Key to
&ebra Rstional Numbers
By fulie Kingand PeterRasmussen
Name
Class
TABLEOF CONTENTS R a t i o n aNl u m b e ...
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Key to
&ebra Rstional Numbers
By fulie Kingand PeterRasmussen
Name
Class
TABLEOF CONTENTS R a t i o n aNl u m b e r s D i v i d i nIgn t e g e r s Equations withRational Solutions............ N u m b eLr i n e s Graphing lntegers Graphing Rational Numbers. I n e q u a l i t i.e. .s. . . . . . . . . . A b s o l u tVea l u e G r a p h i nIgn e q u a l i t i.e. .s. . . . . . . . . . S o l v i n lgn e q u a l i t i e s . . . . . . . . . . . . . Relations Functions W r i t t eW n ork Practice Test........
............1 ..............2 ........4 ...................5 ............6 ............7 . . . . . .1. .1 ...............14 . . . . . .1. .5 ...........18 ........27 ........29 ..................35 ..........36
Systemsof Equations The graphof a linearequationis a lineif the equationhastwovariables and a plane if the equationhas three variables. A systemof linear equations is a setofsuchequations considered atthe sametime. Thehistoryof systemsof linearequationshada ratherunusualbeginning-itstartedon the backof a turtle.Accordingto ancientChinesetraditiona turtle carrieda specialsquarefromthe riverLo to a man. Hereis thesquare. Sucha squareiscalleda magicsquarebecause thethreenumbersin everyrow,columnanddiagonal addup to 15. TheChinesewereespecially fondof patterns,so it is notsurprising that they wouldbe intriguedby magicsquares.About250 e.c.a book calledNineChapterson theMathematicalArf devotedoneentiresection to constructing them. lt involvedthreelinearequations, markingthefirst timein historythata systemof linearequationswas everencountered. Chinesemathematicians continuedto developand refine techniquesfor solvingsystemsof linearequations.The peakof this development occurredin 1303r0. withthepublication of a mathematics book havingthe unlikelylitle PreciousMirrorof the FourElements.lt describeda methodfor solvingsystemsof four equationswhose unknownswerecalledheaven,earth,manand matter. The resultsof theseChineseadvancesremainedunknownin the West.Duringthe earlypanofthe19thcenturytheGerman mathematician KarlGauss('1777-1855) introduced an effectivemethodfor solvingsuch systems.lt was modifiedslightlyby Jordan,andtodaythe procedure is calledGauss-Jordan elimination. Whois Jordan? Forovera centurythe nameJordanwasassumedto be a tributeto theFrenchmathematician CamilleJordan(1838-1922). it was However discoveredin 1986that the methodwas actuallydue to the German geodesist WilhelmJordan(1841-1899). On the coverof this book you see the legendaryChineseturtle emergingfromthe riverLo witha magicsquareon its back. Thepattern on the turtle'sbackrepresents the magicsquareshownabove.
Historicalnoteby DavidZitarelli lllustration by Jay Flom
IMPORTANTNOTICE:This book is sold as a studentworkbookand is notto be used as a duplicatang master. No part of this book may be reproducedin any form without the prior written permissaonof the publisher. Copyrightinfringementis a violationof FederalLaw. Copyright @1990by KeyCurriculum Project,Inc.All rightsreserved. @Key to Fractions,Key to Decimals,Key to Percents,Key to Algebra,Key to Geometry,Key to Measurement,and Key to MetricMeasurement arc registered trademarks of KeyCuniculumPress. Published by KeyCurriculum Press,115065thStreet,Emeryville, CA 94608 Printedin the UnitedStatesof America lsBN 1-55953-005-7 23 22 21 08 07 06 0s
R a t i o n aN l umbers wholenumbersand0). andnegative In Books1 to 4 we workedwithintegers(positive integers, butwhenwe gotto division We hadno troubleadding,subtracting andmultiplying youcan problems we ranintodifficulties. Division like 9 + 0 haveno answer,because neverdivideby 0. Otherproblems, like 10- 3, do nothaveanswerswhichareintegers. To solveproblems like 10 + 3 we needa newclassof numberscalledrationalnumbers. Rationalnumbersare numberswhichcan be writtenas fractions.The numerator(top number)anddenominator(bottomnumber)of a fractionmustbe integersandthe maynotbe 0. denominator
IL
r J . 9 -h- -3_-1
(-
numerators
(-
denominators
T
l - 7 7
B
I
l
3
Everyintegeris a rationalnumberbecause it can be writtenas a fractionwith a denominator of 1. Rewriteeachintegeras a fraction.
B=+
- ? =3 \-,,
I
-21=
L+=
o=
-15=
25=
6=
Everymixednumberis a rationalnumberbecause it canbewrittenas a fraction. Rewrite eachmixednumberas a fraction. 1 3
r +
oo
7
1 6+ 3
3 I
lg
3?=
6 l J 2 -
+8=
loa= = l
l7=
23 J 7 -
Everydecimalis alsoa rationalnumber(unlessit goes on foreverwithoutrepeating). A terminatingdecimal(onethatcomesto an end)is a rationalnumberbecauseit equalsa fractionwitha denominator of 10 or 100or 1000,etc. Rewriteeachterminating decimalas a fraction.
o6=# o06=# 0006= u.u)b = n
n
t-,
@1990by Ksy Curiculum Proioct,Inc. Do not duplicale wilhout p€rmission.
