ࡱ> MOL'` 6bjbjLULU p.?.?)        $4 +++P,,,4 -2////000?AAAAAA$țh0e9 00000e  //5550 / /?50?55#  G/- z+2Fӕl0Z3GG [x00500000eeI5^00000004 4 4  4 4 4 4 4 4        AP Statistics Chapter 7/8 Discrete, Binomial and Geometric Rand. Vars. 7.1: Discrete Random Variables Random Variable A random variable is a variable whose value is a numerical outcome of a random phenomenon. Discrete Random Variable A discrete random variable X has a countable number of possible values. Generally, these values are limited to integers (whole numbers). The probability distribution of X lists the values and their probabilities. Value of Xx1x2x3xkProbabilityp1p2p3pkThe probabilities pi must satisfy two requirements: 1. Every probability pi is a number between 0 and 1. 2. p1 + p2 + + pk = 1 Find the probability of any event by adding the probabilities pi of the particular values xi that make up the event. Continuous Random Variable A continuous random variable X takes all values in an interval of numbers and is measurable. 7.2: The Mean of a Discrete Random Variable Mean Of A Discrete Random Variable Suppose that X is a discrete random variable whose distribution is Value of Xx1x2x3xkProbabilityp1p2p3pkTo find the mean of X, multiply each possible value by its probability, then add all the products:  EMBED Equation.DSMT4  Law Of Large Numbers Draw independent observations at random from any population with finite mean m. As the number of observations drawn increases, the mean of the observed values eventually approaches the mean m. 8.1: The Binomial Distributions A binomial probability distribution occurs when the following requirements are met. Each observation falls into one of just two categories call them success or failure. The procedure has a fixed number of trials we call this value n. The observations must be independent result of one does not affect another. The probability of success call it p - remains the same for each observation. Notation for binomial probability distribution ndenotes the number of fixed trialskdenotes the number of successes in the n trialspdenotes the probability of success1 pdenotes the probability of failure Binomial Probability Formula  EMBED Equation.3  How to use the TI-83/4 to compute binomial probabilities * There are two binomial probability functions on the TI-83/84, binompdf and binomcdf binompdf is a probability distribution function and determines  EMBED Equation.3  binomcdf is a cumulative distribution function and determines  EMBED Equation.3  *Both functions are found in the DISTR menu (2nd-VARS) ProbabilityCalculator CommandExample (assume n = 4, p = .8) EMBED Equation.3 binompdf(n, p, k) EMBED Equation.3 = binompdf(4, .8, 3) EMBED Equation.3 binomcdf(n, p, k) EMBED Equation.3 = binomcdf(4, .8, 3) EMBED Equation.3 binomcdf(n, p, k - 1) EMBED Equation.3 = binomcdf(4, .8, 2) EMBED Equation.3 1 binomcdf(n, p, k) EMBED Equation.3 = 1 binomcdf(4, .8, 3) EMBED Equation.3 1 binomcdf(n, p, k - 1) EMBED Equation.3 = 1 binomcdf(4, .8, 2) Mean (expected value) of a Binomial Random Variable Formula:  EMBED Equation.DSMT4  Meaning: Expected number of successes in n trials (think average) Example: Suppose you are a 80% free throw shooter. You are going to shoot 4 free throws. For n = 4, p = .8,  EMBED Equation.3 , which means we expect 3.2 makes out of 4 shots, on average 8.2: The Geometric Distributions A geometric probability distribution occurs when the following requirements are met. Each observation falls into one of just two categories call them success or failure. The observations must be independent result of one does not affect another. The probability of success call it p - remains the same for each observation. The variable of interest is the number of trials required to obtain the first success.