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Derivatives and IntegralsLaajuus (3 cr)

Code: TKV22MA04

Credits

3 op

Objective

The student understands how, where and when to use the two basic concepts in mathematical analysis: derivation and integration.
The student can apply derivation and integration to various problems within their own field of study.
The student can use mathematical software to analyze measured data ​​or other collected data sets.

Content

- Limit calculations
- Definition of derivatives
- Tangent and linearisation
- Derivation rules
- Extreme value problems
- Second derivative and convexity
- Applications of derivatives in different fields
- Numerical derivation
- Primitive function (antiderivative)
- Definition of integrals
- Integration rules
- Area calculations, volume integrals
- Integral applications from own specialist area
- Numerical integration
- Mathematical software (Mathcad, Matlab, GeoGebra or equivalent) as a tool for solving problems

Qualifications

Functions and equations 1,
Geometry and vectors,
Functions and equations 2.

Assessment criteria, satisfactory (1)

Derivatives: Basic understanding of the concept of derivatives. Master simple derivation rules.
Integrals: Basic understanding of the integral concept. Master simple integration rules.
Modeling and numerical methods: Have some understanding of how to make a mathematical model and how it can be solved numerically.

Assessment criteria, good (3)

Derivatives: Is able to solve common types of extreme value problems using derivatives
Integrals: Is able to calculate areas and volumes using integrals. Is able to solve mechanical problems using integrals.
Modeling and numerical methods: Understands how to make a mathematical model and how it can be solved numerically.

Assessment criteria, excellent (5)

Derivatives: Can apply theory to more complicated applications and calculations.
Integrals: Can apply the theory to more complicated applications and calculations (rotational surfaces, arc lengths, etc.).
Modeling and numerical methods: Can construct and numerically solve more complicated models with calculation software.

Open in new tab
Enrollment

01.12.2024 - 11.03.2025

Timing

09.03.2025 - 30.04.2025

Number of ECTS credits allocated

3 op

Mode of delivery

Contact teaching

Campus

Vasa, Wolffskavägen 33

Teaching languages
  • Svenska
Degree programmes
  • Degree Programme in Civil and Construction Engineering
  • Degree Programme in Mechanical and Production Engineering
  • Degree Programme in Electrical Engineering and Automation
  • Degree Programme in Industrial Management
  • Degree Programme in Land Surveying
Teachers
  • Anders Skjäl
  • Lina Åberg
  • Sofia Frilund
Teacher in charge

Ronnie Sundsten

Scheduling groups
  • ELA24-Y (Size: 40. Open UAS: 0.)
  • ELA24-S (Size: 40. Open UAS: 0.)
  • UIT24 (Size: 40. Open UAS: 0.)
Groups
  • ELA24D-V
    Ingenjör (YH), el- och automationsteknik, 2024, dagstudier
  • UIT24D-V
    Ingenjör (YH), informationsteknik, 2024
Small groups
  • ELA24-Y
  • ELA24-S
  • UIT24

Objective

The student understands how, where and when to use the two basic concepts in mathematical analysis: derivation and integration.
The student can apply derivation and integration to various problems within their own field of study.
The student can use mathematical software to analyze measured data ​​or other collected data sets.

Content

- Limit calculations
- Definition of derivatives
- Tangent and linearisation
- Derivation rules
- Extreme value problems
- Second derivative and convexity
- Applications of derivatives in different fields
- Numerical derivation
- Primitive function (antiderivative)
- Definition of integrals
- Integration rules
- Area calculations, volume integrals
- Integral applications from own specialist area
- Numerical integration
- Mathematical software (Mathcad, Matlab, GeoGebra or equivalent) as a tool for solving problems

Evaluation scale

H-5

Assessment criteria, satisfactory (1)

Derivatives: Basic understanding of the concept of derivatives. Master simple derivation rules.
Integrals: Basic understanding of the integral concept. Master simple integration rules.
Modeling and numerical methods: Have some understanding of how to make a mathematical model and how it can be solved numerically.

Assessment criteria, good (3)

Derivatives: Is able to solve common types of extreme value problems using derivatives
Integrals: Is able to calculate areas and volumes using integrals. Is able to solve mechanical problems using integrals.
Modeling and numerical methods: Understands how to make a mathematical model and how it can be solved numerically.

Assessment criteria, excellent (5)

Derivatives: Can apply theory to more complicated applications and calculations.
Integrals: Can apply the theory to more complicated applications and calculations (rotational surfaces, arc lengths, etc.).
Modeling and numerical methods: Can construct and numerically solve more complicated models with calculation software.

