ࡱ> 02/o HDbjbj;; 0LQvfQvf Uzz  8ThT]C&:}&& $z҆E&_$C&&&҆   !+!+!+&R !+&!+!+|6P4&P-0]('x&&!+&&&&&҆҆=)&&&]&&&&&&&&&&&&&zX : Inequalities Mathematical sentences that use any of the following symbols > Greater than< Less thand" Less than or equal toe" Greater than or equal to Solving Inequalities Done the same way you solve equations. Exception: when you multiply or divide both sides of an inequality by a negative number, you must change the direction of the inequality symbol. Example: Solving Inequalities Using Addition/Subtraction Solve the following inequalities and graph the solution on the number line. y + 3 > 5 b. x - 3 < 5 Step 1: Isolate y variable Step 1: Isolate the x variable Subtract 3 from both sides add 3 to both sides y + 3 > 5 x - 3 < 5 - 3 > -3 + 3 < +3 y > 2 x < 9   Example: Solving Inequalities Using Multiplication/Division Solve the following inequalities and graph the solution on the number line. 4y > 12 b. 3y > 15 Step 1: Isolate y variable Step 1: Isolate the y variable divide both sides by 3 divide both sides by -3  EMBED Equation >  EMBED Equation   EMBED Equation >  EMBED Equation  y > 3 y < -5 (since we divided by negative, ineq switched)   Solving Inequalities (Multi-Step) Complete the Distributive Property Simplify by adding like terms. Eliminate the variable on 1 side Eliminate constant term on the side with variable Solve for the variable Check solution Remember: addition/subtraction must be done before multiplication/division Note: some inequalities have no solution and others are true for all real numbers. Example: Solving Inequalities (Multi-Step) Solve the following inequalities and graph the solution on the number line. 2y + 3 < 9 b. 3y + 2y > 15 Step 1: Opposite of add is subtract Step 1: Add like terms So subtract 3 from both sides So add 3y + 2y Step 2: Perform the necessary operation Step 2: Perform the necessary operation 2y + 3 < 9 5y > 15 - 3 -3 2y < 6 Step 3: Opposite of multiply is divide Step 3: Opposite of multiply is divide So, divide by 2 So, divide by 5 Step 4: Perform the necessary operation Step 4: Perform the necessary operation  EMBED Equation <  EMBED Equation   EMBED Equation >  EMBED Equation  y < 3 y > 3   Try.  EMBED Equation  < -5 Try. 10 > -5c  Representing Inequalities Practice  Inequality Interval Graph Set Notation 1. x < 8 2. x < -3 3. x > 0 Rewrite in interval notation, set notation, and graph: 4. -6 < x 5. x > -3 6. x < -2 7. -2 < x 8. x < 6 9. x < -2 Write as an inequality: 10. 11. Practice: Solving Inequalities Using Addition/Subtraction and Multiplication/ Division Solve the following inequalities. Graph your solution. x  3 < 5 2. 