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Differential calculationLaajuus (3 cr)

Code: AT00CN99

Credits

3 op

Teaching language

  • Finnish
  • English

Responsible person

  • Päivi Porras
Enrollment

20.11.2024 - 30.12.2025

Timing

01.01.2025 - 31.12.2025

Number of ECTS credits allocated

3 op

Virtual portion

3 op

Mode of delivery

Distance learning

Unit

Faculty of Technology (LAB)

Campus

E-campus

Teaching languages
  • Finnish
  • English
Degree programmes
  • Complementary competence, Bachelor's (in Finnish)
Teachers
  • Päivi Porras
Groups
  • TLABTO24H
  • TLABTO25-26

Assessment scale

1-5

Enrollment

20.11.2023 - 30.11.2024

Timing

08.01.2024 - 31.12.2024

Number of ECTS credits allocated

3 op

Virtual portion

3 op

Mode of delivery

Distance learning

Unit

Faculty of Technology (LAB)

Campus

E-campus

Teaching languages
  • Finnish
  • English
Degree programmes
  • Complementary competence, Bachelor's (in Finnish)
Teachers
  • Päivi Porras
Groups
  • TLABTO23H

Implementation and methods of teaching

All lecturing material and exercises are open in moodle, so this course is meant to be studied at your own pace.

The course is completed with moodle exercises.

Lecturing material and exercises are available in English and in Finnish.

This course is highly recommended, if you are planning mastering your diploma.

LAB student: Send an email paivi.porras@lab.fi when you have registered for the course. Otherwise, it may take time to accept the enrollment. Registrations are not accepted during summer breaks.

Learning material and recommended literature

All material is in Moodle.

Contents

Derivation of exponential and logarithmic functions
Derivation of trigonometric and arcus functions
Applying derivation in engineering
Basics of integrals
Integrals of trigonometric, arc functions, exponential functions and logarithmic functions
Applying integrals in engineering
First and second order differential equations

Additional information for students: previous knowledge etc.

The basic knowledge required for attending this course is Technical mathematics 2 or corresponding knowledge in derivation of polynomial functions.

Assessment criteria

Grade is determined as a sum of exercise packages. More detailed information is given in moodle.

Assessment scale

1-5

Failed (0)

A student cannot solve mechanical exercises well enough. Less than 33% of maximum scores.

Assessment criteria: level 1 (assessment scale 1–5)

A student knows methods for differential calculation and can solve simple mechanical exercises.

Assessment criteria: level 3 (assessment scale 1–5)

A student understands requirements of differential calculation and is able to apply them in some extent in engineering problems. At least 59% of maximum scores.

Assessment criteria: level 5 (assessment scale 1–5)

A student masters differential calculation and is able to analyze engineering problems. At least 85 % of maximum scores.

Enrollment

21.11.2022 - 30.11.2023

Timing

01.01.2023 - 31.12.2023

Number of ECTS credits allocated

3 op

Virtual portion

3 op

Mode of delivery

Distance learning

Unit

Faculty of Technology (LAB)

Campus

E-campus

Teaching languages
  • Finnish
  • English
Degree programmes
  • Complementary competence, Bachelor's (in Finnish)
Teachers
  • Päivi Porras
Groups
  • TLABTO22H
  • TLABTO23H

Implementation and methods of teaching

All lecturing material and exercises are open in moodle, so this course is meant to be studied at your own pace.

The course is completed with moodle exercises.

Lecturing material and exercises are available in English and in Finnish.

This course is highly recommended, if you are planning mastering your diploma.

LAB student: Send an email paivi.porras@lab.fi when you have registered for the course. Otherwise, it may take time to accept the enrollment. Registrations are not accepted during summer breaks.

Learning material and recommended literature

All material is in Moodle.

Contents

Derivation of exponential and logarithmic functions
Derivation of trigonometric and arcus functions
Applying derivation in engineering
Basics of integrals
Integrals of trigonometric, arc functions, exponential functions and logarithmic functions
Applying integrals in engineering
First and second order differential equations

Additional information for students: previous knowledge etc.

The basic knowledge required for attending this course is Technical mathematics 2 or corresponding knowledge in derivation of polynomial functions.

Assessment criteria

Grade is determined as a sum of exercise packages. More detailed information is given in moodle.

Assessment scale

1-5

Failed (0)

A student cannot solve mechanical exercises well enough. Less than 33% of maximum scores.

Assessment criteria: level 1 (assessment scale 1–5)

A student knows methods for differential calculation and can solve simple mechanical exercises.

Assessment criteria: level 3 (assessment scale 1–5)

A student understands requirements of differential calculation and is able to apply them in some extent in engineering problems. At least 59% of maximum scores.

Assessment criteria: level 5 (assessment scale 1–5)

A student masters differential calculation and is able to analyze engineering problems. At least 85 % of maximum scores.

Enrollment

15.08.2022 - 04.09.2022

Timing

05.09.2022 - 16.12.2022

Number of ECTS credits allocated

3 op

Virtual portion

3 op

Mode of delivery

Distance learning

Unit

Faculty of Technology (LAB)

Campus

E-campus

Teaching languages
  • Finnish
  • English
Degree programmes
  • Complementary competence, Bachelor's (in Finnish)
Teachers
  • Päivi Porras
Scheduling groups
  • Diffis (Size: 0. Open UAS: 0.)
Groups
  • TLABTO22H
Small groups
  • DiffMath

Implementation and methods of teaching

All lecturing material and exercises are open in moodle, so this course is meant to be studied at your own pace. There is one lecture at the beginning of the course, when main aspects are mentioned. There is a so called reception time once a month, but no actual lecturing.

The course is completed with moodle exercises and with an exam at the end of the course.

Lecturing material and exercises are in English, but the teacher may also speak in Finnish occasionally.

This course is highly recommended, if you are planning mastering your diploma.

Learning material and recommended literature

All material is in moodle.

Contents

Derivation of exponential and logarithmic functions
Derivation of trigonometric and arcus functions
Applying derivation in engineering
Basics of integrals
Integrals of trigonometric, arc functions, exponential functions and logarithmic functions
Applying integrals in engineering
First and second order differential equations

Additional information for students: previous knowledge etc.

The basic knowledge required for attending this course is Technical mathematics 2 or corresponding knowledge in derivation of polynomial functions.

Assessment criteria

Grade is determined as a sum of exercise packages (max. 24 points) and scores of the test (max. 24 points). More detailed information is given in moodle.

Assessment scale

1-5

Failed (0)

A student cannot solve mechanical exercises well enough. Less than 33% of maximum scores.

Assessment criteria: level 1 (assessment scale 1–5)

A student knows methods for geometry in plain and for vectors in plain and can solve simple mechanical exercises.

Assessment criteria: level 3 (assessment scale 1–5)

A student understands requirements of geometry and vectors in plain and is able to apply them in some extent in engineering problems. At least 57% of maximum scores.

Assessment criteria: level 5 (assessment scale 1–5)

A student masters geometry and vectors in plain and is able to analyze engineering problems. At least 83 % of maximum scores.