The function g results when the graph of f(x) = 1/x is vertically stretched by a factor of 7, and then shifted 4 units to the right and 5 units up.

which equation describes the function g?

-g(x) = 7/(x-4) - 7
-g(x) = 7/(x-4) + 5
-g(x) = 7/(x-5) + 4
-g(x) = 7/(x+4) + 5
-g(x) = 7/(x+5) - 4

That's where you're wrong. I have attempted this. Just want to know if I'm doing it right that's all.

For example, my answer for this one is g(x) = 7/(x-4) + 5

Also, sometimes problems are broken down in this site so I thought maybe I would get lucky and have some break down the problem and I could see where I'm going wrong or right.
I see your point tho; sorry I guess.

nice homework dump.

Review the topic.
Show an attempt at these problems, and we can confirm or correct your answers.

your answer is correct.

see how easy that was?

It was easy I was just trying to check my answers that's all lol.

Sorry if it rubbed you the wrong way; I can definitely see why.

To find the equation that describes the function g, we need to understand the transformations applied to the original function f(x) = 1/x.

1. Vertically Stretching: The function is vertically stretched by a factor of 7. This means that all y-values are multiplied by 7.

2. Shifting Right: The function is shifted 4 units to the right. This means that the x-values are decreased by 4.

3. Shifting Up: The function is shifted 5 units up. This means that the y-values are increased by 5.

Combining these transformations, we can determine the equation for the function g.

Starting with f(x) = 1/x, which is the original function.

1. Vertical Stretching: Multiply the original function by 7.
g(x) = 7 * (1/x)

2. Shifting Right: Decrease the x-values by 4.
g(x) = 7 * (1/(x - 4))

3. Shifting Up: Increase the y-values by 5.
g(x) = 7 * (1/(x - 4)) + 5

Therefore, the equation that describes the function g is:
-g(x) = 7/(x - 4) + 5

Therefore, the correct option is:
-g(x) = 7/(x - 4) + 5