首页
网站开发
桌面应用
管理软件
微信开发
App开发
嵌入式软件
工具软件
数据采集与分析
其他
首页
>
> 详细
MA2552代做、代写Matlab编程语言
项目预算:
开发周期:
发布时间:
要求地区:
MA2552 Introduction to Computing (DLI) 2023/24
Computational Project
Aims and Intended Learning Outcomes
The aims of the Project are to describe methods for solving given computational problems, develop and test Matlab code implementing the methods, and demonstrate application
of the code to solving a specific computational problem. In this Project, you be will be required to demonstrate
• ability to investigate a topic through guided independent research, using resources
available on the internet and/or in the library;
• understanding of the researched material;
• implementation of the described methods in Matlab;
• use of the implemented methods on test examples;
• ability to present the studied topic and your computations in a written Project Report.
Plagiarism and Declaration
• This report should be your independent work. You should not seek help from other
students or provide such help to other students. All sources you used in preparing your
report should be listed in the References section at the end of your report and referred
to as necessary throughout the report.
• Your Project Report must contain the following Declaration (after the title page):
DECLARATION
All sentences or passages quoted in this Project Report from other people’s work have
been specifically acknowledged by clear and specific cross referencing to author, work and
page(s), or website link. I understand that failure to do so amounts to plagiarism and
will be considered grounds for failure in this module and the degree as a whole.
Name:
Signed: (name, if submitted electronically)
Date:
Project Report
The report should be about 6-8 pages long, written in Word or Latex. Equations should
be properly formatted and cross-referenced, if necessary. All the code should be included in
the report. Copy and paste from MATLAB Editor or Command Window and choose ‘Courier
New’ or another fixed-width font. The Report should be submitted via Blackboard in a single
file (Word document or Adobe PDF) and contain answers to the following questions:
1
MA2552 Introduction to Computing (DLI) 2023/24
Part 0: Context
Let f(x) be a periodic function. The goal of this project is to implement a numerical method
for solving the following family of ordinary differential equations (O.D.E):
an
d
nu(x)
dxn
+ an−1
d
n−1u(x)
dxn−1
+ . . . + a0u(x) = f(x), (1)
where ak, k = 0, · · · , n, are real-valued constants. The differential equation is complemented
with periodic boundary conditions:
d
ku(−π)
dxk
=
d
ku(π)
dxk
for k = 0, · · · , n − 1.
We aim to solve this problem using a trigonometric function expansion.
Part 1: Basis of trigonometric functions
Let u(x) be a periodic function with period 2π. There exist coefficients α0, α1, α2, . . ., and
β1, β2, . . . such that
u(x) = X∞
k=0
αk cos(kx) +X∞
1
βk sin(kx).
The coefficients αk and βk can be found using the following orthogonality properties:
Z π
−π
cos(kx) sin(nx) dx = 0, for any k, n
Z π
−π
cos(kx) cos(nx) dx =
0 if k ̸= n
π if k = n ̸= 0
2π if k = n = 0.
Z π
−π
sin(kx) sin(nx) dx =
(
0 if k ̸= n
π if k = n ̸= 0.
1. Implement a function that takes as an input two function handles f and g, and an
array x, and outputs the integral
1
π
Z π
−π
f(x)g(x) dx,
using your own implementation of the Simpson’s rule scheme. Corroborate numerically
the orthogonality properties above for different values of k and n.
2. Show that
αk =
(
1
π
R π
−π
u(x) cos(kx) dx if k ̸= 0
1
2π
R π
−π
u(x) dx if k = 0
βk =
1
π
Z π
−π
u(x) sin(kx) dx.
2
MA2552 Introduction to Computing (DLI) 2023/24
3. Using question 1 and 2, write a function that given a function handle u and an integer
m, outputs the array [α0, α1 . . . , αm, β1, . . . , βm].
4. Write a function that given an array [α0, α1 . . . , αm, β1, . . . , βm], outputs (in the form
of an array) the truncated series
um(x) := Xm
k=0
αk cos(kx) +Xm
k=1
βk sin(kx), (2)
where x is a linspace array on the interval [−π, π].
5. Using the function from question 3, compute the truncated series um(x) of the following
functions:
• u(x) = sin3
(x)
• u(x) = |x|
• u(x) = (
x + π, for x ∈ [−π, 0]
x − π, for x ∈ (0, π]
,
and using question 4, plot u(x) and um(x) for different values of m.
6. Carry out a study of the error between u(x) and um(x) for ∥u(x)−um(x)∥p with p = 2
and then with p = ∞. What do you observe?
Part 2: Solving the O.D.E
Any given periodic function u(x) can be well approximated by its truncate series expansion (2) if m is large enough. Thus, to solve the ordinary differential equation (1)
one can approximate u(x) by um(x):
u(x) ≈
Xm
k=0
αk cos(kx) +Xm
k=1
βk sin(kx),
Since um(x) is completely determined by its coefficients [α0, α1 . . . , αm, β1, . . . , βm],
to solve (1) numerically, one could build a system of equations for determining these
coefficients.
