ࡱ> sur` bjbjss 4,JJJJtK4,_HMNNNNNNN^^^^^^^$F`hb_E5PNN5P5P_NNJ_wQwQwQ5PjNN^wQ5P^wQwQwQN:O,wQfO$ONNN__aQNNN_5P5P5P5P,,,9= ,,,=,,, Math 141 Practice Test # 1- KEY: Chapter 1, 2.1, 6.1 6.3 1.Not a function. (Input of 4 has 2 outputs.) D = {4, 8} R = {2, 3, 5} 2.Function (Substituting values for x yield only one answer.) D = {x| x > - 3} or [ - 3,  EMBED Equation.3 ) R = {y| y > 0} or [0,  EMBED Equation.3 ) 3.Function (Passes vertical line test) D = (- EMBED Equation.3 , EMBED Equation.3 ) R = [- 4,  EMBED Equation.3 ) 4.Not a function (Input of 1 has 2 outputs.) D = {1, 3, 5} R = {2, 4, 6} 5.D6.C7.A8.I9.D10.H11.A.[- 7, 4] B.[- 2, 4]C.(- 4.5, 0), (2, 0)D.(0, 3.5)E.(2, 0) F.(0, 3.5)G.NeitherH.(- 7, 0) and (2, 4)I.(0, 2) J.f(- 2) = 2K.f(3) = 212.a. Graph x- 4-3-20 y- 101- 3b. D = ( -  EMBED Equation.3 ,  EMBED Equation.3  )c. R = (- EMBED Equation.3 , 1]d. x-intercepts: (-3, 0), (-1.5, 0); y intercept: ((0, - 3)13.a.Graphx- 2 - 10123y12350- 1b. D = [ - 2,  EMBED Equation.3 )c. R = ( -  EMBED Equation.3 , 5]d. x-intercept (2, 0); y-intercept (0, 3)14.a.OddCk for even f(x) = f(-x) x = - x NOCk for odd f(-x) = - f(x) -x = - (x) -x = - x YESb.EvenCk for even f(x) = f(-x) -2x2 = -2(-x)2 -2x2 = -2x2 YESNo need to check for Oddc.NeitherCk for even f(x) = f(-x) x3 1 = (-x)3 1 x3 -1 = - x3 1 NOCk for odd f(-x) = - f(x) (-x)3 1 = - (x3 1) - x3 1 = - x3 + 1 NOd.NeitherCk for even f(x) = f(-x)  EMBED Equation.3  NOCk for odd f(-x) = - f(x)  EMBED Equation.3  NO15.a.(f"g)(x) = (3x + 1)(- 4x  3) ! - 12x2  9x  4x  3 ! - 12x2  13x  316.b.(g-f)(x) = (- 4x  3)  (3x + 1) ! - 4x  3  3x  1 ! - 7x - 4c.  EMBED Equation.3  =  EMBED Equation.3 d.(f + g)(x) = (3x + 1) + (- 4x  3) ! 3x + 1  4x  3 ! - x - 2AnswerWork / thinking17.A.m = - 2Coefficient of xB.(0, 3) Let x = 0, find y. y = -2(0) + 3 ( y = 3C.DecreasingNegative slopeD.Zero at 3/2 or (3/2, 0)Let y = 0, find x. 0 = -2x + 3 ( -3 = -2x ( 3/2 = xE.-2 or -2 / 1Average rate of change is the same as slope for linear functions.17.F.18. F. 18.A.m = - 1 / 3Coefficient of xB.(0, 1)Let x = 0, find y. C.DecreasingNegative slopeD.Zero at 3 or (3, 0)Let y = 0, find x. 0 = -1/3x + 1 ( -1 = -1/3x ( (Multiply by -3/1) ( 3 = xE.-1 / 3Average rate of change is the same as slope for linear functions.19.5 / 7Avg. rate = (y / (x = (y2 y1) / (x2 x1) = (7-2)/(4- -3) = 5 / 720.A. LinearConstant rate of change: as x values increase by 1, y values increased by 2B.LinearConstant rate of change: as x values increase by 1, y values increased by 0C.Not linearRate of change is NOT constant: as x values increase by 1, y values increase by 3, then 4, 5, and 6 21.(3, 3)Solve the 1st equation for y by subtracting 2x from both sides. ( y = -2x + 9. Substitute for y in the 2nd equation. ( 3x 2(-2x + 9) = 3 ( Use the distributive property 3x + 4x 18 = 3. Combine like terms 7x 18 = 3 ( Add 18 to both sides of the equation 7x = 21 ( Divide by 7 to get x = 3. Substitute x = 3 into the 1st equation ( 2(3) + y = 9 ( Subtract 6 from both sides of equation to get y = 3. 22.(1, -2) EMBED Equation.3 Adding the two equations gives 43x = 43 or x = 1. Substitute x = 1 into the 1st equation ( 4(1) 3y = 10 ( -3y = 6 ( y = -2 23.(5, 1) EMBED Equation.3 R1 = r1 + r2 ( EMBED Equation.3 ( R1 = r1  EMBED Equation.3 2 ( EMBED Equation.3 ( R2 = r1 r2 ( EMBED Equation.3 ( x = 5, y = 1 24.A.(-2, -12) EMBED Equation.3 Adding the two equations gives -23x = 46 Or x = - 2. Substitute -2 for x in 1st equation ( 4(-2) 3y = 28 ( -3y = 36 ( y = -12 B.No solution EMBED Equation.3 Adding the two equations gives 0 = - 22 This is a false number statement ( inconsistent system ( no solution C. EMBED Equation.3  EMBED Equation.3 Adding the two equations gives 0 = 0 This is a true number statement ( dependent system (same line) D.(5, 21)Multiply 1st equation by 6 (the LCD) and the 2nd equation by 2 (the LCD) to get rid of the fractions. New system has the equations 9x - 2y = 3 and 4x y = - 1. Multiply 4x y = - 1 by 2 and add to 9x 2y = 3 to eliminate the ys and get x = 5. Substitute x = 5 into 4x y = - 1 ( 4(5) y = - 1 ( 20 y = - 1 ( 21 = y 25.A.Independent system X = 1, Y = 2, Z = 3 (unique solution) B.Consistent systemx + 2y + 8z = 0, y + 3z = 2, 0 = 0 (dependent solution) Solve for x and y in terms of z ( x = -2y 8z; y = - 3z + 2; z can be any real number C.Inconsistent systemNo solution because last row 0 = 3 is a false statement. 