* * As such, the geometric is also called a waiting-time distribution Notation for geometric probability distribution ndenotes the number of trials required to obtain the first successpdenotes the probability of success1 pdenotes the probability of failure Geometric Probability Formula  EMBED Equation.3  How to use the TI-83/4 to compute geometric probabilities * There are two geometric probability functions on the TI-83/84, geometpdf and geometcdf geometpdf is a probability distribution function and determines EMBED Equation.DSMT4  geometcdf is a cumulative distribution function and determines  EMBED Equation.DSMT4  *Both functions are found in the DISTR menu (2nd-VARS) ProbabilityCalculator CommandExample (assume p = .8, n = 3) EMBED Equation.DSMT4 geometpdf (p, n) EMBED Equation.3 = geometpdf(.8, 3) EMBED Equation.DSMT4 geometcdf(p, n) EMBED Equation.3 = geometcdf(.8, 3) EMBED Equation.DSMT4 geometcdf(p, n-1) EMBED Equation.3 = geometcdf(.8, 2) EMBED Equation.DSMT4 1 geometcdf(p, n) EMBED Equation.3 = 1 geometcdf(.8, 3) EMBED Equation.DSMT4 1 geometcdf(p, n-1) EMBED Equation.3 = 1 geometcdf( .8, 2) Mean (expected value) of a Geometric Random Variable Formula: IJKkz{}   8 ˹vgggYKh )h0J6OJQJh h0J6OJQJh hB*OJQJph!h h0J B*OJQJph$hm h0J5B*OJQJphh h0JOJQJ#h h5B*OJQJ\ph#h h45B*OJQJ\phhwFh45CJaJ h~h< h~h< 5CJaJh5CJaJh~hpd5CJaJJKk $$Ifa$gdAgd &dPgdwFgd< 2$$d%d&d'd-DM NOPQa$gdB (58 y ̱̱̱̱̱̱n#hm h5B*OJQJ\phh hB*CJaJph"h h0J!5B*H*\phh h0J!5B*\phh h5B*H*\phh hB*phh h5B*\phh hB*OJQJphh h0JOJQJh0JOJQJ& 4((( $$Ifa$gdAkd$$IfTlֈd $p````` t0644 laytAT (kd$$IfTlֈd $p````` t0644 laytAT $$Ifa$gdA  - . D E b c f g h l m t u v | ɸp]I;hB*OJQJ\ph'h h0J!B*H*OJQJ\ph$h h0J!B*OJQJ\ph'h h0J B*H*OJQJ\ph$h h0J B*OJQJ\phh hB*OJQJph#h hB*H*OJQJ\ph h hB*OJQJ\ph hm h5B*OJQJph#hm h5B*OJQJ\ph&hm h5B*H*OJQJ\ph . c { | i j      $$Ifa$gdA &dPgdwF [$\$gd4 [$\$gd[$\$^gdgd  ( ) * U ] g i j w { }   ޾ѰѦymy_T_Dh h5B*H*\phh hB*phh h5B*\phhwFh45CJaJhwFh5CJaJhlk-5CJaJh40JOJQJh )h0J6OJQJh0JOJQJh h0J6OJQJ$hm h0J5B*OJQJphh h0JOJQJh hB*OJQJph#h h45B*OJQJ\ph           " # $ % & ' ( ) * + , - . / 0 1 2 > B ƴƴs_&jh5B*OJQJU\phh hB*OJQJph#h h5B*OJQJ\ph h hB*OJQJ\phh hB*CJaJph"h h0J!5B*H*\phh h0J!5B*\phh h5B*H*\phh h5B*\phh hB*ph#  # & ) 4((( $$Ifa$gdAkd$$IfTlֈd $p````` t0644 laytAT) , . 1 2 (kd$$IfTlֈd $p````` t0644 laytAT $$Ifa$gdA2 *F*+Z\p$<<$7$8$H$Ifa$gdA$dd-D7$8$@&H$M gd&L $7$8$@&H$gd&L & F<<7$8$@&H$gd&Ldd-D7$8$H$M gd&Ldh&dPgdCu[$gd[$\$`gdgd  Ʋ𣑣zm\m\N@7h=3T5CJaJhK|B*OJQJ\phhB*OJQJ\ph h hB*OJQJ\phh-Ph0JOJQJh0JOJQJh h0JOJQJ#h h45B*OJQJ\phh hB*OJQJph&jh5B*OJQJU\ph0jh-Ph5B*EHOJQJU\ph!j-R hCJOJQJUVh5B*OJQJ\ph*.p*+Z[\!"5678:T־ַڬַ֜֔֬֬{l\{j hhmh&L5EHU\jXN h&LCJUVaJjh&L5U\hh&L5CJ\aJhrh&L6h&L56]hXV`h&L5hXV`h&L56] h&L5\hl 5h&L6h&h&L6hx'h&L6h&Lhh&L5CJ\aJhh&LCJaJh6rh&L5CJaJ$\4Qkd/$$IfT-0[#x!4 -aytAT$<<$7$8$H$Ifa$gdAQkd$$IfT-0[#x!4 -aytAT<<$7$8$H$IfgdAQkd$$IfT-0[#x!4 -aytAT<<$7$8$H$IfgdA$<<$7$8$H$Ifa$gdA!9c.5$$$d%d&d'd7$8$@&H$NOPQ]a$gd&L=$$$d%d&d'd-D7$8$@&H$M NOPQ]a$gd&L $7$8$@&H$gd&LQkd; $$IfT-0[#x!4 -aytAT9:u v$dd$7$8$@&H$IfgdA$d7$8$@&H$gdMui$hdd7$8$@&H$^hgd&L$dd7$8$@&H$gd&L$dd-D7$8$@&H$M gd&L$<<7$8$@&H$gd&L T[\eu  (.89EN^_rstuvɾڴɴکɴɴکtd\h4-h&L\jhTh&L5EHU\jYN h&LCJUVaJj hTh&L5EHU\jYN h&LCJUVaJ h&L5\jh&L5U\h4-h&L6\hh&L56\ h&L6\hQh&L6\ h&L\hQh&L\hh&L5CJ\aJh&L5CJ\aJ$ *+,-/89;=?