Qualifications

Functions and equations 1,
Geometry and vectors,
Functions and equations 2.

Open in new tab
Enrollment

01.12.2024 - 09.03.2025

Timing

03.03.2025 - 30.04.2025

Number of ECTS credits allocated

3 op

Mode of delivery

Contact teaching

Campus

Vasa, Wolffskavägen 33

Teaching languages
  • Svenska
Degree programmes
  • Degree Programme in Civil and Construction Engineering
  • Degree Programme in Mechanical and Production Engineering
  • Degree Programme in Electrical Engineering and Automation
  • Degree Programme in Industrial Management
  • Degree Programme in Land Surveying
Teachers
  • Ing-Britt Rögård
  • Sofia Frilund
Teacher in charge

Sem Timmerbacka

Scheduling groups
  • BYS24-S (Size: 30. Open UAS: 0.)
  • BYS24-Y (Size: 30. Open UAS: 0.)
  • BYL24 (Size: 30. Open UAS: 0.)
Groups
  • BYL24D-V
    Ingenjör (YH), lantmäteriteknik, 2024 dagstudier
  • BYS24D-V
    Ingenjör (YH), byggnads- och samhällsteknik, 2024 Vasa, dagstudier
Small groups
  • BYS24-S
  • BYS24-Y
  • BYL24

Objective

The student understands how, where and when to use the two basic concepts in mathematical analysis: derivation and integration.
The student can apply derivation and integration to various problems within their own field of study.
The student can use mathematical software to analyze measured data ​​or other collected data sets.

Content

- Limit calculations
- Definition of derivatives
- Tangent and linearisation
- Derivation rules
- Extreme value problems
- Second derivative and convexity
- Applications of derivatives in different fields
- Numerical derivation
- Primitive function (antiderivative)
- Definition of integrals
- Integration rules
- Area calculations, volume integrals
- Integral applications from own specialist area
- Numerical integration
- Mathematical software (Mathcad, Matlab, GeoGebra or equivalent) as a tool for solving problems

Evaluation scale

H-5

Assessment criteria, satisfactory (1)

Derivatives: Basic understanding of the concept of derivatives. Master simple derivation rules.
Integrals: Basic understanding of the integral concept. Master simple integration rules.
Modeling and numerical methods: Have some understanding of how to make a mathematical model and how it can be solved numerically.

Assessment criteria, good (3)

Derivatives: Is able to solve common types of extreme value problems using derivatives
Integrals: Is able to calculate areas and volumes using integrals. Is able to solve mechanical problems using integrals.
Modeling and numerical methods: Understands how to make a mathematical model and how it can be solved numerically.

Assessment criteria, excellent (5)

Derivatives: Can apply theory to more complicated applications and calculations.
Integrals: Can apply the theory to more complicated applications and calculations (rotational surfaces, arc lengths, etc.).
Modeling and numerical methods: Can construct and numerically solve more complicated models with calculation software.

Qualifications

Functions and equations 1,
Geometry and vectors,
Functions and equations 2.

Open in new tab
Enrollment

01.12.2024 - 09.03.2025

Timing

03.03.2025 - 04.05.2025

Number of ECTS credits allocated

3 op

Mode of delivery

Contact teaching

Campus

Vasa, Wolffskavägen 33

Teaching languages
  • Svenska
Degree programmes
  • Degree Programme in Civil and Construction Engineering
  • Degree Programme in Mechanical and Production Engineering
  • Degree Programme in Electrical Engineering and Automation
  • Degree Programme in Industrial Management
  • Degree Programme in Land Surveying
Teachers
  • Ing-Britt Rögård
  • Sofia Frilund
Teacher in charge

Kaj Rintanen

Scheduling groups
  • MAP24-Y (Size: 40. Open UAS: 0.)
  • MAP24-S (Size: 40. Open UAS: 0.)
Groups
  • MAP24D-V
    Ingenjör (YH), maskin- och produktionsteknik, 2024 dagstudier
Small groups
  • MAP24-Y
  • MAP24-S

Objective

The student understands how, where and when to use the two basic concepts in mathematical analysis: derivation and integration.
The student can apply derivation and integration to various problems within their own field of study.
The student can use mathematical software to analyze measured data ​​or other collected data sets.