26.x = -1, y = 4, z = 0Subtract equation 2 from equation 1 (x + y + 6z = 3) (x + y + 3z = 3) ( 3z = 0 ( z = 0. Using the 1st and 3rd equations and substituting z = 0 ( x + y = 3 and x + 2y = 7. Subtracting the (new) 1st equation from the (new) 2nd equation, (x + 2y = 7) (x + y = 3) ( y = 4. Substituting y = 4 and z = 0 into the original 2nd equation ( x + 4 + 3(0) = 3 ( x = - 1. 27.1500 children tickets, 700 adult ticketsLet x = # of children tickets; y = # of adult tickets ( x + y = 2200 (number of tickets) and 1.5x + 4y = 5050 (money). Multiply the 1st equation by -1.5 and add the two equations ( 2.5y = 1750 ( y = 700. Substitute 1500 for y in the original 1st equation ( x + 700 = 2200 ( x = 1500 28.Dimensions: 15 cm by 12 cm.Let x = length, y = width. Area: xy = 180, perimeter: 2x + 2y = 54. Solve for x or y in area equation ( :;<    q r } ~  ؽاؽاؽاtؽاc!jhT[Qhb CJEHUaJ!jhT[Qhb CJEHUaJ!jhT[Qhb CJEHUaJ!jhT[Qhb CJEHUaJ+jJ hT[Qhb CJOJQJUVaJjhT[Qhb CJUaJhT[Qhb >*CJaJhT[Qhb CJaJhT[Qhb CJaJhoFhb hb 5 hf!V5&;<?  OSkd$$Ifl0|)(' t644 laSkd$$Ifl0|)(' t644 la$If   " # $ ' QSkda $$Ifl0|)(' t644 laSkd$$Ifl0|)(' t644 la$If        F G K L m n Ŵꞩu_Nuu!j%hT[Qh>rNCJEHUaJ+jJ hT[Qh>rNCJOJQJUVaJjhT[Qh>rNCJUaJjhT[Qhf!VCJUaJhT[Qh>rNCJaJhT[QhVCJaJhT[QhT[QCJaJ!jr hT[Qhb CJEHUaJ+jJ hT[Qhb CJOJQJUVaJjhT[Qhb CJUaJhT[Qhb CJaJhT[QhyCJaJ' v w x { } ~ $$Ifa$gdb Skd $$Ifl0|)(' t644 la$If $$Ifa$gdb Skd$$Ifl0|)(' t644 laFf$If     " ) * - 8 ; D E F $$Ifa$gdVFf $$Ifa$gdb Ff$IfF G K & $Ifkd$$Ifl  i_E|)(!N0 t6$$$$44 laK M ` d g j l m $$Ifa$gd>rN$If $IfgdVm n o p 60'0 $IfgdV$Ifkd"$$Ifl40ִE!|)`(`qZ r  t6    44 la $If $$Ifa$gd>rN 60'0 $IfgdV$Ifkd#$$Ifl40ִE!|) ( qZ r  t6    44 la $IfgdV$Ifjkd$$$Ifl4.F|) ( qO t6    44 la    M P T U V X Y ^ _ ` a e f i j k l m n o p q s t x y z { | } ~  ο߮~~~~~~~~~s~~~~~hT[QhT[QCJaJhT[Qh??CJaJj/hT[Qhf!VCJUaJhT[Qhb CJaJhT[QhyCJaJ!j*hT[Qh>rNCJEHUaJjhT[Qh>rNCJUaJ!j'hT[Qh>rNCJEHUaJ+jJ hT[Qh>rNCJOJQJUVaJhT[Qh>rNCJaJ- $IfgdV$Ifjkd)$$Ifl4.F|) ( qO t6    44 la  $IfgdV$IfjkdB*$$Ifl4.F|) ( qO t6    44 la  $IfgdV$Ifjkd,$$Ifl4.F|) ( qO t6    44 la  L $IfgdV$Ifjkd-$$Ifl4.F|) ( qO t6    44 laL M N O P T V ;Skd/$$Ifl0|)(' t644 la$Ifjkd\.$$Ifl4.F|) ( qO t6    44 laV Y _ a f j l n p r s t u v w x z | ~ FfH=Ff9 $$Ifa$gd??$If    %&1289BCst꺩꺘hT[Qh??CJH*aJhT[Qhb CJaJ!jChT[Qh??CJEHUaJ!j*@hT[Qh??CJEHUaJ+jJ hT[Qh??CJOJQJUVaJjhT[Qh??CJUaJhT[QhT[QCJaJhT[Qh??CJaJhT[Qh>rNCJaJ2 jkdq?$$Ifl4"F|) ( qO t6    44 la$If $IfjkdB$$Ifl4"F|) ( qO t6    44 la $IfjkdB$$Ifl4"F|) ( qO t6    44 la $IfjkdzE$$Ifl4"F|) ( qO t6    44 la  $Ifjkd3F$$Ifl4"F|) ( qO t6    44 la      ! ;SkdG$$Ifl0|)(' t644 la$IfjkdF$$Ifl4"F|) ( qO t6    44 la! % 1 > S ^ m x Rkd7H$$Iflr:|)( t644 lap2$If Rkd@I$$Iflr:|)( t644 lap2$If RkdIJ$$Iflr:|)( t644 lap2$If  $7RkdRK$$Iflr:|)( t644 lap2$If 7U`oRkd[L$$Iflr:|)( t644 lap2$If  !"#$58FHtv,JŴuugugu_Puj?UhT[QhT[QCJUaJhT[QCJaJhT[QhT[QCJH*^JaJhT[QhT[QCJ^JaJhT[QhT[QCJaJ!jQhT[Qh%eCJEHUaJ+jJ hT[Qh%eCJOJQJUVaJ!jmNhT[Qh%eCJEHUaJ+jJ hT[Qh%eCJOJQJUVaJjhT[Qh??CJUaJhT[QhHCJaJhT[Qh??CJaJRkddM$$Iflr:|)( t644 lap2$If  1234RkdS$$Iflr:|)( t644 lap2$If459<$IfSkdT$$Ifl0|)(' t644 laVPPPPP$IfkdV`$$Ifl4r:,|)( `w` t644 lap2.02VPPPPP$Ifkdla$$Ifl4r:,|)(  w  t644 lap22468:<>VPPPPP$Ifkdb$$Ifl4r:,|)(  w  t644 lap2>@BJVPPPPP$Ifkdc$$Ifl4r:,|)(  w  t644 lap2JLrtvx~DV\,.>F|cϾ娗shshZhshshZhZhsh jhT[QhHCJaJhT[QhHCJaJhT[QhH5CJaJhT[Qh%eCJaJhT[QhT[QCJ^JaJ!j*ghT[QhT[QCJEHUaJ+jJ hT[QhT[QCJOJQJUVaJ!jdhT[QhT[QCJEHUaJ+j݊J hT[QhT[QCJOJQJUVaJhT[QhT[QCJaJjhT[QhT[QCJUaJVPPPPP$Ifkdi$$Ifl4r:,|)(  w  t644 lap2FHJVPPPPP$Ifkdj$$Ifl4r:,|)(  w  t644 lap2JLNPRTVPPPP$Ifkdk$$Ifl4r:,|)(  w  t644 lap2TVXZ~u $Ifgdf!V$If{kdl$$Ifl4\,|)( w  t644 laZ\^`n $Ifgd $$Ifa$gd Skdm$$Ifl0|)(' t644 la^RRI= dh$Ifgd $Ifgd $$Ifa$gd kd'n$$Ifl\_ |)( T t0644 la<^RRI= dh$Ifgd $Ifgd $$Ifa$gd kdn$$Ifl\_ |)( T t0644 la<>@F\z^RRI= dh$Ifgd $Ifgd $$Ifa$gd kd=o$$Ifl\_ |)( T t0644 laz|~^RRI= dh$Ifgd $Ifgd $$Ifa$gd kdo$$Ifl\_ |)( T t0644 la b^RRI= dh$Ifgd $Ifgd $$Ifa$gd kdSp$$Ifl\_ |)( T t0644 labcgjltv^RRIII $Ifgd $$Ifa$gd kdp$$Ifl\_ |)( T t0644 lacfjklstuvw~!"(,67?C9=жШШРШВВІІІІ~hHCJaJhT[QhHCJH*aJ jDhT[QhHCJaJh CJaJ jhT[QhHCJaJhT[QhT[QCJaJjͳhT[Qh CJUaJhT[QhHCJaJjiqhT[QhT[QCJUaJhT[QhH5CJaJh 5CJaJ0vw{~K??6 $Ifgd $$Ifa$gd kd$$Iflr_ |)(} t0644 laRFF= $Ifgd $$Ifa$gd kdk$$Ifl\_N |)(  t0644 la dh$Ifgd ^RRI= dh$Ifgd $Ifgd $$Ifa$gd kd$$Ifl\_N |)(  t0644 la>^RRI= dh$Ifgd $Ifgd $$Ifa$gd kd$$Ifl\_N |)(  t0644 la>?