12 d" x  5   3. n  7 d" -2 4.  4 > b - 1   12.  EMBED Equation n d" 2 13. 6 d" EMBED Equation w   14.  EMBED Equation  < -1 15.  20 > -5c   Practice: Solvi2 4 6 ` ( : @ j k l O        娜h fhc jhUQB*CJUaJphhUQB*CJaJph juhUQB*CJUaJphhs7 hUQ>*h`cih> hUQ5\ hUQCJ hchc h?Zh?ZhUQhUQ5CJ \jh4RUmHnHu02  & F *UU$If^U`gdUQ & F * $If^ gdUQ & F $If^`gdUQ & F h$If^h`gdUQ !2 4 6 ` j k l O ~|wwqq|oga^ & Fgd.Ol ! & Fgdc|kd$$Ifl\ @)4 t644 lazytUQ O      S 3 gdW $*$7$8$H$gd.Ol ^` & Fgd f $*$7$8$H$^    S  3 4 E F G H J K \ ] ^ _ e f w x y z | } 鹯頖}l j(hUQB*CJUaJphjhUQEHUjEH hUQCJUVaJj hUQEHUjEH hUQCJUVaJj hUQEHUjOJ hUQCJUVaJj hUQEHUjOJ hUQCJUVaJjhUQUhUQhUQB*CJaJph h fh f& Bb &z{ :AQ Z )*0U\ſ hUQ>* hUQ5\hUQhc+<B*aJphhUQB*aJphh`ciB*aJph hUQCJ hWh fh fhWhf5B*CJ\aJphhUQB*CJaJph jhUQB*CJUaJph9 Bb&z{Q`^ & F  & FgdWZ)*}9:;<>b$a$gdgd`cih^hgd fgd fgdo{ !^ ^`\}~maaZ ho{ho{hUQB*CJaJph j#hUQB*CJUaJphhWjho{UmHnHuj!hUQEHUjCH hUQCJUVaJjhUQEHUjCH hUQCJUVaJjhUQEHUj(CH hUQCJUVaJj|hUQEHUjCH hUQCJUVaJjhUQUhUQ" !").029:;<=>?bcdnzø~~ninni h>*jhCJUmHnHuhJh5 h5+jhs756>*CJUaJmHnHuhh56>*CJaJhho{j9*h fh fUhUQ ho{CJ hfh f5B*\phj4(h fEHUjEH h fCJUVaJjh fUh f)bd56789XYZ[stgddhgd`gd$a$gd )*456789:;<BDJKLRSWXYZ[qstuvwxԭh`cihh5hh>*jhUmHnHu h>*h fjhCJUmHnHu h5hJh5 hhhDBDHJNZ\Z\^h^hgdo{gdo{  !gd`ci & F%gd`cigd`cigd`cigdBDHJNPVXZ\&(JԡwmjQho{EHUjEH ho{CJUVaJjho{Uho{h fh h h`ci j Mh`ciB*CJUaJph j`Hh`ciB*CJUaJph jCh`ciB*CJUaJphh`ciB*CJaJph j ?h`ciB*CJUaJphh`ci5B*\phh`ci$JLNPXZ\^`dfhjnrtھڝڎڝvraP jeho{B*CJUaJph jHaho{B*CJUaJphhhfho{5B*\phjC_ho{EHUjEH ho{CJUVaJh f jZho{B*CJUaJphho{B*CJaJph jUho{B*CJUaJphho{5B*\phho{jho{UjSho{EHUjEH ho{CJUVaJ^hj:<<0=2=4=6=8=:=>=F=H=====8^8gdo{  !gdo{^gdo{gdo{gdgdo{h^hgdo{<:<<<<===0=2=4=6=8=:=<=>=@=F=H=N=T=Z=z=~====================¶᫫ӝxttxthqtjhqtUhdB*CJaJph jFoho{B*CJUaJphhc+<h5B*\phh5B*\phho{B*CJaJph jjho{B*CJUaJphjhUmHnHuho{5B*\phhh fUho{ ho{CJ -ng Inequalities (Multi-Step) Solve the following inequalities and graph the solution on the number line. 16. -15c  28 > 152 17. 4x  x + 8 d" 35   18. 2x  3 > 2(x-5) 19. 7x + 6 d" 7(x  4)       Representing Inequ==============1D2D5D6D7D:D;D>D?DBDCDgdgds7  !gd`ci  !gd f8^8gdo{========>D1D2D4D5D6D7D9D:D;D=D>D?DADBDCDDDEDFDGDHDhdB*CJaJph hLhTh4Rh$'h4RCJHaJHh4RCJHaJH h4R0Jh4RUh4R5CJ\jhqtUhqtalities, Solving Inequalities and Absolute Value 44 45 -9 6 CDEDFDGDHD  !gd`cigd,1h/ =!"#$%h @=t +QA l㏴x1)xŘMh1ǟCkcs*j [`ꊬNک&T`Ey "̋B= Ջ0QAvvu;|_ 3~DOOI!$GGR|a"K9z܇DgFS_KaC[I>CG)ZCѬv7GG8MLNN&/ctNR⼟tJ/>jḎh] z>Ֆ5 5OQSdsEf%0Ìz wbяR'_$?{ӷ=TeQyW.Id3S5s1Fgu gOs۟VǺ@Ix?P9k^iۨs/}:X.i<h[1G}G)?nC9`ã܂G<<`f#<-x #lVxZ<=GԂG S:<~Yg)J1?u3g)y̹G98wCqyrDgm% $y.j Cf¼e sTWa2 njICFy!Faއ2d*̇=0ӆ:!