FSCBNK#W#04#00# Algebra 1 Cumulative Review - End of 1st Semester*7H{=ll"r*+|&;Dw)xx6  Times New Roman Times New Roman Times New Roman Times New Roman Times New Roman A    7 |/?  /H^m  $N ?  x!| (Jl{  ,,-Yd  /6E}]?  32%CN  K9;M{p^? GE4je  vZA \]? US(Jv  3e Qrg1? mcaDv  e{z%?: +щ(Pq   k<Ra(   SIB<@  #Fr graph the function slope from graphc slope from points 0 or undefined slope, find m and b of the line solve equation value of expressionf find the quotientL1%1-8 Multiplying and Dividing Integers1-8.2 Dividing Integers7IN 7.2.1, 7IN 7.3.4 1-8 Example 2dividing integersNAEP N3a, CAT5.LV17.47, CAT5.LV17.51, CTBS.LV17.47, CTBS.LV17.51, ITBS.LV13.NPO, S9.Int3.NS, S10.Int3.NS, TV.LV17.10, TV.LV17.11, TV.LV17.12, TV.LV17.49divisorrange(-12,12,1)3V@dividendrange(-100,100,1)90>result1dividend/divisor30result2fracs(1,result1)-1/30>@result3-result130result4fracs(1,result3)1/30 remainderdividend MOD divisor0 remainder=0 and abs(dividend)<>1abs(divisor)<>1?scrambleTRUE1+7H{*ll"p*+|$;Dw(xx6o67`3/Pc%tt:ZTl_@@SXxK \\M ZbeW9'w}Hv?s;."z55j*rs$c/a00~1~(JW(] BJKF[%IVVWRO0EZ]⺻춫ȆކЂӕĊʒĞρОƞ鸸崴ÔӬрΖϘǸ͜҂ی˴9hh&~&'p"?@s5dd*j23d>#]o"pp>f>?h h[LL \dWXXN@pCTT:bc4ns ?q n6no8zg+m<Ew)xx6n97`2/Pc%tt:ZT_@@VD XiN Z][LQtGy.)f>fg0bn3u$$j*rs$~c/a~&^(J-]GLJf+%I5VSVRO0EZQP뭶⛡鶭лΆ܇ЂӕĊʄĞρОƞwⲠ龹B巵ÔӬрΖϘ̻҂ی˴9hh&~&'p">@s5gd*j2d>#\o!pp>f>?h h[LLR[\dW XXN@SrCVU:bc4ns ?q n6no8zf+m:fg0b3u$$j*rs$~c/a00~&~(JW(] rJKn#(Q{=+VVWRO0EZ⺻L12-6 Solving Two-Step Equations 2-6.1 Solving Two-Step Equations 7IN 7.2.1, 7IN 7.3.2, 7IN 7.7.12 2-6 Example 1two-step equation,algebradNAEP A4a, CAT5.LV17.54, CTBS.LV17.54, ITBS.LV13.A, S9.Int3.PRA, S10.Int3.PRA, TV.LV17.12, TV.LV17.16"@var1range(-12,12,1)9&@var2rand(15)11Cvar3range(-100,100,1)38correct(var3+var2)/var13r2ceil((var3-var2)/var1)5Dr3var3+var1-var2402r4var1+var2+var318isunique(correct,r2,r3,r4)(var3+var2) mod