O.1= 0.01= 0.1= 9 0 t t?=
l 3 = l #19, lo= 2 . 1= 5.Ol= 3.27=
DividingIntegers Nowwe candivideanyintegerby any otherintegerexcept0. All we haveto do is write (top)and a fractionwiththe dividend(thenumberwe aredividinginto)as the numerator (bottom). the divisor(thenumberwe aredividingby)as the denominator
rl\-/n \., a -- l o 3 Do eachdivisionproblem.lf the divisorgoesevenlyintothe dividend,writeyouranswer writeit as a fraction. as an integer.Otherwise,
1 2* - 2 = - 6 4O 4 O= 7 = +I i -3.5=
15=3= -7=2=
5 =4 =
-$+-3 =
= b =
54*7=
-Ll5=-1 =
-7 = 6=
- / + 1 9=
A fractioncan be positiveor negative.To findthe sign,justfollowthe rulesfor division. Whendivisionis writtenusinga fractionbar,the ruleslooklikethis: POSITIVE
NEGATIVE =
NEGATIVE
NEGATIVE
POStlvE
POffi
=
POSITIVE
ffi
POSITIVE
=
NEGATIVE
iir
Nffiriw
=
we willwriteit lf a fractionis positive, we willwriteit withno signs. lf a fractionis negative, withthe negativesignon top.
sowewillwrite|. S is positive,
so wewillwritef . f is negative,
fraction. problem.Writeyouransweras a positive or negative Doeachdivision
=+
-{+-7=
15--2 =
l B* - 5 =
!+lO=
l.-5=
- l= 9 =
40*21=
- l + - l O=
9 :-5 =
1 2+ - 7=
- J + - l O 0=
12*ll=
4=5=
-f+-14=
-20=l=
1 3* - 3
2
0199 by Ksy CurriculumProjsl, Inc. 0o not duplicats without pormission.
Divide.Writeyouransweras an integeror as a positive or negative mixednumber.
50 *-5 = -fO 2B*-t+= -80=-lO=
- 1 2= 1=- l i
- l B+ - 7=
30=?= -lB=5=
- J = - 6=
2 5 + - 7=
4 5 +- 2 = % 3 + - q=
O+-6= - ll = 4 =
20=3= -25 =-4 =
%0=4=
64*-3= -100 =3= - l ++ - 5= -37=lO=
Divide.Thistimewriteyouransweras a positiveor negativedecimal.
- J + l O = B = - O . 3 lo7+too =is =l# =t.o7 -r+1 3q + lO =
.75
olgeo by KeyCuriqrlum p|Dlect,Inc. Do nd dwlicate wltl|outpermi$bn.
-253
Equationswith RationalSolutions is notan NowwecanusetheDivision Principle evenwhentheanswer to solveequations integer.Solveeachequation.Writeyouransweras a fraction or as a mixednumber.
-4x = 17
9x=40
&=-25 Y . 7
x =-3+ 2x- 5 = ltf
3x* 7=-4
-5x*l=15
x-3=8x*5
-2h -5) = 7
x-5x+7=-8
Solvetheseequations, writeit as a decimal. too. Thistimeif youransweris notan integer,
.fA
Itx
= - lO
{
1=
I rlio7 J oo\-\--#
F -2,5
-5x=
l8
7 x - 7= 3 x + 2 0
x - ? =6 x * J
3 ( x- 5 ) = x - 2 0
4(x+6)=23
-2c^ 5
- -7 I
2(x-3)*x=9
0199 by Key CurriculumProiecl,Inc. Do not duplicatewithoutpermission.
NumberLines In Book1 we usednumberlinesto helpus thinkaboutaddingand multiplying integers. Thefootballfieldwasa kindof numberline. Rulersandthescaleson thermometers are alsonumberlines. To makea numberlinewe drawa lineanddivideit intosections of equallengthcalled units. Thenwe numberthe pointswhichseparate the units.Herearethreenumberlines:
-60
-59 -58
-57 -56 -55 -54 -53
-52 -51
-50
Thearrowson the endsof eachnumberlineshowthatthe numberlinekeepsgoing. We canstartwithanynumberas longas we numberthe pointsin order(usually fromleftto right).Sometimes we do notshoweveryunit. Thisnumberlineonlyshowseveryfifthunit: -25
-20
-15
-10
-5
0
5
10
Hereare some numberlinesfor you to finishnumbering:
-18
- 15
Makea numberlineshowingall the integersfrom -5 to 5.
Ol 990by KsyCurriculum Proiscl,Inc. Oonol duplicatswithoutg€rmission
5
Graphinglntegers Wecanusea number lineto picture a setof numbers. linewe makea dot Onthenumber to showeachnumberin theset. Thisis calleda graphoftheset. A graphcanhelpyousee a pattern or answera question.lf a pattern continues forever to theleftor right,wefillin the arrowthatpointsin thatdirection. Grapheachset of integersbelow. Oddintegers: Evenintegers: Integers lessthan4: lntegersgreaterthan-3: Integersbetween-3 and-4: Integers notequalto 2:
-5-4 -3-2 -1 0
1
2
3
4
5
6
-5-4 -3'2 -1 0
1
2
3
4
5
6
-5-4 -3 -2 -1 0
1
2
3
4
5
6
-5-4 -3-2 -1 0
1
2
3
4
5
6
-5-4 -3 -2 -1 0
1
2
3
4
5
6
- 5 - 4 - 3 - 2 - 1 0 1 2 3 4 5 6
Integers divisible by 2: 0
10
20
0
10
20
0
10
20
0
10
0
10
lntegers divisible by 3: Integers divisible by 2 and3: Thesquaresof integers: Integerswithsquares whicharelessthanl0:
-10
-10
Didyou noticeany interesting patternsin the graphsyou made? @199 by Key CurriculumProj6cl,Inc Do not duplicalo without p€rmissbn.
