# GAZI UNIVERSITY INFORMATION PACKAGE - 2019 ACADEMIC YEAR

COURSE DESCRIPTION
CALCULUS I/MAT101
 Course Title: CALCULUS I Credits 4 ECTS 6 Course Semester 1 Type of The Course Compulsory
COURSE INFORMATION
-- (CATALOG CONTENT)
-- (TEXTBOOK)
-- (SUPPLEMENTARY TEXTBOOK)
-- (PREREQUISITES AND CO-REQUISITES)
-- LANGUAGE OF INSTRUCTION
Turkish
-- COURSE OBJECTIVES
-- COURSE LEARNING OUTCOMES
Students can know definiton of functions and some special functions.
Students can calculate limit of function and some special trigonometric limits.
Students can take the derivative of function.
Students can solve problems of absolute and local extremums, maxima and minima.
Students can take defined and indefinite integrals of the some special functions.

-- MODE OF DELIVERY
The type of this course is face to face.
 --WEEKLY SCHEDULE 1. Week Introduction: Sets, Real numbers, intervals, inequalities, neighbourhoods, coordinates 2. Week Functions: Definition function, definition and image of sets, injections, surjections and inverse functions, combinations of functions. 3. Week Special Functions: Definitions of rational, irrational, trigonometric, inverse trigonometric, exponenetial, logarithmic and hyperbolic functions. 4. Week Limit of Function: Definition of limit, right and left-hand limit, fundamental theorems about limits, some special and trigonometric limits. 5. Week Continuity of Functions: Definition of continuity, fundamental properties of continuous funcitons, discontinuties and its types 6. Week Concept of derivative: Definition and presence, rules of derivative, derivative of composite, inverse,and trigonometric functions. 7. Week Differentiation of exponenetial, logarithmic, hyperbolic and inverse hyperbolic functions, closed and parametric functions, higher order derivatives. 8. Week Midterm; Application of Differentiation: Geometrical interpretation of differentiaition, absolute and local extremums, maxima and minima problems. 9. Week Application of Differentiation: Geometrical interpretation of differentiaition, absolute and local extremums, maxima and minima problems. 10. Week Graphic Drawing: Graphs of rational, irrational, exponenetial, logarithmic, trigonometric, hyperbolic and parametric functions. 11. Week The Definition of Riemann Integrals and their properties 12. Week Indefinite Integral : Differentiation of a function, definition of indefinite integral, propereties, basic integration formulas. 13. Week Methods of Computing Integral : Integration by substitution, parts. 14. Week Integral of Partial fractions, trigonometric and hyperbolic functions, integration by some special substitution. 15. Week 16. Week
-- TEACHING and LEARNING METHODS
-- ASSESSMENT CRITERIA
 Quantity Total Weighting (%) Midterm Exams 1 40 Assignment 0 0 Application 0 0 Projects 0 0 Practice 0 0 Quiz 0 0 Percent of In-term Studies 40 Percentage of Final Exam to Total Score 60