var1 = 0abs(var1)<>abs(var2)<>abs(var3)?scrambleTRUE1+7H{*ll"p*+|$;Dw(xx6o67`3/Pc%tt:ZTl_@@SXxK \\M ZbeW9'w}Hv?s;."z55j*rs$c/a00~1~(JW(] BJKF[%IVVWRO0EZ]⺻춫ȆކЂӕĊʒĞρОƞ鸸崴ÔӬрΖϘǸ͜҂ی˴9hh&~&'p"?@s5dd*j23d>#]o"pp>f>?h h[LL \dWXXN@pCTT:bc4ns ?q n6no8zg+m<Ew)xx6n97`2/Pc%tt:ZT_@@V XiN Z][LQtGy.)f>fg0bn3u$$j*rs$~c/a~&^(J+]GLJf+%I5VSVRO0EZQPH⛡鶭лΆ܇ЂӕĊʄĞρОƞw^龹B巵ÔӬрΖϘڕ|҂ی˴9hh&~&'p">@s5gd*j3d>#\o!pp>f>?h h[LLR[\dW XXN@pCVU:bc4ns ?q n6no8zf+m:qؚ٦˘䨢7p۰̂ˊܟؖԚU瘫弼딧ƕǐߠЄʘӄüކ߈*7H{=ll"r*+|&;Dw)xx6n67`2/Pc%tt:ZTl_@@TXxK \\RL tGy((f>fg0r3w$$j*rs$~c/a00~&~(KW(] BJKF[$IVVWEO0GZ஢ɇܮݏҹŧʒρОƞ鸸崴ϘǸ͜҂ی˴9hh&~&'p"?@s5dd*j23d>#lo!p f>?h h[LLR \dW XXN@pCTT:bc4ns ?q n6n zg+m<#\o!pq>f>?h h[LLR \dW XXO@pCTT:bc4ns ?q n6no8zg+m<Pc%tt:ZTl_VX{K MBsrGyr(f>ef0b3u7$j*rs$~c/a00~&(Jw(]BSFX%ShV{WRL1EZX'J춊\ЂӕŊʒĞρОƞSS C[崴”ӬрΖϘǸͅ҂ڌ˴9hh&~&'p"?@s5ed*j13d>\o!pp>f>?h h[LLR \.`W *YNB@[pC]T:cc4nr ?q! n6lo8zg+m5ɍ݅Ӊ'Y%w/mF=_ UJ VS^C<AW_H7ߛn ڛԎߑؚˍܒŽ̖PᝰШ݉’˜Фɘ֎׀ϰŔz"#t.3L1``.v./x:'Xk-||2b:;l6*TgXH^P`SED JD|OPPFHjg;}.,b2jk2nr&D#2ugzчړЎ˒ɻ׌‹⵾֋뚪т֖諶䣲ꢮƧQGI [! FDC^VF|TVPVHz{ 5il.gr+1co%zx,w"z(PS!aL>t[:^G0".~a A v iC-3Iu[Hg6&I%fH0&>Y`DJ RS^C<Ah^_ಯE%Ԏޑ֎ؚˍܒš̖㜯ᰰר݌’˜ۤɘ֎׀ϰŔz"#t.3L1``.v./x:'Xk-||2b:;l6+TgHH^P`SDD JD|LPPFHjw;},,jk''p?@s6ed*j23d."\o!pp>f>?h h[LR \dWI]MY pC_TT9cc4ns ?k! n6no8zg+m<fg0b3u$$j*rs$zj/b10~&~(JW(i BKKF[$IVVWRO0DZl⺻쎢ȆކЂĊȓĞρОƞ(鸸崴ÔV٬ΖϘǸ5ی˴9hh&~&'p"?@s4dd*i23d"\o!pp>f>?h h[LLR \dWYXN@pCVT8cc4ns ?q n6no8zg+l<La`.v./x:'Xkx|2o;;l6+TgHH^P`SDD ID|OPPFHjw;},,b2jkfg0b3u$$j+rs$~c/hρً׵W(]d$&;wAn'/A-3%z7%tRO&EZ5ͮ춫ȬކЂӕʒĞSρ؞ƞ鸽崴ÔӬрΖϘǸ͜҂ی˴9hh&~&'p"?As5dt*j21d>#\o!pq>f>/h j[LLR \tW XZN@pCTT:bc4ns ?q n6no8zg+m< BJKF[$IVVWRO0EZ℻춢ȆކЂӕĊʒƞ 0~/%a9aΒق5崴lӬрזρǸ͜ۯ˴9hh2~&'z"?