G r a p h i n gR a t i o n aN l umbers Integers are notthe onlypointson a numberline. On the numberlinebelowwe have also labeledthe pointshalfwaybetweeneachintegerandthe next.
3 -2+ -;
-i
-i
o
+
b z t
ln fact,thereis a pointon the numberlinefor eachrationalnumber.To findthispoint, firstwritethe rationalnumberas a fraction.Thedenominator of the fractiontellshow manypafisto divideeachunitof the numberlineinto. The numerator tellshowmany partsto countoffto the rightof 0 (ifthe numberis positive) o_r to the leftof 0 (ifthe number is negative) point. find to the Here'showto find f ,'f , anOf . 6 Pafts
I3,o
7
i 2 + 2 + 2+ 2+ 2?
On eachnumberline,firstfinishlabeling the points.Thengraphthe rationalnumberat the left. ^ J
T -2 3
z5 lr
3
0
1
Labeleach rationalnumbershownon the numberline below. '2 O1990by K€y CurriculumProjocl,Inc Do not duplicats wilhout p€fmissbn.
7
Eachdecimalis a rationalnumber(unlessit goeson foreverwithoutrepeating), so it also place hasa on the numberline. To findthe pointfor a decimal, thinkof it as a fractionor mixednumber. 0.4is thesameas # . Thisnumberis between0 and1 so we dividethatunitintoten parts andcountfourto the rightof 0.
-3.7is equalto-3fr . Thisnumberis between -3 and-4 so we dividethatunitintoten parts andcountsevenunitsto the leftof -3. -4
-3.7
-3
-2
Forhundredths we coulddividethe unitintoa hundredparts,butto savetimeit makes senseto divideit intotenthsfirstandthento divideonlyoneof thetenthsintoten parts. To graph0.32thiswaywe firstnoticethatit is between0.3and0.4. Thenwe dividethe sectionbetween0.3 and0.4 intoten pails. Eachof thesepartsis a hundredth of the unit.
Grapheachdecimalbelow.
0.7
-o.2 5.8 -t+.I 325 -1.71+ 0.75 -0 08 0
I
@19S by Key CurriculumProjscl,Inc Oo nol duplicalBwithoul p€rmi$ion.
Finda decimalnamefor eachpointgraphedon the numberlinesbelow.
-0.1
0
0.1
lmaginemakinga graphof all the rationalnumbersbetween2 and 3.
Firstwe wouldgraphthe halves,
2+
thenthethirds,
2l
2+
zt
z)
zt zi
thenthefourths,
zt zi thenthe fifths,
2
z l z i z i z t z2+I zztt z3 z S2eo z2t lzt
3
andsoon... We wouldneverbe finished!Soonthe linewouldbe so crowdedwithdotsthatyoucouldn't tellonefromanother.So whenwe wantto show alltherationalnumbersbetween2 and3 we justshadethe wholesectionof the linebetween thosenumbers. 2 "between" wheneverwe say we willmean"notincluding the endpoints." We haveusedhollowdotsat 2 and3 to showthatthosenumbersare notincluded. Yougraphallthe rationalnumberswhichare: -1 and4 between between-3 and0
-4 -3
-2 -1
-4
-2
-3
between2 and3.5 O1990by K€y CutriculumProjecl,Inc. Oo not duplicatswilhoulpsrmission.
9
Canyoutellwhatsetshavebeengraphed?
-
2
-
1
0
1
2
3
4
5
6
7
8
9
Thefirstgraphshowsall rationalnumberswhichare greaterthan.3. The hollowdot shows that3 is notincluded. Thesecondgraphshowall rationalnumbers whicharelessthanor equalto 3. Thistime3 is included, so we haveuseda soliddot. On bothgraphsthe arrowshavebeenfilledin to showthatthe graphscontinue. Graphallthe rationalnumberswhichare: lessthan6
greaterthan1
greaterthanor equalto 4
lessthanor equalto 0 greaterthanor equalto -1.4
lessthanor equalto 0.5
between8 and8.5 7,8
8.0
8.2
8.4
8.8
8.6
notequalto 1 4
10
5
6
7
@19$ by K€y CurriculumProjscl,Inc Do not duplicalswilhoutpermission.
Inequalities In Book3 we workedwithequations.Rememberthat an equationis a sentenceabout numbersbeingequal,liker + -4 = 5. Anotherkindof sentenceis an inequality- a sentenceaboutnumbersbeingunequal. Herearetwo examplesof inequalities: utr+ -4 is less x + -4 <5 means than5." "x +'4 is greater x+-4>5 means than5."
Sometimes we combine twosymbols to makea newsymbol.Thesymbol< means "islessthanor equal > means"isgreater to." Andthesymbot thanor equalto." sentences usingthesecombined symbols arealsoinequalities. r+-4<5
means
x+-4>5
means
"tr+ -4 rs /essthan or equallo 5." "x,+ -4 is greater thanor equalto 5."
To get usedto using<, >, < and>, readthe followingstatements carefully. Eachof theseis true:
l 0> 6 1>-2
5 5 s5
B >-B
1 2 = 1 2 -4 >-7 -7 <-+ 1 2> 1 2
Eachof theseis false:
3>r+
-6<-6
-q>?
l < o
0
3 >
|>2 2>2
Markeachstatementbelowtrue (T)or false(F).
I B> 2 T lg >
-lt+s I -lr+s -15
7<
t g> t g - 3s - 3
-l+ s -lr+
7s7 - 7s 7
o >-g
l0 s24
3 <3
0 >-g
1 3> - 2
3
-8<
-Ll > -l
@199Oby Key Curicirtum projsci, lnc. Do not duplicate without p€rmissbn.