Content

- Limit calculations
- Definition of derivatives
- Tangent and linearisation
- Derivation rules
- Extreme value problems
- Second derivative and convexity
- Applications of derivatives in different fields
- Numerical derivation
- Primitive function (antiderivative)
- Definition of integrals
- Integration rules
- Area calculations, volume integrals
- Integral applications from own specialist area
- Numerical integration
- Mathematical software (Mathcad, Matlab, GeoGebra or equivalent) as a tool for solving problems

Evaluation scale

H-5

Assessment criteria, satisfactory (1)

Derivatives: Basic understanding of the concept of derivatives. Master simple derivation rules.
Integrals: Basic understanding of the integral concept. Master simple integration rules.
Modeling and numerical methods: Have some understanding of how to make a mathematical model and how it can be solved numerically.

Assessment criteria, good (3)

Derivatives: Is able to solve common types of extreme value problems using derivatives
Integrals: Is able to calculate areas and volumes using integrals. Is able to solve mechanical problems using integrals.
Modeling and numerical methods: Understands how to make a mathematical model and how it can be solved numerically.

Assessment criteria, excellent (5)

Derivatives: Can apply theory to more complicated applications and calculations.
Integrals: Can apply the theory to more complicated applications and calculations (rotational surfaces, arc lengths, etc.).
Modeling and numerical methods: Can construct and numerically solve more complicated models with calculation software.

Qualifications

Functions and equations 1,
Geometry and vectors,
Functions and equations 2.

Open in new tab
Enrollment

01.12.2024 - 09.03.2025

Timing

03.03.2025 - 04.05.2025

Number of ECTS credits allocated

3 op

Mode of delivery

Contact teaching

Unit

Faculty of Technology and Seafaring

Campus

Vasa, Wolffskavägen 33

Teaching languages
  • Svenska
Degree programmes
  • Degree Programme in Civil and Construction Engineering
  • Degree Programme in Mechanical and Production Engineering
  • Degree Programme in Electrical Engineering and Automation
  • Degree Programme in Industrial Management
  • Degree Programme in Land Surveying
Teachers
  • Ing-Britt Rögård
  • Lina Åberg
Teacher in charge

Niklas Kallenberg

Scheduling groups
  • PRE24-S (Size: 40. Open UAS: 0.)
  • PRE24-Y (Size: 40. Open UAS: 0.)
Groups
  • PRE24D-V
    Ingenjör (YH), produktionsekonomi, 2024 dagstudier
Small groups
  • PRE24-S
  • PRE24-Y

Objective

The student understands how, where and when to use the two basic concepts in mathematical analysis: derivation and integration.
The student can apply derivation and integration to various problems within their own field of study.
The student can use mathematical software to analyze measured data ​​or other collected data sets.

Content

- Limit calculations
- Definition of derivatives
- Tangent and linearisation
- Derivation rules
- Extreme value problems
- Second derivative and convexity
- Applications of derivatives in different fields
- Numerical derivation
- Primitive function (antiderivative)
- Definition of integrals
- Integration rules
- Area calculations, volume integrals
- Integral applications from own specialist area
- Numerical integration
- Mathematical software (Mathcad, Matlab, GeoGebra or equivalent) as a tool for solving problems

Evaluation scale

H-5

Assessment criteria, satisfactory (1)

Derivatives: Basic understanding of the concept of derivatives. Master simple derivation rules.
Integrals: Basic understanding of the integral concept. Master simple integration rules.
Modeling and numerical methods: Have some understanding of how to make a mathematical model and how it can be solved numerically.

Assessment criteria, good (3)

Derivatives: Is able to solve common types of extreme value problems using derivatives
Integrals: Is able to calculate areas and volumes using integrals. Is able to solve mechanical problems using integrals.
Modeling and numerical methods: Understands how to make a mathematical model and how it can be solved numerically.

Assessment criteria, excellent (5)

Derivatives: Can apply theory to more complicated applications and calculations.
Integrals: Can apply the theory to more complicated applications and calculations (rotational surfaces, arc lengths, etc.).
Modeling and numerical methods: Can construct and numerically solve more complicated models with calculation software.

Qualifications

Functions and equations 1,
Geometry and vectors,
Functions and equations 2.

