ࡱ> oqn#` ubjbj\.\. @>D>D)D!D!D!D!"Dk>2X"2$$$$1,1,1,=======$?hBJ=Q-*1,--=$$%>l0l0l0-X$$=l0-=l0l0r~;T^J~<$L" 4?D!-T;=;>0k>;OB,/$OB~<OB~<01,0a,"l0,,1,1,1,==P01,1,1,k>---- Lesson 3.3 Multi-Step Equations Learning objectives for this lesson By the end of this lesson, you will be able to: Solve a multi-step equation by combining like terms events. Solve a multi-step equation using the distributive property. Solve real-world problems using multi-step equations. California State Standards Addressed: Algebra I (4.0, 5.0) 3.3.1 Solving multi-step equations by combining like terms. We have seen that when we solve for an unknown variable, it can be a simple matter of moving terms around in one or two steps. We now look at equations that take several steps to isolate the unknown variable. Such equations are referred to as multi-step equations. In this section we will simply be combining the steps we already know how to do. Our goal is to end up with all the constants on one side of the equation and all the variables on the other side. We will do this by collecting like terms. Dont forget, like terms have the same combination of variables in them, but with differing numerical coefficients. Example 1 Solve  EMBED Equation.3  This problem involves a fraction before we can combine the variable terms we need to deal with it. Lets put all the terms on th left over a common denominator of 3:  EMBED Equation.3  - next we combine the fractions:  EMBED Equation.3  - combine like terms:   EMBED Equation.3  - multiply both sides by 3: 4 12x = 18 - subtract 4 from both sides:  4 4 12x = 14 - divide both sides by 12:  EMBED Equation.3  Solution:  EMBED Equation.3  3.3.2 Solving multi-step equations using the distributive property. You have seen in some of the examples that we can choose to divide out a constant or distribute it. The choice comes down to whether on not we would get a fraction as a result. We are trying to simplify the expression if we can divide out large numbers without getting a fraction we avoid large coefficients. Most of the time, however, we will have to distribute and then collect like terms: Example 2 Solve  EMBED Equation.3  This equation has the x buried in parentheses. In order to extract it we can proceed in one of 2 ways: we can either distribute the 17 on the left, or divide both sides by 17 to remove it from the left. If we divide by 17, however, we will end up with a fraction. We wish to avoid fractions if possible!  EMBED Equation.3  - distribute the 17:   EMBED Equation.3  - subtract 68 from both sides:  68 68 51x = 61 -divide by 51: Solution:  EMBED Equation.3  Example 3 Solve  EMBED Equation.3  This time we will need to collect like terms, but they are hidden inside the brackets. We start by expanding the parentheses:  EMBED Equation.3  - collect the like terms (12x and 14x): (12x 14x) + (21 16) = 3 - evaluate each set of like terms:   EMBED Equation.3  - subtract 5 from both sides:  5 5 2x = 2 - divide both sides by 2: Solution: x = 1 Example 4 Solve the following equation for x:  EMBED Equation.3  This function contains both fractions and decimals. We need to convert to having all terms either one or the other. It is often easier to convert decimals to fractions, but the fractions in this equation are easily moved to decimal form. Decimals do not require a common denominator! Rewrite in decimal form:  EMBED Equation.3  - multiply out decimals:  EMBED Equation.3  - collect like terms:  EMBED Equation.3  - evaluate each collection:   EMBED Equation.3  - subtract 1.82 from