1. Let f(x) = a* and g (x) = c + he where a, c, and h are constants. The graph of y = f(x) and y = g (x) are shown below & . The point of
intersection not lying on the y-axis have coordinates (*o, yo).
f(x)
9(a)
(20,Yo)
A. For each question below, circle the option that must be true based on the graph provided. If there isn't adequate information to determine any option in a specific row. circle "NOT ENOUGH INFORMATION.
a. The constants a and c satisfy:
a > c
< c
NOT ENOUGH INFO
b. The constants a and h satisfy:
a > h a < h
a = h
NOT ENOUGH INFO
c. The constants c and h satisfy:
c> h c < h
c = h
NOT ENOUGH INFO
d. If the constants a and c remain the same while the value of the constant h increases, then the value of o, the x-coordinates of the point of
intersection of f(x) = a* and g (z) = c + he:
INCREASES
DECREASES
STAYS THE SAME
NOT ENOUGH INFO
e. If the constants a and c remain the same while the value of the constant h increases, then the value of Yo. the y-coordinates of the point of
intersection of f(x) = a* and g (z) = c + hx:
INCREASES
DECREASES
STAYS THE SAME
NOT ENOUGH INFO
B. The graph of the function m (a) has a vertical intercept at (0, -2) and is perpendicular to the graph of g (x) = c + ha. Find the formula for function h(x). Your formula may include any or all of the constants a, c and d.