11
n
[flfil
roadsignfor "PassingPermitted." is the international
\./
"NoPassing." IACD is the signfor
\.y
Canyouligureoutwhateachsignbelowmeans?
S A @ @
isthesisnror isthesisnror isthesisnror ror isthesign
roadsignsto mean"No."We usethesameideato makeup A slashis usedon international "is newsymbolsin algebra.Inthesesymbolsthe slashmeans not." "7 is not equalto 4." means
7 + 4
o>
means
"0 is notgreaterthan5."
2<
means
"2 is not lessthan2."
l0 +-lZ
means
"10is notgreaterthanor equalto 12."
3 S 0
means
"3 is not lessthanor equalb 4."
Youwritethe meaningof eachsentencebelow.
B{ + 0+3 5 + 6
- 1 0# t 0 x+Ll +g -2x 4 lO
means means means means
means means
5 +s 12
@19S by Ksy CurriculumProiecl,Inc. Oo not duplicate without permission.
A numberis a solutionof an inequality if it makesthe inequality truewhenyoutry it in placeof r.
Thesenumbers aresolutions o fr + - 4 < 5 :
ofr+-4<5:
7 -1
because
0
because 0+-4<5
because
Thesenumbers arenotsolutions
7 + - 4< S -1 + -4< 5
10 because
1 0+ - 4 { 5
9
because 9+-4{5 25 because 25 + -415
Tryto findat leastfiveintegerswhicharesolutionsfor eachequationor inequality.lf there aren'tfiveintegersolutions, listas manyas you canfind.
x>3
x+8=l0
x 4 0
x+B<10
x + l
x+8>lO
x <
x +8 > l0
X <
x+8< lO
x + x
x+8+10
x : x
x+8>10
x >
x +B { l0
x <
x+8#lO
@1990by Koy Curridtum proisct, Inc. Do not duplicalo without permisslon.
13
AbsoluteValue or Whenwe multiplyor divideintegerswe get lhe amounfof the answerby multiplying dividingandthe srgnof the answerby followingthe rulesfor signs.The amountof a numberis oftencalleditsabsolutevalue. We putthesymbol| | arounda numberwhen we wantto talkaboutits absolutevalue. "Theabsolutevalueof 6 is 6." = 6 means
l6l
l - 6 1= 6 l0l = 0
means means
"Theabsolutevalueof -6 is 6." "Theabsolutevalueof 0 is 0."
Findingthe absolutevalueof a numberis easy. Justget ridof itssign. Youfindeach absolutevaluebelow.
-al=4 7 l = - l ol =
-l9 = | l9| =
Itl= | - tr l =
t+(-5 )I=
0 . l gl =
l o o 2 l7=
(-6)(-t{) I=
3 - 1 1 l=- 6l =
Usetrialanderrorto findas manysolutionsas youcan for eachequationbelow.
xl=5
r + 2 1= 4
x l =I xl=O
3 xI = 2 7
lxl=-5
x - 5 1 2= x-Bl=O
Foreachinequality whicharesolutions. below,tryto findat leastfiveintegers 7, l0 ond12 holl,cobsolrrta yclccs grcatcr thaa 6, -7,-fO ond -lZ. o brrt lo do
o
o
lxl{z
x
lxl$lo
>o +3 14
l x l) x l x ls 2 Ol 99 by Key Cuiriculum Proiecl, Inc. Oo not duplicale wilhoul permission.
GraphingInequalities Lookat thelastequation page.Thefiveintegers ontheprevious whicharesolutions are -2,-1,0, 1 and2. we could easilymakea graphofthissetofsorutions.
lxls 2
- 5 - 4 - 3 - 2 - 1 0 1 2 3 4 5
Someinequalities, like r ) -3, havean infinitenumberof solutions.lt woutdbe impossible to listallthe integerswhicharesolutions, butwe couldshowthe solutionset by startinga list andthenusingthreedotsto showthatit continues on andon.
x >3
o ,1 ,z , g ., . . I {-2,-1
We couldalsographtheset of solutions usinga darkened arrowon the rightto showthat the dotscontinue to the right.
x > 3
{ - 2 , - 11 , 0, 2 , ,g,...1
-5-4 -3-2 -1 0
1
2
3
4
5
Foreachinequality, showthe integers whicharesolutions in twoways:by makinga listand by graphing. lisf Graph
x <|
{
x >5
t
x s-3
t
x >-+ t x >2lot xso
t
l x l( T
t
l x l> 2 t x + f > 5 t Ol99O by Key Cuilicutum proisct, Inc. Do not duplicate without p€amissbn
15
ofthe numbers whicharesolutions It wouldbeimpossible to listalltherational -3. -3 greater than-3 is. number inequality is nota solution, r > buteveryrational Wecanshowthesolutionsetveryclearly by graphing. -
5
-
4
-
3
-
2
-
1
0
1
2
3
4
For each equationor inequalitybelow,graphthe set of all rationalnumberswhich
aresolutions.
x >
-5
-4
-3
-2
x ( 2
-5
-4
-3
-2
xs2
-5
-4
-3
-2
-1
x >-Ll
-5
-4
-3
-2
-1
-4
-3
-2
x +-3 x >
-5
-4
-3
-2
x
-5
-4
-3
-2
x +L+.4
-5
-4
-3
-2
x
-5
-4
-3
-2
x|z
-5
-4
-3
-2
lxl)3
-5
-4
-3
-2
16
-1
-1
3
4
5
Proiecl,Inc 0199 by KoyCurriqrlum Do notduplicalowithoulpo.missbn.
