QUESTION 35
The correct answers are 2 and 8. Substituting
x =
a in
the definitions
for
f and
g gives
f (
a) = − 1
_
2 (
a − 4)
2
+ 10 and
g(
a) = −
a + 10, respectively.
If
f (
a) =
g(
a), then − 1
_
2 (
a − 4)
2
+ 10 = −
a + 10. Subtracting 10 from both
sides of this equation gives − 1
_
2 (
a − 4)
2
= −
a. Multiplying both sides
by −2 gives (
a − 4)
2
= 2
a. Expanding (
a − 4)
2
gives
a
2
− 8
a + 16 = 2
a.
Combining the like terms on one side of the equation gives
a
2
− 10
a + 16 = 0. One way to solve
this equation is to factor
a
2
− 10
a + 16 by identifying two numbers with a sum of −10 and
a product of 16. These numbers are −2 and −8, so the quadratic
equation can be factored as (
a − 2)(
a − 8) = 0. Therefore, the
possible values of
a are either 2 or 8. Either 2 or 8
will be scored as
a correct answer.
Alternate approach: Graphically, the condition
f (
a) =
g(a) implies the
graphs
of the functions y =
f (
x) and
y =
g(
x) intersect at
x =
a. The
graph
y =
f (
x) is given, and the graph of
y =
g(
x) may be sketched as
a
line with y-intercept 10 and a slope of −1 (taking care to note the
different scales on each axis). These two graphs intersect at
x = 2
and
x = 8.
QUESTION 36
Dostları ilə paylaş: 