Open in new tab
Enrollment

15.06.2024 - 14.01.2025

Timing

07.01.2025 - 26.01.2025

Number of ECTS credits allocated

3 op

Mode of delivery

Contact teaching

Unit

Faculty of Technology and Seafaring

Teaching languages
  • Svenska
Degree programmes
  • Degree Programme in Civil and Construction Engineering
  • Degree Programme in Mechanical and Production Engineering
  • Degree Programme in Electrical Engineering and Automation
  • Degree Programme in Industrial Management
  • Degree Programme in Land Surveying
Teachers
  • Sofia Frilund
Teacher in charge

Matts Nickull

Groups
  • ÖH23FLEXING
    Öppna YH, Flexibelt till Ingenjör

Objective

The student understands how, where and when to use the two basic concepts in mathematical analysis: derivation and integration.
The student can apply derivation and integration to various problems within their own field of study.
The student can use mathematical software to analyze measured data ​​or other collected data sets.

Content

- Limit calculations
- Definition of derivatives
- Tangent and linearisation
- Derivation rules
- Extreme value problems
- Second derivative and convexity
- Applications of derivatives in different fields
- Numerical derivation
- Primitive function (antiderivative)
- Definition of integrals
- Integration rules
- Area calculations, volume integrals
- Integral applications from own specialist area
- Numerical integration
- Mathematical software (Mathcad, Matlab, GeoGebra or equivalent) as a tool for solving problems

Evaluation scale

H-5

Assessment criteria, satisfactory (1)

Derivatives: Basic understanding of the concept of derivatives. Master simple derivation rules.
Integrals: Basic understanding of the integral concept. Master simple integration rules.
Modeling and numerical methods: Have some understanding of how to make a mathematical model and how it can be solved numerically.

Assessment criteria, good (3)

Derivatives: Is able to solve common types of extreme value problems using derivatives
Integrals: Is able to calculate areas and volumes using integrals. Is able to solve mechanical problems using integrals.
Modeling and numerical methods: Understands how to make a mathematical model and how it can be solved numerically.

Assessment criteria, excellent (5)

Derivatives: Can apply theory to more complicated applications and calculations.
Integrals: Can apply the theory to more complicated applications and calculations (rotational surfaces, arc lengths, etc.).
Modeling and numerical methods: Can construct and numerically solve more complicated models with calculation software.

Qualifications

Functions and equations 1,
Geometry and vectors,
Functions and equations 2.

Open in new tab
Enrollment

01.12.2023 - 03.03.2024

Timing

04.03.2024 - 28.04.2024

Number of ECTS credits allocated

3 op

Mode of delivery

Contact teaching

Unit

Faculty of Technology and Seafaring

Campus

Vasa, Wolffskavägen 33

Teaching languages
  • Svenska
Degree programmes
  • Degree Programme in Civil and Construction Engineering
  • Degree Programme in Mechanical and Production Engineering
  • Degree Programme in Electrical Engineering and Automation
  • Degree Programme in Industrial Management
  • Degree Programme in Land Surveying
Teachers
  • Lina Åberg
  • Sofia Frilund
Teacher in charge

Ronnie Sundsten

Scheduling groups
  • ELA23-S (Size: 40. Open UAS: 0.)
  • ELA23-Y (Size: 40. Open UAS: 0.)
Groups
  • ELA23D-V
    Ingenjör (YH), el- och automationsteknik, 2023, dagstudier
Small groups
  • ELA23-S
  • ELA23-Y

Objective

The student understands how, where and when to use the two basic concepts in mathematical analysis: derivation and integration.
The student can apply derivation and integration to various problems within their own field of study.
The student can use mathematical software to analyze measured data ​​or other collected data sets.

Content

- Limit calculations
- Definition of derivatives
- Tangent and linearisation
- Derivation rules
- Extreme value problems
- Second derivative and convexity
- Applications of derivatives in different fields
- Numerical derivation
- Primitive function (antiderivative)
- Definition of integrals
- Integration rules
- Area calculations, volume integrals
- Integral applications from own specialist area
- Numerical integration
- Mathematical software (Mathcad, Matlab, GeoGebra or equivalent) as a tool for solving problems

Evaluation scale

H-5

Assessment criteria, satisfactory (1)

Derivatives: Basic understanding of the concept of derivatives. Master simple derivation rules.
Integrals: Basic understanding of the integral concept. Master simple integration rules.
Modeling and numerical methods: Have some understanding of how to make a mathematical model and how it can be solved numerically.

Assessment criteria, good (3)

Derivatives: Is able to solve common types of extreme value problems using derivatives
Integrals: Is able to calculate areas and volumes using integrals. Is able to solve mechanical problems using integrals.
Modeling and numerical methods: Understands how to make a mathematical model and how it can be solved numerically.