@CJ^RRI= dh$Ifgd $Ifgd $$Ifa$gd kd $$Ifl\_N |)(  t0644 la^RRI= dh$Ifgd $Ifgd $$Ifa$gd kd$$Ifl\_N |)(  t0644 la8^RRI= dh$Ifgd $Ifgd $$Ifa$gd kd"$$Ifl\_N |)(  t0644 la89:=D^RRI= dh$Ifgd $Ifgd $$Ifa$gd kd$$Ifl\_N |)(  t0644 la^RRI@@ $IfgdH $Ifgd $$Ifa$gd kd8$$Ifl\_N |)(  t0644 la >ARSX[z|HTV`abnopq¶¨¶¨¨¨͝¶¨¨͕ՕjhT[QCJUaJhT[QCJaJ jh CJaJ jhT[QhT[QCJaJhT[QhT[QCJH*aJhT[QhT[QCJaJh CJaJhT[QhT[Q5CJaJhT[Q5CJaJhT[QhHCJaJhT[Qh CJaJ2  ^UUUUU $Ifgd kd$$Ifl\_N |)(  t0644 laJK^RRIII $Ifgd $$Ifa$gd kdN$$Ifl\_N |)(  t0644 la&'78ABKLOQXYlmnopquvz{|}~˿˴˴˴˩˅tkkk˴\jǔK hT[QCJUVaJhT[QCJH*aJ!jHhG<hT[QCJEHUaJj\ƔK hT[QCJUVaJhT[QhT[Q5CJaJhT[Q5CJaJhT[QhT[QCJaJ jhT[QCJaJhhT[QCJH*aJhT[QCJaJjhT[QCJUaJ!jhhT[QCJEHUaJj K hT[QCJUVaJ KLPQX^RRIIII $Ifgd $$Ifa$gd kd$$Ifl\_N |)(  t0644 laϷϗwf!jP hG<hT[QCJEHUaJjǔK hT[QCJUVaJ!jhG<hT[QCJEHUaJjǔK hT[QCJUVaJ!jhG<hT[QCJEHUaJjHǔK hT[QCJUVaJhT[QCJH*aJhT[QCJaJ jhT[QCJaJjhT[QCJUaJ!jhG<hT[QCJEHUaJ$   ,-./|~!"78FGHJKLͲ͕͊͊͊{j͊͊!jhvjhT[QCJEHUaJjȔK hT[QCJUVaJ jhT[QCJaJhG<hT[QCJH*aJ!j0hG<hT[QCJEHUaJj,ȔK hT[QCJUVaJjhT[QCJUaJhT[QCJaJhT[QhT[Q5CJaJhT[Q5CJaJhT[QhT[QCJaJhG<hT[QCJaJ) X^RRIIII $Ifgd $$Ifa$gd kd $$Ifl\_N |)(  t0644 laEF^UI@@@@ $Ifgd $$Ifa$gd $IfgdT[Qkd$$Ifl\_N |)(  t0644 laFGHKc^RRIIII $Ifgd $$Ifa$gd kd$$Ifl\_N |)(  t0644 laL_`abcdwxyz ()23679:uvwyz !ouuhC_hT[QCJH*aJhT[Q5CJaJhT[QhT[Q5CJaJhT[QhT[QCJaJ jhT[QCJaJ!jhvjhT[QCJEHUaJjɔK hT[QCJUVaJjhT[QCJUaJ!j hvjhT[QCJEHUaJjɔK hT[QCJUVaJhT[QCJaJ.12^RRIII $Ifgd $$Ifa$gd kd$$Ifl\_N |)(  t0644 la237:Ntu^RRIII $Ifgd $$Ifa$gd kdB$$Ifl\_N |)(  t0644 lauvwz^RRIII $Ifgd $$Ifa$gd kd$$Ifl\_N |)(  t0644 la!5no^RRIII $Ifgd $$Ifa$gd kdX$$Ifl\_N |)(  t0644 laoptu^RRIII $Ifgd $$Ifa$gd kd$$Ifl\_N |)(  t0644 laopsuNPjl[ \ !!%!&!6!7!B!C!F!H!!!56noxyPصصͳتتتhT[QCJH*aJUhX-rhT[QCJH*aJhhhT[QCJH*aJ jhT[QCJaJhT[QCJaJhT[QhT[Q5CJaJhT[Q5CJaJhT[QhT[QCJaJA % A!B!^RRIIII $Ifgd $$Ifa$gd kdn$$Ifl\_N |)(  t0644 laB!C!G!H!d!PQ^RRIII $Ifgd $$Ifa$gd kd$$Ifl\_N |)(  t0644 la x = 180 / y. Substitute into the perimeter equation ( 2(180/y) + 2y = 54. Multiply everything by the LCD = y ( 360 + 2y2 = 54y. Quadratic equation = 0, reduce the equation by dividing by 2, and use quadratic formula ( 2y2 54y + 360 = 0 ( y2 27y + 180 = 0. y = 12 or 15. Substituting into the perimeter equation gives x = 15 or 12. 29.2.5 lbs of Kenyan, 0.5 lbs of Sri LankaLet x = lbs of Kenyan, y = lbs. of Sri Lanka. Pound equation x + y = 3; cost equation 3.5x + 5.6 y = 11.55. Multiply pound equation by 35 (-35x 35y = -105) and price equation by 10 (35x + 56y = 115.5). Adding the two new equations ( 21y = 10.5 ( y = 0.5. Substituting into the pound equation ( x + 0.5 = 3 ( x = 2.5 PQRUWjkwxhT[Qhb CJaJ jhT[QCJaJhT[QCJaJhT[QhT[Q5CJaJhT[Q5CJaJhT[QhT[QCJaJhX-rhT[QCJaJQRVWj^RRIII $Ifgd $$Ifa$gd kd$$Ifl\_N |)(  t0644 la^\kd$$Ifl\_N |)(  t0644 la21h:pF</ =!"#$% $$If!vh5 5'#v #v':Vl t065(5'Dd b  c $A? ?3"`?294.!Տ`! 4.!Տ:@Rx=NawGrT^@ !!딢F  DD%q[Ǘlvv!؀?D!"@Q2.祸IKbid2\Jқrh 9)aǟzxؐbmܛwcWFlp,H8E\f'b۟c܃( X(/_~K95ڐ$$If!vh5 5'#v #v':Vl t065(5'Dd b  c $A? ?3"`?294.!ՏW`! 4.!Տ:@Rx=NawGrT^@ !!딢F  DD%q[Ǘlvv!؀?D!"@Q2.祸IKbid2\Jқrh 9)aǟzxؐbmܛwcWFlp,H8E\f'b۟c܃( X(/_~K95ڐ$$If!vh5 5'#v #v':Vl t065(5'Dd b  c $A? ?3"`?294.!Տ`! 4.!Տ:@Rx=NawGrT^@ !!딢F  DD%q[Ǘlvv!؀?D!"@Q2.祸IKbid2\Jқrh 9)aǟzxؐbmܛwcWFlp,H8E\f'b۟c܃( X(/_~K95Dd b  c $A? ?3"`?294.!Տ`! 4.!Տ:@Rx=NawGrT^@ !!딢F  DD%q[Ǘlvv!؀?D!"@Q2.祸IKbid2\Jқrh 9)aǟzxؐbmܛwcWFlp,H8E\f'b۟c܃( X(/_~K95Dd b  c $A? ?3"`?294.!Տ `! 4.!Տ:@Rx=NawGrT^@ !!딢F  DD%q[Ǘlvv!؀?D!"@Q2.祸IKbid2\Jқrh 9)aǟzxؐbmܛwcWFlp,H8E\f'b۟c܃( X(/_~K95ڐ$$If!vh5 5'#v #v':Vl t065(5'$$If!vh5 5'#v #v':Vl t065(5'$$If!vh5 555!55a555 5  5  5 5 ;5 ;5N55$555#v #v#v#v!#v#va#v#v#v #v #v #v ;#vN#v#v$#v#v#v:Vl t065(5!55&5 5f555 )5 J5 5 5  5  55$5 555Pkd $$Iflּ N J>&0:S!#%'|)(!& f)J    !"#$%&'()*+,-./0123456789:;<=>?@ABCDEFGHIJKLMNOPQRSTUVWXYZ[\]^_`abcdefghiklmnopqtwyxz{|~}Root EntryP F\mvData jWordDocumentO4ObjectPoolR@9m\m_1250616789F@m@mOle CompObjfObjInfo "#$'*-038;>ADGHILOPQTWZ]^_abcdefgijklmo FMicrosoft Equation 3.0 DS Equation Equation.39q! H " FMicrosoft Equation 3.0 DS Equation Equation.39qEquation Native )_1250620580 F@m@mOle CompObj fObjInfo Equation Native  X_1250620675F@m@mOle  !<8  x+1  = "x+1  FMicrosoft Equation 3.0 DS Equation Equation.39q!@@l;  "x+1  =CompObj fObjInfoEquation Native \_1250614731F@m@m" x+1  FMicrosoft Equation 3.0 DS Equation Equation.39q!5  fg()(x)Ole CompObjfObjInfoEquation Native Q_1250620865 'F@m@mOle CompObjfObjInfo FMicrosoft Equation 3.0 DS Equation Equation.39q!6l 3x+1"4x"3 FMicrosoft Equation 3.0 DS Equation Equation.39qEquation Native R_1268024588F@m@mOle CompObj f$  t6PPPP44 la$$If!vh5 5'#v #v':Vl t065(5'$$If!v h5 55:55555K5  #v #v#v:#v#v#v#v#vK#v :Vl t065(5!5N5550555  pZ kd{$$Ifl  i_E|)(!N0 t6$$$$44 lapZ$$If!v h5 55:55555K5  #v #v#v:#v#v#v#v#vK#v :Vl t065(5!5N5550555  pZ kd$$Ifl  i_E|)(!N0 t6$$$$44 lapZ*$$If!v h5 55:55555K5  #v #v#v:#v#v#v#v#vK#v :Vl t065(5!5N5550555  Dd *'#0  # A"MgYIۙC)@=!gYIۙCTr%ܥ5*xŘLUeǟ.p5Tdخ .SIʒ?