'iTATUTE JO I Contd
Geology
Hydrology (E28)
Biology (B2)
81100 Earth SLtenLes I 71100 Chemistry I
81100 Earth SL1enLes I 61128 Algebra Bil
63126 D1fferenual and Integral CalLulus BI
76100 Physics I or 71100 Chemistry I 86100 B1ologH.al SuenLe I
61128 Algebra Bil 63126 D1fferenttal and
Integral Calculus Bl 76100 PhysKs I 71100 Chemistry I or 76100 PhysKs I
76100 Phys1Ls 71100 Chemistry 63126 D1fferenttd.l and
Integral Calculus BI 61128 Algebra Bil
SCHEDULE 5 THE ORDINARY AND HONOURS DEGREE OF BACHELOR
STATUTE 10 I Contd
4 In the second year of the degree a student shall c..omplete not less than 36 unlts c..ompns1ng 24 sec..ond year level mathemauc..s units 1nc..lud1ng the following topKs (eac..h worth 3 units)
63221 Differential and Integral Cakulus Bii or6321 l D1fferent1al and Integral Calc..ulus All•
63222 D1fferenl1al and Integral Cakulu!. Biii or 63212 D1£ferenual and Integral Cakulus Alli
63223 D1fferenual and Integral Cakulus BIV or 63213 Drfferenual and Integral Calc..ulus AIV
61221 Matrix Theory 1•
65251 Probability and Staustics I 67111 Computn1g I if not already done 67212 Numenc..al Analysis I
63241 Differential Equauons 1•
67252 Class1c..al Mec..ha1uc..s
and further sec..ond year or higher level un1ls taken in the Sc..hools of Mathe1natKal Sc..1enc..es B1ologKal Suenc..es Earth Sc..1enc..es Hum1nit1es PhysKal Suenc..es or Soc..1al Sc..1enc..es and
5 In the third year of the degree a student shall cornpletenot less than 36unlls from one of the third year level programmes spec..1hed belo\v
(a) Applied Mathematics
21 thud year level mathematKS unlls as speuhcd (eac..h topu ... worth 3 units) 63311 Complex Analysis A or 63321 Complex Analysts B
63342 Parttal D1fferent1al [quat1ons I 63343 Partial D1fferenual Equations II 67303 Calculus of Vanat1ons
67351 Conunuum Mechan1c..s 67353 Analyuc..al Mec..han1c..s
67399 Apphed Mathe1nauc..s Reading Topic
and a further 15 unrts drawn from the sec..ond thud or fourth year level toptc..s offered in the SLhool of Mathemat1Lal Suenc..es and the sc<-ond and thtrd year topKs offered 111 the Sd1ools of BiologKal Suen<-es Earth Suen<-es Human1t1es Phys1<-al Suen<-e<; or Soual S<-tenc..es Ea<-h one term topt<-at fourth year level in the S<-hool of MathematKal S<-ten<-es is given the vdlue 4 units
(b) General Mathematics
18 thud year level m.ithemaucs untts tndud1ng the follow1ng (eac..h topK \VOrth 3 units) 63311 Complex Analysts A or 63321 Complex Analysis B
60399 General Mathematics Reading TopI<- 61211 Foundations of Anthmellc
61212 Foundauons of Geometry
and a further 18 units drawn from these<-ond third or fourth year level topics offered 1n the School of Mathemat1Lal Sciences and the se<-ond and thud year topI<-S offered 1n the Schools of B1ologKal Suen<-es Earth Suences Humanlttes Physical S<-1en<-es or So<-1al Sc1en<-es EaLh one term toprcatfourth year level In the School of M1.themalKal S<-ien<-es ts given the value 4 units
(<-) Numerical Analysis
18 thud year level mathematics unlls as specified (each topt<- worth 3 units) 63311 Compex Analysis A or 63321 Complex Analysis B
63342 Parual Differenual Equations I 67312 Numencal Methods of Linear Algebra 67313 Approxunauon of Func..uons
67316 Numerical Solutions of Differential [quauons 67389 Computauonal Pro1ect
and a further 18 unus drawn from these<-ond thud or fourth year level topl<-S offered In the
Smdu 1~ who h'lve tdkt'l1fi!116 Algehr'IA aud 63116 D1ffercmnl and mtegril akulus \I 1"ill 1101bepuml\ted tormol 111 these top1ts They will s1 b~tllutt other topi s dS .ipproved by the lO onhn1tor o[ unde~ndu He tnlh nr:; m mathtm 111u
STATUTE JO I Contd
Sthool of Mathematical Sciences and the second and thnd year topics offered in the Schools of B1olog1tal Sciences Earth Saences Human1t1es Physical Sciences or Sot1al Sciences Each one term topic at fourth year level 1n the Schoo I of Mathemat1calSc1enLes 1s given the value 4 unus
(d) Probability and Statistics