7. Explain why under the above approximation, the boundary conditions of (1) are automatically satisfied.
8. We have that
dum(x)
dx =
Xm
k=0
γk cos(kx) +Xm
k=1
ηk sin(kx)
Write a function that takes as input the integer m, and outputs a square matrix D that
maps the coefficients [α0, . . . , αm, β1, . . . , βm] to the coefficients [γ0, . . . , γm, η1, . . . , ηm].
3
MA2552 Introduction to Computing (DLI) 2023/24
9. Write a function that given a function handler f, an integer m, and the constants
ak, solves the O.D.E. (1). Note that some systems might have an infinite number of
solutions. In that case your function should be able identify such cases.
10. u(x) = cos(sin(x)) is the exact solution for f(x) = sin(x) sin(sin(x))−cos(sin(x)) (cos2
(x) + 1),
with a2 = 1, a0 = −1 and ak = 0 otherwise. Plot the p = 2 error between your numerical solution and u(x) for m = 1, 2, . . .. Use a log-scale for the y-axis. At what rate
does your numerical solution converge to the exact solution?
11. Show your numerical solution for different f(x) and different ak of your choice.
4
软件开发、广告设计客服
QQ:99515681
邮箱:99515681@qq.com
工作时间:8:00-23:00
微信:codinghelp
热点项目
更多
代写dts207tc、sql编程语言代做
2024-12-25
cs209a代做、java程序设计代写
2024-12-25
cs305程序代做、代写python程序...
2024-12-25
代写csc1001、代做python设计程...
2024-12-24
代写practice test preparatio...
2024-12-24
代写bre2031 – environmental...
2024-12-24
代写ece5550: applied kalman ...
2024-12-24
代做conmgnt 7049 – measurem...
2024-12-24
代写ece3700j introduction to...
2024-12-24
代做adad9311 designing the e...
2024-12-24
代做comp5618 - applied cyber...
2024-12-24
代做ece5550: applied kalman ...
2024-12-24
代做cp1402 assignment - netw...
2024-12-24
热点标签
mktg2509
csci 2600
38170
lng302
csse3010
phas3226
77938
arch1162
engn4536/engn6536
acx5903
comp151101
phl245
cse12
comp9312
stat3016/6016
phas0038
comp2140
6qqmb312
xjco3011
rest0005
ematm0051
5qqmn219
lubs5062m
eee8155
cege0100
eap033
artd1109
mat246
etc3430
ecmm462
mis102
inft6800
ddes9903
comp6521
comp9517
comp3331/9331
comp4337
comp6008
comp9414
bu.231.790.81
man00150m
csb352h
math1041
eengm4100
isys1002
08
6057cem
mktg3504
mthm036
mtrx1701
mth3241
eeee3086
cmp-7038b
cmp-7000a
ints4010
econ2151
infs5710
fins5516
fin3309
fins5510
gsoe9340
math2007
math2036
soee5010
mark3088
infs3605
elec9714
comp2271
ma214
comp2211
infs3604
600426
sit254
acct3091
bbt405
msin0116
com107/com113
mark5826
sit120
comp9021
eco2101
eeen40700
cs253
ece3114
ecmm447
chns3000
math377
itd102
comp9444
comp(2041|9044)
econ0060
econ7230
mgt001371
ecs-323
cs6250
mgdi60012
mdia2012
comm221001
comm5000
ma1008
engl642
econ241
com333
math367
mis201
nbs-7041x
meek16104
econ2003
comm1190
mbas902
comp-1027
dpst1091
comp7315
eppd1033
m06
ee3025
msci231
bb113/bbs1063
fc709
comp3425
comp9417
econ42915
cb9101
math1102e
chme0017
fc307
mkt60104
5522usst
litr1-uc6201.200
ee1102
cosc2803
math39512
omp9727
int2067/int5051
bsb151
mgt253
fc021
babs2202
mis2002s
phya21
18-213
cege0012
mdia1002
math38032
mech5125
07
cisc102
mgx3110
cs240
11175
fin3020s
eco3420
ictten622
comp9727
cpt111
de114102d
mgm320h5s
bafi1019
math21112
efim20036
mn-3503
fins5568
110.807
bcpm000028
info6030
bma0092
bcpm0054
math20212
ce335
cs365
cenv6141
ftec5580
math2010
ec3450
comm1170
ecmt1010
csci-ua.0480-003
econ12-200
ib3960
ectb60h3f
cs247—assignment
tk3163
ics3u
ib3j80
comp20008
comp9334
eppd1063
acct2343
cct109
isys1055/3412
math350-real
math2014
eec180
stat141b
econ2101
msinm014/msing014/msing014b
fit2004
comp643
bu1002
cm2030
联系我们
- QQ: 9951568
© 2021
www.rj363.com
软件定制开发网!