^a9bl9^C7afЖ|e{c3Š n'nԘtq۠=vs]F4VcF7v 7ḽqqmp.hk5ܠ1] z 7`̭wq@J-76pp6Iem g9!%RY>}49=O:=ӧ@?Ks$$Ifz!vh#v#vu#vm #v :V l t654555azytUQDd  |0  # A"&t +QA l㏴w @=t +QA l㏴x1)xŘMh1ǟCkcs*j [`ꊬNک&T`Ey "̋B= Ջ0QAvvu;|_ 3~DOOI!$GGR|a"K9z܇DgFS_KaC[I>CG)ZCѬv7GG8MLNN&/ctNR⼟tJ/>jḎh] z>Ֆ5 5OQSdsEf%0Ìz wbяR'_$?{ӷ=TeQyW.Id3S5s1Fgu gOs۟VǺ@Ix?P9k^iۨs/}:X.i<h[1G}G)?nC9`ã܂G<<`f#<-x #lVxZ<=GԂG S:<~Yg)J1?u3g)y̹G98wCqyrDgm% $y.j Cf¼e sTWa2 njICFy!Faއ2d*̇=0ӆ:!^a9bl9^C7afЖ|e{c3Š n'nԘtq۠=vs]F4VcF7v 7ḽqqmp.hk5ܠ1] z 7`̭wq@J-76pp6Iem g9!%RY>}49=O:=ӧ@?KDd  |0  # A"&t +QA l㏴cw @=t +QA l㏴x1)xŘMh1ǟCkcs*j [`ꊬNک&T`Ey "̋B= Ջ0QAvvu;|_ 3~DOOI!$GGR|a"K9z܇DgFS_KaC[I>CG)ZCѬv7GG8MLNN&/ctNR⼟tJ/>jḎh] z>Ֆ5 5OQSdsEf%0Ìz wbяR'_$?{ӷ=TeQyW.Id3S5s1Fgu gOs۟VǺ@Ix?P9k^iۨs/}:X.i<h[1G}G)?nC9`ã܂G<<`f#<-x #lVxZ<=GԂG S:<~Yg)J1?u3g)y̹G98wCqyrDgm% $y.j Cf¼e sTWa2 njICFy!Faއ2d*̇=0ӆ:!^a9bl9^C7afЖ|e{c3Š n'nԘtq۠=vs]F4VcF7v 7ḽqqmp.hk5ܠ1] z 7`̭wq@J-76pp6Iem g9!%RY>}49=O:=ӧ@?K Dd |lJ  C A? "2kK0XRsG w `!?K0XRs`0 xcdd``$d@9`,&FF(hzP7\s ?P9ĒʂTX/) ĺ3E2:Y@ 7fj3L11d++&1t\> M=W6cHIH'a$$&TVd8 &I)$5a dE.2& 1QDd TlJ  C A? "2bܓ%ە^{\RT> w `!6ܓ%ە^{\RT XJxcdd``>$d@9`,&FF(hzP7\ ?Sr< %!@9_@S u!f0et WDF0 ZZбsD V0Z.'b:#6faghtNX' q&@1.XYv #RpeqIj.E.?2Alf`An1Dd lJ  C A? "2%yK[ꉸS Mow `!g%yK[ꉸS ML 5xcdd``Vc 2 ĜL0##4Y=F (.YRcgbP9ĒʂTX/) ĺ3E2:Y@I&+@ngȱL@(\KRK>b劼iFAg0faie d> bbr<v0}.}p k\.Fb dB%*.hsc m `p221)W2LfPd:04}   !"#$%&()*+,-.L1465798:;<?=>@ABDCEHFGIJK~MNOPQRSTUVWXYZ[\]^_`abcdefghijklmnopqrstuvwxyz{|}Root EntryG F43Data 'sWordDocumentF0LObjectPoolIP44_1253396429:  FP4`4Ole CompObjeObjInfo!'-39?DEFGHIKLMNOPR FPH Math Algebra 2 Equation Equation Equation9q< 4y4 All FPH Math Algebra 2 Equation EOle10Native @Ole10ItemName_1253396468 F`4`4Ole CompObj eObjInfo Ole10Native  @Ole10ItemName quation Equation9q< 124 All FPH Math Algebra 1 Equation Equation Equation9q_1212517012" F`4`4Ole  CompObj eObjInfoOle10Native`Ole10ItemName_1212517036 F`4`4Ole \ -3y-3 D BL All FPH Math Algebra 1 Equation Equation Equation9q< 15-3CompObjeObjInfoOle10Native@Ole10ItemNameAll FPH Math Algebra 1 Equation Equation Equation9q< 2y2 All_1212391193 F`4`4Ole CompObj eObjInfoOle10Native!@Ole10ItemName_1212391208($ F`4`4Ole CompObj#& eObjInfo"Ole10Native%'#@Ole10ItemName$ FPH Math Algebra 1 Equation Equation Equation9q< 62C All FPH Math Algebra 1 Equation Equation Equation9q_1212391605.