Question

The equation y=3x−2

describes a linear function. How does it compare to the linear function y=3x+2
?(1 point)
Responses

The first function has a growth rate of -2. The second function has a growth rate of 2. They both pass through (0, 3).
The first function has a growth rate of -2. The second function has a growth rate of 2. They both pass through (0, 3).

Both functions have growth rate of 3. The second equation is shifted down from the first equation.
Both functions have growth rate of 3. The second equation is shifted down from the first equation.

The first function has a growth rate of -2. The second function has a growth rate of 2. They both pass through (3, 0).
The first function has a growth rate of -2. The second function has a growth rate of 2. They both pass through (3, 0).

Both functions have a growth rate of 3. The second equation is shifted up from the first equation.

Answer 1

[AI-generated answer — Bot GPT 3.5]

The first function has a growth rate of 3 (the coefficient of x). The second function also has a growth rate of 3. The only difference between the two functions is the constant term, which is -2 in the first function and +2 in the second function. This means that the second function is shifted up by 4 units compared to the first function. Both functions pass through the point (0, -2).

Answer 2

-x+y=3, -2x+2y=3