Thegraphof an inequality dependson whatkindsof numberswe ailowas solutions. Theset of numberswe allowas solutions is calledthe reptacement set. In the firstproblembelowwe haveshownwhatthe graphof r < 4 lookslikewhenonly integersare allowedas solutionsandwhatit lookslikewhenall rationalnumbersare allowedas solutions.Makea graphof eachinequality for eachreptacement set. lntegers
x<+
RationalNumbers
+- l F , l5 l l .l 0l l O l 5>
-
5
0
5
x
-
5
0
5
-
5
0
5
x >2.5
-
5
0
5
-
5
0
5
x ' >+
-
5
0
5
-
5
0
5
x<35
-
5
0
5
-
5
0
5
<2
-
5
0
5
-
5
0
5
<25-
5
0
5
-
5
0
5
>r+
-
5
0
5
-
5
0
5
xl>o
-
5
0
5
-
5
0
5
x *-t
-
5
0
5
-
5
0
5
x > l
-
5
0
5
-
5
0
5
Fromnowon in thisbookwe'llatwaysuserationat numbersas our replacement set. 01990 by Key CurricrJlumproiecl, Inc. Do nol duplbalo withoul pormission.
. ,
t
Solvinglnequalities thatnumber by substituting We cantellif a numberis a solutionof an equation or inequality forthevariableandseeingwhetherthe resultis trueor false. l s S a s o l u t i o n2 ox l+ 5 < x - 1 5 ? We cansubstitute 8 forxto findout:
2X+5
<
Z.g + S
<
t6+5
2
t
<
< false
so 8 is nota solution.
solution. Luckily we do nothaveto substitute everytimewewantto checka possible justaswe usedit to solve WecanusetheAddition Principle to helpussolvean inequality withthesame inequality equations. TheAddition Principle canhelpusfinda simpler Lookatthisexample: solution set. Thisis calledsolvingtheinequality.
zi^n 5-\ < x +5- (
- 1-55 '
x < Onlynumberslessthan-20aresolutions, so 8 couldnotbe a solution.Neithercouldany otherpositive number. Solveeachinequality belowusingthe AdditionPrinciple.
^ + ff>
3-'t
-16 x >
x-4
x+? s -6
ll+ x >
x - 5 <-3
l0<
1 2 >
-rl
5 > x +t(
l >x
x < lo -+* 5x+ |
ff I ir biqqli thonr, th'e?r r is fessthon f.
7x-1<
x-5S 2x+8
x+l
x 18
@199 by Key CurnculumPlojacl,Inc Do nol duolicalewilhoutosrmission.
Solveeachinequality belowusingthe AdditionPrinciple.Drawa graphof eachsolutionset.
^-7>0
x >7 5 6 7
x-g<-?
6 < x + 1 2
S g f o
2 x + l ) x - 4
3(x-il ) 2x
x + 1 61 2 x + 2 0
-Lt*ll 3 26
xz+x+8>
( x * 2 ) ( x - 2 )< x z+ x x e - & +( x t + x
(x * A(x-ll
5x-6 <
2 k - l ) < 3 ( x* 4 )
2x''*22)2x'+x-1
x"
(x-4Xx+5)(x'-19
-q(x ?( >-tf
proioct.Inc. 01990by KeyCurriqrlum Do notduplbatewithoutp€rmjssion.
19
for and DivisionPrinciples Maybeyou are wonderingwhetherthereare Muttiplication and The answeris yes,buttheyaren'tquitethe sameas the Multiplication lnequalities. for Equations.Whenwe multiplyor dividebothsidesof an inequality Divisionprinciples inequality.Butwhenwe multiplyor by a pos1ivenumber,we do get an equivalent dividebothsidesby a negativenumber,we mustreversethe inequalitysignto get an to seewhy: inequality.Lookat thesesentences equivatent -6 Dividing tr,^e Multiplying 2: by -52 L
-6 < I
-t7 < Multiplying by -2:
lO'2.- t^re
-2O t>
l2
trae
-6 .L
true
-3
true
t z < - 2 0(
2
Dividing by -2:
folse ./
-z
false /
3
truc wilh 4
io ) swilchcd
3
>
-5
F
true wilh ( to ) switched
to switch Remember Principles. and Division usingthe Multiplication Solveeachinequality signif you multiplyor divideby a negativenumber. the directionof the inequality
oo 5x 2 ' 3 0 0
5
" )p
x >-6
o
o
-+. c c
x q
^t{r
t - --rl f
\
x
6 < >$)'+
>-z+
x
>
3
l
llx <
x
-5
20
<
t^
-3x <
019$ by l(ey Cwriclrlum Ptoiad, Inc Do not duplicats without potmission.
Solvingeachinequality belowtakesmorethanonestep. Remember to switchthe inequality signwhenever you multiply or dividebothsidesby a negativenumber.
{@ -3x+iWt -3x > -5^ < t1 nlL'\ -3
W%;Z
5x +l s -L+4
- Z x + 1 5<
x
ry<
f>
-4x
-t
f , " 1 +> q
2x-7x <
o1990 by K€y Curiculumproiec,t,Inc Do not duplicats wilhoul pormission.
t
-3(x-5)
2l
-t2
ro<
on page21. Here'showSandyandTerrysolvedthe lastinequality
Terry
Sandy
q-fs
7 '*
?t s zn* t,
2 < x >
t{xs
7-7
-z - l x < 'z -XS
,k
v
-2
T
x > BothSandyandTerryendedup withthe samesotutionset. Whosemethoddo you like better?Why? below. Bothmethodswork. Useeitheroneto solveeachinequality
2-x >
3 x * f 5>
25 s lo x
22
1 8 + x>
x+ 20 <
+-X T
-5x*9 >
\ t. / t L
1 2- 7 x <
O19O by l(.y CurtiorlumPtol€cl,hc. Oo not dupl'Eatowirhoulp.rflission'
Solveeachinequality andgraphthesolution set.