@ACDWX²Ѩю~si\i\isMjYN h&LCJUVaJhth&L56\]h&L56\]hth&L56\j hTh&L5EHU\j+\N h&LCJUVaJhUh&L6\]hUh&L6\jhTh&L5EHU\jNhN h&LCJUVaJ h&L5\jh&L5U\h7th&L5CJ\aJ h&L\hh&LH*\BI444$dd$7$8$@&H$IfgdAkd $$IflF$ 0 H  t06    44 lapytABC[mlWWW$dd$7$8$@&H$IfgdAkdF$$IflPF$ 0 H t06    44 laytAXYZ[dkmnݹݞp`jhTh&L5EHU\j:ZN h&LCJUVaJhth&L56\]h&L56\]h&L56\hth&L56\jhTh&L5EHU\j\N h&LCJUVaJhUh&L6\]hUh&L6\ h&L5\jh&L5U\jhTh&L5EHU\!lWWW$dd$7$8$@&H$IfgdAkd6$$IflPF$ 0 H t06    44 laytA     !#$789:@FIûñΕ{p{aQλj"hTh&L5EHU\j\N h&LCJUVaJhUh&L6\]hUh&L6\j hTh&L5EHU\jsZN h&LCJUVaJhth&L56\]h&L56\]h&L56\hth&L56\ h&L5\jh&L5U\jhTh&L5EHU\j\N h&LCJUVaJ #SlWWW$dd$7$8$@&H$IfgdAkd& $$IflPF$ 0 H t06    44 laytAIJLNPQRSTUhijklyϵϛρqc_h&Lhh&L5CJ\aJj'hTh&L5EHU\j\N h&LCJUVaJhUh&L6\]hUh&L6\j%hTh&L5EHU\jZN h&LCJUVaJjh&L5U\ h&L5\h&L56\hth&L56\hth&L56\]h&L56\]#STllWWW$dd$7$8$@&H$IfgdAkd%$$IflPF$ 0 H t06    44 laytAl\!:$dd$d%d&d'd-D7$8$@&H$M NOPQgd&L$<<7$8$@&H$gd&Lkd*$$IflPF$ 0 H t06    44 laytA;<KR^'68ºtkbtktWhhMuiCJaJh=3T5CJaJhMui5CJaJh6rhMui5CJaJj-h:nh&LEHUj,kN h&LCJUVaJ h&L\hoh&L\h9eh&L6\ hoh&Lh&Gh&L6 h&L6h>h&L6hoh&L6j*h .h&LEHUjN h&LCJUVaJh&Ljh&LU!T67'uccccW $7$8$@&H$gdMui & F <<7$8$@&H$gdMuidd-D7$8$H$M gdMuidh&dPgdCu/dd$d%d&d'd7$8$H$NOPQgd&L4 p<<$d%d&d'd7$8$H$NOPQgd&L 8AZ \]&'4=WXY   !"$>EFP`nw繱ئئ~nfaf hMui\hQhMui\j1hB(hMui5EHU\j)N hMuiCJUVaJjhMui5U\hhMui5CJ\aJhXV`hMui56]hXV`hMui5hMui56] hMui5\hl 5hMui6h&hMui6hMuihhMuiCJaJhhMui5CJ\aJhMui5CJ\aJ&'WYmQkd/$$IfT-0[#x!4 -aytAT<<$7$8$H$IfgdA$<<$7$8$H$Ifa$gdA$d-D7$8$@&H$M gdMui4Qkd0$$IfT-0[#x!4 -aytAT<<$7$8$H$IfgdA$<<$7$8$H$Ifa$gdAQkdx0$$IfT-0[#x!4 -aytAT #$`pWG$dd7$8$@&H$gdMui$dd-D7$8$@&H$M gdMui$<<7$8$@&H$gdMui5$$$d%d&d'd7$8$@&H$NOPQ]a$gdMui=$$$d%d&d'd-D7$8$@&H$M NOPQ]a$gdMui $7$8$@&H$gdMui!+,8AQRijklmϡ։qfqhMui5CJ\aJh7thMui5CJ\aJhhMuiH*\h4-hMui\j7h)+hMui5EHU\jN hMuiCJUVaJj4h)+hMui5EHU\jN hMuiCJUVaJ hMui5\jhMui5U\h4-hMui6\hMui56\ hMui6\ hMui\&m$dd$7$8$@&H$IfgdA$d7$8$@&H$gdMui$hdd7$8$@&H$^hgdMui:I444$dd$7$8$@&H$IfgdAkd;$$IflF$ 0 H  t06    44 lapytA$%&')235789;<STUVW`egh{ݵݝ{l\jAh)+hMui5EHU\jN hMuiCJUVaJhthMui56\]hMui56\]hthMui56\hMui56\j>hThMui5EHU\j+\N hMuiCJUVaJhUhMui6\hMui6\] hMui6\ hMui5\jhMui5U\j;h)+hMui5EHU\:;WglWWW$dd$7$8$@&H$IfgdAkdA$$IflPF$ 0 H t06    44 laytA{|}~ƻΕ~vl]MƻjfJhThMui5EHU\j\N hMuiCJUVaJhUhMui6\hMui6\] hMui6\jXGh)+hMui5EHU\jN hMuiCJUVaJhthMui56\]hMui56\]hthMui56\hMui56\ hMui5\jhMui5U\jDhThMui5EHU\j\N hMuiCJUVaJlWWW$dd$7$8$@&H$IfgdAkdF$$IflPF$ 0 H t06    44 laytA /0128ABDFGHIJKbcʺ䰩䒂zmz^jN hMuiCJUVaJhthMui56\]hMui56\j*PhThMui5EHU\j\N hMuiCJUVaJhMui6\] hMui6\hUhMui6\jMh)+hMui5EHU\jN hMuiCJUVaJjhMui5U\ hMui5\hthMui56\hMui56\]IlWWW$dd$7$8$@&H$IfgdAkdL$$IflPF$ 0 H t06    44 laytAIJf|lWWW$dd$7$8$@&H$IfgdAkdcR$$IflPF$ 0 H t06    44 laytAcdefjsz|}ݵݝ{{mbm^VT^UjhMuiUhMuihMui5CJ\aJhhMui5CJ\aJhMui56\]hthMui56\]hthMui56\hMui56\jUhThMui5EHU\j\N hMuiCJUVaJhMui6\] hMui6\hUhMui6\ hMui5\jhMui5U\jRh)+hMui5EHU\l`%:$dd$d%d&d'd-D7$8$@&H$M NOPQgdMui $7$8$@&H$gdMuikd&X$$IflPF$ 0 H t06    44 laytA