downward. If the line had a positive slope, sloping
upward, then the point ( 1 , 2 ) would be above the line
and would satisfy y> mx + b, which is not what is
given. 43. G 45. 96 days
- 2 < x < 7 <i i i—i i cd i -+*
-3 -101 - one solution: ( - 6 , - 9 ) 48. one solution: (2, 0)
- no solution
Lesson 6-6
Go t It?
pp. 400-405
2a
y
m
! ; | VMs.
\s X
y< -jx + 1
y < 1* + 1
b. No; the red line is dashed
so points on that line are
not included in the
solution.
2 x+ 2 y < 126,
x< 50, y> 10
0 10 30 50 70
- You can substitute the ordered pair into each inequality
to make sure that it makes each true. 5. Not necessarily;
as long as there is some overlap of the half-planes, then
the system will have a solution. 6. You need to find the
intersection of each of the two systems, but the intersections
of lines will be a point or line and the intersections of
inequalities will be a line or a planar section.
Ex e r c i se s 7. yes 9. no
(^11) y4i
/ i
f/
//
J
/
' { X
t :> L
/ 7 /
I/
y
I t
V
4- V X
— \ *
V
- y
\
21.
-5-
3
IH
/
I
1 -
»
/
X
0 t
/
X
2 3. y < x + 2, y < -\x 25.y>2,y>x+1
2 7. Let x = hours driven by slower driver, let y = hours
driven by faster driver.
29a. y 4 f
/
/ X
—■ / (^0) /
/
/!
/
t
b. No; they have the same
slope and different
y-intercepts, so they will
never intersect, c. no
d. No; there are no points
that satisfy both
inequalities.
- You can buy 5 T-shirts and 1 dress shirt or 2 T-shirts
and 3 dress shirts. 33. C 3 5. Check students' work. - The graph shows two lines, one passing through (1,1)
c
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