both sides:  1.82 1.82  EMBED Equation.3  - divide by 0.1: Solution: x = 18.2 3.3.3 Solve real-world problems using multi-step equations. Real world problems require you to translate from a problem in words to an equation. Look to see what the equation is asking what is the unknown you have to solve for? That will determine the quantity we will use for our variable. The text explains what is happening. Break it down into small, manageable chunks, and follow what is going on with our variable all the way through Example 5: A growers cooperative has a farmers market in the town center every Saturday. They sell what they have grown and split the money as follows: 8.5% of all the money taken is removed for sales tax. $150 is removed to pay the rent on the space they occupy. What remains is split evenly between the 7 growers. How much money is taken in total if each grower receives a $175 share? Let us translate the text above into an equation. The unknown is going to be the total money taken. We will call this x. 8.5% of all the money taken is removed for sales tax So 91.5% remains. This is 0.915x $150 is removed to pay the rent on the space they occupy (0.915x 150) What remains is split evenly between the 7 growers  EMBED Equation.3  If each growers share is $175, then we arrive at the following equation:  EMBED Equation.3  - Multiply by both sides 7:  EMBED Equation.3  - add 150 to both sides:  EMBED Equation.3  - divide by 0.915:  EMBED Equation.3  -round to 2 decimal places: Solution: If the growers are each to receive a $175 share then they must take at least $1,502.73 Example 6 A factory manager is packing engine components into wooden crates to be shipped on a small truck. The truck is designed to hold 16 crates, and will safely carry a 1,200 lb cargo. Each crate weighs 12 lbs empty. How much weight should the manager instruct the workers to put in each crate in order to get the shipment weight as close as possible to 1,200 lbs? The unknown quantity is the weight to put in each box. This is x. Each crate, when full will weigh: (x + 12) - so 16 crates must weigh: 16(x + 12) - and this must equal 1,200 lbs: 16(x + 12) = 1200 - to isolate x first divide both sides by 16: x + 12 = 75 - next subtract 12 from both sides: x = 63 Solution: The manager should tell the workers to put 63 lbs of components in each crate. Ohms Law The electrical current, I (amps), passing through an electronic component varies directly with the applied voltage, V (volts), according to the relationship: V= IR where R is the resistance (measured in Ohms - ) Example 7 A scientist is trying to deduce the resistance of an unknown component. He labels the resistance of the unknown component x. The resistance of a circuit containing 5 of the components is (5x+20). A 120 volt potential difference across the circuit produces a current of 23.5 amps. Calculate the resistance of each component. Substitute V = 12, I = 3.5 and R = (5x + 20) into V = IR: 120 = 2.5(5x + 20) - distribute the 3.5:  120 = 12.5x + 70 - subtract 70 from both sides:  70 70 50 = 12.5x - divide both sides by 12.5  EMBED Equation.3  Solution: The unknown components have a resistance of 4. Distance, speed and time The speed of a body is the distance it travels per unit time. We can determine how far an object moves in a certain amount of time by multiplying the speed by the time. The equation we use is: distance = speed time Example 8 Nadias car is traveling at 10 miles per hour slower than twice the speed of Peters car. She covers 93 miles in 1 hour 30 