* F`4p4Ole %CompObj),&eObjInfo(< 5y5 All FPH Math Algebra 1 Equation Equation Equation9q< 155 Ole10Native+-)@Ole10ItemName*_12123916150 Fp4p4Ole +CompObj/2,eObjInfo.Ole10Native13/@Ole10ItemName0All FPH Math Algebra 1 Equation Equation Equation9q< x2C All_12125177816 Fp4p4Ole 1CompObj582eObjInfo4Ole10Native795@Ole10ItemName6_1212517651@< Fp4p4Ole 7CompObj;>8eObjInfo:Ole10Native=?;@Ole10ItemName< FPH Math Algebra 1 Equation Equation Equation9q< -23 All FPH Math Algebra 1 Equation Equation Equation9q_12125177824B Fp4p4Ole =CompObjAD>eObjInfo@< -35 AllOh+'0  4 @ L Xdlt|Solving InequalitiesBakasNormalKimberly PetwayOle10NativeCEA@Ole10ItemNameB1TableSummaryInformation(HCd%Dd hlJ  C A? "2vBĆ0cGw `![vBĆ0@|)xcdd``$d@9`,&FF(hzP7\ ?P9ĒʂTX/) ĺ3E2:Y@kF+@ng#bbM-VK-WMcرsA V0Z; b:#6f eghzNX'>@1,0l Ma`h*p -L`|39de=`221)W2LfPdk  |SIDd  |0  # A"&t +QA l㏴lw @=t +QA l㏴x1)xŘMh1ǟCkcs*j [`ꊬNک&T`Ey "̋B= Ջ0QAvvu;|_ 3~DOOI!$GGR|a"K9z܇DgFS_KaC[I>CG)ZCѬv7GG8MLNN&/ctNR⼟tJ/>jḎh] z>Ֆ5 5OQSdsEf%0Ìz wbяR'_$?{ӷ=TeQyW.Id3S5s1Fgu gOs۟VǺ@Ix?P9k^iۨs/}:X.i<h[1G}G)?nC9`ã܂G<<`f#<-x #lVxZ<=GԂG S:<~Yg)J1?u3g)y̹G98wCqyrDgm% $y.j Cf¼e sTWa2 njICFy!Faއ2d*̇=0ӆ:!^a9bl9^C7afЖ|e{c3Š n'nԘtq۠=vs]F4VcF7v 7ḽqqmp.hk5ܠ1] z 7`̭wq@J-76pp6Iem g9!%RY>}49=O:=ӧ@?KDd  |0  # A"&t +QA l㏴w @=t +QA l㏴x1)xŘMh1ǟCkcs*j [`ꊬNک&T`Ey "̋B= Ջ0QAvvu;|_ 3~DOOI!$GGR|a"K9z܇DgFS_KaC[I>CG)ZCѬv7GG8MLNN&/ctNR⼟tJ/>jḎh] z>Ֆ5 5OQSdsEf%0Ìz wbяR'_$?{ӷ=TeQyW.Id3S5s1Fgu gOs۟VǺ@Ix?P9k^iۨs/}:X.i<h[1G}G)?nC9`ã܂G<<`f#<-x #lVxZ<=GԂG S:<~Yg)J1?u3g)y̹G98wCqyrDgm% $y.j Cf¼e sTWa2 njICFy!Faއ2d*̇=0ӆ:!^a9bl9^C7afЖ|e{c3Š n'nԘtq۠=vs]F4VcF7v 7ḽqqmp.hk5ܠ1] z 7`̭wq@J-76pp6Iem g9!%RY>}49=O:=ӧ@?K Dd |lJ   C A? "2l=t<)VixZ;HHw `!@=t<)VixZ;H`0xcdd``$d@9`,&FF(hzP7\s ?P9ĒʂTX/) ĺ3E2:Y@ 7fj3L11d++&1X +|-?͛6b:# F\ٌ! F"̇"v0d'PY \P8b;KF&&\ :@ğG`>O&SDd lJ   C A? " 2]Y ].p%N9w `!1Y ].p%NRxcdd``>$d@9`,&FF(hzP7\s# ?ƩP9ĒʂTX/) ĺ3E2:Y@# 7fj3L11d++&1X +|-?Û6b:# F\ٌQ f"!`#Խ\`@+I)$5dP"CXHG 2}h?3X?A% Dd hlJ   C A? " 2k\2 jmkt;!Gw `!?\2 jmkt;!@| xcdd``$d@9`,&FF(hzP7\ ?P9ĒʂTX/) ĺ3E2:Y@#F+@ng#bbM-VK-WMcرsA V0Zΐ 1{#lFVPNpt;I HvIM\ .p(AM%#RpeqIj..dE.Q& 1/PDd @lJ   C A ? " 2b |k4^es _>!w `!6 |k4^es _ xcdd``>$d@9`,&FF(hzP7\3 ?Sr< %!@9_@S u!f0etWDF0 ZZǰc@`CG)ZCѬv7GG8MLNN&/ctNR⼟tJ/>jḎh] z>Ֆ5 5OQSdsEf%0Ìz wbяR'_$?{ӷ=TeQyW.Id3S5s1Fgu gOs۟VǺ@Ix?P9k^iۨs/}:X.i<h[1G}G)?nC9`ã܂G<<`f#<-x #lVxZ<=GԂG S:<~Yg)J1?u3g)y̹G98wCqyrDgm% $y.j Cf¼e sTWa2 njICFy!Faއ2d*̇=0ӆ:!^a9bl9^C7afЖ|e{c3Š n'nԘtq۠=vs]F4VcF7v 7ḽqqmp.hk5ܠ1] z 7`̭wq@J-76pp6Iem g9!%RY>}49=O:=ӧ@?KDd lJ = C A ? " 2g5R٥t-+WCx(w `!;5R٥t-+WR xcdd``~$d@9`,&FF(hzP7\s# ?ƩP9ĒʂTX/) ĺ3E2:Y@ # 7fj3Z&br<K>b 3|`ĕ͘YQ DLdN(F `m `+KRs@&3u(2t5?2 { lAO7Dd |) 0 > # A "O'@XuCJEA+}*w @=#'@XuCJEAkNHfHyx]}tT}iE$YA I*f XQ-+8!HI"HNEԄԭ\ N];GnRSMl>5l :Vz{TUޙy37eeEQc.ݢ|&ߘқ?`Ly,2&O3s1sҝlqN؀T>2%GPe nΉ a.842VeTZ8nR"L10خ(Ƽz̃ygSIx+WAFA?dvϘ;ݦ&lz;flc|/=K gY5VRZX/Tj5$^ir}?Z?g>|m9[aNذ2pv"M's*-G_m3Ƕ[k>jc",!k?P+SX~/M`\#XH X8c݃2}pc?>q7cD\?q7pwaėBo㪋GpĢc;iq:>cX(C8̖xj@(VZxWmd1ߒ"%¸1sG-,Qac_sDfO3+\갣:D7B:9D cw܊I `fDN!Է&?`VjSen7]X 7sف]bw[,L|5ޭ t묲5ÿF/fi.3/!ovwVDi#żO _xGw\Koj2a?`G9?{d]))^! &?