ʏv%cdyLiL@,Y?,cu3[ssCq{W9?{} u9~RI~E\"ASB{,H{l境ޠ"P9mb\ZLɰX6?^=ox6l<%vtEVFf(I ۫_(|2P8Y Vf𽲞%kni0Bf - L´EaڙiWnt+3 *lI:#k(L3E YaK+'E G8RlfM&L)cdjX&fLLdd[w)L1TS19rFcl\ckJ85xWXǺQAamǣ. L$~#]]> r7̴y׽\x&޷rzq1~mrq6b&{l&=Rkɸhwci}NGVB>gt_ POn)?y/WQ:]$@*^CLn-+l9!m+&Kzz_7gc+0ʡweBYגf0Z٣;\"|Izn)cksKԸG6e-Vu$$SG2t$[lfM&L56O%!愡5= #Q 2Scaj5&0M&i:j=>~db `=/m>3g5v7\ N?&7Yo`{3, ZM-D2a0`2Xf]H_ ՛!ћ$֒dj)K3雐=Prr,F>z=R$Y:zdn!"Ns|ls.gO/=9Qo6xOv TQ@зs7f| i`AaZo?m_ o#YaEKt(zۙiWn0 sK +*a-) &Ua:#k0̤+GaV1Jav٥0E)L3f18~!|-(Pq,Ch3u4{?'-4tOoT Q<M_0gIuqȐ2{e8Ƅhp%Omm% Y53AT3skE mLט+Kn P7|3CW?"P"F?`WiPT  FbobS@$6U=r0fvgfgΎ!re–6[g-+iQD̜Ndr <{UX rQ|%@exK"ZNh!Gha)8 %nwհ \ÆʽYʄT8̲ۨ"to'gRaq\ .Xؗ-ؚ@7%,,@1%”(Lb U1`sXÊӡNa:a>2Lglsfbf 3[1`~LHvl4sB.$ØIwMf4if0S]LY,b)Sa6ey=qf00\f7̝2 יj>fs>E'. Gʄwuj&9~ey>Gu:,rRM| kFS %?L`)LeupU??* H'ۊܒ^̾F#-T̮N?Gk?2"+lkub{1T8*yy~gujk+nl/9wQni Wm(OgiTr kۗhɥdZ#ߊ g=JkgNvᇕu׉ 8;ccz1B]l0!q)z! .u} Gʪ`}-g*WiCa|1>'N{Sm5<`j4"~0G$m,t:DUO["Vӑ_(ϧ'Uo‘w,^}W]B E>n&sI ~a}hc-o?uط^ܧ]x4ϩe֒w߭u&:~sufNseZKkXim)GEeW% ݯ>~I0:Ft:Za&kZku>IkpuLf0S]LA֙>Zz^9cc!t,0Y2`Juh-i}IC^h\Qa6eyυe9ae4geyK|S'M>w緣娫"\092FX&[oK.4xu|66n͂%)n5ĭF@k}$?*KGd[*}e(gsO7?)Q諶gǑeht/_g-.3ۊ#)2'N]ĭ~][ b=r>r9VMy\/,B`;qvF!Ĺjq<]:u]:ZrDK2 Z)`(PBŬB1%”(Lb*PL-Zlfb4*f0I190vj~q<c:7JG"]MTk0$c3;L.\Ōfb惙oyl}6\3Nϱw>":(ˠc:[ي)SE,RL 0}4zJid_'{Irk_J/4LǩD=Cx$չmƎ4I0*8ڪ҈'s }3EKTN`C׿,iXqWouۆv#gZ^ssρk׾k0^Eפ+CtMDׅ렫]tLT{prt{}$$If!v h5 5555>5~555 5 t5 L5 O#v #v#v#v#v>#v~#v#v#v #v t#v L#v O:Vl4 t06++5(5q55;55{5}55 5 w5 o5 'kd!8$$Ifl4  i Jr]m"$-'|)`(`q;{}wo t6000044 la}$$If!v h5 5555>5~555 5 t5 L5 O#v #v#v#v#v>#v~#v#v#v #v t#v L#v O:Vl4 t06++5(5q55;55{5}55 5 w5 o5 'kd;$$Ifl4  i Jr]m"$-'|) ( q;{}wo t6000044 la$$If!vh5 55#v #v#v:Vl4" t06++5(5q5ODd b o c $A ? ?3"`? 294.!Տn@`! 4.!Տ:@Rx=NawGrT^@ !!딢F  DD%q[Ǘlvv!؀?D!"@Q2.祸IKbid2\Jқrh 9)aǟzxؐbmܛwcWFlp,H8E\f'b۟c܃( X(/_~K95ڷ$$If!vh5 55#v #v#v:Vl4" t06++5(5q5O$$If!vh5 55#v #v#v:Vl4" t06++5(5q5ODd b p c $A ? ?3"`? 294.!ՏC`! 4.!Տ:@Rx=NawGrT^@ !!딢F  DD%q[Ǘlvv!؀?D!"@Q2.祸IKbid2\Jқrh 9)aǟzxؐbmܛwcWFlp,H8E\f'b۟c܃( X(/_~K95ڷ$$If!vh5 55#v #v#v:Vl4" t06++5(5q5O$$If!vh5 55#v #v#v:Vl4" t06++5(5q5O$$If!vh5 55#v #v#v:Vl4" t06++5(5q5O$$If!vh5 5'#v #v':Vl t065(5'$$If!vh5 555 5#v #v#v#v #v:Vl t065(5555p2$$If!vh5 555 5#v #v#v#v #v:Vl t065(5555p2$$If!vh5 555 5#v #v#v#v #v:Vl t065(5555p2$$If!vh5 555 5#v #v#v#v #v:Vl t065(5555p2$$If!vh5 555 5#v #v#v#v #v:Vl t065(5555p2$$If!vh5 555 5#v #v#v#v #v:Vl t065(5555p2Dd hb q c $A? ?3"`? 2v N`!v " @F|xڕR=KAH xD "DJ"_$)m"!x]T" ]j[%hZ70`2c$CDZq15@<ҥE9Xax̲{xcbSF;G>YV}'E "y?p!t&B eMed(FVZd)}b[QQO~=;n6.v8 Xt*}c?[7# 'sjQx<7ľeĚ5>49xH~z=c W%kʼnuv #ЃxHj-jX DxV )Dd hb r c $A? ?3"`? 2ONE;^([JJQ`!ONE;^([J2` @|xڕRKPM HEݕNnvBjcjD'?CGPߏ`p}ᄏw<:? )RC@8Hvc>}| !2ύtP:Fܿc(ʫTܼwE#9 6v z 7O= g}z]L^+^%şg|oqpiۏ>g)ny<Zj \{˹h$w8fLzAEY$Z,͖AV@cQd M㿃H$$If!vh5 555 5#v #v#v#v #v:Vl t065(5555p2$$If!vh5 5'#v #v':Vl t065(5' Dd !0  # A " Q9>BGo U@=g Q9>BG,0BbS/;5 xŚLUϹ<^!aH (eEZlKۇRaeBQ"JզY͘[4.PgeJcIÂFluw;{^py7{9{yO !^g4!ʥC^_,ĬyB-[\ U~&p Q%:ijb$~!f] 6­"6 ,l Ωt^翃D:7ispVd} 쩥+Pw+ 48K'V\?y./=08<  ubRKTqHL1y)1T0Z4?0~tŘ0\':c)=IR1XL>0eL50ՌcL0G>˘g[;OL?cx3US -%&1m1` 4Ujk=z֣s2opN-8ELxZĬ7J`*-L#1& L9JQg2:0Ѥb4i0ٲS˶'L0kYk2-hAhu9 6N_ qjxlJƸOau9qfh`ۥz掮q4S(~B(H iB瞻)lwSWlWHu7oդ3{+q?%X<古*(½yk Jɠ/wK߽9uZ?h+p]6[q K̨4|αM}#禑wk;l:bSę'"( 6 6%_{39vzש6?$1/l1yzsom˯eˠ:E闪MچnJ .zB3t+bуqQб:8VK΀zSܒg.窞Ao3B5w8?: f|ࣀJכn86 2̸r+'%2gd;#~\)ԱPkhYp8ρ*S~}xV71H:Mc@ >DU-vE:tZ@S(\&#i]@l11ṯ0YdoDZsHlZօa8кЁec tYĬ7J`*#ZNZ_i]CZFk9n#L{@ HLɴݦuiUhv8`8:Y5n`-ibN `nX>bLFFs7D1>b)f[̌gQb6 ny҉GzgeEo&1& wMoTzHBGz IKY%fɴ7HA20zpwѰz#4ϴ^ 6wk$^U.#K$}]|=hݑ{DZ ьh(kQ= npk-PvZ>FI#'E&[5SO 뒬ƺdoA@9ku qO hpdmy}Ou3I'&1Ϙjv.2}.5WR9[ALcjeL1ui1M41?o߄q[4jLir"1`9Oy.cs1I,6Eָ̐]7XHӒZeH/4|`813f0%˘j`UyW#ǘ`:SKL-cNs1ǘ^`z#hNj&}^boGh8Lqb3ƭ 19ǘ9aL?1ŚҟYcvbyD޿G:1eiv?-I#&142&\ƴAm1[a|1;0fX=n>t: [mʱa_J99a_i0D'rCF'^EkhOcn懦`_4T{͒Ps~O\WDGl~&St>qSWXOg~f||DžQX?K6eƻ[\6?Z~bg 9Bߦ6~9D?;bgp?`CF6(_T/r}m_#󃯑R]/!՚^S]'y {`oX!~GN.2p/@ 9nCQƾΤuӷoHc]R'&ǧ7 򆔱_Qޘh]X2~,|Cʇ4+Qx].MJb4{_&|WQ8?\E50?|懫ASRzFNR*uy 3X _U0^M`'`{Ӆ ڛ'4$$If!vh5 5555a#v #v#v#v#va:Vl4 t06++5(55 5w5p2$$If!vh5 5555a#v #v#v#v#va:Vl4 t06++5(55 5w5p2$$If!vh5 5555a#v #v#v#v#va:Vl4 t06++5(55 5w5p2$$If!vh5 5555a#v #v#v#v#va:Vl4 t06++5(55 5w5p2|Dd b  c $A? ?3"`?2``7{$ad`!