Math3 Derivative and Integral (3cr)

Materials

The course materials are available in the course's Moodle workspace.

Evaluation scale

0-5

International connections

-

Completion alternatives

You can find information about alternative implementations at opintohaku.jamk.fi. You can also ask the course instructor about alternative ways to complete the course.

Further information

The course’s summative assessment is based on a two-part final exam and learning activities in the Moodle workspace.

Employer connections

-

Student workload

The estimated workload of the course is 3 ECTS * 27 h/ECTS = 81 hours. Of this, approximately 27 hours are contact teaching and 54 hours are independent study.

Assessment criteria, satisfactory (1)

Sufficient 1
You know the concept of the derivative as the rate of change and as the slope of the tangent. Yo understand how to apply the derivative in optimization problems. You can differentiate and integrate polynomials without technology. You know the concept of the integral as accumulation of quantities and as area under a curve. You know the relation between integral and derivative.

Satisfactory 2
You have achieved the desired goals (look at the criteria of grade 1). You know many of the concepts and methods and how to apply them in familiar situations but your reasoning is sometimes deficient or you make mistakes in calculations.

Assessment criteria, good (3)

Good 3
You have achieved the desired goals(look at the criteria of grade 1). You know most of the concepts and methods and how to apply them in familiar situations showing often the ability to reason completely and calculate flawlessly

Very good 4
You have achieved the desired goals (look at the criteria of grade 1). You know most of the concepts and methods and how to apply them in new situations showing in most cases the ability to reason completely and calculate flawlessly.

Assessment criteria, excellent (5)

You have achieved the desired goals (look at the criteria of grade 1). You know all the concepts and methods and how to apply them in new situations showing always the ability to combine things, reason completely and calculate flawlessly.

Content scheduling

The course content is covered weekly in the following order:

- The concept of the derivative
- Differentiation of power and polynomial functions
- Symbolic differentiation
- Applications of the derivative 1
- Applications of the derivative 2
- The concept of the integral
- Symbolic integration
- Applications of the integral 1
- Applications of the integral 2

Changes to the schedule are possible.

Exam schedules

The exam sessions will be held during the weeks starting on 3 November, 24 November, and 8 December. The exact dates will be announced at the beginning of the course implementation.

Teaching language

en

Teaching methods

Contact teaching. Attendance is mandatory in the course lessons.

Location and time

The course is implemented from 25 August 2025 to 9 November 2025.

Number of ECTS credits allocated

3

Qualifications

You know the concept of a limit value. You can work with polynomial, exponential, logarithmic and trigonometric functions.

Content

In this course, you will learn to master the tools needed to study phenomena of change, such as the concepts of derivatives and integrals. You will understand the meaning of these concepts and be able to apply them in practice. You will learn to derive and integrate and solve applied problems using these methods. This course will give you a strong foundation in applying mathematical methods to engineering problems.

The derivative and its different interpretations. Rules of differentiation. Using differentiation in optimization problems and other applications involving the derivative such as estimation of error. The definite integral. Rules of integration. The applications of the integral. Using technology in calculations.

Objective

The object of the course
During this course you will learn the concepts needed to study continuous change and dynamic phenomena. With differential calculus you can study instantaneous rates of change and the slopes of curves. With integral calculus you can study accumulation of quantities and areas bounded by curves. During this course you learn how to use these concepts in applications.

Course competences

EUR-ACE: Knowledge and understanding 
You have the knowledge and understanding of mathematics and other basic sciences underlying your engineering specialisation, at a level necessary to achieve the other programme learning outcomes.

The learning objectives of the course
After completing this course you know the meaning of derivative and integral as tools for modeling dynamic phenomena. You know how to differentiate and integrate. You know how to use the derivative and integral in applications.