Answer: ? Wha?
Step-by-step explanation:
Domain = set of input value
Range = set of output values
<h3>#1</h3>
- Domain: -2 < x ≤ 2 or (-2, 2]
- Range: -4 < y ≤ 4 or (-4, 4]
<h3>#2</h3>
- Domain: -5 ≤ x ≤ 1 or [-5, 1]
- Range: -1 ≤ y ≤ 5 or [-1, 5]
<h3>#3</h3>
- Domain: -4 < x < 4 or (-4, 4)
- Range: -1 ≤ y < 3 or [-1, 3)
I need a picture or an example to help you. To identify the slope and y-intercept you have to do slope intercept form. Y=mx+ b or y=slope+ y intercept. If you are looking at a graph then, the y intercept is the only point on the y axis. To find the slope on a graph you have to count how much the point rises and moves from each point. Like, if my point was (1,3) and the next point was (3,4). To get to (3,4) you would have to go up 1 and move 3 spaces to the right. Your slope would be 1/3.
Answer:
For the functions h and g, which statement is true if h(x) = x and g(x) = (x + 14)?
(F) The graph of g is the result of the graph of h being translated right 14 units.
(G) The graph of g is the result of the graph of h being translated left 14 units.
(H) The graph of g is steeper than the graph of h.
(J) The graph of g is less steep than the graph of h.
Step-by-step explanation:
For the functions h and g, which statement is true if h(x) = x and g(x) = (x + 14)?
(F) The graph of g is the result of the graph of h being translated right 14 units.
(G) The graph of g is the result of the graph of h being translated left 14 units.
(H) The graph of g is steeper than the graph of h.
(J) The graph of g is less steep than the graph of h.