``7{$a8hxcdd``f 2 ĜL0##0KQ* W*d3H1)fY =sC0&dT20|`bB]F"LL_,a K L *'031d++&1t\> {BdeĵɞUkTHL`@dBԞ`ӡa`~Z%1@penR~C+ WG!W9 P{f2Y PbF[%L῀UrAc ;n+KRszA`Pdk),Ā`X y=^Dd [lb  c $A? ?3"`?2Mv=j3-lng`!|Mv=j3-lv`SJxcdd``f 2 ĜL0##0KQ* W9URcgbR PtfĒʂT/&`b]F"L L`0 roB2sSRs:V~. _Y^Cdej\ j3c XA 27)?{G!3`{tb@3f1e${zͭs8[wF&&\ {:@ |b@33X?)oP$$If!vh5 5555a#v #v#v#v#va:Vl4 t06++5(55 5w5p2$$If!vh5 5555a#v #v#v#v#va:Vl4 t06++5(55 5w5p2$$If!vh5 5555a#v #v#v#v#va:Vl4 t06++5(55 5w5p2$$If!vh5 555a#v #v#v#va:Vl4 t06++5(55w5$$If!vh5 5'#v #v':Vl t065(5'$$If!vh5 55 5#v #v#v #v:Vl t65(55 5T$$If!vh5 55 5#v #v#v #v:Vl t65(55 5T$$If!vh5 55 5#v #v#v #v:Vl t65(55 5T$$If!vh5 55 5#v #v#v #v:Vl t65(55 5T$$If!vh5 55 5#v #v#v #v:Vl t65(55 5T$$If!vh5 55 5#v #v#v #v:Vl t65(55 5TdBDdfMNN   C *AGraph 1F RAUM9UjzTAqFAUM9UjzTJFIFLEAD Technologies Inc. V1.01(#(#!#.+(0=fB=88=}Y^Jfǣް+..=5=xBBx  }!1AQa"q2#BR$3br %&'()*456789:CDEFGHIJSTUVWXYZcdefghijstuvwxyzw!1AQaq"2B #3Rbr $4%&'()*56789:CDEFGHIJSTUVWXYZcdefghijstuvwxyz ?خa0*bI+耨o.68{+e ^oXP<|8\ahEά̮Ϋ/FKG`*'WaZ (L( `( ( ( ( ( ((*ܓ%v~f!2-H6d~ thRK>8+el P0 '5YAo+I섋€ )S@P@)P@PLS @(L ((L H'hlbCu(h#2#FUo0锒jc(zfUS\Ţp3X65R}S @P@P@PY p=M0@ (eހr8Z)sӚ@ ""gU_Rp)n\d7}wy/J@$idc4nr9g` e8zs@ =(hk|NMkNj/Q4U!W/ :flvI "Vevgj`ShQHohh"@~SԀcƀ@z(ր `:W@_`()Ҁ>P(iOTy%h&2 K]iєI% NVԀi@APր?J`:z(Z(u@ht\_SLl_C=zzh}3@9ƀbF oƘ {Frzxpb}.2 h `}p pPcB|hn?{4_P_EC}p_VlzQϖFkѢ m{4/fEen4KwCtP@o(Zu5(h҄@ZOTp u Ezր@ ?|}(>C(_>S@27Wf )h~i(@0~@ `K1LSoQpp>v(!E B;G!Hk|B篠.&yzP(#@{m/P(p( Pߥ yGPm_\?@50~aA*_Rw|$e+^&Ft)!ASd4$[DnObjInfo! Equation Native !_1268041308,$F@m@mOle %~! 434x"3y=10!16x"12y=409x+4y=1!27x+12y=3{ FMicrosoft Equation 3.0 DS Equation Equation.39qZ& 9Z+8?o@ G@F`69(qyqX/ݦՄfn~m 3P5e6_~5et.<X0.+## F8/( "Wq)IpG0]`?( " | ?Zh 1YPOJu5:z@ E-5{hh?(Z`: hGALWPGju4@ zx?[R@tRh@?|}(>Ct}(h@ F~ԓ ݚ.Ǩ ̾`S(dhZZ`"H͵si_GS yIdQEC"?‹,p ,毣(/<7_;_FM7M/=4X. 7_]ѿ@ yEp`pɢѿ@$\toɠ7ɠ=H]4OT`l9^sxT#QP_ZEusހ}hxJv:!u~a@m0@ ??:js,j .]F@I?ZO$`czƱDcX/(hc=XNT`c@APH::Gր@ hGA@ @(h:i(\ zŃW E z֘ J': nZLSCH~PNG$ nsx-2'tH0zkG%h,J˨QpZ`5L~@ 1 ~HSCH~W֐7 u0GրJ5XJHShhGn2Z S61W :TS@-"o0H>ktZu04$&?<Z([Y Ao3)NaرY)@!(i@@0~褀Z(~ <\Q1u;ɋy(,'(2i|.E<] \:tQv1$E`'iɋy'( Q~:tQpʏy(?E "i|.QfȢ"?է(|_ʋ{ȿ`)0 ؿ1al-" jmۡ&Ak I7uD"ع ([TA R/E]-򎾔Zt~TB| (:SM'PE*p[A"%A;i`F0; T\_SHl_v.ק Ѡ`k4FAp}@5:z@ GҀQP[ր@ hGA@ LJHPGS# I^{Q%@+8?1 ?? .JL6vz6GҀ ?*F x~TaG@HS(CtRhLRQP[րL4QPB@~@4@ %&C o!m2kw?q+fb5AX u8j08_q6;1*\J7c D&+3$ 3)^+dhr'ԜslvcP>0@z E  ^Z@: @u  :Riukgp?>h֐٦=(]Gݤ/L]}h?tܾGPjk^?@ ?Z_iWP*j2_@L}}ʽ?vdG(&'d2 b*ᱍj~|˙ EpJ+@]MTv%*s kرF׸UJhV%%H􈿪JI=6d_jh2d?F.eG)h73@ Sc&9E'`?ZBdWQ6 .d_j4?*Z2u&_yWur_@K|}r_@(/}r GPOu5~4`!h_)P[֐?J`()P/Oƀ@ ҘOQ@,.Z; VyL~Fr-.r9OqNՐ_)h@>kh/J@:oCRiti(p0 <zw>u]R8Q>F(w7@ V?7}ۏZM?n?!n+u~ToP|Rwߕ0nv[w|@=in:7OJ}PtŐl=k[jv '֢AHumc?)w\ ̲Ʋ.0CYg`dG ||` poѿEBp8o#:u/|,4XdPE_1}4, _1}4XFEW.G |VW=?N "<7iXѿNb7h tRPOu0w~վu0 Lo @ ohGA@ LJ@:>SԀYdಒ=^ \mNF1Ҳ$;U|Ub-S{FFk?ys!"c5-!@ ~`L= E E`7 :@!(hM>(@ @ _I(ʬ 0<B0'_ |Bb ?EE } ,Dhoާ_ ,Bd{ڀl:,zxR Gic*x?(<@ GH֋b}:@ր?AsNw`rE\%i[)viԟ3# GqS ?:(| Pq޷hL "J[t[0;#PI#dz?NO~PWր@ ?˜t@ @ _HP@ ?xS\h_(hO(kvh0t@(h?J`- 4e>vd?JE-n"W}=J8pmT㣨4nAgٯWr(æiB[W0ƪW*.:P/G@Qp~QPG?*]Ƚ})Zq*w<QpGȿ|T\h ~EE|"L_?Er @ @&u2es9ǹ5\p-R~4J,tP E ^ZuQR nZu5iҀ@zZgcW#Q8r",qQM+[$CU9Y&>[# 8aiNZ`5{io@!(hM(@K @6c=Ѻ4Y\te#ҩ;Hi˃E靬?.Nab}_70}=had;i0aG3 ! go_C'o񣙅yj9h/a`'آݍG3~>>ySG3~.5{O1f>y1I"&?M~Ŀ.~ě%p.G?飘#~.{Q pN:Ӌ >Ow_o XdPI-کqnz>hߪRذ?w\Z˛aOG?9w_G7>]@>Z? ?.Z7l0?sgS]R˯֧k=?sZp}c)9?Ÿ8XCd@?w? \a%2ːʻOo^Y &5.n22J.i *~oқ3b(>CtP@?€@ nZu5P()C:)Up- ~04gzCZB\ueq) Zs]CҀ@ ~:z@-0u7Z~u}h"{6l8c*Ӳ/D# /ݤ6w P?/0_p_@/ף@>ehO/ף@N~eIOѠ !:wF rNh^/ΝƖ;}?4h0a˧ƍP$?F|@$O |ΟZ\ĿOIƍ\K aa&q'U ^E||/נ bٝh0ă]T#g#! O/נ|W; ?*B(}oUw<_J@/꿕0oE_)`Ґ $zP_C~P@2bdc4`V,ckzVMŶ"u_`1hQP@(h?JZC-S/\7*@)/P3D."&JKW:V1Dp}UE"YkZu04/Z`5{io?J`:Zk@@tRiPNw 4Adcs<+۳tLfEmjSw$(Y= )&d ~\ f2i.G+Of {X*drL)o&GM8Ǜ\"yH*/MǗ\'yOOQP o'Β:TլЬ *3L(Vc 'VUǕ/x5pa1%]T͏ߘ,?ohݷ?Ǝ.m7ݷ?Ƌy?ƋSS%$Gq {y56Ϳ14XVlݷ?ƕ]<,Cۯ`)^KV8~u=qV?ưkQ~@p?v}G]y48?ohݷ4X~EEcۯ?ͿOw{.?ƀ#oҀq~i[t2J@: BP))<`_B[~PAަR@}d䃷Sh?JevVAO(:sZ/gmn-K5^Z@: yǥ@sR[ $F8A<NiX,XC8(<򥨅&ܑTJI4jh@ZCP >\7H @ _)վƲѷFwֲ=EiU/u/#`MtPIo?J`:zZ`5P/ LkshW,nawku^&&iǿiq^4vn῿OC@]c:|5nd+Yv(a `(u @.({_Zhu~aLo_ @!u>aLޟOTe6aU*>u!pfB,|`̏`"euE_2?ElIxQ]xوюx_zZ1G_ZM0͏z/EefǴ~1E<B0e'_ ,w_΋6=‹0͋z'(<'(c} ,4?_Pc} <B~ @0~P0@z(րL@^ E݇}Jm+LֳGt)A@ZCRiSU$iUGp-`E+[@ H^'`wZ6Ab{,ܜ?i?y)!"tZ1CtPW֋o@Z.O"Z`5顀(]Z):P @ ^Zu7 u~v>SH(iJ@:hƗPOP@ El$sb;o@ L_)W}hԀi@|b,KV_Q1f&9b[֒ZCm g%)i/AH{hh~, L4u0 E @0ʬ2L_?NxӯE+ɋy)݀yQqv"]y1fȢXbi"C1'jX'Z`FT_?J!<ׯE|"׆ i|.p,OQv^8KyJq%V-Tet*?Ȭ"T_*?濕!=i|i.BUGp.lOʤbu*jm(/E5Qr(@ؿxGJd}E\fX6 !A$kndV5v/sB E>^Uv:nxLl_C3@ {f6Ѡ?