EMBED Equation.DSMT4  Meaning: Expected number of n trials to achieve first success (average) Example: Suppose you are a 80% free throw shooter. You are going to shoot until you make. For p = .8,  EMBED Equation.3 , which means we expect to take 1.25 shots, on average, to make first     78Zam€ÀȀʀˀހ߀'()+,./1256º׍׳meaeaeaeamhKtjhKtU$hh0JB*OJQJ\phj[h\hMuiEHUjN hMuiCJUVaJ hMui\hohMui\h\hMui6\ hohMuih&GhMui6 hMui6h>hMui6hohMui6hMuijhMuiUjXhL9RhMuiEHUjN hMuiCJUVaJ c'(*+-.013456[$gd/dd$d%d&d'd7$8$H$NOPQgdMui4 p<<$d%d&d'd7$8$H$NOPQgdMui6&P1h:p&L/ =!"#8$8% 6&P1h:pMui/ =!"#8$8% $$If!vh5p5`5`5`5`5`#vp#v`:V l t06,5p5`/ / ytAT$$If!vh5p5`5`5`5`5`#vp#v`:V l t06,5p5`/  / ytAT$$If!vh5p5`5`5`5`5`#vp#v`:V l t06,5p5`/ / ytAT$$If!vh5p5`5`5`5`5`#vp#v`:V l t06,5p5`/  / ytAT!Dd b  c $A? ?3"`?2k7;k<ձ.}tG`!?7;k<ձ.}t@& xڵUKOQ>δCMy&RlM!5Ȯ)uvB! 6+,F7!`UϝG-%mo̹||gN% (taI ,B+bHkv㡳 F3C8>};E`Ӽ]Pa`\9ͩ 2]3B7ZXR b~U_˦m6>;sA} 1| O.c{(_0 y'7pCP9HGʱN/q0W9$Rʯю]y{MRUSf *GQ5rKz& ?p:%7OOd'F{CjKu-k#5hVw]ihԱvzR eBa@׶Fkgmkx]ۼpC j{DGǏc=uA\R @͠{$!x~%pMH8zKONsR")œbҵrZR@vfJ"X!Xb}EPL8CbK1TLJ;#hbX̾~s;LE0()0e.i, U"+I^]{$eh}JaFձp7=]!M"wଏ驉_9JuLJSDmvrکZ0)wʩ4Xe~xHz?Na$$If!vh55x!#v#vx!:V -,55x!/ 44 -ytAT$$If!vh55x!#v#vx!:V -,55x!/ 44 -ytAT$$If!vh55x!#v#vx!:V -,55x!/ 44 -ytAT$$If!vh55x!#v#vx!:V -,55x!/ 44 -ytATDd b  c $A? ?3"`?2"FƙvPu0 `!FƙvPu0 P%dxcdd``$d@9`,&FF(`TI偸 A?d 7zjx|K2B* R0pE1At 2Bab`b Y> wfjQ9B&br<Xk6`0^̮WyP~0__ŏ>ɉYy7|s'y=ؑqڷ'`En ~@%AI9 l\p a(]==U\l -_ cqIq\p|ha_&k|;x{x@US|EEXB'02"O`a炦h.p{ `p>adbR ,.IehC  z1!::Dd @b  c $A? ?3"`?2Y(ȊʅL0ܿ` `!XY(ȊʅL0ܿ@8 &xcdd``ed``baV d,FYzP1n:&&6! KA?H1:10 UXRY7S?&,e`abM-VK-WMc<3pUsi#bVVJ~JtI2D@g9 Ȅl=O&Fn ~@%CA 27)?aG!dm%4! .h 0y{qĤ\Y\ 2C D|b@#3X?^,:Dd @b  c $A? ?3"`?2sd #̤f5 ``!Xsd #̤f5  ~ &xcdd``ed``baV d  !"#$%&'()*+,-./0123456789:;<=>?@ABCEFGHIJKNQxRSTUVWYXZ\[]_^`bacedfhgikjlmnoprqstuvwyz|{}~Root Entryx Fp5P+Data D>_WordDocumentwpObjectPoolz p5_1384154413rF  Ole CompObjiObjInfo  %*/49>CHMPQRUX[^_`abehijmpqruxyz} FMathType 6.0 Equation MathType EFEquation.DSMT49qTOT DSMT6WinAllBasicCodePagesTimes New RomanSymbolCourier NewMT Extra!/ED/APG_APAPAE%B_AC_AE*_HA@AHA*_D_E_E_A  m X ==pEquation Native "_1321293954E F  Ole  CompObj fx ii==1k " gp i ==x 1 gp 1 ++x 2 gp 2 ++"""++x k gp k FMicrosoft Equation 3.0 DS Equation Equation.39qObjInfo Equation Native _1321294277 F  Ole w P(X=k)=n!k!(n"k)!(p)k(1"p)n"k FMicrosoft Equation 3.0 DS Equation Equation.39qCompObjfObjInfoEquation Native =_1321294319F  !xx P(X=k) FMicrosoft Equation 3.0 DS Equation Equation.39q!p< P(Xd"k) FMicrosoft Equation 3.0 DS EqOle CompObjfObjInfoEquation Native =_1321297998'YF  Ole CompObjfObjInfo!uation Equation.39q!e P(X=k) FMicrosoft Equation 3.0 DS Equation Equation.39q!S|f P(X=3)Equation Native "=_1321294891F  Ole #CompObj $fObjInfo!&Equation Native '=_13212949876$F  Ole ( FMicrosoft Equation 3.0 DS Equation Equation.39q!tf P(Xd"3) FMicrosoft Equation 3.0 DS Equation Equation.39qCompObj#%)fObjInfo&+Equation Native ,=_1321294394;)F  Ole -CompObj(*.fObjInfo+0Equation Native 1=!(4 P(X<k) FMicrosoft Equation 3.0 DS Equation Equation.39q!S P(X<3)_1321295000.F  Ole 2CompObj-/3fObjInfo05Equation Native 6=_13212944513F  Ole 7CompObj248f FMicrosoft Equation 3.0 DS Equation Equation.39q!P$ P(X>k) FMicrosoft Equation 3.0 DS Equation Equation.39qObjInfo5:Equation Native ;=_1321295012,@8F  Ole <CompObj79=fObjInfo:?Equation Native @=_13212945821"=F  !