minutes. How fast is Peter driving? Here we have two unknowns Nadias speed and Peters speed. We do know that Nadias speed is Peters speed plus 10, and since the question is asking for Peters speed, it is his speed that will be x. Substituting into the distance time equation yields: 93 = (2x + 10) 1.5 - divide by 1.5:  62 = (2x + 10) - subtract 10 from both sides:  10 10 52 = 2x - divide both sides by 2: 26 = x Solution: Peter is driving at 26 miles per hour Example 9 Speed of Sound The speed of sound in dry air, v, is given by the equation: v = 331 + 0.6T where T is the temperature in Celsius Nadia hits a drainpipe with a hammer. 250 meters away, Peter hears the sound and hits his own drainpipe. Unfortunately there is a 1 second delay between him hearting the sound and hitting his own pipe. Nadia accurately measures the time from her hitting the pipe and hearing Peters pipe at 2.46 seconds. What is the temperature of the air? This complex problem must be carefully translated into equations: Distance traveled = (331 + 0.6T) time but: time = (2.46 1) - do not forget, for 1 second the sound is not traveling and: Distance = 2 250 Our equation is: 2(250) = (331 + 0.6T)(2.46 1) - simplify terms: 500 = 1.46(331 + 0.6T) - divide by 1.46: 342.47 = 331 + 0.6T - subtract 331 from both sides: 11.47 = 0.6T - divide by 0.6: 19.1 = T Solution: The temperature is 19.1 Celsius Homework Problems Solve the following equations for the unknown variable: a. 3(x 1) 2(x + 3) =0 b. 7(w+ 20) w= 5 c. 9(x 2) = 3x + 3 d.  EMBED Equation.3  e.  EMBED Equation.3  f.  EMBED Equation.3  g.  EMBED Equation.3  h.  EMBED Equation.3  i.  EMBED Equation.3  An engineer is building a suspended platform to raise bags of cement. The platform has a mass of 200 kg, and each bag of cement is 40kg. He is using 2 steel cables, each capable of holding 250 kg. Write an equation for the number of bags he can put on the platform at once, and solve it. A box contains 500 identical unmarked resistors. A scientist finds that a circuit comprising 5 of these resistors plus one a 50   !w$ 7 X ` b : B W X ȽȽȽȟ}umemem}]h,S*CJaJh9 CJaJhv(CJaJhkvCJaJh4CJaJhh56CJaJhh\NCJaJhCJaJhhCJaJh#hCJaJhhCJaJh hCJaJh hCJaJhh>*CJaJh>*CJaJh2h>*CJaJ  !w& ' b c  7  N dhgd_dhgdJZdh&d P gd4 & Fdhgd4dhgd4 $dha$gd4uu     3 4 5 6 7     2 3 ޳—ӗހm—aRj5IJ h_CJUVaJhIh_6CJaJ$jkhIh_6CJEHUaJj0IJ h_CJUVaJh_CJaJh_6CJaJ$jh()h_6CJEHUaJjIJ h_CJUVaJ jh()h_6CJUaJh()h_CJaJh()h_6CJaJhVKs6CJaJhVKshJZ5CJaJ3 4 5 N O Q R e f g h ܴӇӇӴ~v~k~kv_~VMh ~6CJaJhv(6CJaJhFhF6CJaJhIhFCJaJhFCJaJhF6CJaJhIh_CJaJ$j`h()h_6CJEHUaJjYIJ h_CJUVaJh()h_6CJaJ%jhF6CJUaJmHnHuh_6CJaJ jh()h_6CJUaJ$jh()h_6CJEHUaJ )K%Eu'TU_H+Cdhgd@dhgdJZdhgdkvdhgdF%&'()34GHIJKOP#$%&,鬙镑ul`WNBh2hJZ6CJaJhkv6CJaJh\N5CJaJh2hkv5CJaJh@5CJaJhv(hv(CJaJh@CJaJhkv5CJaJh\Nhv($j$ h ~h ~6CJEHUaJjWJJ h ~CJUVaJh ~h ~5CJaJ$j h ~h ~6CJEHUaJjlWJJ h ~CJUVaJh ~6CJaJjh ~6CJUaJ,-.ABCDE[\]cwx  ҿҕs`$j hhJZ6CJEHUaJjEJ hJZCJUVaJ%jhJZ6CJUaJmHnHu$jhrhJZ6CJEHUaJhJZhJZCJaJhrhJZ6CJaJ$jrhrhJZ6CJEHUaJjMEJ hJZCJUVaJhJZ6CJaJjhJZ6CJUaJhJZCJaJ%(1<=PQRSTU]^_`fgh{|}У|phZ|K8$jhrhW36CJEHUaJj JJ hW3CJUVaJjh@6CJUaJh@CJaJh2h@6CJaJh@6CJaJh\N5CJaJh2h@5CJaJh@5CJaJhe7hJZCJaJ$jHh4KhJZ6CJEHUaJjJEJ hJZCJUVaJjhJZ6CJUaJhe7hJZ5CJaJhJZ6CJaJhe7hJZ6CJaJ}~ FGIJMNSTefgiʷ髢ᙢzl]jJJ hW3CJUVaJjhU6CJUaJ%jhW36CJUaJmHnHuhW3hW36CJaJhU6CJaJhW36CJaJhUhU6CJaJ$jh@hW36CJEHUaJjJJ hW3CJUVaJh@CJaJhW3CJaJh@6CJaJjh@6CJUaJ  #*+,-67BCͱͦvmamVhe7h@CJaJhe7h@5CJaJh3Q6CJaJhUhU6CJaJh@CJaJhrh@6CJaJhUCJaJhW3CJaJhUhUCJaJ%jhW36CJUaJmHnHuhW36CJaJhU6CJaJh@6CJaJjhU6CJUaJ$j\h@hW36CJEHUaJCDNs2kX[\/z dh^gdO5 