_Ѡ/ @4P_tP>QfobXyz7w)'3=Vi^C4Rim=ҩ9 oGT6jF#|ERVn"q(=Sh1+yv87"ze9&Ar*E[F/E7l+zqkqpR uS\7@ Lu5z֘OJu5`L?t_(i:@ @Bh0%67;?_o C)c!\#`~ NE$- +dX;HL/OMIGյodیp?*nz W %þ: cH,#ڃ(q+NX `sX,; <0Vav5O0?ˆMEL{[x`Sea?ѿ! F-̀Ku`$dIP'B?m?o!S|]MLa!x#P xl?  Ҙ Pr7Jvߥ >aҘx~T 7@C`Cm0Hx~T@ux~Thp̽?ף@h2?z4p_O@?2?zN.$?zzbO/ף@~POkhC_(^Zu7Z:W@4-0) @ =  zxI_**@JtRh7֘}(>0@~~PWրL@ GtRP[;M֦\ Hu0__@ߴ|} SdN?@ +ʑБ7n3 y\1?ҟ#\;m•kDR̿O=U+я\ Y}h?Zɴ|} ?Zj*Zvd_j42ʽ?֠u_^PZ~Uh_j4r5K.[o?/oZv[!-\Z`#~Oրq(_)( u5:z@ E-5{hM49q%';_=mUnE#KfN샡 @*}ii8ߗd2;S`b+c#<{ӌS@n <,BsTk,[(X k;TIȭغk~P=S<Up-E-5~}h>ktZu04Z`5{iaSitPW@: i8aր T.*B@ hN.ɢ5\su;xo`#E$r-m~F0ɥ`"4.7ʚ݀E"nR+«.cpNGCfnӺycX<s#'s!,v"iH~s9SR`;xoҰILKWZ.=xoXp8o` ѿE.>n'UGp-o| ѿEEqpɤ|`"piǣ&p=?hۇM#0]4 |` h& zM p0z4.@!a=*`#i0 ր~P?Oƀ@z(ր }@u Gր4m >x'2Kpb"QR3l ARW}h=E-S?\7H"HV?nZ:PtPHP)i oh/Z(ʬ70c} ,G1ׯ|tY_΋06:,_1?`"/_Z,]fn]xtܿ .G:`z΀6GEPG@ (uh9MS<_Up-_)j?Zu7 :,[ֆu0@C?J:, L40@ @@ H~~@ @hZE;z n;PX8hvʀl< PQ` ?*,*>v/G@ ʿ@vT#_ʀ-?TVBzoqW P,q_ʐ GҐ G?v(lbi|.b q"C]y14E`"ӯE G<\v?(|"G]*?濐Q?_ʋG<T*.@-Ҁ@ ~@@"@QP_QPҐh uS?\7@ @tPվokvu#}~-'?J`: =E:tPPtP@ e .yK}w0VEw}.f-}./fJ/=[4\7n4\=[4\d/-ƋFaEPvVF:i hovV~a7N.vSS\XW[Tmi~Q@.0|ڐߥ7i0}JFS}`O JOi~@) a=Myt@ ~EB?‹z?v7?•]=_Nz\_*@uҀ:4/P/}hh?P[htP/Ju4}O NjWn~Z@::ݾ=u04~hX~@!(hM:~P@ `Ă3Lğ_@VC?F|@ IѠѠ&O=6::h}?4hm9ޟZ|Vc:hĿO@e#?F|$'h,?F.$'h&Iܟz|@l2'ihO/ƍXSA)1Jst@p:@ _ʀyWg9_ʀf?ݠ٠;?_΀ݠ8_΀_΀Euym_@d_j3'e_9rg- ( ( ( ( ( (/-չd0@ ( JZ(H `( )DDdPIN   C *AGraph 2F R[Dy#\U%/J7DF/Dy#\U%/JJFIFLEAD Technologies Inc. V1.01(#(#!#.+(0=fB=88=}Y^Jfǣް+..=5=xBBx  }!1AQa"q2#BR$3br %&'()*456789:CDEFGHIJSTUVWXYZcdefghijstuvwxyzw!1AQaq"2B #3Rbr $4%&'()*56789:CDEFGHIJSTUVWXYZcdefghijstuvwxyz ?خqfҾ@YՏ-}[wl\>a \>s0GQf'OpL]E)F%L ( ( ( ZS(P@)PH `)R `)PH )PEj'C;1طy[{ԮKj_60B= )Ght,KRm\t@1¸֪0vM##hmX P@P@P@P@P@&@ @ )R ( ( ݹF@⮜SLáM”`u_ -V }͌⮫$G6# S@cCJHf}d0uyz ,U bR@R@PH `"C= @@P@ vA@M[(;sŸW:qss+ Ew)[?7#J,gEIE㑊,Y "vAR@XGG^0툶>`q8`.*2t ('A!^~w4A @(6R+J?<6+S`rVEl)x/!6H*h\F%VBg30=j,mՋvZFPL ( @&@)tl:,O:/ЧfDYoO CjFUt-#`FQ u9SΝ g&922H֐[aO?*wt2c+OB`'rqF=C,89\eB& (ӯ|Qp" Ucx4]3ӺB7&=6( ^e+|v~Bs'4@PL Ah=mnOt6d[Ie~+ FKrngES#.l(X1ncP?’v2\{ !>eQE +K(j#Y9s;li:@4[4\ľ}pĠp_i\ycտCظ<~BFzƿ4 Xi#AT7=(jFZuCIiEb ڀ*i˺X95R5&Nd`z*v@]x`:~PSCH_(PP[htS: (IiqVu (%O֯_t+R,,VȣfsR6 `Cw@:~hE:[@/Ž-5LP7CH @4-qSGPy`~`FO;ƳܣLM_΋l:,ZX"~b@ WG_|4X pb7hợtɠ>F4]<N!vchv~ch5 c /WPw>4@PL!hх_O@ SC&ʝ¤_@ ?tqLĝ%| Z0},^p)m?oPUhC)o @ -_omi:nex}@<ӸcQ_Ҹ=[4\?3H"|G_ʄK0>cN$aGTU p`z C[u%"@W7ր@ 1P[ր@zA@ LC0H )PH= E-5{hh?nP_ZZj@O>C: Z`TJ=%oU -Ҁ@ ?yh@ @tS>f! 0ttc./OQfe} ] ƍ7),3tА|`X3ӺJ>P@0 (Q~i_G(Wh;XҀm0~EP<~#h1vߘ`a@ dWPO֣@/֠|@Cn@$?z4 FƇ`?^l~T?@ }O𦀧` IvSFя? w}@~t-ƋտEZ5y5o1v/@i|\,L_?9"s~pD_ʐj(`Y>zP: Zj(P@P@ _(Zu7 ZFP[QPW:>PQGPwP0n7oT@\P~u5Z@5>:>P ZG`'j@ E-;Zu'~( (ЀZh@ HH`d@.=h} 9X i‹0å(u:F1}4VEGQ`/&7~Vw7@ .ۇ,]<vf;շ?Ɠۏ( l}hWS2&??O@+Y]aWo7_:#/נ:tIO! @ |BU[B`.4)xߧP@WH=[4^54\4j;i\Pm3HؾՍ77Ƚ})y1fȢQU b% ( (!l2cR}SMLCY'(f()v>kvpL?t>Rhh@:>PQ@ L4u%"@ @l]g[n@o:P: `- ?u4}POZu5~PW7ր@ !P@P@0)h@(t})ç0ȃhe#} ,_6?EGt~a__Ґ {F$toӰ /VՀ?tU5{7Rwnohۏo;p~CLZ\WPɃ^P'Q7ঝ<EX ɢ&OJ@.)rJ04X}+o+Qj|pzFA#?ΓxcҐ[WR̝?cHr j7'?F(ݸn} ij|+Ҁ IOĹtbO/נ`NX?z@.loߐ .*6Sտ!ESۭ g~t\kvK5|v/hd]Td p&/Ȣ"?է(TR}}PiR5; U( 0$ wPy^4Ҹ tTjoGq7ݷG@d>-T%s ڞ˰8 aCA/:>"O/=zqBy wRȨ9 jq#9qQ۰%/ȧSZF);1 %INn*6+@$6qkie*Wn$j ;5{ioku_:pSu4u4oJu#vZF@ _IV? Z[ "y2@ z!Im0p}PahY%N?ڬ%w)&$R "q ¬9lPwA+M`1D+ 9T#TɫŹXk"qNuvƭ%Ԅ sj..@9qfvʷvd AVəT`o5? iU2 j[#&VRf(6438V*k;aQmvvHIwqbj @)PA=hwq{.< PtN\eZ ?ZDߴ|}77nn?b4>e;hʓzʘA~cڀS|(~N"u @;i ?g(TW@-l}@i@n4\տN@۲6NvI [R-׾q|ܱ8sG.E7_Pb1qv6BqJ r݁Q #uc9rI^ Ic;$UnsmXdtQT pվWn:K$ T`Ƥ!BXw0jt'sY?!_)2`4&bEMV@yc+fۧ:{}i( @S(kvk}HX2 6hXAg@r;\ h@Ju5Pu04ELR-0)XGʀz:)ݣ@4@~P?s0:?w,OYiPYI0}h)Sʤv2:ȣ3΋xt/@'8H޾=k!ˎ7w:O#SKbfk~->|wI'T{'w,)³jۀn!Ooo;r5Vۛ?@- ~ʿZ&\}QML֤}z~UP^W>IZYĿON!qN?C?z@ iJ6P~C)6?ֿ_AloߧP;ߥ;o7@ (7/-}./gi݀WZhظ:DD>Q@ G Yo'_w`/" $"mQGE}i0L(@>OJuHS ))aƷ'2zf`C(0L ( @4}@`5~4u04iEt "6@: RrGZH޿7@^<ؘ`ȇ"$B>9jI!Y & *$K"xXH:qkavL9ЩAܛ\qGG |V۽ r~V6?Ƙ]Gldv@%f068#݁ˆC9qD#&K(\=iI݌sG֩L "G)O'֣@K_:oͼ=(p_F42:4ؓ|>@{a .UQ}]=_EP'o)O *7[տN!@0Ali7PH `)RC1?NRhP{4&ߺ?*_.<(vȢ {G]"(}( @:WLP hcSh,@lagWBױ(ʬM*l5Ut?L=\(jɦ> [J {3&A>t}X b,eo*k6sC@Wր@ ?Ž:W@[@(@ Lݤ4[ P@(>POZu5:O(PiC@ @ B6-MֶGjˮfE+_9nu`ԯ5&*'9Р㻶K~ d(ȣ&' ,.)X=4XV_J]&{@y??Ɲ 7niP1m&d/֣@2q=j1Sԕv_}@ _ʀC_|c\פ @PL083Owe6W@!@ dmE</SvJ@;oM-u_Wӻ8W2/wE?0\ɋ*@"*$=(x I UW5k /-QH ݏaWށb1qPIuD}'!X q"zZ|50C¥ђ zɦ> ^PP[ր@~t~ L#_0H4`R@ O(iZ@:tE @ _o:ݾ`!i HCcOAYA#gb!.~kF^@f>e~Il- gA-VŠs$=.z\a6@,l+zIMh{lF~Yri#G+:Mͅ6fqu‡1ږg[r0B؃cF V @_C#j,nN\Fq g:Wq9߯>O0_dǥ9i?ҲbF,֋ =-;D s]IkVo!cj wCQ@j H (™ݥ>ǧH n&S#(Tz֜.}|?2Ǹϼ$f{)r7(Z8'=BGsj>@p[̟@>Ɩ/w=HhLWyH?^EU6`s|zi^=xx/Qtm7s~Žd17wV{j|ajJ~@=l@srYM@3dCG6bٰ>`$ۏ"/-&I-!