24 third year level mathemaucs units as speL1f1ed (each topic worth 3 unas) 63311 Complex Analysis A or 63321 Complex Analysis B
65311 Stausucal Inference I 65312 Stattsucal Inference II 65313 StaUsUcal Inference III 65342 Markov Processes I 65351 Random Vanables
65399 Probab1hty and Stausucs Reading Topit
and a further 12 units drawn from the second thud or fourth year level top1u; offered in the Sthool of Mathematical Sciences and the second and thud year topics offered tn the Sthools of Btolog1cal Sciences Earth Sciences Humanities Physical Sciences or Soc1al Sciences Each one term topic at fourth year level in theSchoolof Mathematical Sciences ts given the value 4 unas
(e) Pure Mathematics
30 third year level mathematics units as specified (each toptL worth 3 untts) 61311 Algebra I
61312 Algebra II 61313 Algebra III
61243 Classical D1fferent1al Geometry 63311 Complex Analysts A
63312 Founer Analysts 63313 Integration Theory 63351 Topology
63352 Functional Analysts I
63399 Pure Mathemaucs Reading Topic
and a further 6 units drawn from the second thud or fourth year level topics offered 1n the School of Mathematical Sciences and the second and third year top1ts offered in the Sthools of Biolog1tal Sciences Earth Sciences Human1ues Phys1Lal Sciences or Sot.1al St1entes Each one term topic al fourth year level 1n the Siliool of Mathematical Sciences ts given the value 4 units
6 A student who has qualified for the ordinary degree of Bachelor o{ Science or a quahf1cauon deemed by the Board to be equivalent may be permitted by the Board to enrol for the Honours degree of Bachelor of Science
7 (a) The Honours degree may be taken in any one of the following spec1ahzattons (1) apphed mathematics
(n) numencal analysts and computing science (111) probab1hty and staust1cs and
(1v) pure mathematics
Entry tnto an Honours programme 1n a given spec1ahzauon will be restncted to those students who have quahfted for the ordinary degree tn the same speL1ah1auons or 1re deemed by the Board to have equivalent quahhcauons
(b) In each of the programmes of study for the Honoursdegreespeuhed 1n paragraph (a) a student \VIII complete ten topics
(c) Each programme consists of a certain number of compulsory topics and a certain number of opttonaI topics
(d) The optional topics may be selected from among the Honours or graduate level topics tn any field offered tn the School of Mathemaucal Sciences in the current year or in the Fat.ulty of Mathematical Sciences at the Untverstty of Adelaide Topics may also beLhosen from those at a sufficiently high level which are available in other ~chools of Flinders University and which represent a sequel to thud year level already completed by the student
(e) A student may be permuted to subsutute a pro1ect for thesemmaror foroneormoreo[
the opuonal topics
(f) The compulsory topics tn the indicated speciahzat1ons are as follows
54
STATUTE 10 I Contd
(1) Applied Mathematics
The compulsory 1op1cs are those taught at the Honours or graduate level tn apphed mathematics 111 the School of Mathematical Sciences 1n the t.urrent year
In addiuon a seminar pro1ect or reading topic counted as one 1op1<. must be taken (n) Numerical Analysis and Computing Science
The t.ompulsory top1<.s are those taught at the l-Ionours or graduate level 1n numen<.al analysis and computer sc1en<.e in the School of Mathemau<.al Suences 111 the <.urrent year In addition a seminar pro1ect or reading 1op1<. counted .is one topic must be taken (u1) Probability and Statistics
The student roust take as compulsory topics
(a) 65466 Honours Seminar 1n Probab1hty and Stausucs and
(b) stx topics 1n probab1hty or stat1st1<.s al the Honours level given at either Fhnders Un1vers1ty or the Un1vers1ty of Adelaide
(1v Pure Mathematics The c.ompulsory topics are
(a) 61406 Honours Seminar tn Pure Mathemaucs (counts as two topics) and (b) An Honours topic 10 algebra
An Honours topic 10 geometry or topology 63411 Topics in Complex Analysis 63453 Funcllonal Analysts II
SCHEDULE 6 THE ORDINARY AND HONOURS DEGREE OF