Course Title : Mathematical Analysis I  

Code  Course Type 
Regular Semester 
Lecture (hours/week) 
Seminar (hours/week) 
Lab (hours/week) 
Credits  ECTS  
CMP 1131  A  1  3  1  0  3.50  5  
Lecturer and Office Hours  Sofokli Garo, PhD  
Teaching Assistant and Office Hours  
Language  
Course Level  
Description  This course provides a review of the high school mathematical concepts. In addition, it is dedicated to the basic concepts of mathematical analysis, such as : function, limit and its computations, unidentified forms of limit, continuity on a point and interval, derivative and its techniques.  
Objectives  8. Albanian outcomes Studentet duhet te dine konceptet ner secilin kapitull si dhe ushtrimet qe jepen ne fund te cesilit kapitull. Provimet midterm dhe final do te perfshijne ushtrime dhe problem nga bashkesite e ushtrimeve ne fund te kapitujve qe lidhen me integralin perdorimet e tij si dhe serire.  
Course Outline  
Week  Topics  
1  Functions. (Effect of algebraic operations on domain. Domain and range in applications). (P. 111).  
2  . New functions from the old ones. (Function compositions. The expression of a function as a composition. Translations, reflections, stretches, compressions, symmetry, odd and even functions). (P. 1524).  
3  Family of functions. (Families of curbs, power functions, inverse proportions, polynomials, rational functions, algebraic functions, families of trig functions). (P. 2735)  
4  Inverse functions. (Change of the independent variable, existence of inverse functions, invertible functions and their graphs, the inverse trig functions and the corresponding identities. (P. 3848)  
5  Exponential and trigonometric functions (Irrational exponents, family of exp functions, natural exponents, log functions, solution of equations involving exponentials and logarithms, log scale in in science and engineering, exponential and logarithmic growth). (P. 5261).  
6  Limits (intuitive approach). (Tangent lines and limits. Areas and limits. Decimals and limits. Onesided limits. Relationship between onesided and two sided limits. Infinite limits. Vertical asymptotes. (P. 6776).  
7  Computing limits. (Some basic limits, limits of polynomials and rational functions. Limits involving radicals. Limits of piecewise functions). (P. 8087).  
8  . MIDTERM TEST.Limits at infinity. (Horizontal asymptotes, Laws of limits, infinite limits, limits of polynomials, limits of rational functions. Limits involving radicals, end behavior of trig, exp, and log functions). (P. 8896).  
9  Limits (Rigorous approach). (Motivation for definition of two sided limits. Delta value. Infinite limits. (P. 100108).  
10  Continuity. (Continuity in applications, continuity on an interval, some properties of continues functions, continuity of polynomials and rational functions; continuity of composed functions; theorem of intermediate value; approximation of roots)(P. 110117).  
11  . Continuity of trig functions, exp functions and inverse functions. (Obtaining limits by squeezing). (P. 121125)  
12  Derivative. (Tangent lines and rate of change; slopes and rate of change; applications). (P. 131140).  
13  Derivative functions. (Computing instant velocity; differentiation; relationship between differentiation and continuity; derivative at segment endpoints)(P. 143151).  
14  Introduction to differentiation techniques. (Derivative of a constant, power; derivative of sums and differences; higher derivatives. (P. 155160).  
15  The product and quotient rules. (Derivatives of trig functions; chain rule; summary of differentiation rules). (P. 163171)  
16  Final Exam  
Prerequisites  
Textbook 


Other References 


Laboratory Work  
Computer Usage  
Other  
Learning Outcomes and Competences  
1  Studentët do të jenë në gjendje të zbatojne konceptet kryesore te lendes ne zgjidhjen e ushtrimeve dhe problemeve.  
Course Evaluation Methods  
Interm studies  Quantity  Percentage  
Midterms  1  30  
Quizzes  0  0  
Projects  0  0  
Term Projects  0  0  
Laboratory  0  0  
Attendance  1  20  
Contribution of interm studies to overall grade  50  
Contribution of final examination to overall grade  50  
Total  100  
ECTS (Allocated Based on Student) Workload  
Activities  Quantity  Duration (hours) 
Total Workload (hours) 

Course Duration (Including the exam week : 16 x Total course hours)  16  4  64  
Hours for offtheclassroom study (Prestudy, practice)  14  4  56  
Assignments  0  0  0  
Midterms  1  0  0  
Final examination  1  10  10  
Other  0  0  0  
Total Work Load  130  
Total Work Load / 25 (hours)  5.2  
ECTS  5 
Get Syllabus PDF (Albanian) Get Syllabus PDF (English)