>\V<͎V_ocـO7>`csO`5MN *u@#YXoa4*o>`qC ionbh+` JmP'*&_&QB ꅨN(p ]FaFTr9Pp?(-HPnttm;['+}_4uè`9lJZ@( GY^.M PHS @ ?xPu0(h@@K&?N\f"Tv6kUZ !cl"&7,JBv$E.r{r}ڄ%Y {IQ$[;zRoP%-: r)ހRvcLBk (Ӛ9imQs32MʉRT.G,r9\\w@-j@]|^=Xic'_ ,ɷ(vnIv.x)P@(44ב@7_/|7ShȤ + |]1X[ ciۛOҰ @?Z`~?k6h'?O@ u_Hn:_*`/_ĿO&]zwF/נ õT@T|Tl7?‹ll޿?Pz7onvsv ǖ/}pcPgi\Ѡt]@;bq*`5pG4PZC"= Sna݇aMU,ŸE"FZhKtcO_ȟ`I֥Hw' L= PL (?xQOƓC_>j(@ hS@-0[@@ L ZNQKC@(hu4}@ hSE @ yqT%PYxb9ȫ&XG$ejJ2qJT.NYNm41W@C-p0>i|!r`A#Tl@OuiC)G4nQՇLg.}hHc} ,h=:ڀ"+zR{4Ǒv4Xyǣ&+|+~T ۯoߘ,n9Vߧm@vT zL~ʿZ&L&ʿZ _j@"z?y/O ?zx+^oʀ?9@(v?7?‹o w@5PZߧRߧP17@=[4\1fZhZIgOMjP(Ԯ s kNY=5Q 0j%g O G% IɓzxOZ+T^[PRZ`59MX?BLkeL;0,{QH wJ@.|`T^pySU1sJbxoWG ҀTܨÜ`Qv'nRov7ۧVwߘ%;?#6:x<1oeGys? 7U} :M?O@ KO-\?0m- v .loߐ wW `H uR@ `N0H稠o wd!Ndo)Oo~t@TrѢ_Wi%ܿJ;`4x㷭/PkҀ&/ȧpaNGH\~T <iS.2ԕR)HcMqWm <,X :, CRiOT8sWn+K*^vQшf89 &rX)皞EՁ |!Køyq8ai`72:|$n.Tf?J@WͲu"$[6xE)ICסhX~u zu5^  `P@4k}H)j}u4}POJ`: n@~ E (Ϯ*(h IoWz`*j`>P=󪎌 CT2Juk B+l)印 Oފhqe,vݐÃN}@$l/Fb /$A|lfI$c1-j46 wvA[WeGWApGNvvh?+; F`r4- ܖ]FBDֳoh~|4X14Xq7_QHs1m"_jzf_'rj@ZZ)PH02u!/WP@/4 1 V*=PR`#Yy^? .,r3#oe {1&/87 +>T $ y *- +<п`(r\iUW3~tl}.2pDr|8,2# jڂ݆񃎙&5'n 8kƙ_uQ5lf"5/ET^NEv?)6 R@6 @>S\(C/@DeDb9TIL`ԜZ?Zu50?@: `PHݾZ`!(i@$6SSN y܌r>\]!B#Ml0L̒*it Y _d*n.|e1!sU.Kh-IJb'A@ "F@ ?5^,EcOo L ? TLW >R$r;r;RW k)=4ӳlL6Fq ip$3*p(* @\as։-ZM$X+tSYc?x?YXc" |ï!޾06MH ; _1}4Xb={@ )P\s=7FM0oʀh{'?ƝEfo+l?4BQUג*7'v$/~۴ yGaqG)WP(h_@ ?^@'_F\p?hqd!),rAZWVc,r9&64IDs?³v7o;e6dcOH#JOp$:HUun4/Id'%޶bd*. ֥C˿K6nJosǹDFsꤜVY6vXQv <RFp;E { K *qk an3+90aP2%!#EW? &!|kNJ/Q2aYn.獳"ZLu^tA I25Z,\g U).o![B)khd\1?f`Iu @ @ ^Z@: (@#}@\}DȃY΋z'(X;O@ w@ @ i+u , v2M+ǣ~T]S(m@/5v ?o+[z.d}&L}h zˍPU~/oʛ _R@:p5`}?4hz@; PX71(9%UN>Qj-m/v NM`TR/,}h|Ѣ4D/}p_Wp }v/iʃFXvŃE;bh"TU8PL0 (2@TtQSq@tP ^HSPHP74:>OZ`:Z`2_/?9nou ݾAHjtihƀ@ ?yhJD@ Oր@(tSu4uju0:#@ @0 '^n]ǞԀ]4iq~hwFM;ɤ]ѿ*k)h ?`'X~R9?nhۏ@ |hrރm|Z WPK}8/@ ]<_J@.|退>/O@~^r#.H @= wѿO")>v?€xQhSL#}@ c;FPcF4t]Lи/OJ_-?4a&(S xQPIlQZu 7?J>TZP`SԀkthzZjЀu7Ҁ@ nMhƀ@(z`-5>KG4u0~RSCH~W֒O)uiր@ b6iQՀi2G`T$,#RZ+-yDE4@ 毣)i?E_1}4,1oʀc|@ N"s?ƕvM&@ b_z{@eg)L?"g)h&>G(~EoUR@)veOwwO>(4I?4h?4PzHa?*hV~s@ ~C( (_ wv7‹2}Ro΀V J_4J;E5Hl_OրMttʏyEkE+ӯE`;ʏPQ@GH``ј~@[>u0@zP'@5z֘P[ր@zA@ LCou(@!i ^IlҀHZZGJELVQo:z@ZdzhΩnh@ ohQ@ W@_΀͏z/Ej-Ew_΀ xtL2( ,d<7hq&@ V8?#u~ENT>(lݷ?ƀ1l?4XRp~SR7GLz{GP2q?h_zx=v_:@#n4U1'h˧Ɩ8|6[@!@ c~GP =N#!)ƀ09op-}[4]=ʐe>Ml @n?OZ]G@ hܿ"yQ5Ǵ*wRBʀ>Qp>P: ~:tP@ L @(~WրLHP[h _Ih@A`!Htvv{ .TQ[ik}@ @ @ _HS|HPOku0Zhu 2dc5fjuyD ͕ ڐ `P@F$@0]r=POҀ&.p;j?E E=1%H n8VߧoovV`1??ƕpc?*A$}̙}eG(#Q?4?T| +A G? 3{*1j$l7YM9!@Fpo .]=_Ha.ߥ.sl}.yK٧p_V -}Hb~yi?;yQ5<"EPQ@(pj@-0 .@P@PH(p `RL @(L0 @Skϴctw 4(@0 (@PP@0 @)P@0 )ٟ$$If!vh5 5555~#v #v#v#v#v~:Vl t65(55}55$$If!vh5 555.#v #v#v#v.:Vl t65(55 5$$If!vh5 555.#v #v#v#v.:Vl t65(55 5$$If!vh5 555.#v #v#v#v.:Vl t65(55 5$$If!vh5 555.#v #v#v#v.:Vl t65(55 5$$If!vh5 555.#v #v#v#v.:Vl t65(55 5$$If!vh5 555.#v #v#v#v.:Vl t65(55 5$$If!vh5 555.#v #v#v#v.:Vl t65(55 5$$If!vh5 555.#v #v#v#v.:Vl t65(55 5$$If!vh5 555.#v #v#v#v.:Vl t65(55 5$$If!vh5 555.#v #v#v#v.:Vl t65(55 5Dd %&b u c $A? ?3"`?2.%̽ћ`zg  `!%̽ћ`zg`xڕ/CQϹ*m_HD e0_!$FM*$z[ &fX1t1M"Bs{7 =wsEh +/Dstޏ)37C@I}"-뮉)bnwH#H`=^ݷgV1+'<+Ǵ;1'/_Qp&O>'}:RK[/(~S۸V>Ƚ!qsĸ;cqאak~!gBfX3Z2;oꦥۉ$$If!vh5 555.#v #vCompObj#%&fObjInfo&(Equation Native )q_1268041601"6)F@m@m~U ! 1161"14[]! FMicrosoft Equation 3.0 DS Equation Equation.39q~U( 20Ole +CompObj(*,fObjInfo+.Equation Native /q101"14[] FMicrosoft Equation 3.0 DS Equation Equation.39q~ X  FMicrosoft Equation 3.0 DS Eq      "#$%&'()*+,-./0123456789:;<=>?@ABCDEFGHIJKLMNOPQR_1268041544.F@m@mOle 1CompObj-/2fObjInfo04Equation Native 5)_12680416113F@m@mOle 6CompObj247fuation Equation.39q~Q l 1051"14[] FMicrosoft Equation 3.0 DS Equation Equation.39qObjInfo59Equation Native :m_12680416801@8F@m@mOle <CompObj79=fObjInfo:?Equation Native @i_1268041772=F@m@m~M,! 105011[] FMicrosoft Equation 3.0 DS Equation Equation.39q~H#6 1"34x"3y=28!4x"3Ole BCompObj<>CfObjInfo?EEquation Native Fy=289x"y="6!"27x+3y=18{ FMicrosoft Equation 3.0 DS Equation Equation.39q~K "31x+4y=8!"3x"12_1268041982;EBF@m@mOle JCompObjACKfObjInfoDMEquation Native N_1268042154JGF@m@mOle RCompObjFHSfy="243x+12y=2!3x+12y=2{ FMicrosoft Equation 3.0 DS Equation Equation.39q~b(t& (x,y)|y=13x"53{}ObjInfoIUEquation Native V~_1268042182LF@m@mOle X FMicrosoft Equation 3.0 DS Equation Equation.39q~)tq 322x"6y=10!6x"18y=30"3x+9y="15!"6x+18y="30{CompObjKMYfObjInfoN[Equation Native \1Table!hc#v#v.:Vl t65(55 5aDd 7Cb v c $A? ?3"`?2)2rs ǧ֙ `!)2rs ǧ֙R@ PVMxcdd``dd``baV d,FYzP1n:N! KA?H1aE,@=P5< %! vfjvL@(\5aG!'kia@t9:vus WbC!p +z5\=?Ƽ ׭~C2sSRspDh.