1001 Algebra Problems.PDF

above the line y = 3xand below (or on) the

liney = –5. The system of linear inequalities

for which the shaded region is the solution set

is given byy 3 x,y –5.

345. b.The slope-intercept form of the lines 9(y– 4)
     = 4xand –9y= 2(x+ 9) are, respectively,y =
     ^49 x+ 4 andy = –^29 x– 2. The graphs of both
     lines are dashed, so the inequality signs used in
     both inequalities are eitheror. Next, note
     that points in the shaded region lie below the
     liney = ^49 x+ 4 and above the liney = –^29 x– 2.
     This tells us that the system of linear inequali-
     ties for which the shaded region is the solution
     set is given byy^49 x+ 4,y–^29 x– 2. This sys-
     tem is equivalent to 9(y– 4) 4 x,–9y2(x

+ 9), which can be seen by reversing the sim-

plification process used to obtain the slope-

intercept forms of the lines in the first step. In

doing so, remember that multiplying both

sides of an inequality results in a switching of

the inequality sign.

346. c.The slope-intercept forms of the linesy – x
     = 6 and 11y= –2(x+ 11) arey = x+ 6 andy =

•  121 x– 2, respectively. The graphs of both lines
  are solid, so the inequality signs used in both
  inequalities are either or. Next, points in
  the shaded region lie above (or on) the liney =
  x+ 6 and above (or on) the liney = – 121 x– 2.
  The system of linear inequalities for which the
  shaded region is the solution set is given by
  y x+ 6,y –  121 x– 2. This system is equiv-
  alent toy – x 6, 11y –2(x+ 11), which
  can be seen by reversing the simplification
  process used to obtain the slope-intercept
  forms of the lines in the first step.

347. c.The slope-intercept forms of the lines 5x–
     2(y+ 10) = 0 and 2x+ y= 3 are, respectively,y
     = ^52 x– 10 andy = –2x3. The graphs of both

lines are solid, which means that both inequal-

ity signs are either or. Points in the

shaded region lie above (or on) the line y=

^52 x– 10 and below (or on) the line y= –2x– 3,

so the system of linear inequalities for which

the shaded region is the solution set is given by

y ^52 x– 10,y –2x– 3 This system is equiv-

alent to 5x– 2(y+ 10) 0, 2x+y –3, which

can be seen by reversing the simplification

process used to obtain the slope-intercept

forms of the lines in the first step. In doing so,

remember that multiplying both sides of an

inequality results in a reversing of the inequal-

ity sign.

348. b.The slope-intercept forms of the lines
     7(y– 5) = –5xand –3 = ^14 (2x– 3y) are, respec-
     tively,y= – x+ 5 and y= ^23 x+ 4. The graphs
     of both lines are dashed, so the inequality
     signs used in both of the inequalities compris-
     ing the system are eitheror. Points in the
     shaded region lie below the line y= –^57 x+ 5
     and below the liney = ^23 x+ 4. This tells us that
     the system of linear inequalities for which the
     shaded region is the solution set is given byy
     –^57 x+ 5,y^23 x+ 4. This system is equiva-
     lent to 7(y– 5)–5x,–3^14 (2x– 3y), which
     can be seen by reversing the simplification
     process used to obtain the slope-intercept
     forms of the lines in the first step. In doing so,
     remember that multiplying both sides of an
     inequality results in a reversing of the inequal-
     ity sign.


349. d.The solution set for the system in choice ais
     the empty set. The solution set for the system in
     choice bconsists of only the points that lie on
     the line y= 3x+ 2, and the solution set of the
     system in choicecconsists of only the points
     that lie on the line y= x. So, the solution sets of

^5

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ANSWERS & EXPLANATIONS–