dhgd]tdhgd3dhgd4CDLMNsuvʻʬʐqbQqHh36CJaJ!jL!h3h3QCJEHUaJjJJ h3QCJUVaJjhW3h3CJUaJh ~CJaJh3CJaJhW3h3CJaJ!jhW3h3QCJEHUaJjJJ h3QCJUVaJjhW3h4CJUaJhW3h4CJaJhW3h46CJaJh\N5CJaJhW3h45CJaJh@5CJaJ0467JKLMOjklno|}Сۈ|j_PjJJ h3QCJUVaJhW3h2CJaJ"jh3CJUaJmHnHuh3h36CJaJh3CJaJ!jb&h3h3QCJEHUaJjJJ h3QCJUVaJ!j#h3h3QCJEHUaJjJJ h3QCJUVaJhW3h3CJaJjhW3h3CJUaJh36CJaJhW3h36CJaJ˺ןןכraUŸLCh3Q5CJaJh@6CJaJh3Qh3Q6CJaJ!jD+h3h3QCJEHUaJjMJJ h3QCJUVaJhW3h3QCJaJjhW3h3QCJUaJh3Qh3QCJaJ%jh3Q6CJUaJmHnHuh2CJaJh3Q6CJaJh3Qh36CJaJh3CJaJjhW3h3CJUaJ!j(h3h3QCJEHUaJ!"WX7?Z[\|ǿׯ||ph]R]hO5 htCJaJhO5 hO5 CJaJh@CJaJhO5 h36CJaJhO5 6CJaJhO5 hO5 6CJaJh]t5CJaJh\N5CJaJh{h]t5CJaJhh,6h5CJaJhCJaJhZshNhh3Qh3QCJaJh3Qh3QCJaJh3Q6CJaJh3Qh3Q5CJaJ   ,/0hklqryz{()*+HIKL_`||n|_jHJ hhJECJUVaJjhhJE6CJUaJhhJE6CJaJ$j/hO5 hVKs6CJEHUaJj>JJ hVKsCJUVaJ$j-hO5 hhJE6CJEHUaJjHJ hhJECJUVaJjhO5 6CJUaJhO5 CJaJhO5 hO5 CJaJhO5 hO5 6CJaJhO5 6CJaJ#I~GHS!IxN O Y ""$"\$$ dh^gd{)dhgd{)dhgd4`ab}GHPQֿ֣֔xlaVMDh\N5CJaJh{)5CJaJhO5 hhJECJaJhhJEhhJECJaJhhJEhhJE5CJaJhUp5CJaJ$j7hhJEhhJE6CJEHUaJjjHJ hhJECJUVaJhO5 6CJaJ$j4hhJEhhJE6CJEHUaJjHJ hhJECJUVaJhhJECJaJhhJE6CJaJjhhJE6CJUaJ$jn2hhJEhhJE6CJEHUaJQRSTTW#$.HMNWmpwy{|}N O Y ͻͻͻͻͻͻ糇{h{h{)5CJaJh{)5CJaJhoh{)6CJaJh=h{)CJaJh=h{)6CJaJh{)CJaJh{)6CJaJh?h?aJhth{)6CJaJjh?UmHnHuh=h{)5CJaJh?h?mHnHu.Y q r y !!"" """ """$"&"######$$&$\$g$h$o$p${$|$$$$$$$$$$$$$$$$$$ȼᢙ᎙ᢙhlh{)CJaJh{)6CJaJhlh{)6CJaJjh?UmHnHuh=h{)5CJaJ h?h?h\N5CJaJh{)5CJaJh{)CJaJh^_h{)6CJaJh{h{)CJaJ3$$$ %9%S%& &<&'''(((n))))*7*?*o*p****R, dh^gd{)dhgd{)$$$$$$$$$$$$$$$$$$%%% %%6%;%<%O%P%Q%R%S%\%&&<&D&'ЮйТГvmbhUph{)CJaJh{)5CJaJh?h{)5CJaJ!j9hVKsh{)CJEHUaJj>JJ h{)CJUVaJjh{)CJUaJhO5 h{)CJaJhVKsh{)CJaJhVKsh{)6CJaJh{)CJaJhlh{)CJaJh{)6CJaJ%jh{)6CJUaJmHnHu$'''(((1(O((j)k))))))))))))))* ******8*=*?*H*o*x*y**󻯻{o{h h{)5CJaJh h{)CJaJhO5 h{)CJaJhVKsh{)CJaJ%jh{)6CJUaJmHnHuh h{)6CJaJh{)CJaJh{)6CJaJhUph{)5CJaJh\N5CJaJh{)5CJaJh?5CJaJhUph{)6CJaJ&****R,S,,,,-9-O-P-^-o-p-r-w----------.. . .../.0.1.8.9.:.K.L.M.ܸɸܸܸɸɘԤԤwohUCJaJhUh]t5CJaJhUhU5CJaJh ~5CJaJh?h?5CJaJh?h?CJaJh?6CJaJh{)6CJaJh{)CJaJh{)h{)CJaJh?CJaJh{)h{)6CJaJh?h{)CJaJhh{)6CJaJ)R,S,,,-(-)-:-p----.9.L.M..../ /u/v/0Ldh^`Lgd4K & Fdhgdbdhgd]tdhgd{)M..................................///////|k!j>hth{CJEHUaJjZJJ h{CJUVaJ!j <hth{CJEHUaJj[JJ h{CJUVaJjhtCJUaJhtCJaJh}'CJaJh}'6CJaJh9 h4K6CJaJh ~CJaJhE8h4K6CJaJh4KCJaJhbCJaJ(////#/$/7/8/9/:/;/g2ގzr=Fk% K\ >'п>T3A/-%*-nԽݚfh^ϢqU7E Q{;ammtp< kl}46D~{?z6Ehm^[=d;gWlT'̌ڄ)Qp[nn 7D'„h) aj#̈an?<(X+x+RqT`WT໨aAqi\PYԗFNrtUrD(xH%,O{{RI܃ܡ{ޞ1Vk'p- YT9Z? u_Jү>3{_Ͷׯ}+,+9׊'[]V:yMrcgYdP lrLDq-7~~mt2z!~M\/Kx^eqY;>ה4WV>O+B+zScp\YƳV*ey|l}p]?RvXhcp y.7B5;~sSKO50~͋''ܜx{*ꞏrŧ=L\@~'X)cz܅7uz웱 * Cd[l vX4ia{@ Af]I)5'#uG>*ymhxp"hvvK:%h MigI,P#']%Z̗cZ\>5@n z%`9X^ծZQ{h,֞P 9T2\ Fk4g`G\ܦZ .NCC5jg ӺHo ]"mdp(??;̋[̺i3]\|^oAJؕ87X:X_97KRbf  6i Ul/#0}0WF _]Gt抁B#U5@ :. /(>/]@Pj& =@sP<|6 u=w٠UvfYzx{{ߖu|+,ves.^XեELnїi]!u>mkkdmYc]R6쑬PX; w[l`oնí4sK\Sw%\w\ӯ{=_1g~Jm8PeXh?/t7[.o)/&}m;N\}Ů.quk/F`wWkm7ֹl[l٠nmNfD"u )f|v3< 5hR䁖hZqpod=|c;7}3؋?Gۇ>lUUG1-cX3=s\0' s\1gs\2-s\3=karU,;whE=tNrtkϸS@s._绉/nļQ\[{ˮp+n$^q7-Z{GcY`r$p`n0c1Z(O/2IN+AAT$ NVW'z ^ǻоw4OG ~3:ys9pg y^WFsnԐڄήENkc7@{}oz|?}p]/|bzuj։d1 X VªaXM*Vƪc YJV'ʪm)w>渖:u\O} x'|Y_lk ]k{uEŘϥ`s7wPTYN;˪:{;_1:59ZܓZ=%؇_u5mchjov6ur=m5,s5PW]c;QL3hKrke^+aJn<]6(u6K,cR^n*i=QfX7]tӰ)np'`4FQb5FQ\gYr5gUp5\WUr\5W(Nq ڮEN5A*Z=_븯8D{Mu۹H`6ٙ u+P6`d*2[vfd~* TcX1fcX2-ȹrΜ;pM\? /wKyUvC_=DafDƯ5~W~t(t{.n~3T?sl>," +bіRN[D)'H=^ԦRIQ%[Sp-CTz)5hN 9q]ͤ/F }&`u!2CCmp Rfߣc`W7pn Ř[5_LIi=ޟ*_svNۅy}J)R nm2^ڮzvԵA'7S16ghùvm2̺Jux ǹw%{}8w?<1kd]+٠;N B,/p|s[3v K0^7Hpnu9)!-Zok5ܰP,a^ÛuvbڳҷһҥҩҭұҵҹҽziOH_HHH'H7HGHWHgHwHkV撴礻äˤӤۤ5i/H?HGGHH'H7HGHWHgkr>^Ύ.NnܕtttttttttļM?