` P(X>3) FMicrosoft Equation 3.0 DS Equation Equation.39q!T P(Xe"k) FMicrosoft Equation 3.0 DS EqOle ACompObj<>BfObjInfo?DEquation Native E=_1321295023BF  Ole FCompObjACGfObjInfoDIuation Equation.39q! P(Xe"3) FMathType 6.0 Equation MathType EFEquation.DSMT49q+l@SdDSMT6WinAllBasicCodePagesEquation Native J=_1321258396GF  Ole KCompObjFHLiObjInfoINEquation Native O_1321298732LF  Ole STimes New RomanSymbolCourier NewMT Extra!/ED/APG_APAPAE%B_AC_AE*_HA@AHA*_D_E_E_A  m==np FMicrosoft Equation 3.0 DS Equation Equation.39q=84b =(4)(.CompObjKMTfObjInfoNVEquation Native WY_1321337641JTQF  8)=3.2 FMathType 6.0 Equation MathType EFEquation.DSMT49q-D@S DSMT6WinAllBasicCodePagesTimes New RomanSymbolCourier NewMT Extra!/ED/APG_APAPAE%B_AC_AE*_HA@AHA*_D_E_EOle YCompObjPRZiObjInfoS\Equation Native ]I_A  P(X==n)==(1"-p)n"-1(p) FMathType 6.0 Equation MathType EFEquation.DSMT49qD@S DSMT6WinAllBasicCodePages_1321337736VF  Ole cCompObjUWdiObjInfoXfEquation Native g_1321337760Oc[F  Ole kCompObjZ\liTimes New RomanSymbolCourier NewMT Extra!/ED/APG_APAPAE%B_AC_AE*_HA@AHA*_D_E_E_A  P(X==n) FMathType 6.0 Equation MathType EFEquation.DSMT49qD@S DSMT6WinAllBasicCodePagesObjInfo]nEquation Native o_1321337778`F  Ole sTimes New RomanSymbolCourier NewMT Extra!/ED/APG_APAPAE%B_AC_AE*_HA@AHA*_D_E_E_A  P(Xd"n) FMathType 6.0 Equation MathType EFEquation.DSMT49qD@S DSMT6WinAllBasicCodePagesCompObj_atiObjInfobvEquation Native w_1321338265^meF  Times New RomanSymbolCourier NewMT Extra!/ED/APG_APAPAE%B_AC_AE*_HA@AHA*_D_E_E_A  P(X<<n) FMathType 6.0 Equation MathType EFEquation.DSMT49qD@S DSMT6WinAllBasicCodePagesOle {CompObjdf|iObjInfog~Equation Native Times New RomanSymbolCourier NewMT Extra!/ED/APG_APAPAE%B_AC_AE*_HA@AHA*_D_E_E_A  P(X>>n) FMathType 6.0 Equation MathType EFEquation.DSMT49qD@S DSMT6WinAllBasicCodePages_1321338273jF  Ole CompObjikiObjInfolEquation Native _1321338330hoF  Ole CompObjnpiTimes New RomanSymbolCourier NewMT Extra!/ED/APG_APAPAE%B_AC_AE*_HA@AHA*_D_E_E_A  P(Xe"n) FMathType 6.0 Equation MathType EFEquation.DSMT49qD@S DSMT6WinAllBasicCodePagesObjInfoqEquation Native _1321338399tF  Ole Times New RomanSymbolCourier NewMT Extra!/ED/APG_APAPAE%B_AC_AE*_HA@AHA*_D_E_E_A  m== 1p FMathType 6.0 Equation MathType EFEquation.DSMT49qCompObjsuiObjInfovEquation Native !1TableLD@S DSMT6WinAllBasicCodePagesTimes New RomanSymbolCourier NewMT Extra!/ED/APG_APAPAE%B_AC_AE*_HA@AHA*_D_E_E_A  m== 1.8==1.25Oh+'0 ,8 X d p |,FYzP1n:&&6! KA?H1:ʎ ㆪaM,,He` @201d++&1Dl\ _mZYt9Wc+Hf%ovF%$? ٳdB6ܞ'`#|7?! \%NAeۛ 2bq%4! .h 0y{qĤ\Y\ 2C D,ĀGf~b$$If!vh5 50 5H#v #v0 #vH:Vl  t65 50 5HpytA:Dd @b  c $A? ?3"`?2OG|@4P``!XOG|@4P@8 &xcdd``ed``baV d,FYzP1n:&&6! KA?H1:10 UXRY7S?&,e`abM-VK-WMc< Usi#bVVJ~JtI2D@g9 Ȅl=O&Fn ~@%CA 27)?dG!dm%4! .h 0y{qĤ\Y\ 2C D,ĀGf~D_w9Dd @b  c $A? ?3"`?2Tŕzg=5=_Q`!WTŕzg=5= ~ %xcdd``ed``baV d,FYzP1n:&&6! KA?H1:ʎ ㆪaM,,He` @201d++&1Dl\ _oeF\  0ηG}@0W&008qr8|a#do3[ sI\FO&DTrAC ;7LLJ% {A0u(2t5B ~b}sd}$$If!vh5 50 5H#v #v0 #vH:VlP t65 50 5HytA:Dd @b   c $A? ?3"`?2sd #̤f5 ` `!Xsd #̤f5  ~ &xcdd``ed``baV d,FYzP1n:&&6! KA?H1:ʎ ㆪaM,,He` @201d++&1Dl\ _mZYt9Wc+Hf%ovF%$? ٳdB6ܞ'`#|7?! \%NAeۛ 2bq%4! .h 0y{qĤ\Y\ 2C D,ĀGf~b7Dd @b  c $A ? ?3"`?2Z05weņ*]C`!UZ05weņ*L #xcdd``ed``baV d,FYzP1n:&lB@?b u  UXRY7S?&,e`abM-VK-WMc<eKT TXAZ5+ai, 1oF%@>Ma`XumG!12Hf1Xa.