Assessment criteria, excellent (5)

Derivatives: Can apply theory to more complicated applications and calculations.
Integrals: Can apply the theory to more complicated applications and calculations (rotational surfaces, arc lengths, etc.).
Modeling and numerical methods: Can construct and numerically solve more complicated models with calculation software.

Qualifications

Functions and equations 1,
Geometry and vectors,
Functions and equations 2.

Open in new tab
Enrollment

01.12.2023 - 10.03.2024

Timing

04.03.2024 - 28.04.2024

Number of ECTS credits allocated

3 op

Mode of delivery

Contact teaching

Unit

Faculty of Technology and Seafaring

Campus

Vasa, Wolffskavägen 33

Teaching languages
  • Svenska
Degree programmes
  • Degree Programme in Civil and Construction Engineering
  • Degree Programme in Mechanical and Production Engineering
  • Degree Programme in Electrical Engineering and Automation
  • Degree Programme in Industrial Management
  • Degree Programme in Land Surveying
Teachers
  • Ing-Britt Rögård
  • Sofia Frilund
Teacher in charge

Kaj Rintanen

Scheduling groups
  • MAP23-S (Size: 40. Open UAS: 0.)
  • MAP23-Y (Size: 40. Open UAS: 0.)
Groups
  • MAP23D-V
    Ingenjör (YH), maskin- och produktionsteknik, 2023 dagstudier
Small groups
  • MAP23-S
  • MAP23-Y

Objective

The student understands how, where and when to use the two basic concepts in mathematical analysis: derivation and integration.
The student can apply derivation and integration to various problems within their own field of study.
The student can use mathematical software to analyze measured data ​​or other collected data sets.

Content

- Limit calculations
- Definition of derivatives
- Tangent and linearisation
- Derivation rules
- Extreme value problems
- Second derivative and convexity
- Applications of derivatives in different fields
- Numerical derivation
- Primitive function (antiderivative)
- Definition of integrals
- Integration rules
- Area calculations, volume integrals
- Integral applications from own specialist area
- Numerical integration
- Mathematical software (Mathcad, Matlab, GeoGebra or equivalent) as a tool for solving problems

Evaluation scale

H-5

Assessment criteria, satisfactory (1)

Derivatives: Basic understanding of the concept of derivatives. Master simple derivation rules.
Integrals: Basic understanding of the integral concept. Master simple integration rules.
Modeling and numerical methods: Have some understanding of how to make a mathematical model and how it can be solved numerically.

Assessment criteria, good (3)

Derivatives: Is able to solve common types of extreme value problems using derivatives
Integrals: Is able to calculate areas and volumes using integrals. Is able to solve mechanical problems using integrals.
Modeling and numerical methods: Understands how to make a mathematical model and how it can be solved numerically.

Assessment criteria, excellent (5)

Derivatives: Can apply theory to more complicated applications and calculations.
Integrals: Can apply the theory to more complicated applications and calculations (rotational surfaces, arc lengths, etc.).
Modeling and numerical methods: Can construct and numerically solve more complicated models with calculation software.

Qualifications

Functions and equations 1,
Geometry and vectors,
Functions and equations 2.

Open in new tab
Enrollment

01.12.2023 - 10.03.2024

Timing

04.03.2024 - 28.04.2024

Number of ECTS credits allocated

3 op

Mode of delivery

Contact teaching

Unit

Faculty of Technology and Seafaring

Campus

Vasa, Wolffskavägen 33

Teaching languages
  • Svenska
Degree programmes
  • Degree Programme in Civil and Construction Engineering
  • Degree Programme in Mechanical and Production Engineering
  • Degree Programme in Electrical Engineering and Automation
  • Degree Programme in Industrial Management
  • Degree Programme in Land Surveying
Teachers
  • Ing-Britt Rögård
  • Lina Åberg
Teacher in charge

Leif Östman

Scheduling groups
  • BYS23-S (Size: 40. Open UAS: 0.)
  • BYS23-Y (Size: 40. Open UAS: 0.)
  • BYL23 (Size: 40. Open UAS: 0.)
Groups
  • BYL23D-V
    Ingenjör (YH), lantmäteriteknik, 2023 dagstudier
  • BYS23D-V
    Ingenjör (YH), byggnads- och samhällsteknik, 2023 Vasa, dagstudier
Small groups
  • BYS23-S
  • BYS23-Y
  • BYL23

Objective

The student understands how, where and when to use the two basic concepts in mathematical analysis: derivation and integration.
The student can apply derivation and integration to various problems within their own field of study.
The student can use mathematical software to analyze measured data ​​or other collected data sets.