@v5dd>j23>#\g!ppf>?v hvLL R [dR XXNKpCTT:bc4ns ?q n6no8zg+m<fg'b1u$$j*rs$~c.a00*O[jMl}^c/s$KO?6Fx%^Mvy?-_oE$Z݂⺻춫ȆކЂӕĊL1*2-4 Equations With Variables on Both Sides42-4.1 Solving Equations With Variables on Both Sides5IN A1.2.1, IN A1.2.6, IN A1.9.2, IN A1.9.4, IN A1.9.5 2-4 Example 1Addition and Subtraction Properties of Equality, Multiplication and Division Properties of Equality, solving equations, multi-step equation, equations with variables on both sidesNAEP A2e, NAEP A4a, NAEP A4c, CAT5.LV19.50, IT.LV15.CP, IT.LV15.PS, IT.LV15.AM, S9.TSK1.PRA, S10.TSK1.PRA, TV.LV19.16, TV.LV19.17, TV.LV19.52, TV.LVALG.54 @var1range(2,6)4@var2((-1)^rand(2))*range(2,9)+ 7 @var3range(2,6)5 var1<>var3@var4var1*correct+var2-var3*correct+ 3 var2<>var4 @correctrange(-6,6,1)4 abs(var4)<10 abs(var4)>1@result4correct-range(1,3)2@result2correct+range(1,3)7result3floor((var4-var2)/(var1+var3))1)isunique(correct,result2,result3,result4)?scrambleTRUE1+7H{ll"p*+|$;Dw,xx6l67`3/Pc%tt:ZTl_@@^XxK \\Mb;C66TH'vHv?s=."z5gD;}b`Pr>p00~&~~(JW(] -BJKF[$IVVWSO0EZQ⺻춫ȆކЂӕĊʒĞρОƞ鸸崴ÔӬрΖϘǸ͜҂ی˴9hh&~&'p"?@s5dd*j23d>#\o!pp>f>?h k[LLR \dW XN@qCTT:bc4ns ?q n6no8zg+m<'Xk-|w2b:?l6+TgH^P`SDc'w`dPf oS?=(Hjw;},,b2jk?*hVjR \d_XXN@pCTT:bcos 8p n6no8zg+m<fg0b3u$$j*rs%~c)a00&~(JW(] BJKF[$I VW0RO0u$f%Z⺻춫ȆކЂĞρОƞ鸸崴ʚ⯡рΖϘǸ͜҂ی˴9hh&~&'p"?@s5dd*j23T>#\@D>f>?h h[LLR \dW XXN@pCTT:bc4ns q Y]+m<var2 num1/den1<>.5num1/den1<>.25frac1fracs(num1,den1)4/5abs(var1-var2)>1correctmixfracs((var2-var1)*den1,num1)12/1/2abs(var1)<>abs(var2) var2-var1>0 result2mixfracs((-var2+var1)*den1,num1)-12/1/2result3mixfracs((var2-var1)*num1,den1)8*result4mixfracs((var2-var1)*den1+range(2,8),num1)14?scrambleTRUE1+7H{#ll"p*+|$;Dw*xx6l67`3/Pc%tt:ZTl_@@QXxK \\Mb;C66THiiw1w%spp[5+{n\b+or/a00&~(JW(] BJKF[$IVWWRO0EZN⺻춫ȆކЂӕĊʒĞρОƞ鸸崴ÔӬрΖϘǸ͜҂ی˴9hh&~&'p"?