Exam 2 Review (Sections Covered: 31 33 6164 71) Solutro 1 Write a system of linear inequalities that describes the shaded region :) 5x +2y 30 x +2y " 2) 12 x : 0 y Z 0 : Line as 0 TO ± 30 True Line (2) 0+0 ± 12 Tr 2 Write a system of linear inequalities that describes the solution set D 7x +6y 86 =f (2) x + y < 10 x 2 (3) 0 y 2 1 4) 5 (2) Line 1 i ) 0 +0286 False Line 12 ) O +0<10 True Line (3) 0>0 True Line 14 ) 025 False (2) 17
3 Solve the linear programming problem Maximize P =3x +5y Ll ) subject to 2x + y apple 16 ( 801 ( 016 ) 14 2x +3y apple 24 1120 ) x 0 y 0 (a) Find the corner points of the solution set theline Ll ) 0+0[6 Linlk 0+0424 True # i±% E*s (b) Find the maximum "±M t# K 41 01010 2 Fall 2016 Maya Johnson
4 Solve the linear programming problem Minimize C =2x +4y li ) subject to 4x +2y 40 11010111020 ) 121 2x +3y 30 ( 1507 x 0 y 0 (O: (a) Find the corner points of the solution set Lionel o+oz4o o±i# E #EF Points : = Line : +0230 ONFalse (b) Find the Min maximum Effete rsoiyot8ime# 3 Fall 2016 Maya Johnson
5 Let the universal set U = {u v w x y z} with sets A = {uvyz} B = {xyz} andc = {w x} Determine whether the following statements are true or false (a) x y 2 B (b) {x y z} B (c) {u w} 2 A (d) {u y} A True False True % 6 Let the universal set U = { 3 2 1 0 1 2 3} with sets A = { 202} B = { 3113} and C = { 2 1 3} Determinewhetherthefollowingstatementsaretrueorfalse (a) A has 20 subsets (b) B c =? Fat (c) (A \ B) c = U : :alee : (d) (A [ C) ={ 2 1 0 2 3} rue (e)? 2 C False (f) A and B are disjoint sets True 7 Let U be a universal set with sets A and B Determine whether the following statements are true or false (a) (U) c =? True (b) (?) c = U True (c) (A \ B) c = A c \ B c False (d) B \? = B (e)? B (f) A [? =? True False False 4 Fall 2016 Maya Johnson
8 Write venn diagrams to represent each of the following sets (a) A \ B \ C c (b) A c [ B [ C 0$08 (c) (A \ B) [ C *eemaa% ao (d) (A [ B c ) \ C IAUBYNC = Angolan c ) 5 Fall 2016 Maya Johnson
9 Let U = {9 6 1 2 5 7 11 13 17 19} A = {9 1 5 11 17} B = {6 2 7 13 19} andc = {9 6 2 5 13 17} Find each set using roster notation (a) (A \ B) [ C (b) (A [ B [ C) c 0VCaCaI9i6i2s13@lAuBUCKAcnBcnctecDloctt05IYaTiniaA (c) (A \ B \ C) c 10 Let U = { 8 4 2 1 3 6 9 12 16 18} A = { 8 2 3 9 16} B = { 4 1 6 12 18} and C = { 8 4 1 3 12 16} Listtheelementsofeachset (a) A c \ (B \ C c ) 'M 618 }={6@ (b) (A [ B c ) [ (B \ C c ) laub9u{ 6183={8 43916 }UBCU 6 18 } 854316191161830 (c) (A [ B) c \ C c ltttnpscncy µ 6 Fall 2016 Maya Johnson
11 If n(b) =13n(A [ B) =24andn(A \ B) =6findn(A) NAUB )=nla)thlb ) NCANB 24 = MA ) +13 6 ) NCA) = 2413+6 7 ' 12 In a survey of 400 people a pet food manufacturer found that 250 owned a bird 150 owned a snake and 75 owned neither a bird or a snake (a) How many owned a bird or a snake? (b) How many owned both a bird and a snake? nl Bnp (a) n( Bus )a=4g 5 Lb ) 325=250+150 nl BAS ) = 250+150325=750 13 In a survey of 300 members of a local sports club 180 members indicated that they plan to attend the next Summer or Winter Olympic Games 150 members indicated that they plan to attend the next Summer Olympic Games and 90 indicated that they plan to attend the next Winter Olympic Games How many members of the club plan to attend (a) Both of the games? (b) Exactly one of the games? (c) The Summer Olympic Games only? ;Ii : :QQD (d) None of the games? Ld ) @ 7 Fall 2016 Maya Johnson
14 Let A and B be subsets of a universal set U and suppose n(u) =48n(A) =13n(B) =23and n(a \ B) = 8 Compute: (a) n(a c \ B) (b) n(b c ) (c) n(a c [ B c ) (d) How many subsets does B have? (e) How many proper subsets does B have? ' 00 lab ( c 20 +5=400 " (d) 223=83886080 221=83886070 ( e) 15 Let A B andc be sets in a universal set U We are given n(u) =66n(A) =32n(B) =33 n(c) =33n(A \ B) =16n(A \ C) =10n(B \ C) =18n(A \ B \ C c ) = 9 Find the following values (a) n((a [ B [ C) c ) (b) n((a c \ B c ) [ C) (c) n((a c [ B c ) \ C) semi ee#nojx@qo0qy regions 33 +5 =@ (c)add 3 + 12 t Ll =# with two as 8 Fall 2016 Maya Johnson