Content

- Limit calculations
- Definition of derivatives
- Tangent and linearisation
- Derivation rules
- Extreme value problems
- Second derivative and convexity
- Applications of derivatives in different fields
- Numerical derivation
- Primitive function (antiderivative)
- Definition of integrals
- Integration rules
- Area calculations, volume integrals
- Integral applications from own specialist area
- Numerical integration
- Mathematical software (Mathcad, Matlab, GeoGebra or equivalent) as a tool for solving problems

Evaluation scale

H-5

Assessment criteria, satisfactory (1)

Derivatives: Basic understanding of the concept of derivatives. Master simple derivation rules.
Integrals: Basic understanding of the integral concept. Master simple integration rules.
Modeling and numerical methods: Have some understanding of how to make a mathematical model and how it can be solved numerically.

Assessment criteria, good (3)

Derivatives: Is able to solve common types of extreme value problems using derivatives
Integrals: Is able to calculate areas and volumes using integrals. Is able to solve mechanical problems using integrals.
Modeling and numerical methods: Understands how to make a mathematical model and how it can be solved numerically.

Assessment criteria, excellent (5)

Derivatives: Can apply theory to more complicated applications and calculations.
Integrals: Can apply the theory to more complicated applications and calculations (rotational surfaces, arc lengths, etc.).
Modeling and numerical methods: Can construct and numerically solve more complicated models with calculation software.

Qualifications

Functions and equations 1,
Geometry and vectors,
Functions and equations 2.

Open in new tab
Enrollment

30.11.2023 - 29.02.2024

Timing

01.03.2024 - 01.05.2024

Number of ECTS credits allocated

3 op

Mode of delivery

Contact teaching

Teaching languages
  • Svenska
Degree programmes
  • Degree Programme in Information Technology
Teachers
  • Anders Skjäl
Teacher in charge

Kaj Wikman

Groups
  • UIT23D-V
    Ingenjör (YH), informationsteknik

Objective

The student understands how, where and when to use the two basic concepts in mathematical analysis: derivation and integration.
The student can apply derivation and integration to various problems within their own field of study.
The student can use mathematical software to analyze measured data ​​or other collected data sets.

Content

- Limit calculations
- Definition of derivatives
- Tangent and linearisation
- Derivation rules
- Extreme value problems
- Second derivative and convexity
- Applications of derivatives in different fields
- Numerical derivation
- Primitive function (antiderivative)
- Definition of integrals
- Integration rules
- Area calculations, volume integrals
- Integral applications from own specialist area
- Numerical integration
- Mathematical software (Mathcad, Matlab, GeoGebra or equivalent) as a tool for solving problems

Evaluation scale

H-5

Assessment criteria, satisfactory (1)

Derivatives: Basic understanding of the concept of derivatives. Master simple derivation rules.
Integrals: Basic understanding of the integral concept. Master simple integration rules.
Modeling and numerical methods: Have some understanding of how to make a mathematical model and how it can be solved numerically.

Assessment criteria, good (3)

Derivatives: Is able to solve common types of extreme value problems using derivatives
Integrals: Is able to calculate areas and volumes using integrals. Is able to solve mechanical problems using integrals.
Modeling and numerical methods: Understands how to make a mathematical model and how it can be solved numerically.

Assessment criteria, excellent (5)

Derivatives: Can apply theory to more complicated applications and calculations.
Integrals: Can apply the theory to more complicated applications and calculations (rotational surfaces, arc lengths, etc.).
Modeling and numerical methods: Can construct and numerically solve more complicated models with calculation software.

Qualifications

Functions and equations 1,
Geometry and vectors,
Functions and equations 2.

Open in new tab
Enrollment

01.12.2023 - 10.03.2024

Timing

01.03.2024 - 25.04.2024

Number of ECTS credits allocated

3 op

Mode of delivery

Contact teaching

Unit

Faculty of Technology and Seafaring

Campus

Vasa, Wolffskavägen 33

Teaching languages
  • Svenska
Degree programmes
  • Degree Programme in Civil and Construction Engineering
  • Degree Programme in Mechanical and Production Engineering
  • Degree Programme in Electrical Engineering and Automation
  • Degree Programme in Industrial Management
  • Degree Programme in Land Surveying
Teachers
  • Ing-Britt Rögård
Teacher in charge

Ing-Britt Rögård

Groups
  • PRE23D-V
    Ingenjör (YH), produktionsekonomi, 2023 dagstudier

Objective

The student understands how, where and when to use the two basic concepts in mathematical analysis: derivation and integration.
The student can apply derivation and integration to various problems within their own field of study.
The student can use mathematical software to analyze measured data ​​or other collected data sets.

