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Integral Calculus

Structure Type: Study unit
Code: IITB3005
Type: Compulsory / Basic Studies
Curriculum: IT 2017
Level: Bachelor of Engineering
Year of Study: 2 (2018-2019)
Credits: 2 cr
Responsible Teacher: Mäkelä, Jarmo
Language of Instruction: English

Courses During the Academic Year 2018-2019

Impl.Group(s)Study TimeTeacher(s)LanguageClassesEnrolment
2I-IT-2N2019-01-07 – 2019-04-10Jarmo MäkeläEnglish22 h2018-12-10 – 2019-01-14

Learning Outcomes

The integral of a function gives an answer to the question: Which is the function, whose derivative the given function is? For example, (one of) the integral function(s) of 2x is x^2, since the derivative of x^2 is 2x. The integral can be used, for example, in evaluating surface areas and volumes, and it is useful in studying the average behaviour of a function in a given time interval. In this course, the student learns to evaluate integral functions of some given functions, and she will learn how to apply integral calculus for, e.g., determining areas and volumes.

Student's Workload

54 h, which contains 28 h of scheduled contact studies.
The assessment of student’s own learning 1 h is included in contact lessons.

Contents

A short revision of differential calculus. The integral function. Integral function of the power function, the exponent function and the trigonometric functions. Integral of the sum. Definite integral and its interpretation as the surface area. The area enclosed by two plane curves. Integration by parts. Integration by substitution (changing the variable). Integrating a rational function by partial fractions. The average value and the root-mean-square value of a function. The length of a plane curve. The surface area and the volume of a solid of revolution. The center of mass of a homogenous planar object. Numerical integration by polynomial fitting and by Simpson’s rule.

Recommended or Required Reading and Other Learning Resources/Tools

Material prepared by the teacher.

Mode of Delivery / Planned Learning Activities and Teaching Methods

Lectures, exercises.

Assessment Criteria

Grade 5: The student is able to solve problems creatively in almost all the contents of the course.
Grade 3: The student can solve applied problems related with the central contents of the course.
Grade 1: The student can solve basic problems on the central contents of the course.

Assessment Methods

Homework exercises, assignments, an examination.


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