+=A|Cƨ Vo2ʻ2B\ؙа``㔑I)$5! NE.B ,f_Dd ckb w c $A? ?3"`?2}B&~+*uF `!}}B&~+*uFB`hn KxuJP{66DnQ0Vhd+"NչPJqJ9DM8%9\` ~rfR $6Ċr`;e%"a1JqаhiZYL̕\PIoG`;nݾyN7~_.!^zyK?c[_2L5o8 n:Q|N27-69s/ėͫ)ϕ 'ٶnD4.Q4Rw(4n/0f2t]k @eDd b x c $A? ?3"`?29wfmfعzBMK L`! wfmfعzBMK:@@x=N Aa=3/v$ ,HV^z,twH$+o\|9``^D*?D"}_Qr.祸E-rUi2l*&RɀB;vi(o i zddbiw:>[bŽKoXٳK^z؈t\vټ?= p 7 5YDd clb y c $A? ?3"`?2zZ:ʣܬNH ; `!wzZ:ʣܬNHB`hn ExuJPƿ{4m,X28*wt}+DZw+"Nҥ*R)"Z0'WM8Ksǹ %2c (J<8c&c<25؂6gue>tw<I1*Ɉ|RєtI L~) C9HzGׯ!oE|Kߋ#j:tsZBs<3|4\߂gb ?8c.. vmiKeln9Wm*7-0̶u#ʦuCy-8HUTq j"ߵ?߅rfUDd ~b z c $A? ?3"`?2{s)35>L{ `!s{s)35>L2 Axcdd``dd``baV d,FYzP1n:6! KA?H1a6ĒʂT`35;aR& Ma`gڴCXk[@]j m%<W%1B?+a@Wpkze%1ZZ} ܝǘϳ03?5/՛ۘP71@sAC `gBV3F&&\ ;: @> 1vFf b $$If!vh5 555.#v #v#v#v.:Vl t65(55 5Dd \ ,-b { c $A? ?3"`?2-JbQ8dzh t`!JbQ8dzh `"!xڕKPϹIUc"vp_Ul'BEPI8)8:SuPQA=7%Wt06-\-Pd8V20/' ˳FEd;_2f*@"bNa|W<^1zQ-sStv'[O.)F!y$><UR2:U wp0wy/])JɉB99^\X?H+i#mmOcZJ~6H|'|g΋~φT-q䒡揆9-_&P//=|l7P[umI zwjLqzgƂ+q],axE E]k={$$If!vh5 555.#v #v#v#v.:Vl t65(55 5Dd \ ,-b | c $A? ?3"`?2-U.k 6$JW `!U.k 6$JW `"!xڕ?,AߛwXwDDq r"ABt*q: : N"و 5FV(T NBPP#DTg wn `+*C#dr6ť.VtGGbe:5 \s /4~_M1wG wOW\om.≏8yM<[L'd>6ĵc!) jZ[ 3(:(p1#S09FW&$N2_I +50ev^°qf#}K_f, 1ucFEd|Cl~tm~p8%8I'y*yD_q>\Tw~5^NWݣWO3S)SJ>gUtTr%2LGƗRӋe_sQ͗:usGˋ'}gɼb% ՟׼~^?RտW9*$NXnLt.*8a&SlFl q{@ȉ$$If!vh5 555.#v #v#v#v.:Vl t65(55 5$$If!vh5 555.#v #v#v#v.:Vl t65(55 5$$If!vh5 555.#v #v#v#v.:Vl t65(55 5$$If!vh5 555.#v #v#v#v.:Vl t65(55 5$$If!vh5 555.#v #v#v#v.:Vl t65(55 5$$If!vh5 555.#v #v#v#v.:Vl t65(55 5$$If!vh5 555.#v #v#v#v.:Vl t65(55 5$$If!vh5 555.#v #v#v#v.:Vl t65(55 5$$If!vh5 555.#v #v#v#v.:Vl t65(55 5SummaryInformation(Q`DocumentSummaryInformation8hDCompObjnqOh+'0 4@ ` l x,Math 141: PRACTICE TEST # 1: Chapter 1 KEY Mike Singleton Normal.dotsingletonlymeda2Microsoft Office Word@F#@~m@~m՜.+,0 hp|   .  +Math 141: PRACTICE TEST # 1: Chapter 1 KEY Title  FMicrosoft Office Word Document MSWordDocWord.Document.89qH@H Normal CJOJQJ_HaJmH sH tH DAD Default Paragraph FontRi@R  Table Normal4 l4a (k(No Listj@j b  Table Grid7:V0;<?"#$'vwx{}~ ")*-8;DEFGKM`dgjlmnop     LMNOPTVY_afjlnprstuvwxz|~!%1>S^mx $7U`o 123459<"abcdefghijklmnu  L M N Q ^     1 | } ~    # * v w x { B C D H I P CDEILV>"*opquxYZ[\_s3459:QcZ[\`at000 00 0 @0 @0 @0 @0 @0@0 @0 @0 @0@0 @0 @0 @0@0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 0 0 0 @0 @0 @0@0 @0 @0 @0 @0 @0 @0 @0 0 0 00 0 0 0 0 0 0 0 0 0 00 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 `0 `0 @0 @0 `0 `0 @0 @0 `0 `0 @0 @0 `0 `0 @0 @0 `0 `0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 `0  0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 `0 `0 @0 @0 `0 `0 @0 @0 `0 `0 @0 @0 `0 `0 @0 @0 `0 `0 @0 @0 @0 @0 @0 @0 @0 @0 @0@0@0 @0@0@0@0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0@0@0@0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0@0@0@0 @0@0@0@0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0@0@0 @0@0@0 @0 @0 @0 @0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 0 0 0 0 0 0 0 0 0 0 0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0 @0@0 @0 @0 @0 @0 @0@0 @0 @0 @0 @0 @0@0 @0 @0 @0 @0 @0@0@0 @0 @0 @0 @0 @0@0@0 @0 @0 @0 @0 @0@0@0 @0 @0 @0 @0 @0@0@0 @0 @0 @0 @0 @0@0 @0 @0 @0 @0 @0@0 @0 @0 @0 @0 @0@0 @0 @0 @0 @0 @0@0 @0 @0 @0 @0 @0@0 @0 @0 @0 @0@0 @0@0 @0 @0 @0 @0 @0@0 @0 @0 @0 @0@0 @0 @0 0459<L M   | }   v w x { C D H I P CDEV>pqZ[\_s45Qc[\atj00cq@0j0 h00e h00c @0j j00a h00a @0j0 j00@0j0 j00@0h0 j00@0j0j00@0h0j00 @0j0%j0 0 @h0%j0 0 j00@0h0jj00@0j0jj00j00h0,4j00@0h0Cj00@0j0Hj00@1j00@0j00`j00 j00j00 @1j0!0"8uh050 h050 h050 @0 j050 @0 j0*0+4vh0*0 @0 h0;0h0;0 @0 j000 h000 @0 h0@0j0@0h0@0 h0F0 j0F0 @0j0F0 h0L0 h0L0 @0j0L0  @4 j0R0 @0j0R0 p0 b0C0 Dx@0 j0X0 j0X0 @0 @0 j0]0 @0 j0K0Lyh0K0 h0K0 @0h0b0 @0 @0 j0b0 h0i0 h0i0@0 j0i0 @@0 @0 j0o0 4CP0P j0[0\{h0t0@0 h0t0 @0|F  00W JcLoP&2:FPSUVZ`f ' F K m  L V  ! 742>JTZ<zbv>8KF2uoB!Q !"#$%'()*+,-./013456789;<=>?@ABCDEGHIJKLMNOQRTWXY[\]^_abgh}  !#    13Vjl::::::::::::::::::::::::3f_3fԴ3f3f9*urn:schemas-microsoft-com:office:smarttagsplaceB*urn:schemas-microsoft-com:office:smarttagscountry-region  =@ a j k m n s D { | ~ 3f j I O |  + . w a j b  oF??H>rNT[Qf!V@{XQ\Px`}{J.:M!%e>F<yV<?#$'wx{}~ "*-8;DEFGKM`dgjlmnop     LMNOPTVY_afjlnprstuvwxz|~!%S U123459<"abcdefghijklmnu  L M N Q ^     1 | } ~    # * v w x { C D H I P DEILV"*pquxZ[\_s459:c[\`a@4D@>>> P@PPP(@P@UnknownGz Times New Roman5Symbol3& z Arial"1h{{&{{& . .#x42QKX)?.2*Math 141: PRACTICE TEST # 1: Chapter 1 KEY Mike Singletonsingletonlymeda