Content

- Limit calculations
- Definition of derivatives
- Tangent and linearisation
- Derivation rules
- Extreme value problems
- Second derivative and convexity
- Applications of derivatives in different fields
- Numerical derivation
- Primitive function (antiderivative)
- Definition of integrals
- Integration rules
- Area calculations, volume integrals
- Integral applications from own specialist area
- Numerical integration
- Mathematical software (Mathcad, Matlab, GeoGebra or equivalent) as a tool for solving problems

Evaluation scale

H-5

Assessment criteria, satisfactory (1)

Derivatives: Basic understanding of the concept of derivatives. Master simple derivation rules.
Integrals: Basic understanding of the integral concept. Master simple integration rules.
Modeling and numerical methods: Have some understanding of how to make a mathematical model and how it can be solved numerically.

Assessment criteria, good (3)

Derivatives: Is able to solve common types of extreme value problems using derivatives
Integrals: Is able to calculate areas and volumes using integrals. Is able to solve mechanical problems using integrals.
Modeling and numerical methods: Understands how to make a mathematical model and how it can be solved numerically.

Assessment criteria, excellent (5)

Derivatives: Can apply theory to more complicated applications and calculations.
Integrals: Can apply the theory to more complicated applications and calculations (rotational surfaces, arc lengths, etc.).
Modeling and numerical methods: Can construct and numerically solve more complicated models with calculation software.

Qualifications

Functions and equations 1,
Geometry and vectors,
Functions and equations 2.

Open in new tab
Enrollment

01.12.2023 - 07.01.2024

Timing

03.01.2024 - 17.01.2024

Number of ECTS credits allocated

3 op

Mode of delivery

Contact teaching

Unit

Faculty of Technology and Seafaring

Teaching languages
  • Svenska
Degree programmes
  • Degree Programme in Civil and Construction Engineering
  • Degree Programme in Mechanical and Production Engineering
  • Degree Programme in Electrical Engineering and Automation
  • Degree Programme in Industrial Management
  • Degree Programme in Land Surveying
Teachers
  • Sofia Frilund
Teacher in charge

Matts Nickull

Groups
  • ÖH22FLEXING
    Öppna YH, Flexibelt till Ingenjör

Objective

The student understands how, where and when to use the two basic concepts in mathematical analysis: derivation and integration.
The student can apply derivation and integration to various problems within their own field of study.
The student can use mathematical software to analyze measured data ​​or other collected data sets.

Content

- Limit calculations
- Definition of derivatives
- Tangent and linearisation
- Derivation rules
- Extreme value problems
- Second derivative and convexity
- Applications of derivatives in different fields
- Numerical derivation
- Primitive function (antiderivative)
- Definition of integrals
- Integration rules
- Area calculations, volume integrals
- Integral applications from own specialist area
- Numerical integration
- Mathematical software (Mathcad, Matlab, GeoGebra or equivalent) as a tool for solving problems

Evaluation scale

H-5

Assessment criteria, satisfactory (1)

Derivatives: Basic understanding of the concept of derivatives. Master simple derivation rules.
Integrals: Basic understanding of the integral concept. Master simple integration rules.
Modeling and numerical methods: Have some understanding of how to make a mathematical model and how it can be solved numerically.

Assessment criteria, good (3)

Derivatives: Is able to solve common types of extreme value problems using derivatives
Integrals: Is able to calculate areas and volumes using integrals. Is able to solve mechanical problems using integrals.
Modeling and numerical methods: Understands how to make a mathematical model and how it can be solved numerically.

Assessment criteria, excellent (5)

Derivatives: Can apply theory to more complicated applications and calculations.
Integrals: Can apply the theory to more complicated applications and calculations (rotational surfaces, arc lengths, etc.).
Modeling and numerical methods: Can construct and numerically solve more complicated models with calculation software.

Qualifications

Functions and equations 1,
Geometry and vectors,
Functions and equations 2.

