cdot g(x) = 3x\sqrt{x} + 2\sqrt{x}\)

The range of \(f \cdot g(x)\) would depend on the domain of the function and the behavior of the square root function.

Since the square root function is always non-negative, the range of \(f \cdot g(x)\) would be all non-negative real numbers, including zero.

So, the range of \(f \cdot g(x)\) is \(x \geq 0\) or \([0, \infty)\).