@s5dd*j23d>#\o!pp>f??k h[LLR \dXXNApCTT:bc4ns ?q n6no8zg+m<M{0m-,.||;Dw$yx6n67`!/Pc%tt:ZTl_@vXxKjLYOzZf qGT((f3gg0b3c$$j*rs$~c/a00~ف(JW( B[NKZVTVW_N0EZ⢣EXOcЯӘĊʒąρОƞSKȢ(鐣ÔӬ̀ΖϘǸ͜}%ی˴nh&"p/>Udd*j23d6"\o!pp>f>?h h[LL \dW XXN@pCTT;bc4hs ? n6no8zg+m<fg0R3EV[*rs$~c/a00~&~(JW(] BJKF[$IVVWRO0uZƮ⺻춫ȆކЂӕĊ揺ƞ鸸崴ÔӬ󭻘Ǹ͜҂ی˴9hh&~&'p"?@s5dd*j23d>#\opp>[LfcZ[LLR \dW XXN@pCTT:bc4ns ?q nno8k^Hr"z{,vk'YFFGB_ UJ RS^C<A^^_oL1:3-3 Solving Inequalities Using Multiplication and Division03-3.1 Using Multiplication to Solve InequalitiesIN A1.2.4, IN A1.2.6 3-3 Example 2DMultiplication Property of Inequality for c < 0,solving inequalitiesNAEP A4a, NAEP A4c, CAT5.LV19.50, IT.LV15.CP, IT.LV15.PS, IT.LV15.AM, S9.TSK1.PRA, S10.TSK1.PRA, TV.LV19.10, TV.LV19.16, TV.LV19.52, TV.LVALG.54 @denomrange(2,6)4 @nrange(-4,4,1)2 answer-n*denom8@answer4n+denom6abs(answer)<10 @answer3-answer8?scrambleTRUE1$+7H{#ll"p*+|$;Dw xx6l67`3/Pc%tt:ZTl_@@_XxK \\M ZbyHhkw1iv! Q#\o!pp>f??k h[LLR \dXXNApCTT:bc4ns ?q n6no8zg+m<7=d~zh[0LLZ \dWXXN@pCTTŝc4ns ?e+ nj8+dRPFHjw;},,b2jk#\o!pp>H!?hh[LL \dW XXL@pCTT:ba4gߑno8zJ<#\o!pp>f>?hh[LLR \dWXXz%a/>&rtuW 4= a]L (e-Ok zD<#\o!pp>f>?h h[LLR \dW XXN@pCTT:bc4ns ?q n6no8zg+m<fg0b3u$$j*rs$~c/a00~&~(JW(] BJKF[$IVVWRO0EZ⺻춫ȆކЂӕĊʒĞρОƞ뼻崴ÔӬрΟ;0g%2Gt2҂y)4K}Ɨ&~&'+ʿʛ*j23d>$Uޏ˙h hQ|"?u7x?\eW XN@kpCyT:{c4nj ?qD n6 o8zf+mffg0b3u$$j*rs$~b/a`$~(JW(] BJKF[$IVVWRO0EZ⺻춫ȆކЂӕĊʒĞρОƞ鹸ÔҬ᫽Ǹ͜҂ی˴9hh&~&'p"?@s5dd*j23d>#\o!qp>f>?h h[V;gn/&U ) 7{/x@pCTT:bc4ns ?c $n6no8zԒ;fg0b3u$$j*rs$~c/a00~&~(JW(] BJKF[$IVVWRO0EZ⺻춫ȆކЂӕĊʒĞρОƞ鸸崴ÔӬрΖϘǸ͜҂ی˴9hh&~&'p"?