[`J~8:}B=kn;p/Rǣ~Ve;?YdG=؟|tKgz 5e>\# Ǐy0fQOyXΖ&L)pkڹ@Ouֺ#_Ӈ[H^Zjh8HrѠԨ Zjh8HzѠh Zjh8HhRc Hfᤥh Zjh8HvѠ Zjh8HAK q@4h 5-54FhR6qD8i #pDRO4h 5ERhRCAh]€c>e>PLBB! 3m5+?49v3ɯaO_4Q?CaRe$vY4}sE'Lc\#t.JQν7~IsR=8rq~[}ǃOj}R~n5.·G|r|L=㓳yT'Q?cgO%.ܿzp\܄2/JS1BҸf6c&q9=R6ɺλ`um:t񰺒v)⛷*woo4uR떻ykxWH[Թ\xrꏉ߅g̓yX'e)Dij"saw,:̸1L'|$oX_7]ۺrý/ex\Y`]yf<n~(nxԟ]|, $*~֍K3Mw>EuaL R`{ə8^8<]ƴd#lS,IT06 ) ـ8}~W>wf̟g5vU`ߴwghwc-'[-rQ+mkȏ>u7}*`?/miC/'n!Ӓe7g'Z>+ ́xֱ~ Mܻńskc3w Z8(I(q0irNrQ<|攃@ `-%X EP$,5 Zc6x1Fy4ZEchTe@ h% h||<`Hd@Kuh΀D_48g h|R4Fg4 h.D@4Xq(.΀ӢOq$yؽ}Փh*2qX4L42qJ4ΊF4`Du~4T<ǽAXkk-l;lt| Б k Owh7R>b#s #IkۗqQXNӳ4NK r1\pʃB>'g):m_ n!ص:9ۄ>9k\mk:7"o D㓓cym\GԳ?{prùUggOΥ e1[`yB8CJ?QԸz~xֵc.q?>^g /}7v%7oCnMM?s8e]߼g_aݼyV/ݼUyewM?s7́sGBŔq7!>sEcw6L wsp_XG Of2WGL_j-s-9'4T<&~f@hl4^ɧ俀N~ +W~"r*&=g=%}wvKp:wK = Sݟ}6V^44?7vJѧm1ufxVH 6vIٸoo3ER=VM?3AVxRz~H?3^70_{e}i^;Rh\avOz˶_}O `;>zqj4kKש |W㰽LLY.xkE e&$1\ ;v$=ζ^Q9Ϙ$* %' ".zb.C[֡# *:}gmvE7 + ϡ'bZ.+|8ISg[3W/}r>c\ȂMj([k]6\ kk:;ϲ]>d%Ee^MWMV˫k5cKjCwX`3^]g%Ks7f^:8&!r(y51c"ׁ@ k̓k.tzN985=7a{̅#M ㋂u#hN+FU4"j ,>%Ez;qh$2h hǤحhɀFh h<.GE3F66mXn>uq D[q(/ƿFw4fN H4ѓ#hˀƠhe@cuyg@ch|Y4NPvch< xƻ2L0g3(Oa'?ӝV~EHc1\˲-MPXxsݞp:노DpNz:s \F>9\<8vqpYW*:W,`gt#89[8w{pXurΣ|rֹ8O g6w۹nig9؟<8}r.upnp>yB8C#d]&O}!Kxm͛~/ϋnf߼úyy%-^y|1d>[7K~w}fr5v1l^y}1 ol߼g ?{ =x A&Dy/(@.#KJh.xK\]MK]n^{If?xr^-%="罤E}@kL9$ZKJ^R!ȍe˭x~$7c {IԙPcNh[w:.b$@ ;ac?{IPuW֭`S} SZ; z p Ob#AHYm2>-Az`Cq.zM7 Dd  |0  # A"&t +QA l㏴P?w @=t +QA l㏴x1)xŘMh1ǟCkcs*j [`ꊬNک&T`Ey "̋B= Ջ0QAvvu;|_ 3~DOOI!$GGR|a"K9z܇DgFS_KaC[I>CG)ZCѬv7GG8MLNN&/ctNR⼟tJ/>jḎh] z>Ֆ5 5OQSdsEf%0Ìz wbяR'_$?{ӷ=TeQyW.Id3S5s1Fgu gOs۟VǺ@Ix?P9k^iۨs/}:X.i<h[1G}G)?nC9`ã܂G<<`f#<-x #lVxZ<=GԂG S:<~Yg)J1?u3g)y̹G98wCqyrDgm% $y.j Cf¼e sTWa2 njICFy!Faއ2d*̇=0ӆ:!^a9bl9^C7afЖ|e{c3Š n'nԘtq۠=vs]F4VcF7v 7ḽqqmp.hk5ܠ1] z 7`̭wq@J-76pp6Iem g9!%RY>}49=O:=ӧ@?KDd  |0  # A"&t +QA l㏴Cw @=t +QA l㏴x1)xŘMh1ǟCkcs*j [`ꊬNک&T`Ey "̋B= Ջ0QAvvu;|_ 3~DOOI!$GGR|a"K9z܇DgFS_KaC[I>CG)ZCѬv7GG8MLNN&/ctNR⼟tJ/>jḎh] z>Ֆ5 5OQSdsEf%0Ìz wbяR'_$?{ӷ=TeQyW.Id3S5s1Fgu gOs۟VǺ@Ix?P9k^iۨs/}:X.i<h[1G}G)?nC9`ã܂G<<`f#<-x #lVxZ<=GԂG S:<~Yg)J1?u3g)y̹G98wCqyrDgm% $y.j Cf¼e sTWa2 njICFy!Faއ2d*̇=0ӆ:!^a9bl9^C7afЖ|e{c3Š n'nԘtq۠=vs]F4VcF7v 7ḽqqmp.hk5ܠ1] z 7`̭wq@J-76pp6Iem g9!%RY>}49=O:=ӧ@?KDd  |0  # A"&t +QA l㏴Hw @=t +QA l㏴x1)xŘMh1ǟCkcs*j [`ꊬNک&T`Ey "̋B= Ջ0QAvvu;|_ 3~DOOI!$GGR|a"K9z܇DgFS_KaC[I>CG)ZCѬv7GG8MLNN&/ctNR⼟tJ/>jḎh] z>Ֆ5 5OQSdsEf%0Ìz wbяR'_$?{ӷ=TeQyW.Id3S5s1Fgu gOs۟VǺ@Ix?P9k^iۨs/}:X.i<h[1G}G)?nC9`ã܂G<<`f#<-x #lVxZ<=GԂG S:<~Yg)J1?u3g)y̹G98wCqyrDgm% $y.j Cf¼e sTWa2 njICFy!Faއ2d*̇=0ӆ:!^a9bl9^C7afЖ|e{c3Š n'nԘtq۠=vs]F4VcF7v 7ḽqqmp.hk5ܠ1] z 7`̭wq@J-76pp6Iem g9!%RY>}49=O:=ӧ@?KDd  |0  # A"&t +QA l㏴NMw @=t +QA l㏴x1)xŘMh1ǟCkcs*j [`ꊬNک&T`Ey "̋B= Ջ0QAvvu;|_ 3~DOOI!