3x-{x >
x + 1 2>
t-7 <
7x-2x x >
- t 6 +I x
@1990 by KsyCuricutumproiecl.Inc. Do not dupli:atewilhoutgermissbn.
>
g + r < +
you shouldnof usethe Whenan absolutevaluesignappearsin an equationor inequality, insidetheabsolute to simplifyan expression or DivisionPrinciple Multiplication Addition, valuesignmeans. thinkaboutwhatthe absolute valuesign. Instead,
Ix 1 +
i l l = 6
l = 6
o r 1 + l = - 6
x = 5 or x=-7 -7 eachlorx. we cansubstitute To makesurethatboth5 and aresolutions,
C h e c k ,l $ + l l = 1 6 l =6 l - 7+ t | = l - 6 1= 6 Solveeachequation,andcheckyoursolutions.
I x - tol = Z
l x * 5 1= 7
Check:
Check:
l-3xl = Ll
Check:
[3x+41 =lO
= frzx-616
C h e c k:
24
Proiecl,Inc @19$ by KeyCurriculum withoulpormission. Do notduplicato
Solveeachequation.
lxl*f=2O-3 l x l= 1 7
lxl-6=-Z
x=17or-|'7
l x | +I = l l
Z l x l- S = 3
| + x -5 | = 7
4 l x l - s= 7
l x + 2 1 - l= 7
f x * 5 1 + 4= l Z
I z ^- 3| +I = l l
-3lxl * 5 = -r+
@1990by Key Cufticllum proioct, Inc. Do not duplicalo without D€rmission.
25
SolveandcheckeachinequalitY. so picka fewsamples' Youcan'tcheckallthe solutions,
,--,.n^,^,-.
( wtoti inridc nus!bc J
.oo(-g[Xj:)
l x l + 7<
lx:zl>
l x l *4 <
lxl-6>
^ A - 2< - 3 o r > 3 X 2 l x l< x > 5 o rx < - l x < 9 a n xd > - 9 Check: Check: 6 , l 6 l+ 2 = 6 + 2 = 8 < 1 : l q - z l= - /> 3 -rl: l - 4+12 = 4 + 2 = 6 l 3 lxl s 4 l x l > Check:
Check:
lx-ll<
l x * l O l>
Check:
Itzx| > 2+
lil<
Check, 26
@199 by Ksy CurriculumProiscl'Inc Do not duplicals wilhout p€rmisson.
Relatin os =, (, >, ( and> aresometimes In algebra, calledrelations.Thinking of relations in your familycan helpyou understand relationsin algebra.Relationsin yourfamilyare people connected to you in certainways. You havedifferentkindsof relaiions:mother,father, brothers, sisters,aunts,uncles,etc. Lookat thisfamilytree:
Abe
Bev
Cal
r_T__J
Dee
t-T__J
Eve
Fred
Grl
Helen
fon
.Ione
ThetreeshowsAbe is marriedto Bev,and Eveis theirchild. Calis married to Dee,and theirchildis Fred.Guy,Helen,lanandJanearethechildren of EveandFred. Let'ssee howsomeof the peoplein thisfamityare related: srsters.'we willcallthe sisterrelations. s(r) means,,asisterof x,.,,
= Helen S(Guy)
means
= Jane S(Guy)
means
S(lan)=
means
S(lan)=
means
S(Jane)=
means
= S(Helen)
means
'h sister t, crf GuI is Helen. % sister of Cruyis Jone.,'
Brothers:we willcallthisrelation B. B(x) means,,abrotherofx.,, B(lan)= B(Jane)= B(Jane)= B(Guy)=
= B(Helen)
= B(Helen)
Fathers:we willcallthisrelation F. F(x) means,thefather of x;, F(Eve)= F'(lan)= F(Guy)= F'(Fred)=
= tr'(Helen)
= F(Jane)
Grandmothers: We willcallthisrelationG. G(x)means"a grandmother of x.,, = G(Helen) G(Jane)= G(lan)= = G(Helen)
G(Jane)=
G(Guy)=
G(Guy)--
O1990 by Koy Curricutumproieci. Inc. Do not duplicate without rprmlssion
G(lan)=
27
with in algebrapairnumbers pairpeoplewithotherpeople.Relations in families Relations whichinvolvenumbers: othernumbers.Herearesomerelations "a than"relation:WewilluseG(r)to mean numbergreaterthanr." The"greater G(5)= 7
" means "A numbcrgrcotcr thon 5 ig 7. or
7 ) 5
G(5)= lO.l+ means A numberqreoterthon 5 ig 1O.4." ot lo.l+ ) 5 Namesomeothernumberswhichcan be pairedup with5 in this relation:
G(5)=
G(5)=
G(5)=
G(5)=
Finda numberto makeeachol thesetrue: G(2)=
G(-6)=
G(100)=
G(4.8)=
"a lessthanr." The"lessthan"relation:WewilluseL(r) to mean number
ber fcssthon3 is 2." ot 2 3-?.
= 2 ^L(3)
means
r(3)=- li
-l*." ot -li means 'h nrmbsrlcssthon 3 ir
zf1)=
means
L(-2.5)=
means
( 3
"a The"equality"relation;We will useE(r) to mean numberequalto r."