#7 ؄@J.h(rC\0``㆑I)$5E.Syfv}$$If!vh5 50 5H#v #v0 #vH:VlP t65 50 5HytA:Dd @b  c $A? ?3"`?2OI zBCC@``!XOI zBCC@ ~ &xcdd``ed``baV d,FYzP1n:&&6! KA?H1:ʎ ㆪaM,,He` @201d++&1Dl\ _˵6Usi#Ma`0暽@${AF`H? 2}6!~7? \4 =adbR ,.IeXC D,Ā'f~[c}$$If!vh5 50 5H#v #v0 #vH:VlP t65 50 5HytA:Dd @b   c $A ? ?3"`? 2l=fo*` `!Xl=fo*@8 &xcdd``ed``baV d,FYzP1n:&&6! KA?H1:10 UXRY7S?&,e`abM-VK-WMc<3pUsi#bVVJ~JtI2D@g9 Ȅl=O&Fn ~@%CA 27)?a+ZB8no3J.h(rC\0``㆑I)$5d.P"CX,ĀGf~ }`9Dd @b   c $A ? ?3"`? 2'WF wP E.pH  `p021)W2ԡ"|b@3X?ef}$$If!vh5 50 5H#v #v0 #vH:VlP t65 50 5HytA:Dd @b   c $A ? ?3"`? 2gXxڥOS`%`!XgXxڥOS ~ &xcdd``ed``baV d,FYzP1n:&&6! KA?H1:ʎ ㆪaM,,He` @201d++&1Dl\ _ 8Xt9Wc+Hf%ovF%$? ٳdB6ܞ'`#|7?! \0NAeۛ 2bs%4! .h 0y{qĤ\Y\2C D|b@#3X?4`7Dd @b   c $A ? ?3"`? 2Q9e]h](`!UQ9e]hL #xcdd``ed``baV d,FYzP1n:&lB@?b u  UXRY7S?&,e`abM-VK-WMc<gKT TXAZ5+ai, 1oF%@>Ma`p@${AFl0D@elBn ~@%4! .h 0y{qĤ\Y\pdP"CXYO`-fZ}$$If!vh5 50 5H#v #v0 #vH:VlP t65 50 5HytADd deb  c $A? ?3"`?2N DUgtԤh**`!" DUgtԤhxuR1o@.č'RC Ae)bNJB&*e/g/@bgD`&$;)'wwG([&C)rDb>ghUWP]eRBMo3}JSF*8 MHtIf_w NN9~b>G~ExiT3%nfmS>߂do'wV}R9 7.*U?ZzU5hIS"+]&|朜 ? " 4GmhnvvGAdz{^tS ڲe%oȟ(͎<ڋ;δcRtϵZ׫/,Nz#-Ite_3܆JE#>]AfξgJ(I 57=BWJ5p![Ͳwʴd8. Z*YQjgDd |@b  c $A? ?3"`?2 y ߢZh-`! y ߢZhl`  SxuJP{6mC8(:)b;E!`@8 c>O'M(N?']p gLggYjqpeQ^22Ñ& Oc٬55e'c@09U h05)u[R]gCؙM4i8(@vAxDښA ];~@84>_U.ϙI\Z>}huϋ%^@§ BEݩ8ԶktD1Zbn U jF$$If!vh55x!#v#vx!:V -,55x!/ 44 -ytAT$$If!vh55x!#v#vx!:V -,55x!/ 44 -ytAT$$If!vh55x!#v#vx!:V -,55x!/ 44 -ytAThDd  b  c $A? ?3"`?2gZB i2@B1`!gZB i2@Bt p@CTxڥSOkAo6[mMT*-TҤ@c=Dhnqu!,ٕSE/'=W2/7߼3ȥ X,1Fˊ徜03YFW2yp[ӡ8(M,$ ~#'P±.لDg=AOƇK^h&A ~mⲙ{'ٍn5=Iʛ*%V * FtA(5C}$H'$)e(TY0ljOf{ͮ]y+V2l߭ <=BU JzЂV<HDAm*DFfr^lBT.G##_n^;<r؝z$+#n/։uïg[!UT2XF2X%&]|kRs>*RmYŒڟXDd @b  c $A? ?3"`?2Z<#(+&I8@h6<8`!.<#(+&I8@h* ~ xڕRoP94'-E*PI)CERএb)q8(dĐ%,,ؑW0 !1#0'w{9@{Ejl(A$&Il}Ya]IE? pPH0Q0#O|D1ǜb -t3)9e`ޖN>pKxUޝa-'+)6fXrROͩkz#VR^;3>G\|Jm(! *۶M1e%xYmzo5\NHjvXV^K=y-9h^;z쩟ȧ*5sy'6҆Ffr]TBX/##g+7.pE6?a`6Jr+%n/։u s_VC^/2Ux&m/M<'ѭe06v*s #[R쬵(7C$$If!vh5 50 5H#v #v0 #vH:Vl  t65 50 5HpytA Dd @b  c $A? ?3"`?2V謻;Ci2<`!*謻;Ci* ~ xڕRϋP%ii].xdaMP `o5vhTjO^ū<_A<Ɠ` E>2/7߼3ȥ X,1Fˊ徜03YFW2yp[ӡ8(M,$ ~#'P±.لDg=AOƇK^h&A ~mⲙ{'ٍn5=Iʛ*%V * FtA(5C}$H'$)e(TY0ljOf{ͮ]y+V2l߭ <=BU JzЂV<HDAm*DFfr^lBT.G##_n^;<r؝z$+#n/։uïg[!UT2XF2X%&]|kRs>*RmYŒڟX9Dd @b  c $A? ?3"`?2Tŕzg=5=_?`!WTŕzg=5= ~ %xcdd``ed``baV d,FYzP1n:&&6! KA?H1:ʎ ㆪaM,,He` @201d++&1Dl\ _oeF\  0ηG}@0W&008qr8|a#do3[ sI\FO&DTrAC ;7LLJ% {A0u(2t5B ~b}sd}$$If!vh5 50 5H#v #v0 #vH:VlP t65 50 5HytADd @b  c $A? ?3"`?2Z<#(+&I8@h6A`!.<#(+&I8@h* ~ xڕRoP94'-E*PI)CERএb)q8(dĐ%,,ؑW0 !1#0'w{9@{Ejl(A$&Il}Ya]IE? pPH0Q0#O|D1ǜb -t3)9e`ޖN>pKxUޝa-'+)6fXrROͩkz#VR^;3>G\|Jm(! *۶M1e%xYmzo5\NHjvXV^K=y-9h^;z쩟ȧ*5sy'6҆Ffr]TBX/##g+7.pE6?a`6Jr+%n/։u s_VC^/2Ux&m/M<'ѭe06v*s #[R쬵(7C7Dd @b  c $A? ?3"`?2Z05weņ*]D`!UZ05weņ*L #xcdd``ed``baV d,FYzP1n:&lB@?b u  UXRY7S?&,e`abM-VK-WMc<eKT TXAZ5+ai, 1oF%@>Ma`XumG!12Hf1Xa.#7 ؄@J.h(rC\0``㆑I)$5E.Syfv}$$If!vh5 50 5H#v #v0 #vH:VlP t65 50 5HytADd @b  c $A? ?3"`?2X|gLX&Ƞ4G`!,|gLX&Ƞ* ~ xڕR1oP9INZ$@\$PSVb`Pq)CE"S,%NLT 1DHaaedgg_ȀČLH{RO>}1ʲ N1ڤilI[bt%!;xXMa`0暽@${AF`H? 2}6!~7? \4 =adbR ,.IeXC D,Ā'f~[c}$$If!vh5 50 5H#v #v0 #vH:VlP t65 50 5HytADd @b  c $A? ?3"`?2XXW޷Zխ4`M`!,XW޷Zխ* ~ xڕRϋP楩n]D]twP E.pH  `p021)W2ԡ"|b@3X?ef}$$If!vh5 50 5H#v #v0 #vH:VlP t65 50 5HytA Dd @b  c $A? ?3"`?2Wj1=)\A3&S`!+j1=)\A* ~ xڕR1oP{u# [ TJ :Ե]ʐ"ȄqãXJ(J3@b+S3fB"{v@`|~ݻ2A#K%c9B6N%SLÓ(2뭐G-~Ӽ6@E(Nآjw$l#G<:/@YZVi/=ʅZt|~e;]JnAOmnc!l;KH-"E:!