@s5dd*j23d>#\o!pp>f>?h h[LLR \dW XXN@pCTT:bc4ns ?q n6no8zg+m<fg0b3u$$j*rs$N/a00~&~}(JW)] BJKF[$IVVWRO0EZ M։ŋЂӕĊʒĞρКƞwDS鸹崴ÔӬрfʘǹ͜҂ڌCxmC iUX *j23d>#\o!pp>f>?h h_LHR cW XXN@pCTT:bc4ns ?q )lo8zg+m<fg0b3u$$j*rs$~c/a00~&~(JW(] BJKF[$IVVWRO0EZ⺻춫ȆކЂӕĊʒĞρОƞ鸸崴ÔӬрΖϘǸ͜҂ی˴9hh&~&'p"?@s5dd*j23d>#\o!pp>f>?h h[LLR \dW XXN@pCTT:bc4ns ?q n6no8zg+m<fs0bd3u$,j*r[$~c/a0~&~t(JW/] BJYF[/IVVWRO0EZ⺻춫؆ކЂӕŊʒĞρОƞ鸸崴ÔӬрΖϘǯ͜҂ی˴9hi&~&sOZ3S{ 8]^P#LRfxl+*D6# R gYdW XXN@pCTT:bc4^ ?q n6nm8zg+mfg0b3u$$j*rs$~c/a00~&~(JW(] BJKF[$IVVWRO0EZ⺻춫ȆކЂӕĊʒĞρОƞ鸸崴ÔӬрΖϘǸ͜҂ی˴9hh&~&'p"?@s5dd*j23d>#\o!pp>f>?h h[LLR \dW XXN@pCTT:bc4ns ?q n6no8zg+m<fg0b3u$$j*rs$~c/a00~&~(JW(] BJKF[$IVVWRO0EZVL11-8 Properties of Real Numbers&1-8.1 Identifying and Using PropertiesIN A1.1.3, IN A1.9.3, IN A1.9.6 1-8 Example 1Fproperties of real numbers, Associative Property of Addition,reasoningNAEP N5f, NAEP G5a, CAT5.LV19.51, CAT5.LV19.54, IT.LV15.CP, IT.LV15.PS, IT.LV15.AM, S9.TSK1.NS, S10.TSK1.NS, TV.LV19.17, TV.LV19.18, TV.LVALG.53arange(-10,10,1)6 @brange(1,10)4 @crange(1,10,1)6a<>-b?scrambleTRUE1+7H{ll"p*+|$;Dw(xx6o67`3/Pc%tt:ZTl_@@PXxK \\M:0l>TlY'FFO?BT <\J%b2 o sB EDR MjZt-i~6kj$zfQ{=qh:g56t; ^TV:KΙǭؖլ߅»ً퓶磓ӽՇ҆̃рΖϘǸ,҂ی˴9hh&~&'q"?@s5dd*j23d>#\o!>f>?h h[LLR \dW XXN@pCTT:bc4ns ?q n6no8zg+m<f"0b3u$$j*rs$~ca0~&~/JWX CO;F[ IWVWROxEZQm纳틬pȒކтӕĭʒĞρОƞ`7  崴©ӬрΖϘGt͜҂fgx#1o!pp>f>?h h[LR \_ XKA/\T:bk5ns ?q n6no8zg+m<f 0b2u$$j*rs$~c/a00~&~~(JW.] BJKF[$IVVWRO0E]⺻춫ȆކЂӕʒĞρОƞ~ۼ鸸崴ÔӬрΖϘǸ͜҂ی˄9h &~&'p"?@s5dd*j23d>#\o!pp>f>?h h[LLR \dW XhNt@pCTT:bc4ns ?q n6no8zg+m<#\o!pp>f>?h h[LLR \dW XXN@pCTW:bc4ns ?q n6nzg`+<=r"z{,vk'YFFGB_ UJ RS^C<A^^_ಯڂԎߑ֎ؚˍܒš̖㜯ᰰר݌’ܜۥɘ֎πϰŔz"(t.3L1``.v.y:'Jk)||2b:0l6+PgHH^QrSDD JG-sfoO5'>qr)w;},,b2jkfgϝu$$<.rsCnfc!'JW(\ BJK5F[$IVVWRO0Z("رົ춫̙ȆކЂӕu5䞃/ޛ+ϲ)鸸خ崴k1ӬрϹ¸˴;hh&~&'@"?