E(2)= 2
means " A nu^br eluql b 2 is 2." o, 2 = 2
E(-6)=
means
= E(11.2)
means
"a The"lessthanor equalto"relation;Wewilluse?(r) to mean numberlessthanor equal tor."
T(4)= o
means
t(,u)= +
means
q-6.3)=
means
28
otgs by KeyCutricrlumProiecl,Inc, Do notduplbatewirhoutpermis8bn-
Functions somepeopleliketo thinkof relations as "input-output" machines. Tracy,pul this through lfte rOrccterllun'nachine. lpl;aaS t'\v,
g'l-,r,
ond if q.y.nr
,
a zodot (
\i
5 ' As you cansee,the outputof a "greaterthan"machinecan'tbe predicted. Allwe knowis thatit willputouta numbergreaterthanthe numberwhichis putin. Hereare somepossibilities:
yy5r/
\5/
\r5r/
Greaterthan Machine
Greater fhon lvlochine
Grcolcr fhan Mochine
G
,e\
G ( 5 )= 6
G
0 c ( 5 )= 220 G(5)
,94 G ( 5 )= 33,041 G(5)
\r5,/ Greaterfhon Machine
G G ( 5 )= 1 0 2
/tl\
t02
somekindsof relationmachines arecompletely predictable.
\,3t/
\11/
Doubfinq Mochini
D
1,5/
Equoliiy Machini
E
t't,
D(3)= 6
Addinq 3 llachtire
'i3
E ( 1 3=) 1 3
T T(5)= 3
Thesecompletelypredictabre relationsare calledfunctions. A functionhas onlyone possibleoutputfor eachinput. \Ar,/
Function
f
ri;) @1990by Key Curricillum proiect. Inc. Do not duplicats without p€rmjssion.
29
of functions. Herearesomemoreexamples "theabsolutevalueof x." A(r) = | r I value"function:A(x) willmean The"absolute
\.1r,/ -). I z-
A(-7\= l-71=J
|- s . sI 5 . 3 A(4.71)= l + z r l +.1t
A(3)=
o(i)=
A(-3)=
o(*) =
A(-12)=
4(-6.6)=
A(7)= lZ | = 7
onyndmbcr
Volue Absolute I'tochine A
*l
AC5.3)=
'the integerafterr." N(r) = x' I 1 The "nextinteger"function:N(r) will mean -\ ,t zonly inlegerrs
NextInieger MochinE
N
N ( 1 0 =) l l
= -15 N(-16)
N(9) =
N ( - 1 0 1=)
N(0) =
N(25)=
{';'l
The "opposite"function: P(r) willmean
P(2)= -2
\..X1/ ony n'umber
Opposite Mochine
P
P(-1)=
!:+,
P(0)=
"theoppositeof r. P(x) = -x
"(3)=
= "(+)
= "(+)
P(3.5)= P(0.6)= = P(-0.003)
"thesquareof r." S(r) = a2 The"squaring"function: S(r) willmean \..X r/
s(3)= I
S(-3)=
= s(12)
onynumber
s(4)=
s(-4)=
= s(100)
s(5)=
s(-5)=
= s(-100)
s(6)=
s(-6)=
= s(0.5)
SXuaring Mochine
s
30
/t, 2
x
o19$ by Key CurriculumProjecl.lnc Do not duplicat€wilhout permission.
Herearesomefunctions we usein everyday life: Th9'firstclasspostage"function:P(r) is thefirstclasspostageon a letter weighing r ounces.lt costs2SA1o maila letterweighing oneounceor less. Foreachadditional ounceor partof an ounceyoupay zoemore. P(1)=
o(i)=
P(0.7)=
P(2)=
o(:)=
P(7)=
P(3)=
. (ti)=
P(7.3)=
P(4)=
o (,i)=
P(3.7)=
P(5)=
" (.1)=
P(4.9)=
The "feet-to-inches" function:I(x) is the numberof inchesin r feet. Thereare 12 inchesin onefoot,so I(1) = 12. I(2) =
(5) =
(3) =
1(9)=
I(4) =
1(15)=
, (i)= ' ('i)= r(*)=
The"salestax"function;S(r) is thesalestaxona taxablepurchase ofr dolars. To figuretheseout,youneedto knowthesalestaxpercentage foryourstate.Tryto geta copyof thesalestaxtablewhichmanystoresuse.
= s(.10)
s(.50)=
s(.84=
s(.20)=
= s(1.00)
s(1.10)=
s(.30)=
= s(2.00)
s(7.75)=
The "days-in-a-year" function:D(x) is the numberof daysin the yearx,. Leapyearshave366 days. Othershave365days. D(1980)=
D(1971)=
D(1776)=
D(1950)=
D(1900)=
D(2000)=
@1990by Key Curicutum proioci. lnc. Do not duplicate wilhout p€fmissbn.
31
a functionin words,we oftendefineit by givingan algebraic lnsteadof describing torthe nirmberwhichis pairedup withr. Youfinishthisexample: expression The"f" function:flr) is one morethan3 timesx. flx) = 3r + 1
f ( 5 )= 3 ( 5 ) * | ffn=3fA +l='6+l =-$
f ( - B=)
Findthe numbersaskedtor by expression. Eachfunctionbelowis definedby an algebraic in the exPression. substituting
h ( x )=3 ( x- l ) g ( x )= 3 x - I = 3(-t'f)- | =-|.2- I = -13 h(-t+ )= Jf+) h ( 7) = {7)=3nl-l= = h(5)= 9(5) =(x*1ll" Lt p ( x )= x ' * 1(x)
p ( 3= ) p (l ) = P(-10)=
t(3)= 1(l)=
)= q(-10
,fd =
s ( x ) =l ^ l + g s(3)= s ( - 1 0=) s(-6)=
m ( x )= x - I
n ( x ) =l - x
'n(8) = rn(-8) =
n ( 8 )= n ( - 8 )=
rn(O)=
n ( 0 )=
r ( x ) =l x * 6 1 r(3)= ) r ( - l O=
32
@199 by Key CurriculumProisc, lnc. Do not duplicat€withoutpsrmission.
