Final Year Project Proposal Format

May 11, 2018 | Author: shahirahusnin | Category: Islamic Banking And Finance, Banks, Investing, Business, Philosophical Science


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RESEARCH PROPOSAL(Center, Cap, Times New Roman, Size 18, Bold) DIABETES MELLITUS TYPE I MODELLING BASED ON BLOOD GLUCOSE MEASUREMENT (Project Code) (Center, Cap, Times New Roman, Size 16, Bold) NAME (Center, Cap, Times New Roman, Size 14, Bold) Supervisor: (Center, Times New Roman, Size 14, Bold) Bachelor of Science (Hons.) (Mathematics) Faculty of Computer and Mathematical Sciences (Center, Times New Roman, Size 14, Bold) July 2017 .............................. DEFINITION OF TERMS AND ABBREVIATIONS ................................................... 1 7................................................................................................................................................ 1 3...................................... PROBLEM STATEMENT ....................................................................................................... SCOPE OF THE PROJECT .................... 4 APPENDIX A ....................................................... 2 8... 1 4.................... 5 ii ....... 2 9............... 1 2...... 4 10........................................ OBJECTIVES .............................................................. PROJECT SCHEDULLING/GANTT CHART ................................................................................... 1 5............................................Table of Contents 1.. METHODOLOGY .................................. 1 6............. LITERATURE REVIEW ........................................................................................................ SIGNIFICANCE AND BENEFIT OF THE PROJECT .................... REFERENCES ................................ INTRODUCTION .................... INTRODUCTION Please type using Times New Roman with the size of 12 pt and single spacing. 3. SIGNIFICANCE AND BENEFIT OF THE PROJECT The meaning and the importance of your project. Example: The following are the definition of terms and concepts used in this project: 1 . DEFINITION OF TERMS AND ABBREVIATIONS The definition of the terminologies pertaining to your research area. PROBLEM STATEMENT The problem of the subject area for the project is identified and stated here. Please narrow down the scope. The ‘Introduction’ section contains general information regarding the research. 4. 6. 5. What and how this project benefited others or your research area. Current research in the field can be mentioned here as well as identifying the gap and how your research fills the gap. SCOPE OF THE PROJECT It identifies the scope and boundary of the project. 2. All paragraphs start from the left (no indentation) and are separated by 1 space. OBJECTIVES It should identify significant measurable achievements that are to be made towards building the ultimate aim of your project.1. The 3 steps are: Step 1: Learning musyarakah model Maheran and Shahrir (2005) introduced a musyarakah model involving two parties and two different types of profit sharing rates. there are 7 steps that are used in order to evaluate the proposal report. METHODOLOGY Example: In this project. Conventional banking Refers to a system of banking which earns the major portion of its revenues and expenses on the basis of interest. Please quote a few from journals and books of different sources. Mudharabah An agreement between an owner of capital with no opportunity and an entrepreneur with skills but no capital. 7. Example: * (Roland. LITERATURE REVIEW The discussion of all the known methodology or approach that solve the same problem is written here.Islamic banking Refers to a system of banking activity that is consistent with Islamic law (Shariah) principles and guided by Islamic economies. 2001) * According to Roland (2001) 8. The models are Et  Et 1  rt kE0 (1) 2 . The net profit will be shared according to an agreed ratio while losses will be borne by the owner of capital only. This section also discusses all known similar and relevant on-going projects. Step 4: Analyzing the data Step 5: Graphing the data Step 6: Comparing… 3 . they have solved (1) and ( 2) that are t Et  E0 (1  k  ri ) i 1 t Qt  E0 (1  k ) ri i 1 Step 2: Solving the difference equation Step 3: Collecting data Data is obtained from Bank Islam Malaysia Berhad……………. Qt  Qt 1  rt (1  k ) E0 ( 2) Et : Customer investment at time t Qt : Bank investment at time t rt : The rate of investment at time t k : (1  k ) : Profit ratio for customer and bank E0 : Early investment of customer By using the mathematical induction. (2007). REFERENCES Please make sure that all references cited in the text are listed in this reference section. C. McGrawhill. * Name of organizations. Publisher’s name.) Tasks 1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 10. New Jersey. (1999).healthscience.9. * Author. (year). Retrieved from http://www. (2001) Predator and Prey model. Volume (section): page Holly.org Example: * Author. Name of information used. Cancer cells in babies. The referencing method use is APA Formatting and Style Guide. (Year). Website address (date retrieved). Name of paper in journal. 11(2):35-78. Cancer in Malaysia. WHO. State. (18th July 2007) 4 . Health Science Journal. Name of book. PROJECT SCHEDULLING/GANTT CHART The project schedule for MAT530 & MSP 660 Timeline (Months/Weeks etc.apastyle. (Year). Roland. J. The information can be served from this web-site www. Journal name. Information that is not essential but supports findings. validates conclusion. we can guess that . explain conclusions can be placed in an appendix. APPENDIX A Example Conventional model Solving E E  r kE 0 (1) t t 1 t where Q0  0 From (1) E  E0  r1kE0 1  E0 (1  r1k ) E  E  r kE 2 1 2 0  E0 (1  r1k )  r2 kE0  E (1  r k  r k ) 0 1 2 E3  E2  r3 kE 0  E0 (1  r1k  r2 k )  r3 kE0  E0 (1  r1k  r2 k  r3 k ) 3 = E0 (1   ri k ) i 1 3 = E0 (1  k  ri ) i 1 Here. n E n  E0 (1  k  ri ) i 1 (1a) By using the principle of mathematical induction. then a 1 Ea 1  E0 (1  k  ri ) (1b) i 1 From (1) Ea  Ea1  ra kE0 Substitute (1b) . E1  E0 (1  kr1 ) ... (1a) is true that is E n  E0 (1  k  ri ) for all n elements of natural numbers. E1 is true If E a  1 is true.  kra1  kra ) a  E0 (1  k  ri ) i 1 n Therefore.. i 1 6 ..  kra1 )  ra kE0 = E0 (1  kr1  kr2  . we get  E0 (1  kr1  kr2  .
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