$GGR|a"K9z܇DgFS_KaC[I>CG)ZCѬv7GG8MLNN&/ctNR⼟tJ/>jḎh] z>Ֆ5 5OQSdsEf%0Ìz wbяR'_$?{ӷ=TeQyW.Id3S5s1Fgu gOs۟VǺ@Ix?P9k^iۨs/}:X.i<h[1G}G)?nC9`ã܂G<<`f#<-x #lVxZ<=GԂG S:<~Yg)J1?u3g)y̹G98wCqyrDgm% $y.j Cf¼e sTWa2 njICFy!Faއ2d*̇=0ӆ:!^a9bl9^C7afЖ|e{c3Š n'nԘtq۠=vs]F4VcF7v 7ḽqqmp.hk5ܠ1] z 7`̭wq@J-76pp6Iem g9!%RY>}49=O:=ӧ@?KDd |lJ  C A ? "2%Ea\Ll0D2\Qw `!T%Ea\Ll0D2`0"xcdd``$d@9`,&FF(hzP7\s ?P9ĒʂTX/) ĺ3E2:Y@3 7fj3X& Ma`.uQK>by@Lg+1U26Af d++&1`7 H&CШT,.c4$ b;KF&&\ :@a>OU~Dd hlJ  C A ? "2S:I=8{`[Tw `!SS:I=8{`@|!xcdd``$d@9`,&FF(hzP7\ ?P9ĒʂTX/) ĺ3E2:Y@kF+@ngȱL@(\KQK>bi:Ag0faiխD! ~ Ay Md4<d ( .p(A/I)$5AdP"CX!G iPDd  |0  # A"&t +QA l㏴3Vw @=t +QA l㏴x1)xŘMh1ǟCkcs*j [`ꊬNک&T`Ey "̋B= Ջ0QAvvu;|_ 3~DOOI!$GGR|a"K9z܇DgFS_KaC[I>CG)ZCѬv7GG8MLNN&/ctNR⼟tJ/>jḎh] z>Ֆ5 5OQSdsEf%0Ìz wbяR'_$?{ӷ=TeQyW.Id3S5s1Fgu gOs۟VǺ@Ix?P9k^iۨs/}:X.i<h[1G}G)?nC9`ã܂G<<`f#<-x #lVxZ<=GԂG S:<~Yg)J1?u3g)y̹G98wCqyrDgm% $y.j Cf¼e sTWa2 njICFy!Faއ2d*̇=0ӆ:!^a9bl9^C7afЖ|e{c3Š n'nԘtq۠=vs]F4VcF7v 7ḽqqmp.hk5ܠ1] z 7`̭wq@J-76pp6Iem g9!%RY>}49=O:=ӧ@?KDd  |0  # A"&t +QA l㏴Zw @=t +QA l㏴x1)xŘMh1ǟCkcs*j [`ꊬNک&T`Ey "̋B= Ջ0QAvvu;|_ 3~DOOI!$GGR|a"K9z܇DgFS_KaC[I>CG)ZCѬv7GG8MLNN&/ctNR⼟tJ/>jḎh] z>Ֆ5 5OQSdsEf%0Ìz wbяR'_$?{ӷ=TeQyW.Id3S5s1Fgu gOs۟VǺ@Ix?P9k^iۨs/}:X.i<h[1G}G)?nC9`ã܂G<<`f#<-x #lVxZ<=GԂG S:<~Yg)J1?u3g)y̹G98wCqyrDgm% $y.j Cf¼e sTWa2 njICFy!Faއ2d*̇=0ӆ:!^a9bl9^C7afЖ|e{c3Š n'nԘtq۠=vs]F4VcF7v 7ḽqqmp.hk5ܠ1] z 7`̭wq@J-76pp6Iem g9!%RY>}49=O:=ӧ@?KDd lJ  C A ? "2g5R٥t-+WC_w `!;5R٥t-+WR xcdd``~$d@9`,&FF(hzP7\s# ?ƩP9ĒʂTX/) ĺ3E2:Y@ # 7fj3Z&br<K>b 3|`ĕ͘YQ DLdN(F `m `+KRs@&3u(2t5?2 { lAO7Dd  |0  # A"&t +QA l㏴aw @=t +QA l㏴x1)xŘMh1ǟCkcs*j [`ꊬNک&T`Ey "̋B= Ջ0QAvvu;|_ 3~DOOI!$GGR|a"K9z܇DgFS_KaC[I>CG)ZCѬv7GG8MLNN&/ctNR⼟tJ/>jḎh] z>Ֆ5 5OQSdsEf%0Ìz wbяR'_$?{ӷ=TeQyW.Id3S5s1Fgu gOs۟VǺ@Ix?P9k^iۨs/}:X.i<h[1G}G)?nC9`ã܂G<<`f#<-x #lVxZ<=GԂG S:<~Yg)J1?u3g)y̹G98wCqyrDgm% $y.j Cf¼e sTWa2 njICFy!Faއ2d*̇=0ӆ:!^a9bl9^C7afЖ|e{c3Š n'nԘtq۠=vs]F4VcF7v 7ḽqqmp.hk5ܠ1] z 7`̭wq@J-76pp6Iem g9!%RY>}49=O:=ӧ@?KDd  |0  # A"&t +QA l㏴6fw @=t +QA l㏴x1)xŘMh1ǟCkcs*j [`ꊬNک&T`Ey "̋B= Ջ0QAvvu;|_ 3~DOOI!$GGR|a"K9z܇DgFS_KaC[I>CG)ZCѬv7GG8MLNN&/ctNR⼟tJ/>jḎh] z>Ֆ5 5OQSdsEf%0Ìz wbяR'_$?{ӷ=TeQyW.Id3S5s1Fgu gOs۟VǺ@Ix?P9k^iۨs/}:X.i<h[1G}G)?nC9`ã܂G<<`f#<-x #lVxZ<=GԂG S:<~Yg)J1?u3g)y̹G98wCqyrDgm% $y.j Cf¼e sTWa2 njICFy!Faއ2d*̇=0ӆ:!^a9bl9^C7afЖ|e{c3Š n'nԘtq۠=vs]F4VcF7v 7ḽqqmp.hk5ܠ1] z 7`̭wq@J-76pp6Iem g9!%RY>}49=O:=ӧ@?KDd  |0  # A"&t +QA l㏴jw @=t +QA l㏴x1)xŘMh1ǟCkcs*j [`ꊬNک&T`Ey "̋B= Ջ0QAvvu;|_ 3~DOOI!$GGR|a"K9z܇DgFS_KaC[I>CG)ZCѬv7GG8MLNN&/ctNR⼟tJ/>jḎh] z>Ֆ5 5OQSdsEf%0Ìz wbяR'_$?{ӷ=TeQyW.Id3S5s1Fgu gOs۟VǺ@Ix?P9k^iۨs/}:X.i<h[1G}G)?nC9`ã܂G<<`f#<-x #lVxZ<=GԂG S:<~Yg)J1?u3g)y̹G98wCqyrDgm% $y.j Cf¼e sTWa2 njICFy!Faއ2d*̇=0ӆ:!^a9bl9^C7afЖ|e{c3Š n'nԘtq۠=vs]F4VcF7v 7ḽqqmp.hk5ܠ1] z 7`̭wq@J-76pp6Iem g9!