#>>>'>7^CNNNNOO/O?OOO_OoOOOOOOOOO||>|^|~=}=}=}=}=}=}=}=}=}=}=}= } O_DoDDDDDDTZSjSi_WS>kyo}]^_)$NJ|YVڟQUY]aeqb;r![w_ ZY P4mAo :7 ~]l[`wj\ҞIH{R4Jezffzggzhhziizjjzkkzllzmm"G'팋2]2rcvS.NlQI;t>.ԯ IGtt6(hJGw:ڝot tHe z`&ց'`;ؑ~r;lk"*#'])1 :*UjcձXh*'yKcQz]9.8tMDž>t6_Z7gxx6~o/xڟJ?3^6whO$K%/k*ɍq6~cC~D~qxgkIb'`!;#;&T_s" ;xڭG-=!8!X@@pw @Lw= 3~q< h}#as޴X>$A I` Kܠ :HDjIpPLBw.vY$]:R-B$r%c.wd!]tYUf(2¸)?-g \TVq5ͥ6w `-sL2.p;.ltM&6PjZ;)c$ F>z?ԓGM/~u}/;XN@uO}tK|_Pr̟*j E[fHJ'eߥtNTKM+eeUIjPh4ɨϾ?DYzo(4Gږ6WMmh#2wGӫuq:v.[SéN?o(5"rS|oɯw]H?MBѭɂShp7^A$9AjYduAA 9TSAM4A[y&abdHl8!$aIrIܐ$!$iSIV|!NSDk@" 9ƅ4Yȏ0 Bv>BZUmSfmPpZϬl-D/\/e7Nt-nq;i;DS)R?wW}.Wq1K\V㊲q~mIZhW gR[}P9 0kӓt_we]Au2~tAk-I47@q!_:KC-=USQЭNuNl(IP][L+͠L6pew։XG .`"֖JY{JU-~] ʴ:6abYZ-!L| e+g&Ycgy՚qkk?Z=}q&@#5h}oI88/s)kua_a ֏[7|:Ck2GwQLNIF)%NRl68: ۆ.Cݦ϶b"7_[\6je762@tRNKć,7c?}v&-txvM'/ip8~Om&<x3_$@l# Dnsza_=YL(Lrby)z " A{EcnAtB-a!̕VZ]:h5GtBBq%lQtJY$zx>m{nmOl6#rl6ZJ:d ĝ;IwIBWl,o7&(Gkh/K0[M6j@kk=^FZyt'`}4-&xn`)ftCI/iZW!E"vGo7vcꂹXMۨztݷ1i1q>CJgnK(%߰3֚MP:MA 䫆 u#N/8},uYb9xl!l"t4~Al:Fxڋہ4 5 6~3h!^Bk1fVҊ0~$$1"cD{Lv8_vqlۀQh5\p9;r3.ip.Ev[ by^hdwG 9= wO4{ [rRw h0v?knd7:'Ad[p>"CJ Dht:>dIS)!_ oR hE«{*>VJ+>Шjot=d3ҽ6Gw<݊׻XBϱq:z+n8SY/Z}bRP`-϶A_=zNI;%8p0b-ֶ _:wՎh_;>BOxdwՃFTګi&FFD-#VI_YIkE<0-V\Xya5u5A=B VzȷVJ= lizB>zgam6&T ﷺgZjuz5AX^k]VZh^:&kgBHo!K'# V xBT1`z"FE'̕:n P6ڊ&鯘KwNytU]@ё+oJ%5G EwUv5xE{52m 7]Vi%wkS[[B֐%f2դV(N'\Qs'c|[s-C7aZv) yKe` W%̾2 nGlOq\jkx\ :Έ蘭8>hzM\geun5rV5Įfp4]1-kEBhZ}*r%;*Iߒt\Qw[*R|k 5)]?"} wkAS=/͜y9q$"\gr~(K4JB1!_Zry4+q] +{Υo9 Nq*N9 lXru9Jd"3?e}gͽE5޲-[5w~tW;a^k6Vk[en8[o? ං.4lϷ Wսюb\=njwV#S: wL繋BTV'MqQplo]bYsjVs}l@E\l'UBVe]2NZ+\4[D7]o]U':ʭn[9icEkZ2j#)C>@p 5vp7m4^'VzZ z[ [`b멂2hfi%(a8Y ࠶ Zڰo0ѺCĚfɊ@s%X$}w n=we3 G-pjǭ}pƄ` F ؔ`-u R[ [ Li ,iq- ,b"CX5q0cx7*^0Ě}짠+5 [à٪@ [Ѡ ZaئPZ[dvjo gJ=#5yTRK 7GK*Mssŕ4ęl҅X.*󹦬液z,x,2O("WDVg_[)@E?S!+<rvyZ)h\r5@/$2䊢%9rtbFOa/'xr' w\SUm\Xqʩ wґ@ƄRK$I9 BN4H%Ka)U6M x?KW*WiRJ]*p)ۖ7@J0)c OJ|+8͏~Ћ7X4ߟ<}/SqnQtaP{}+֮tť+)]iHM2ƥ^BYx|d[7{G;?XL@A+,WW&2ʵzI4I|gIK$*KTW[b )7 !\SֺU=.v)d,+sk{䇸۸;{˹spe3+tZe\-[ՒvtL}\ ٤K/\jRJK%0n侗.4m~Ğzț Bjo'Z`EeVZXYk奛7eDZ8̽톟hg ;>{U[*ydUTNٯr.(m,2D$Cmi7MTnH)+Ia$5hVE[ e$d RH[#& ̷V"9m3&![(,2R J%(4xRIQ-F| )ޖAzPKyd9geBL")=]Jm/$wP4rhB|[ZfߘFt7c'z?O _E/F辍gf:]8MTD:'6K1t5лCA2$8A*HA:uA+Fﻤz=w_^SB?(YMR>/ &x&&ȬMbZ+eFZ,hy֚9hN?誑*7Mzu#Z:HjE' n&@ƪI;i ' ~NK[# jr7. I`b)̖L 7z.'n\v;!-‡G?]"eܹ+]QA^d\Aj-"A.GI@D8BY_$$*.01"1qqq?u4%ÑU2h(cyWZda7C+]ּ[hҗsMnIﺶ \{Mڔ~A]OXۀJ"6QGOz=N SXOߨb0*}^qN╞֕zs2/bT ]oyN1gQnvv|~.5:Q)uۡ C_2-[n2Όփn^Hƣķi}S9r]t+RZ5:6h\#[7ann[]eW 2ݮ6\&6wzP{~wĦŐkMw y6Mn ron tMpU~pRזݱ q'j-?]uswG=u™_?}Zkwo[iY]w4X-jVý}|NTE@sD\:v~i@7  `wv9{] q۱wu묑[ڛe9aKI!O<ֈbP,夌0sŨ+Ie\iRMWjT.+5rY@%]JBom_'h#tF6E:!馬rT/Ce;U:) 2#x % cT` 轑t_9qZ/h. d7-e2Z~dB ӵ8UT]::`֍;TBP^}ET(FUCU~* %)Qm'Up"&xI"bi|Y¼~ %L!bSJ7)lrʣ)4jQÎqb_1ع8]R=reDO$=} Ijʩ[rұU`K,:Š8+Sη:~gkˮRh@QMã%0#՞g{(wH챼X߁kˤAzJ)+诱Br4^'@{:Vd_dHztOX|-FbfsANYJN%A뒽sFURNs9Bc+/l -ԞnZMv*QuQYN@9Tn5î\Dy xr%@̨s#*([PnteQ-WUs?8TֽQu_54r$*HGr-vT{N//9<|@iy7V#]elK{.dmȡڶrrDk6m(zBI-,4%y/|#=?L/ɘ<Nfid MD7~80POw֯W%ƒMH`Ő5j~#mѫhU|7յnuu/'|N@D#&XSjI$M*ieEUisfg1$E^B x_@o 9d{d? %5Ծ.#e̐Rn!'\@*s+/$-lOgK|&["6y>Yl Y^APU(AWItO7h 15(/@qՔAA): smSPK O.]8sIN,8Sr3CxP4H ǾR2" R6H+4R3H :i9cIPH_ ΖbA*KKڠ B@jI$A |%ϾlW >{_'xSɷ _!{ "J !ah -àQ=(-`_nMB~v2NH|Al}Dkș _%9 9ܐSiq!)CQ@|M@/}!D 9"BJ< ~1Ir8 CIŰrYbQ;@ 98'3 /wh`| ʗ`H0Q(d`]vV*8܂ssM._ w<$\n=_17s17kcpsܚ;s;qG{`gn#On<3sg6  <Ⱏ)AiNnT*bo"*h2SxN}99u9 v\@D;6x_/p^j*?ZA'@< \7rQ翽,awR-''Ǐ8*_>F 䏴J~GKֲvx?GONW9޷s ʹd^̥i Q_I{<.(S/֠.~:8|_8uXہԑQg>3{=|JKgsz'׼zΠ'4P3E4r-etK ͼvA*`1E[pn <<ȵW>mcQȭ_*wZM?ڎk'I;sCմ-Wf@}5VJRO+=/o|kB.I ;+qķ.m[%mpv~ =dd6EkYe6e,ж2ShTUPA QQՐƢ =dY],JlԭN5a]չ?=:>ئu:9X3Ez[R5w}DmH`"tөC|Qy7JTn8qv'o?{-8^ {N`܎#[Y^`;ȓ!c-Nnp-/q7~秈 ቷs傈R?+d,_)7L)0o(6N H/zCs9M4FB.