\bM&+zB0*dSۖ]l_%0L"sF8RY+2mgp7Dd @b  c $A ? ?3"`?2Q9e]h]3V`!UQ9e]hL #xcdd``ed``baV d,FYzP1n:&lB@?b u  UXRY7S?&,e`abM-VK-WMc<gKT TXAZ5+ai, 1oF%@>Ma`p@${AFl0D@elBn ~@%4! .h 0y{qĤ\Y\pdP"CXYO`-fZ}$$If!vh5 50 5H#v #v0 #vH:VlP t65 50 5HytA4Dd b  c $A? ?3"`?2~[hUh2QZX`!R[hUh2Q@ d xڕRo@)*N ]$*hUHq@" `)FcA!H Ptf?`c CYQ1 Hw> |{a_aR9c b|<hMbi>.M "ݻ $z cIz#4)ؖbep S܇9;.Bխ B?_*}) sB7w<6mjntu$S{(t1`_/ &5v <7>gSҸ\1i /2+Rabrzus޼VbK%j ׷ ;t[fo9!ri{s"\yuDN6^צA_^kV-2WVm)GJt6m4 ْY8Gw/HL}xIn> ߗeDd lb  c $A? ?3"`?2u2N`|c\`!u2N`|c\  QxڥSkA~3馒Ms+C[6C$%YZWĜңЃ7EBģh|oX=Y+XѥBY= :R4)=B4CO612sw89D_bf{,_?|Y@(7rm6~T{;iEBW,Fn|:'}?[Aլ>&G%8~qT%b+eu:Nj J݂h8憭Ta7eT1-V˵+DL[ktla88)_MF G]rM)=uulJiX\*V*/G|*[rZ(2,KuwY>YG-ՋKe8X"Pmaȋ}1_JY3ZE&yoޅ# MTWinEqns   FMicrosoft Office Word Document MSWordDocWord.Document.89q%@@@ NormalCJ_HaJmH sH tH DA@D Default Paragraph FontRi@R  Table Normal4 l4a (k(No ListFV@F BFollowedHyperlink >*B* ph4@4 {PHeader  !4 @4 {PFooter  !H"H  Balloon TextCJOJQJ^JaJj@3j %KL Table Grid7:V0>OB> estyle2dd[$\$OJQJB^@RB e Normal (Web)dd[$\$.W@a. eStrong 5\^JJOqJ estyle23 style39 style40^J<O< estyle3315B*\^Jph>O> estyle251B*CJ^JaJph2X@2 eEmphasis 6]^J:O: estyle23 style40^JDOD e style2 style2dd[$\$JOJ estyle26 style23 style40^JDOD 9style3015B* OJQJ\^Jph>O> 9style381B*OJQJ^Jph"O" grame$O$ spelle(O!( style371>O2>  WP_Normal#1$ OJQJaJFOF &LH3$$dd7$8$@&H$5CJ\aJ) 7 8 JKk.c{|ij #&),.12Z>?np5MN4  * V W o  ! 7 g h h ) J K;km78t&$NOk{/]^zd()+,./1245800000 0 0 0 0 0 0 0 0 0 0 0 0 0 0000000000 0 0 0 0 0 0 0 0 0 0 0 0 0 00000 0 0 0 080800? 0? 0? 0? 0? 0? 0? 0? 0? 0? 0? 0? 8080808080808080800  0  0  0  0  0  0  0  0  0  0  0  0  0  0  0  0  0  0  0  0  0  0  0  80800 0 0 0 0  0 0 0 080800 0 0 0 0 0 0 0 0 8080808080808080800 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 80800000@000@000@000@00000\12Z>?np5MN4  * V W o  ! 7 g h h ) J K78t&$NOk{/]^zd(8Z00Z00Z00Z00Z00Z00Z00Z00@0@0 @ 0 @ 0 @ 0 @ 0:@0:@0@0 @0 @0 @0 @0 @0@0 @0 @0@0 @0 @0:@0:@0:@0:@0:@0:@0:@0:@0:@0@0@0@0@0@0@0@0@0@0 @0@0@0@0@0 @0 @0@0@0@0@0@0 @0 @0 @0:@0:@0@0@0@0@0@0 @ 0 @ 0 @ 0 @ 000P@0/1TU00P@08000P@00K00 K00K0000K0 0:@0K00 00K0 0K0 0@000K00 @0K00@0K00@0 K00 @0K00@0K00@0K00 @0 K00 @0DK0.0 K0/000 8 TXI8{c6"#&(*-/368:=A  ) 2 \9BS':I6 !$%')+,.0124579;<>B55IK 0 2 r   * > @ W k m   7 K M h | ~ " $ 35 "$e}$8:Ogi{/CE^vx7:::::::::::::::::::::::::::::::8@0(  B S  ?tv.04 <  C K o w % - T \ ) , &/=Fkt(LU~))++,,./12458BCHfh  4 < ) I &/~))++,,./1245833333333333333Kk2?p5  W o ! h ) I ;mOk^z))++,,./12458) , ))++,,./12458 Uľ%!l*dW[omiD䌅,|XI ӆB'#`d/a[(^+*W 9-ixa/Jj1V8Bu>U90dEE`TUhFo IT1J1 `NU>- `J2mbb4:~<d>EU|ev^9 -jS9j6j(+G^[>pqWt0wDtedEth^`OJQJo(hHh^`OJQJ^Jo(hHohpp^p`OJQJo(hHh@ @ ^@ `OJQJo(hHh^`OJQJ^Jo(hHoh^`OJQJo(hHh^`OJQJo(hHh^`OJQJ^Jo(hHohPP^P`OJQJo(hH^`.^`.p^p`.@ ^@ `.^`.^`.^`.^`.h^`OJQJo(hHh^`OJQJ^Jo(hHohpp^p`OJQJo(hHh@ @ ^@ `OJQJo(hHh^`OJQJ^Jo(hHoh^`OJQJo(hHh^`OJQJo(hHh^`OJQJ^Jo(hHohPP^P`OJQJo(hHh88^8`OJQJo(hHh^`OJQJ^Jo(hHoh  ^ `OJQJo(hHh  ^ `OJQJo(hHhxx^x`OJQJ^Jo(hHohHH^H`OJQJo(hHh^`OJQJo(hHh^`OJQJ^Jo(hHoh^`OJQJo(hHh ^`hH.h ^`hH.h pLp^p`LhH.h @ @ ^@ `hH.h ^`hH.h L^`LhH.h ^`hH.h ^`hH.h PLP^P`LhH.h88^8`OJQJo(hHh^`OJQJ^Jo(hHoh  ^ `OJQJo(hHh  ^ `OJQJo(hHhxx^x`OJQJ^Jo(hHohHH^H`OJQJo(hHh^`OJQJo(hHh^`OJQJ^Jo(hHoh^`OJQJo(hHh^`OJQJo(hHh^`OJQJ^Jo(hHohpp^p`OJQJo(hHh@ @ ^@ `OJQJo(hHh^`OJQJ^Jo(hHoh^`OJQJo(hHh^`OJQJo(hHh^`OJQJ^Jo(hHohPP^P`OJQJo(hHh ^`hH.h ^`hH.h