16 Use the following information to determine the number of people in each region of the Venn Diagram r Agroupof295studentswereaskedwhichofthesesportstheyparticipatedinduringhighschool 44 students participated in all of these sports 87 students participated in basketball and track 39 students participated in basketball and tennis but not track r 79 students participated in track but not tennis 155 students participated in basketball 73*43=360 142 students did not participate in tennis 103 students participated in exactly one sport r 3629=380 a = b = Tennis a b Track c c = d e g f d = e = f = 4 44=430 h b = 295 Basketball 38 36 39 g = h = 4443 15539 µ2 3643 ' 29 4443=290 : 32 }9# 9 Fall 2016 Maya Johnson
29 34 17 Use the following information to determine the number of people in each region of the Venn Diagram 251 people were asked which of these instruments that they could play: Piano Drums or Guitar 20 people could play none of these instruments 34 people could play all three of these instruments 79 people could play drums or guitar but could not play piano 115 people could play guitar : 130 people could play at least two of these instruments 3%34=440 72 29 28 people could play piano and guitar but could not play drums 78 people could play piano and drums a = b = Guitar Piano b c = a c lag283424=290 d = e 60284434=240 d f e = h g Drums f = g = 24=260 h = C = 251 28 24 44 2620 = 46 10 Fall 2016 Maya Johnson
18 Agroupofstudentswereaskedwhichofthesesportstheyplay Theinformationwasrecorded in the Venn Diagram Use the the Venn Diagram to answer these questions Let T =TennisF = Football and B =Basketball a =43 Football Tennis b =38 a b e c c =45 d =8 d f e =22 g f =16 h Basketball g =12 h =35 (a) How many students play Football or Basketball but not Tennis? a + d tg a 43 +8 + 12=630 (b) How many students do not play Football? Ctftg th = 45+16+12+35 =@ (c) How many students play tennis or do not play basketball? b + C tetf tat h = 38 +45+22+16+43=+360 n(t c \ (B [ F )) at d tg +43+8+12=630 (d) n(t [ (B \ F c )) btctetf tg = 38+45+22+16 t 12=1330 11 Fall 2016 Maya Johnson
+0 19 In recent years a state has issued license plates using a combination of three digits followed by three letters of the alphabet followed by another three digits How many di erent license plates can be issued using this configuration? et 26*61*10=263 ; loti D 20 Complete the following (a) How many sevendigit telephone numbers are possible if the first digit must be nonzero? b a 0%10 760000009 it = 900 (b) How many international directdialing numbers for calls within the United States and Canada are possible if each number consists of a 1 plus a threedigit area code (the first digit of which must be nonzero) and a number of the type described in part (a)? I 9 9000000=810000000026 21 Astatemakeslicenseplateswiththreelettersfollowedbyfourdigits (a) How many license plates are possible? 26 26 0 10 10=175760%21 (b) If no repetition of the letters is permitted how many di erent license plates are possible? a 2 21 e I IO :D 156000 (c) If no repetition of letters or digits is permitted how many di erent license plates are possible? 26 2524 @9 E 7=78624%5 (d) How many license plates have no repetition of letters or digits and begin with a vowel? 25 24 D 9 & I =1512 12 Fall 2016 Maya Johnson
22 A company car that has a seating capacity of eight is to be used by eight employees who have formed a car pool If only three of these employees can drive how many possible seating arrangements are there for the group? 31 III I6 = 3 5 23 There are four families attending a concert together Each family consists of 1 male and 2 females In how many ways can they be seated in a row of twelve seats if (a) There are no restrictions? 12! = 4790016000 (b) Each family is seated together? 1# ' =3! (c) The members of each gender are seated together? 12 total people =3h@ 3131 :3! 4! si#e=ifnstt!g 21 24 Alex Mark Sue Bill and Maggie attend the movie theater Assume that Sue and Maggie are female and that Alex Mark and Bill are male How many ways can they be seated if (a) There are no restrictions? 5! = # 5 total people (b) The females sit together and the males sit together? 3 = 2! 3! 4=240 (c) Mark and Sue want to sit together? t=2!c4 #yt I! = 480 13 Fall 2016 Maya Johnson