`WSO.ͤUq,BaJ?t)Lm1I4J-P[Rlmݳ)vnζZjk`ͷr6׊,m-M46R`wo%'"Z3Smho=֪vW--l74]4vZkTۭd.:]:C+:-+.bD "ͮ4Ԥ:YXC5jdm&z稜@jM㨛 zaI{$n@W'Ը/P>1r 5 I&QW>)dO"+|<8O2ȿ{7'}/~~~E~_q_CѿAe"r'rn/}Z3. 1TpIK%d$BKT98%4f(RqT@NxNB{H{(m>\[/𿌛9-ZŒ鏖F[Z&`ٵўVHYigUu5UVw[=iCM׶HX&5#tUM-6MԻik_(\cp`18ELqkϿY jYxV[;g}y-6>kWm.s4!'ry(+M]-ZPי~ȍvnp h[A:v7uW{JW DXA0?r%?z9w|WwKf~G)~fxq{|_W(!2'KM'|a+?W^s]|y+_myS<ơ? k 7pY+ɉ/GdL K5"^k-/t׆ `GM6j_٩dΖ:O2SnHn{,Ե^H+{&@(-DG&sn2~˫z̪ܶ{_zjh4 Reo0mR]+C 6H;J3;M;m{jb9xZisެ-y'ڿW]ԚX+W-Αdz|2qikm!3vn=~j_l!QD%. }RP&(M\a*J A א* VFA\j~g~aWtDn pcN7Et-nt+S^&R8 NR .Q|g* ALɸT8wВ9z0_u|qo'_rpgTA^R!';.6ryD#|Ww THjnl!tK.D82B4+Q?"j42|rC|(#_D\M9x&TPOgt~\+c c +ƢGv _ }4v#[m&Zz"- *D ]G iFqO{N]s4l[I[m*zWFUz`6etsQl*S[s:h|dl9mTr*jg(]tvc`^zf貎[ڋkԜ>kc#VHV 2SzKD,j+v6VlLl%GSZU-uhUFYBbܱv@2 bf묡hIJŷ x#;;p~bԕXiog" d>[&d?y j-GmbB[Km)jmkG5j8SYTY VGZ <[ S6A1FhcӒ6WsNhjd[슦hwjZ˂=;brCdc?L-a2+e[a'-w5TGc"cd]d~J:Xchw2BȄ#HM*$:n3tME>Y")%+rB~[*ːŬȺ56;@"!: oe<'ehuR_J95;^T;lTOK5I e%|O>+2 r)HN#PGomY$̖I(jʎI~|uӋR|=|]4B?K;馁(:Z㡾J,Nŗ9\?4QPG}U<\H! oe&{agVz]{#zqv ϙ 9<'qx Z߮k^󩶶Wzl!jZWφf`I)"fˬ-6jL)V1@^GkԾ ,նdVίZn{ O\3o Oo " TJD&`!P쬩>TJ @ Wxcdd``vf 2 ĜL0##0KQ* W!d3H1)fY{;_znĒʂT @_L ĺE60:Y@V%3ȝV ZZǠs&+|-7H ˈɛլB?&n [0dM@<0@penR~'p Hba wIf_n1e$1 2MfP1.pb;+KRsA0u(2t5|b@33X?kDd 0b  c $A? ?3"`?2SP'wï iMG&`!SP'wï iMG  ktxcdd``Ne 2 ĜL0##0KQ* W-d3H1)fY3PT obIFHeA*/&`b]F"L,a k-+L%L6A $37X/\!(?71AarM V0Zǖ6b#~#.&%.VJ_y*;o 3>dy& ,o OdAf7 걸 +ss9|^&p|@r'[S+ w3*$8^1HbA3׀dBܞ_ >4ֹ)= =Ĥ\Y\0dP"CXHB a _s;mDd xb  c $A? ?3"`?2jq O,ߏߤjy7&`!jq O,ߏߤjy@ Yxcdd``vf 2 ĜL0##0KQ* W|CRcgbR q_znĒʂT @I_L ĺE60:Y@VȝV ZZǠs&+|-gaKsˈ2;HY%7-kY@34O3M zS,aBܤYvxB8dw۳.]8"8N1e$1 21= 2no c\X7nv0o8021)W2aPdk),Āgf~i%[Dd b  c $A? ?3"`?2lV.Q7[&`!ylV.Q7[V@@8 Gxcdd``f 2 ĜL0##0KQ* W&d3H1)fY{A<6@P5< %! 8 :@u!f0m`t,6;3Q9A $37X/\!(?71AarM V0Z˕1lS+HY%&دP#/{F0~4HL@(\ձ~tp{ŰDBab 2h%$>] `p221)W20ePdk)YO`U1bYiDd tb  c $A? ?3"`?2 ek-.z4Z  &`! ek-.z4Z  @ Uxcdd``ve 2 ĜL0##0KQ* W.d3H1)fY{_znĒʂT @_L ĺE60:Y@V-L&v LAtO` ZZǠs&+|-/J lORV | F(&È*/ c +ss8|a?ؿ``Z2B_ ̀,o壻p ]L *LHqc =Ĥ\Y\˰d.P"CXHAg!t?3mmNDd b  c $A? ?3"`?2'tw 媔#6dth &`!l'tw 媔#6d6 @d :xcdd``f 2 ĜL0##0KQ* W"d3H1)fY{3_znĒʂT @_L ĺE603X@mf;3Q9A $37X/\!(?71AarM V0Z5m.LF]F\?4AZ*!| FU0߼L@(\ɕnɜ dn%oS[ {I&=^ **!p0@``㍑I)$5a.\E.  ceMDd b  c $A? ?3"`?2^MF9C(2pg"as&`!k^MF9C(2pg"aJ H9xcdd``Ved``baV d,FYzP1n: B@?b u ㆪaM,,He`?&,e`abM-VK-W  !"#$%&'()*+,-./0123456789:;<=>?@ABCDEFGHIJKLMNOPQRSTUVWXYZ[\]^_`abcdeghijklmpstuwvxzy{|}~Root Entry F0]X?r1Data fJWordDocument@ObjectPool672?0]X?_1246343314rF72?72?Ole CompObjfObjInfo  #&),/258;>ADGJMNQTUX[^abehknqtwz} FMicrosoft Equation 3.0 DS Equation Equation.39q:%^ 3x+43"5x=6 FMicrosoft Equation 3.0 DS EqEquation Native V_1246343728^ F72?72?Ole CompObj fuation Equation.39qW@'^ 3x+4"153"15x3=6 FMicrosoft Equation 3.0 DS Equation Equation.39qObjInfo Equation Native  s_1246343733F72?72?Ole  CompObj fObjInfoEquation Native Z_1246343769;F72?72?>8,^ 3x+4"15x3=6 FMicrosoft Equation 3.0 DS Equation Equation.39q2Ѕ ) 4"12x3=6Ole CompObjfObjInfoEquation Native N_1246386028TF72?72?Ole CompObjfObjInfo FMicrosoft Equation 3.0 DS Equation Equation.39qOp#Lo "12"12x="1412 FMicrosoft Equation 3.0 DS EqEquation Native k_1246386065F72?72?Ole CompObj fuation Equation.39q&P4i x="76 FMicrosoft Equation 3.0 DS Equation Equation.39qObjInfo!!Equation Native "B_1246042701$F72?72?Ole $CompObj#%%fObjInfo&'Equation Native (M_1246043301",)F72?72?1! 