@s5dd*j23d>#\ppf>?>h=IL)Pi)dW XXO@pYTT:bc4ns w 6no8zg+m<ކ߈-0A“׍|&;DE ɑH`2/Pc%ss3쓠@@k4 \\BKיfg0bLb:ە s$~c/f79فݵ] o㹤[IVQP 9⺢춫ȬކЂӕĞʒĞρ՞ƞü鸄崲ȔӤрΖϘǸ͜҂ی˴9hh&~&'p"?@s5dd*j23d>#]o!p`>f>=h h[LMR \fW XXN@`CTV:bc4ns ?q n6no8zg+m<#Eo!pi>f>[h  [LIR Q\pW XRN@dCT0:bk4ns$?q *n6nS8zg+m<;r"z},vk'YFFGB_ UJ RS^C<A^^_ಯڂԎߑŽ֎ؚˍ̒š̖㜯ᰰר݌’ɜۤɘ֎ր4GTT|\!_`3WL@:a ( /_UWl*TgHHP`SDD HD|OPPFHcĂӝjkfg0b3u$$j+rs$nc/c00~&~(KW(M BJKF[$IVVWPO0EZ⺻춫ȆɆЀӕĊʒğչѭԐᓆމכϞ*(_ӠрΖ͘ǹ͜҂ی˽rƗӁp"?@rd*h23d?#\o!pp>f>?h◤⹳ \(^i@pCS]ŝ?q E?Džg+m<10Q@y2slope2*270I@y3slope3*250 compareslopesfracs(slope1,slope3)12/5 V@y1slope1*1.590 3+7H{ml"p*+|$;Dw.xx6l67`3/Pc%tt:ZTl_@@WXxK \\r~lqy7[QeMWKA^nNU\B^Qj#@i8i,!s88<'/s ~~3|39tr<@f pgtˑؚۣ߱ȉߧ䮲򿩒ܐיҒӀ̗ՀўîPGTGL4L!ZSZ .>A'_V*c>=?2/ub,Pv0`$%lr'l;c_n30b;v,:{ټ̎ÙȰ̈Śۉːβ磧шփ܇Џςȗᰰר:’˜ۤɘ֎ׁ̰Ŕz"#t.3L1.v./x:&Xk-||2b:;l6+TgHH^P`SDD JD|OPPFHjw;},,b2jkfg0b3u$j*ss$~c/a0~&~(JW(] BKKF[$IVVWRO0EZ⺻춫XɆޔԂӕĊʓĞρlҞƌŏי򃌤٘崴ÔрΖϘǴ͜܂ی˴9hh&~&'p"?@s5da*j2=d>#\o!pp>f>?h h[LLR 9Xy XXN@OpCTTs"c4ns ?q n6no8zg+m<7r"zy,vk'YFFGB_ UJ RS^C</^^^\ҩضәξڂԎߑ֜ܚˍ#m=e̖㜯ᰰ݌’ʜۥɘo)ڿ沴ƵCMt.3L1``.v./x:'Xk-n|6b:?l6+B^P`SDE JD}OPQFu~.hKz9t7mH6<@vQ4xNNOZG8 MRZve8-4𢿩겳侣澿芗۝̂Ҋ܆׉ؖΖÅԚ⻶ӂٞП딧وƞǐߠՄʊӄüކ߈*7H{=ll"r*+|&;Dw)xx6n67`2/Pc%tt:ZTl_@@VXxK \\BL tGy((f>fg0b3u$$j*rs$~c/a00~&~(JW(] BJKF[$IVVWRO0EZ⺻춫ȆކЂӕĊʒĞρОƞ鸸崴ÔӬрΖϘǸ͜҂ی˴9hh&~&'p"?@s5dd*j23d>#\o!pp>f>?h h[LLR \dW XXN@pCTT:bc4ns ?q n6no8zg+m<fg0b3u$$j*rs$~c/a00~&~(JW(] BJKF[$IVVWRO0EZ⺻춫ȆކЂӕĭ䬒ĞρОƞ鸸崴ÔрΖμݹ҂ی˴9hh&~&'p"?@s5dd*j23d>#\o!pp>f>?h h[LLR \dW XXN@pCTT:bc4ns ?q n6no8zg+m<fg0b3u$$j*rs$~c/a00~&~(JW(] BJKF[$IVVWRO0EZ⺻춫ȆކЂӕĊʒĞρОƞ鸸崴ÔӬрΖϘǸ͜҂ی˴9hh&~&'p"?@s5dd*j23d>#\o!pp>f>?h h[LLR \dW XXN@pCTT:bc4ns ?q 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