%RY>}49=O:=ӧ@?KDd  |0 ' # A"&t +QA l㏴ow @=t +QA l㏴x1)xŘMh1ǟCkcs*j [`ꊬNک&T`Ey "̋B= Ջ0QAvvu;|_ 3~DOOI!$GGR|a"K9z܇DgFS_KaC[I>CG)ZCѬv7GG8MLNN&/ctNR⼟tJ/>jḎh] z>Ֆ5 5OQSdsEf%0Ìz wbяR'_$?{ӷ=TeQyW.Id3S5s1Fgu gOs۟VǺ@Ix?P9k^iۨs/}:X.i<h[1G}G)?nC9`ã܂G<<`f#<-x #lVxZ<=GԂG S:<~Yg)J1?u3g)y̹G98wCqyrDgm% $y.j Cf¼e sTWa2 njICFy!Faއ2d*̇=0ӆ:!^a9bl9^C7afЖ|e{c3Š n'nԘtq۠=vs]F4VcF7v 7ḽqqmp.hk5ܠ1] z 7`̭wq@J-76pp6Iem g9!%RY>}49=O:=ӧ@?K2Microsoft Office Word@V@0@41k4@41k4 ՜.+,D՜.+,D hp  Bakas  Solving Inequalities TitleH 6> MTWinEqnsDocumentSummaryInformation8JCompObjQr   F Microsoft Word 97-2003 Document MSWordDocWord.Document.89qx666666666vvvvvvvvv66666>6666666666666666666666666666666666666666666666666hH6666666666666666666666666666666666666666666666666666666666666666662 0@P`p2( 0@P`p 0@P`p 0@P`p 0@P`p 0@P`p 0@P`p8XV~ 0@ 0@ 0@ 0@ 0@ 0@ 0@ 0@ 0@ 0@ 0@ 0@ 0@ 0@66666_HmH nHsH tH@`@ NormalCJ_HaJmH sH tH >@>  Heading 1$@& 5CJ\DA`D Default Paragraph FontVi@V 0 Table Normal :V 44 la (k ( 0No List 4@4 Header  !4 @4 Footer  !.)@.  Page Numberj#j ?Z Table Grid7:V0PK![Content_Types].xmlN0EH-J@%ǎǢ|ș$زULTB l,3;rØJB+$G]7O٭Vj\{cp/IDg6wZ0s=Dĵw %;r,qlEآyDQ"Q,=c8B,!gxMD&铁M./SAe^QשF½|SˌDإbj|E7C<bʼNpr8fnߧFrI.{1fVԅ$21(t}kJV1/ ÚQL×07#]fVIhcMZ6/Hߏ bW`Gv Ts'BCt!LQ#JxݴyJ] C:= ċ(tRQ;^e1/-/A_Y)^6(p[_&N}njzb\->;nVb*.7p]M|MMM# ud9c47=iV7̪~㦓ødfÕ 5j z'^9J{rJЃ3Ax| FU9…i3Q/B)LʾRPx)04N O'> agYeHj*kblC=hPW!alfpX OAXl:XVZbr Zy4Sw3?WӊhPxzSq]y  bKL83 bH PPTTTW \J=HD  2 O b^=CDHD #3EGJ\^ewy|    b::::::::::::lMM,"$t +QA l㏴.Hf@J L (     C fAN 9'"+&$B:I@CNI@P@8'S.(R'"9'"#" `?bB  c $D"?bB  c $D"?bB  c $D"?bB  c $D"?bB  c $D"?bB  c $D"? bB  c $D"?b F09<< / #" ? `B 0 c $DF99`B 1 c $Do9P 942 2 _ 09 9 3 C 3C"? 9O << b ?9q%< 4 #" ? `B 5 c $D9q%9`B 6 c $Do;9 #9H2 7 # 333?949 8 C 8C"?9< bB 9 c $D"? bB : c $D"?  B C fAN 9'"+&$B:I@CNI@P@8'S.(R'"9'"#" `? C C fAN 9'"+&$B:I@CNI@P@8'S.(R'"9'"#" `?\ K  3"? \ L  3"? B S  ? b   9 : t u bK|&*t q&@L^&*t{tlt { tY'ttY'tYt:h$'t9ht4^".t/vON [tB&@C&@ _Hlk32998424 _Hlk32998379 c  c Pc!^`Q U  /   Pc33333333333Kf  Bb  < 4 ; J K P [ t  A H  PQSUWY[]^`c    : < = > > ? ?    ) * 4 4 ; < B D J L W W Z Z q q s s t t w x c%)1 z= ߤhY (H5ƄXBTev.xcUl~<Gf@rˆB.9@JSL[>{LK\^%Zj]?Xa/xb3m6b^ceFI1AirHp@j jlQVk>h'nذ20dyhyJug^~Pv(R`Hy^`o(.^`.pLp^p`L.@ @ ^@ `.^`.L^`L.^`.^`.PLP^P`L.^`o(.^`.pLp^p`L.@ @ ^@ `.^`.L^`L.^`.^`.PLP^P`L.^`o(.^`.pLp^p`L.@ @ ^@ `.^`.L^`L.^`.^`.PLP^P`L.^`o(.^`.pLp^p`L.@ @ ^@ `.^`.L^`L.^`.^`.PLP^P`L.^`o(.^`.pLp^p`L.@ @ ^@ `.^`.L^`L.^`.^`.PLP^P`L.^`o(. ^`hH. bL^b`LhH. 2 ^2 `hH.  ^ `hH. L^`LhH. ^`hH. r^r`hH. BL^B`LhH.^`o(.^`.pLp^p`L.@ @ ^@ `.^`.L^`L.^`.^`.PLP^P`L.8^8`o(> ^`hH.  L^ `LhH.  ^ `hH. x^x`hH. HL^H`LhH. ^`hH. ^`hH. L^`LhH.^`o(.^`.pLp^p`L.@ @ ^@ `.^`.L^`L.^`.^`.PLP^P`L.^`o(.^`.pLp^p`L.@ @ ^@ `.^`.L^`L.^`.^`.PLP^P`L.^`o(. ^`hH. pL^p`LhH. @ ^@ `hH. ^`hH. L^`LhH. ^`hH. ^`hH. PL^P`LhH.^`o(.^`.pLp^p`L.@ @ ^@ `.^`.L^`L.^`.^`.PLP^P`L.^`o(.^`.pLp^p`L.@ @ ^@ `.^`.L^`L.^`.^`.PLP^P`L. ^`o(. ^`hH. pL^p`LhH. @ ^@ `hH. ^`hH. L^`LhH. ^`hH. ^`hH. PL^P`LhH.^`o(.^`.pLp^p`L.@ @ ^@ `.^`.L^`L.^`.^`.PLP^P`L.8^8`o( ^`hH.  L^ `LhH.  ^ `hH. x^x`hH. HL^H`LhH. ^`hH. ^`hH. L^`LhH.8^8`o(. ^`hH.  L^ `LhH.  ^ `hH. x^x`hH. HL^H`LhH. ^`hH. ^`hH. L^`LhH.^`o(  ^ `.l Ll ^l `L.<<^<`.  ^ `.L^`L.^`.||^|`.LLL^L`L.h ^`OJQJo(h ^`OJQJo(ohpp^p`OJQJo(hHh@ @ ^@ `OJQJo(hHh^`OJQJ^Jo(hHoh^`OJQJo(hHh^`OJQJo(hHh^`OJQJ^Jo(hHohPP^P`OJQJo(hH^`o(.^`.pLp^p`L.@ @ ^@ `.^`.L^`L.^`.^`.PLP^P`L. ^`o(. ^`hH. pL^p`LhH. @ ^@ `hH. ^`hH. L^`LhH. ^`hH. ^`hH. PL^P`LhH.h ^`OJQJo(h ^`OJQJo(oh pp^p`OJQJo(h @ @ ^@ `OJQJo(h ^`OJQJo(oh ^`OJQJo(h ^`OJQJo(h ^`OJQJo(oh PP^P`OJQJo(8^8`o(> ^`hH.  L^ `LhH.  ^ `hH. x^x`hH. HL^H`LhH. ^`hH. ^`hH. L^`LhH.h ^`OJQJo(h ^`OJQJo(oh pp^p`OJQJo(h @ @ ^@ `OJQJo(h ^`OJQJo(oh ^`OJQJo(h ^`OJQJo(h ^`OJQJo(oh PP^P`OJQJo(h **^*`OJQJo(h ^`OJQJo(oh pp^p`OJQJo(h @ @ ^@ `OJQJo(h ^`OJQJo(oh ^`OJQJo(h ^`OJQJo(h ^`OJQJo(oh PP^P`OJQJo(^`o( ^`hH. bL^b`LhH. 2 ^2 `hH.  ^ `hH. L^`LhH. ^`hH. r^r`hH. BL^B`LhH.^`o(.^`.pLp^p`L.@ @ ^@ `.^`.L^`L.^`.^`.PLP^P`L.^`o(.^`.pLp^p`L.@ @ ^@ `.^`.L^`L.^`.^`.PLP^P`L.^`o(.^`.pLp^p`L.@ @ ^@ `.^`.L^`L.^`.^`.PLP^P`L.^`o(. ^`hH. bL^b`LhH. 2 ^2 `hH.  ^ `hH. L^`LhH. ^`hH. r^r`hH. BL^B`LhH.^`o(. ^`hH. pL^p`LhH. @ ^@ `hH. ^`hH. L^`LhH. ^`hH. ^`hH. PL^P`LhH.^`o(.^`.pLp^p`L.@ @ ^@ `.^`.L^`L.^`.^`.PLP^P`L.^`o(.^`.pLp^p`L.@ @ ^@ `.^`.L^`L.^`.^`.PLP^P`L.^`o(.^`.pLp^p`L.@ @ ^@ `.^`.L^`L.^`.^`.PLP^P`L.^`o(.^`.pLp^p`L.@ @ ^@ `.^`.L^`L.^`.^`.PLP^P`L.^`o(. ^`hH. pL^p`LhH. @ ^@ `hH. ^`hH. L^`LhH. ^`hH. ^`hH. PL^P`LhH.^`o(.^`.pLp^p`L.@ @ ^@ `.^`.L^`L.^`.^`.PLP^P`L.%^%Z[>{L[n%'n0:bH%?- k;MT3y)1 z= (H5f@Ul~P =,$6I/*>89@JJL5^~B0dy1AihY ce3m6bTev(R`Vk j?Xap@j%%                          B                 8         B        &                B                 B                                   վU        ]        Rv0                                           ~                          н                                                                               B                          54x1 /Mwq,.,5s7c+<w=SJNUQbR9bR,TO>YhB[9]8c f`ci.OlwzK5Hdfq&?Z>l cYUo{W}Gq|qtj4RP @. . . @  b@<@Unknown G*Ax Times New Roman5Symbol3. *Cx ArialW,|8DengXian LightI{~ LightC.,{ @Calibri Light? |8DengXianI{~7.@Calibri?= *Cx Courier New;WingdingsA$BCambria Math"qhvgvg  !20 ! 3qHP $PH2! xx`. Solving InequalitiesBakasKimberly Petway%                           ! " # $