17(3x+4)=7 FMicrosoft Equation 3.0 DS Equation Equation.39q)Vtk 51x+68=7Ole *CompObj(*+fObjInfo+-Equation Native .E_1246043466.F72?72?Ole 0CompObj-/1fObjInfo03 FMicrosoft Equation 3.0 DS Equation Equation.39q*&tk x=5161 FMicrosoft Equation 3.0 DS EqEquation Native 4F_12463690353F72?72?Ole 6CompObj247fuation Equation.39qM0\ 4(3x"4)"7(2x+3)=3 FMicrosoft Equation 3.0 DS Equation Equation.39qObjInfo59Equation Native :i_1246369029 J8F72?72?Ole <CompObj79=fObjInfo:?Equation Native @a_1246368989=F72?72?E0( 12x"16"14x+21=3 FMicrosoft Equation 3.0 DS Equation Equation.39q%p[n "2x+5=3Ole BCompObj<>CfObjInfo?EEquation Native FA_12463707631EBF72?72?Ole HCompObjACIfObjInfoDK FMicrosoft Equation 3.0 DS Equation Equation.39qs^ 0.1(3.2+2x)+12(3"x5)=0Equation Native L_1246370776GF72?72?Ole OCompObjFHPf FMicrosoft Equation 3.0 DS Equation Equation.39qmȆ+ 0.1(3.2+2x)+0.5(3"0.2x)=0 FMicrosoft Equation 3.0 DS EqObjInfoIREquation Native S_1246370791@LF72?72?Ole VCompObjKMWfObjInfoNYEquation Native Zu_1246370817QF72?72?uation Equation.39qY 0.32+0.2x+1.5"0.1x=0 FMicrosoft Equation 3.0 DS Equation Equation.39qOle \CompObjPR]fObjInfoS_Equation Native `i| (0.2x"0.1x)+(0.32+1.5)=0 FMicrosoft Equation 3.0 DS Equation Equation.39q5Sd, 0.1x+1._1246370844OcVF72?72?Ole cCompObjUWdfObjInfoXfEquation Native gQ_1246370893[F72?72?Ole iCompObjZ\jf82=0 FMicrosoft Equation 3.0 DS Equation Equation.39q1P< 0.1x="1.82ObjInfo]lEquation Native mM_1246284772'm`F72?72?Ole oCompObj_apfObjInfobrEquation Native sb_1246379528YweF72?72? FMicrosoft Equation 3.0 DS Equation Equation.39qF1 (0.915x"150)7 FMicrosoft Equation 3.0 DS Equation Equation.39qOle uCompObjdfvfObjInfogxEquation Native yjN0 n 0.915x"1507=175 FMicrosoft Equation 3.0 DS Equation Equation.39qE8 0.915x"_1246284790jF72?72?Ole {CompObjik|fObjInfol~Equation Native a_1246284830hoF72?72?Ole CompObjnpf150=1225 FMicrosoft Equation 3.0 DS Equation Equation.39q5$ 0.915x=1375ObjInfoqEquation Native Q_1246284906tF72?72?Ole CompObjsufObjInfovEquation Native _1246379739yF72?72? FMicrosoft Equation 3.0 DS Equation Equation.39qdk 0.915x0.915=13730.915=1502.7322... FMicrosoft Equation 3.0 DS EqOle CompObjxzfObjInfo{Equation Native Nuation Equation.39q2 &n 5012.5=x FMicrosoft Equation 3.0 DS Equation Equation.39q_1246386972~F72?72?Ole CompObj}fObjInfoEquation Native c_1246386837F72?4?Ole CompObjfGL$n 2(5a"13)=27 FMicrosoft Equation 3.0 DS Equation Equation.39qP _m 29(i+23)=25ObjInfoEquation Native l_1246387401|F4?4?Ole  FMicrosoft Equation 3.0 DS Equation Equation.39qG+n 4(v+14)=352 FMicrosoft Equation 3.0 DS EqCompObjfObjInfoEquation Native c_1246387552F4?4?Ole CompObjfObjInfoEquation Native Wuation Equation.39q;-^ s"411=25 FMicrosoft Equation 3.0 DS Equation Equation.39q_1246387094F4?4?Ole CompObjfObjInfoEquation Native h_1246386415F4?4?Ole CompObjfLo p16"2p3=19 FMicrosoft Equation 3.0 DS Equation Equation.39qq n q16+q6"(3q+1)9=ObjInfoEquation Native 1TablekBSummaryInformation(32Oh+'0t  0 < HT\dl Lesson 3andy Normal.dotandy4Microsoft Office Word@Hʎ@f @?4`#McPX\ {pUsi#.yl 0]_ηMc``/91@penR~F.pD@r\V0+3a#nO>Ȅ s.hsc0``㒑I)$5d.P"CXYO`ydMDd b  c $A? ?3"`?2^MF9C(2pg"as&`!k^MF9C(2pg"aJ H9xcdd``Ved``baV d,FYzP1n: B@?b u ㆪaM,,He`?&,e`abM-VK-WMcPX\ {pUsi#.yl 0]_ηMc``/91@penR~F.pD@r\V0+3a#nO>Ȅ s.hsc0``㒑I)$5d.P"CXYO`yd<Dd $b   c $A? ?3"`?2S"@χqBwbP&`!ZS"@χqBwHD R(xcdd``ed``baV d,FYzP1n:lB@?b uBqC0&dT20t @201d++&1(\ _OpaF\ GXAZ+a|3f,`|C}L@(\`Ŷ@${5@|m {IF=9`* ippAPF&&\5 s:@ĞB ~bA`FDd lb   c $A ? ?3"`? 2 p:Yalɜl&`!d p:Yalɜ&@ 2xcdd``f 2 ĜL0##0KQ* WYRcgbR f@P5< %! 8 :@u!f0m`ff;3Q9A $37X/\!(?71AarM V0Zē 1lO@& !| F0L@(\5yG!3n!8 m1e$sz1L0䂆(8K'F&&\` @ ]` {> 1`rtDd b   c $A ? ?3"`? 2ݓ#Onu,Rd&`!ݓ#Onu,Rd xH`xcdd``Ned``baV d,FYzP1n: x,56~) @ *'00L UXRY7Ӂ`'0LY ZZǠs&+|-L3bF\ 7AZ+a|Y._DeYl 7#XP f@5ϚP 27)?mC!ed}O[=9@|m8]8FF;ón;F \^h 0y{iI)$5dP"CXX= Xr'ZDd lb   c $A ? ?3"`? 