25 At a college library exhibition of faculty publications two mathematics books four social science books and three biology books will be displayed on a shelf (Assume that none of the books are alike) (a) In how many ways can the nine books be arranged on the shelf? 9! (b) In how many ways can the nine books be arranged on the shelf if books on the same subject 2362880 matter are placed together? 1 # =2! 4! 3! 3! 2172 26 Find the number of distinguishable arrangements of each of the following words (a) acdbens 7! (b) baaaben 25040 # 24200 (c) aaabbba HE =D 27 In how many ways can a subcommittee of six be chosen from a Senate committee of six Democrats and five Republicans if (a) All members are eligible? C ( U 61=4620 Total of 11 choose 6 (b) The subcommittee must consist of three Republicans and three Democrats? Clb } ) CK 31=2000 14 Fall 2016 Maya Johnson
19 28 In how many di erent ways can a panel of 12 jurors and 2 alternates be chosen from a group of 16 prospective jurors? C 1 1612 ) Cl 412 ) zw@ 29 From a shipment of 25 transistors 6 of which are defective a sample of 9 transistors is selected at random Total of 25 6 defective nondef choose 9 (a) In how many di erent ways can the sample be selected? C 12591=20*29754 (b) How many samples contain exactly 3 defective transistors? C 1631 Cll9 67=5426400 (c) How many samples contain no defective transistors? C 11991=9213780 (d) How many samples contain at least 5 defective transistors? C ( 65 ) C 119 4) tcl 66 ) CI 19 3) =242 15 Fall 2016 Maya Johnson
30 A box contains 8 red marbles 8 green marbles and 10 black marbles A sample of 12 marbles is to be picked from the box (a) How many samples contain at least 1 red marble? Total ways Cl 26 12 ) C Total 26 choose 12 nd on 't wait ( 18 12 ) 9639 a (b) How many samples contain exactly 4 red marbles and exactly 3 black marbles? C ( 84 ) CC 10 3) C ( 851=4704000 (c) How many samples contain exactly 7 red marbles or exactly 6 green marbles? CH 214185 ) tcl 86 ) CH 6) 2588336 I C (d) How many samples contain exactly 5 green marbles or exactly 3 black marbles? 1187 ) + Cl 103 cl 169) CHE ) Choi 3) CH 41=26845440 31 Suppose we have 20 people on a committee How many subcommittees contain one president one vice president and six cabinet members? 2011*161=70543206 32 Ten runners are competing in a halfmarathon How many ways can we award one 1st place prize one 2nd place prize one 3rd place prize and four 4th place prizes? k 4 CHIT =25# 16 Fall 2016 Maya Johnson
33 Consider the sample space S = {s t n} How many total events are there for this sample space? # of events = # of subsets = 23=80 34 Let S = {5 9 12} be a sample space associated with an experiment (a) List all events of this experiment { 5499 } if 12 } I 5 9395 12399 123 { 59 12 } (b) How many events of S contain the number 5? 4 (c) How many events of S contain the number 12 or the number 5? 35 An experiment consists of tossing a coin and observing the side that lands up and then rolling a fair 4sided die and observing the number rolled Let H and T represent heads and tails respectively (a) Describe the sample space S corresponding to this experiment :HI H2 H 3 H 4 Tl TZ T 3 T 4 } (b) What is the event E 1 that an even number is rolled? { H 2 H 4 T 2 T 4 } (c) What is the event E 2 that a head is tossed or a 3 is rolled? { Hi He H 344 T 3 } (d) What is the event E 3 that a tail is tossed and an odd number is rolled? { T ' T3 } 17 Fall 2016 Maya Johnson
5 36 The numbers 3 4 5 and 7 are written on separate pieces of paper and put into a hat Two pieces of paper are drawn at the same time and the product of the numbers is recorded Find the sample space 3 4 35 3 2 4 4 2 S a { 12 15 21 2028 353 5 7 37 A jar contains 8 marbles numbered 1 through 8 An experiment consists of randomly selecting a marble from the jar observing the number drawn and then randomly selecting a card from a standard deck and observing the suit of the card (hearts diamonds clubs or spades) (a) How many outcomes are in the sample space for this experiment? 8 4 = 32 (b) How many outcomes are in the event an even number is drawn? (c) How many outcomes are in the event a number more than 1 is drawn and a red card is drawn? * two of the suits are red 7 a 2 =@ (d) How many outcomes are in the event a number less than 2 is drawn or a club is not drawn? I 4 + 8 3 1 3 = 4 + 24 3=250 18 Fall 2016 Maya Johnson