pLp^p`LhH.h @ @ ^@ `hH.h ^`hH.h L^`LhH.h ^`hH.h ^`hH.h PLP^P`LhH.h^`OJQJo(hHh^`OJQJ^Jo(hHohpp^p`OJQJo(hHh@ @ ^@ `OJQJo(hHh^`OJQJ^Jo(hHoh^`OJQJo(hHh^`OJQJo(hHh^`OJQJ^Jo(hHohPP^P`OJQJo(hH^`CJOJQJo(^`CJOJQJo(opp^p`CJOJQJo(@ @ ^@ `CJOJQJo(^`CJOJQJo(^`CJOJQJo(^`CJOJQJo(^`CJOJQJo(PP^P`CJOJQJo(^`o(. ^`hH. pLp^p`LhH. @ @ ^@ `hH. ^`hH. L^`LhH. ^`hH. ^`hH. PLP^P`LhH.h^`OJQJo(hHh^`OJQJ^Jo(hHohpp^p`OJQJo(hHh@ @ ^@ `OJQJo(hHh^`OJQJ^Jo(hHoh^`OJQJo(hHh^`OJQJo(hHh^`OJQJ^Jo(hHohPP^P`OJQJo(hHh^`OJQJo(hHh^`OJQJ^Jo(hHohpp^p`OJQJo(hHh@ @ ^@ `OJQJo(hHh^`OJQJ^Jo(hHoh^`OJQJo(hHh^`OJQJo(hHh^`OJQJ^Jo(hHohPP^P`OJQJo(hHh^`OJQJo(hHh^`OJQJ^Jo(hHohpp^p`OJQJo(hHh@ @ ^@ `OJQJo(hHh^`OJQJ^Jo(hHoh^`OJQJo(hHh^`OJQJo(hHh^`OJQJ^Jo(hHohPP^P`OJQJo(hHh^`OJQJo(hHh^`OJQJ^Jo(hHohpp^p`OJQJo(hHh@ @ ^@ `OJQJo(hHh^`OJQJ^Jo(hHoh^`OJQJo(hHh^`OJQJo(hHh^`OJQJ^Jo(hHohPP^P`OJQJo(hHh ^`hH.h ^`hH.h pLp^p`LhH.h @ @ ^@ `hH.h ^`hH.h L^`LhH.h ^`hH.h ^`hH.h PLP^P`LhH.^`o(. ^`hH. pLp^p`LhH. @ @ ^@ `hH. ^`hH. L^`LhH. ^`hH. ^`hH. PLP^P`LhH.^`o(. ^`hH. pLp^p`LhH. @ @ ^@ `hH. ^`hH. L^`LhH. ^`hH. ^`hH. PLP^P`LhH.h88^8`OJQJo(hHh^`OJQJ^Jo(hHoh  ^ `OJQJo(hHh  ^ `OJQJo(hHhxx^x`OJQJ^Jo(hHohHH^H`OJQJo(hHh^`OJQJo(hHh^`OJQJ^Jo(hHoh^`OJQJo(hHh^`OJQJo(hHh^`OJQJ^Jo(hHohpp^p`OJQJo(hHh@ @ ^@ `OJQJo(hHh^`OJQJ^Jo(hHoh^`OJQJo(hHh^`OJQJo(hHh^`OJQJ^Jo(hHohPP^P`OJQJo(hHh 88^8`hH.h ^`hH.h  L ^ `LhH.h   ^ `hH.h xx^x`hH.h HLH^H`LhH.h ^`hH.h ^`hH.h L^`LhH.h^`OJQJo(hHh^`OJQJ^Jo(hHohpp^p`OJQJo(hHh@ @ ^@ `OJQJo(hHh^`OJQJ^Jo(hHoh^`OJQJo(hHh^`OJQJo(hHh^`OJQJ^Jo(hHohPP^P`OJQJo(hHh hh^h`hH.h 88^8`hH.h L^`LhH.h   ^ `hH.h   ^ `hH.h xLx^x`LhH.h HH^H`hH.h ^`hH.h L^`LhH.h^`OJQJo(hHh^`OJQJ^Jo(hHohpp^p`OJQJo(hHh@ @ ^@ `OJQJo(hHh^`OJQJ^Jo(hHoh^`OJQJo(hHh^`OJQJo(hHh^`OJQJ^Jo(hHohPP^P`OJQJo(hHh88^8`OJQJo(hHh^`OJQJ^Jo(hHoh  ^ `OJQJo(hHh  ^ `OJQJo(hHhxx^x`OJQJ^Jo(hHohHH^H`OJQJo(hHh^`OJQJo(hHh^`OJQJ^Jo(hHoh^`OJQJo(hH^`.^`.p^p`.@ ^@ `.^`.^`.^`.^`.h^`OJQJo(hHh^`OJQJ^Jo(hHohpp^p`OJQJo(hHh@ @ ^@ `OJQJo(hHh^`OJQJ^Jo(hHoh^`OJQJo(hHh^`OJQJo(hHh^`OJQJ^Jo(hHohPP^P`OJQJo(hHh^`OJQJo(hHh^`OJQJ^Jo(hHohpp^p`OJQJo(hHh@ @ ^@ `OJQJo(hHh^`OJQJ^Jo(hHoh^`OJQJo(hHh^`OJQJo(hHh^`OJQJ^Jo(hHohPP^P`OJQJo(hHh 88^8`hH.h ^`hH.h  L ^ `LhH.h   ^ `hH.h xx^x`hH.h HLH^H`LhH.h ^`hH.h ^`hH.h L^`LhH.^`o(. ^`hH. pLp^p`LhH. @ @ ^@ `hH. ^`hH. L^`LhH. ^`hH. ^`hH. PLP^P`LhH.h^`OJQJo(hHh^`OJQJ^Jo(hHohpp^p`OJQJo(hHh@ @ ^@ `OJQJo(hHh^`OJQJ^Jo(hHoh^`OJQJo(hHh^`OJQJo(hHh^`OJQJ^Jo(hHohPP^P`OJQJo(hHh^`OJQJo(hHh^`OJQJ^Jo(hHohpp^p`OJQJo(hHh@ @ ^@ `OJQJo(hHh^`OJQJ^Jo(hHoh^`OJQJo(hHh^`OJQJo(hHh^`OJQJ^Jo(hHohPP^P`OJQJo(hH Ujl*S9j<d- ` `N>U9XI ew[oj1a/mbbB'#+*EEiD Ia[(qT1J|e^[>pUhFU 9-,V8 -j%!                                                                                                                                                                                                                                                                      *]zc4am0EkcEFRFwF|GQHI?IJc Jl*J.J_JL\&L&L%KL*VLX6NvPP)Q=3TV!V"V9;X|Xs\*pamOc0dFdee5siMui>kakrkIna/pBpGqK.sE9s IsKtCu;ygtyqz {K|r|0eq&(r9vtfiGG2m?;m]a9U$0 9{~Zk]4kG uu!U6>xbe{PX=MCn#\Ea$ ZX4IxuSA\Zn8QuesEwxZ5F[]4dzqV\cb cMkSY9U /pdU6dQ3dnq#:nWNmwKj #&),.12?np  * V W o  ! 7 g h km$NOk{/]^z8 W0@- -  - - 47@ @@UnknownG: Times New Roman5Symbol3& : Arial5& zaTahoma7&  VerdanaC ChicagoArial?5 z Courier New;Wingdings"1hj:ferf F bb$8x4d 2qHX ?< 2)AP Statistics Chapter 1 - Exploring Data svusdsvusd