2X+P}jőF&`!xX+P}jőj XhRFxcdd``6ed``baV d,FYzP1n:B@?b up30 ㆪaM,,He`0?&,e`abM-VK-WMcPX\ L;T TrW ' /  `0@penR~PKfG!advkSX@|]8߉ Gw#q#;@&Ta𹠱9pCDkF&&\ {:@ĞB a wh>Dd b   c $A ? ?3"`? 2}>uTT)?d&`!\}>uTT)?* ~ R*xcdd``ed``baV d,FYzP1n:F6! KA?H1Ⱥ BqC0&dT20t @201d++&1(\ _'eF\ ~ ƕ0~*3o b*I9 b\\ > ᰏD@7d-ܞ&_η۫a/#w؄J.hrC|0``㊑I)$5(\E.cDd  b  c $A ? ?3"`? 2X#%oQD5&`!X#%oQD5Z@`z xڕKP]ڴMZԡXVt*D,X+P9;wAPpr *AEn.'haީ@"y"j0+MӨSu7?- `T enXs٨y>6o-:4K-?s.cc(6xV#K.g 2~N|U%ȸ yį%AA/CZ8+&u{ GqE~_R$,XsPN=>qbVLhFx S0Dd < b  c $A? ?3"`?2lCtux+1!&`!lCtux+1J`HbHxڕK@]4M DD0:Vm]ܬQ0BM\:8NE*n U)NKzxE.>ͻ ]2ӀOT8Zb} l2)ds9/{A{t0c-tԙ44^Y#,3^: "fadcQDd b  c $A? ?3"`?2Ys]0#o4m!h&$&`!Ys]0#o4m!hRlxڕK@ǿwI6mm *ѡ #:)8`P!bJ, n t?8 {0E.>ȻǐpLX>8cxEҪ,t9~0VV(` a In&zk+s,W:]鷝FP?oωBW=ayru!_[ %WgxIԿx:xEOod-zC~+^z׮N({~0/9 <ˊ+^u0U*ZjV<yL0%u1gaQKtE@߬v#Dd b  c $A? ?3"`?28 gEیm*"F&&`!8 gEیm*"F*jHxڕ?K`}mID$:TԊN.~ c5.N:#hI3(I4wM7_xrs aH DBOQQ ߒKIOxrzG1==s@dIrYuwmU~h {֊ݴNmN3Uzm6ښ:e}Zr{ܟF3類gsE$sF1]S %8NgZͿ̼(+g<͊׷t%<\isk O0?a ~!_}"gIvʠͣ vʄQvUH9Zqm1'V' gO=xNDd b  c $A? ?3"`?2M̀G* YHt:)&`!lM̀G* YHZx R:xcdd``ed``baV d,FYzP1n:B@?b uBqC0&dT20t @201d++&1(\ _SY@F\ @Z *aX-`|^ jk |#,eBܤ6FW > p/#w #lLg1a$1\ 096ˆ  \74=edbR ,.Ieԡ"|b@3X?eHDd 8b  c $A? ?3"`?2ӭP!)n+&`!fӭP!)Jv R4xcdd``Ved``baV d,FYzP1n:lB@?b uBqC0&dT20t @201d++&1(\ _C8NUsi#.F_V,`, X0WcD_c@Uoaq W&00<ڿ12H\ 2Bn &Fb#ܞ`*pB\KF&&\S s:@ąB ~b3IemDd b  c $A? ?3"`?2nl?0x~r-&`!nl?0x~rz@e YxڕQ=K`4M A!:ZX-# -'nq":⠢yrж/Xut%c*ǹ|+PCl,,@`10zǚ{ǭBoU`];lc42T4W(zu{]{{}h/sK "OWTF:\̷u[s$s*ּPSu;)3g5s pG$xJ{cQYD^L.\3ޒ)CA0PKp)J0?hR2iuDd Tb  c $A? ?3"`?2LsO\g=0&`!LsO\g| @ axڕQMJP4M BEt!hiPrP[W(+P{W֝ xA *Kg yr@)DZ%W.es!Vdp81F'li0od8gkfݚjw}j iEa{N;jw5pxޓyPמn 6cZRyPfAUR&ʚjJS|W˔ğG{cK<LIJ-eO>>m>oEvp;dнJ6GF #+_`"@c*k RDd b  c $A? ?3"`?2ρ<zx2&`!pρ<z@ FR>xcdd``V`d``baV d,FYzP1n:.! KA?H1Ⱥ \ @øjx|K2B* R vf: KXB2sSRsV~.b哘Xt`0R`1422aaEA"Pk a|30P 27)?+W12@]0s߱ŰDCa# 6 \*4=ddbR ,.Ie`ԡ"b> 1`CDd b  c $A? ?3"`?2zrX7"z<(ri5&`!azrX7"z<(r R/xcdd``gd``baV d,FYzP1n:B@?b uBqC0&dT20t @201d++&1(\ _5yvU}`ĥx$bhln Qcd, MM9"@f`!70@penR~:V.-B8?u 2\F1n( C.hHrCdp``㇑I)$5a7\E.Y`_Dd b  c $A? ?3"`?2:c^%tG7&`!:c^%t@ xڕR=KAKbr"`ᑻ#T)*L0Ic? [jeaPHocoQQp9fٝ]rVFȌ xfਏEy1Q M0#F6ͮi491X.Tƾ Є0E߈P1{\`g4S$ J wIS{;%5}\*~\'_j[l `@nvBp%cmYaFaKA1TH,ˬ5SNB`==-=Nf{=Ρ#ۧp~*\LO5J]⠺qcZݍIY̛ VDr)9MC*gA`WWe"!Fꖠ|*& 1gR ~TDd b  c $A? ?3"`?2Wσ̉'Vxhz9&`!rWσ̉'VxhF@`\ @xcdd``Vf 2 ĜL0##0KQ* W|ERcgbR q _znĒʂT @_L T̠1[i% d0? `01d++&1(\ _˽86Ade

+pv$s2f.I5' OM+a 0_η`Eo7588V`MGF&&\M w0u(2t5,Āgf~gic|Dd b  c $A? ?3"`?25"j4>+N<&`!5"j4>+ͪ@ hxڕR=KA};&XXi,,1p%pV i:BZ;+JPs?p9۝]4`0$JHS1 PY62Fun*F1PVD>>iبjt1"o+J(1{ٝ%Q^DMŹ-NO]a^vïý"ܹvsÔiJ./3uX?$_0~Mo$1|/'9k7i}Rz2m%eUsO~IyTnWr`+SoMWfe_)\) s~&KCnVDd `b  c $A? ?3"`?2G~IZ}+Iw=>&`!G~IZ}+Iw=@X kxڕRJAM.%#ZbE"-Z`pb3Bኼ>i,,#|kK%X;{_|-B@Q^0$e(F!0 -D]*RVxlVsT N=>t: is5VIط!b_>RCg6Iu{uԹ ͯ)f~?H4[ χ 2b8@ |Ip'[pzDd b  c $A? ?3"`?2m,3-dES IA&`!m,3-dES @ fxcdd``e 2 ĜL0##0KQ* W.d3H1)fY{؁/P=7T obIFHeA*/&`b]F"LA,a 3L0+LLLAtO` ZZǠs&+|-–vb#~#Ll FUVM!| yMSzK07k XI9 ٹ|^&p|i' [=L 6=$ &=`Lipp3@``#RpeqIj.m @ ]` {> 1Q_odDd [b  c $A? ?3"`?28g{$b6C&`!8g{$b6j`@S Pxcdd``6e 2 ĜL0##0KQ* W*d3H1)fY{X/P=7T obIFHeA*/&`b]F"L,a ,L̒& ro '0`bM-VK-WMcPX\ q]߈'S Hi%oU1lheɛb +ss.q-(~&? 2n8t1a$џ{`&0L(6 8KkF&&\ s:@ |b@3X?viOwDd `b  c $A? ?3"`?2]%q3S'F&`!]%q3S؞@X cxڕRJQ=3 Bb,"&B!?IcaE5D~V~BF;ko5Xz{QxYΙܹ`a ą & q DKG~ZHMbtFV@WB CC VrFu<1!yҹ tDFwFw3ѝ&<<OHed;vVݮ{p·9!Kwުڤz*گKeҼ%bd`ɋ yM/5l}{;ydjWus: 3ϥU2 &mmuеH*Wgj~z:8Vҡ?X$rDd b  c $A? ?3"`?2i%[Ƭ ~H&`!i%[Ƭ ~"` @ xڕ;KP=34V  Z`Ґ_ :)88vuqRRT|5GE&pK  `OJA6GX6զ#IIC[*I &˕N; Fo(2!Q&EPH[JucҶK[`3c/^ ,:պRu՚S禩XOQt)!Ϝ:Kyd'_1N+2*vd:ۊVk