1001 Algebra Problems.PDF

Set 22(Page 57)

337. c.The graphs of the lines y= 4 and y= x+ 2
     are dashed, so that the inequality signs used in
     both of the inequalities comprising the system
     are eitheror. Next, note that points in the
     shaded region lie above the line y= 4 and
     below the line y= x+ 2. This means that the
     system of linear inequalities for which the
     shaded region is the solution set is given by
     y4,yx+ 2.


338. a.The graphs of the lines y= 5 and x= 2 are
     solid, which means that the inequality signs
     used in both of the inequalities are either or
     . Next, note that points in the shaded region
     lie above (or on) the line y= 5 and to the left of
     (or on) the line x= 2. Therefore, the system of
     linear inequalities for which the shaded region
     is the solution set is given byy 5,x 2.


339. a.First, note that the graphs of the lines y= –x

+ 4 and y= x+ 2 are dashed, which means

that the inequality signs used in both of the

inequalities in the system are eitheror.

Next, note that points in the shaded region lie

below the line y= x+ 2 and below the liney =

- x+ 4. This implies that the system of linear

inequalities for which the shaded region is the

solution set is given byyx+ 2,y–x+ 4.

340. a.First, the graph of the liney = ^14 xis dashed,
     so the corresponding inequality should involve
     one of the signsor. The graph ofy= –4x
     is solid (so the corresponding inequality should
     involve one of the signs or ). Points in the
     shaded region lie above the liney = ^14 xand
     below the line y= –4x. Therefore, the system
     of linear inequalities for which the shaded
     region is the solution set is given byy^14 x,
     y –4x.
     341. d.The slope-intercept form of the line 2y – 3x
     = –6 isy = ^32 x– 3. The graphs of this line and
     y = 5 – ^52 xare solid, so the inequality signs
     used in both of the inequalities are either or
     . Points in the shaded region lie above (or
     on) the line 2y– 3x= – 6 and above (or on)
     the liney = 5 – ^52 x. This means that the system
     of linear inequalities for which the shaded
     region is the solution set is given by 2y– 3x
     –6,y 5 – ^52 x.
     342. a.Given that the first inequality does not
     include equality, but the second inequality
     does, we know that the graph of the line y= 2
     is dashed and the graph of the line y= 2x+ 1
     is solid. Points that satisfy the inequality y 2
     must be above the line y= 2, and those satisfy-
     ingy
     2 x+ 1 must lie below the line y= 2x+
     
     
     1. The intersection of these two regions is given
        by the illustration in choice a.
     
     
     2. b.The slope-intercept forms of the lines 5y=
        8(x+ 5) and 12(5 – x) = 5y are, respectively,
        y = ^85 x+ 8 andy = –^152 x+ 12. The graph of
        the line y = ^85 x+ 8 is solid (so that the corre-
        sponding inequality should involve one of the
        signsor). The graph ofy = –^152 x+ 12 is
        dashed, so that the corresponding inequality
        should involve one of the signsor. Points
        in the shaded region lie below (or on) the line
        5 y= 8(x+ 5) and below the line 12(5 – x) = 5y.
        This implies that the system of linear inequali-
        ties for which the shaded region is the solution
        set is given by 5y 8(x+ 5), 12(5 – x) 5 y.
     
     
     3. d.The graph of the liney = 3xis dashed, so
        that the corresponding inequality should
        involve one of the signs < or >. The graph ofy
        = –5 is solid, so that the corresponding
        inequality should involve one of the signs
        or. Note that points in the shaded region lie
     
     
     
     

ANSWERS & EXPLANATIONS–