A tableis an easywayto listthe pairsof numbers thatbelongto a function. Theexpression for thefunctionis writtenabovethetable.Thefirstcolumnof the tableliststhe numbers to be substituted forthevariablein the function.Thesecond columnliststhe valuesobtainedby substituting the numbersin the firstcolumn.
f(x)=x - lO
g ( x )= 2 x + 6
h ( x )= O . x
25-10=15 17-lO=7
,{,
k ( x )= 6
@199Oby Ksy Cuilicutumproied, Inc. Do not duplicato without permissbn.
m(x)
3x ?
n(rt)=
x-5 4
by peoplewho Manyfunctionsimportantin scienceandotherfieldshavebeendiscovered in a table,andfiguredout a formulafor it' theirinformation data,organized collected see if you canfinda formulato fit the datain eachtable.
f(x)=
= 3(x)
h(x)=
q{x)=
r(x) =
s ( x )=
v ( x )=
Proiod'Inc. o19S by KoyCurriculum withoutpotmlssbn. Do notdugl'tcato
WrittenWork Dotheseproblems on somecleanpaper.Labeleachpageof yourworkwith yourname,yourclass,the date,andthe booknumber.Alsonumbereachproblem. Keepthiswrittenworkinsideyourbook,andturnit in withyourbookwhenyouarefinished. Pleasedo a neatjob. 1. Writeeachrationalnumberas a fraction. -7 -4.3 2 i o 0.6 1.04 2. Writelhe answerto the divisionproblem-15+ 4 in threedifferent ways. 3. Solveeachequation.Writeyouransweras an integeror a mixednumber. -9r =
f =r+
95
6r-2 - ' 3
-
1
I
x ( x + 3 )= a z - 1 U
4. Nameeachpointwhichis marked. -1
1
5. In words,d c escribe the set of numbersshownby eachgraph. 0
5
-
4
-
2
0
2
4
6
-
5
0
-
4
-
2
0
2
4
6
-
5
0
-
4
-
2
0
2
4
6
'
4
-
2
0
2
4
6
6. Writean inequalityfor each graph. -
4
-
2
0
2
4
6
7. Solveeach equationor inequality.
lx+11=! lr-51=Q lx + 4 . ' . 1 2
3r-2S19
# .ro
6-5x>2
7x-1 >4-3x
3lrl-7=11
3 ( r -2 ) < 4 x + 1 6
B. Whichof theserelations arefunctions? "brother" The relation:B(x) is a brotherol x. "mother" The relation:M(x) is a motherof r. "less The than"reration:z(r) is a numberressthanr. "2 The lessthan"relation:W(x)= x - 2. The "tripling"relation:T(x) = 936. 9'
Makea tablefor eachfunctionbelow. Choosefive numbersto substitute forr in eachtable. Showthe valuesyougetwhenyousubstitute thesenumbers. f(x)=2x-1
@1990by Koy Cuflicllum proiecl, Inc. Oo not duplicats without permissior
g ( x=) l x - 2 1
h(x) = vz
35
PracticeTest numberas a fraction. Writeeachrational
3+= -2+=
-t t -
O . 1=
4.Ol=
Q=
-2.5, from-3to 3. Graphthenumbers 0.3and2 |' numbers lineshowing Drawa number
Labeleachnumberlineandgraphthe setof numbers' -2 fntegersbetween and4'. Rationalnumbersgreater thanor equalto 5: Rationalnumbersnot equalto 1: value. Findeachabsolute
le.a1=
l-sl=
l o| =
l - z * 6l =
Solve.
36
@199 by KeYCwriculumProiocl,Inc. withoutp€lmissron. Do notduplicato
Solve.
4x-7(x+6
2 0< 5 x - 2
+ <-1
cl-x>-3
7 x - 3 ^ + l )x * 5 x - 6
t*a<
G(r) means"a numbergreaterthanr." Finda numberto makeeachof thesetrue.
G({)=
G f 2 . 3 )=
G ( O )=
Fillin the missingnumbersin thetablefor eachfunction.
f(x)=x-5
01990by KeyCuniculum Proisct,Inc. Oonol duplicatg wilhout9€fmissbn.
g ( x )= x ' + |
37
Book l: OPerationson Integers Book 2: Variables,Termsand Expressfons Book 3: Equations Book 4: PolYnomis,Is Book 5: Rstions,INumbers Book6:MultiplyingolndDividingRationalExpressions Book 7: Adding'snd subtracting Rqtionql Expressions Book 8: GraPhs of Equations Book 9: SYstems Book l0: Squcre Rootsand QuadraticEquations Answersand Notesfor Books 1-4 Answersand Notesfor Books5-7 Answersand Notesfor Books8-10
Kev to Fractions@ Kev to Decimals@ Key to Percents@ Key to Geometry@ Key to Measurement@ Kev to Metric Measurement@
ilh r€xsl/"5ffi9,y*"u"M:"HS rsBN 1-55953-005-7
'@-
rff ]ililffi