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Enrollment

01.12.2022 - 16.03.2023

Timing

06.03.2023 - 28.04.2023

Number of ECTS credits allocated

3 op

Mode of delivery

Contact teaching

Unit

Faculty of Technology and Seafaring

Campus

Vasa, Wolffskavägen 33

Teaching languages
  • Svenska
Degree programmes
  • Degree Programme in Civil and Construction Engineering
  • Degree Programme in Mechanical and Production Engineering
  • Degree Programme in Electrical Engineering and Automation
  • Degree Programme in Industrial Management
  • Degree Programme in Land Surveying
Teachers
  • Ing-Britt Rögård
Scheduling groups
  • BYS22-S (Size: 30. Open UAS: 0.)
  • BYS22-Y (Size: 30. Open UAS: 0.)
  • BYL22-S (Size: 30. Open UAS: 0.)
  • BYL22-Y (Size: 30. Open UAS: 0.)
Groups
  • BYS22D-V
    Ingenjör (YH), byggnads- och samhällsteknik, 2022 Vasa, dagstudier
  • BYL22D-V
    Ingenjör (YH), lantmäteriteknik, 2022 dagstudier
Small groups
  • BYS22-S
  • BYS22-Y
  • BYL22-S
  • BYL22-Y

Objective

The student understands how, where and when to use the two basic concepts in mathematical analysis: derivation and integration.
The student can apply derivation and integration to various problems within their own field of study.
The student can use mathematical software to analyze measured data ​​or other collected data sets.

Content

- Limit calculations
- Definition of derivatives
- Tangent and linearisation
- Derivation rules
- Extreme value problems
- Second derivative and convexity
- Applications of derivatives in different fields
- Numerical derivation
- Primitive function (antiderivative)
- Definition of integrals
- Integration rules
- Area calculations, volume integrals
- Integral applications from own specialist area
- Numerical integration
- Mathematical software (Mathcad, Matlab, GeoGebra or equivalent) as a tool for solving problems

Evaluation scale

H-5

Assessment criteria, satisfactory (1)

Derivatives: Basic understanding of the concept of derivatives. Master simple derivation rules.
Integrals: Basic understanding of the integral concept. Master simple integration rules.
Modeling and numerical methods: Have some understanding of how to make a mathematical model and how it can be solved numerically.

Assessment criteria, good (3)

Derivatives: Is able to solve common types of extreme value problems using derivatives
Integrals: Is able to calculate areas and volumes using integrals. Is able to solve mechanical problems using integrals.
Modeling and numerical methods: Understands how to make a mathematical model and how it can be solved numerically.

Assessment criteria, excellent (5)

Derivatives: Can apply theory to more complicated applications and calculations.
Integrals: Can apply the theory to more complicated applications and calculations (rotational surfaces, arc lengths, etc.).
Modeling and numerical methods: Can construct and numerically solve more complicated models with calculation software.

Qualifications

Functions and equations 1,
Geometry and vectors,
Functions and equations 2.

Open in new tab
Enrollment

01.12.2022 - 05.03.2023

Timing

06.03.2023 - 30.04.2023

Number of ECTS credits allocated

3 op

Mode of delivery

Contact teaching

Unit

Faculty of Technology and Seafaring

Campus

Vasa, Wolffskavägen 33

Teaching languages
  • Svenska
Degree programmes
  • Degree Programme in Civil and Construction Engineering
  • Degree Programme in Mechanical and Production Engineering
  • Degree Programme in Electrical Engineering and Automation
  • Degree Programme in Industrial Management
  • Degree Programme in Land Surveying
Teachers
  • Anders Skjäl
Teacher in charge

Ronnie Sundsten

Scheduling groups
  • Group A (Size: 30. Open UAS: 0.)
  • Group B (Size: 30. Open UAS: 0.)
  • Group C (Size: 30. Open UAS: 0.)
Groups
  • ÖH22ELA-LED-V
    Öppna YH, el-och automationsteknik ledstudier
  • ELA22D-V
    Ingenjör (YH), el- och automationsteknik, 2022, dagstudier
Small groups
  • Group A
  • Group B
  • Group C

Objective

The student understands how, where and when to use the two basic concepts in mathematical analysis: derivation and integration.
The student can apply derivation and integration to various problems within their own field of study.
The student can use mathematical software to analyze measured data ​​or other collected data sets.

Content

- Limit calculations
- Definition of derivatives
- Tangent and linearisation
- Derivation rules
- Extreme value problems
- Second derivative and convexity
- Applications of derivatives in different fields
- Numerical derivation
- Primitive function (antiderivative)
- Definition of integrals
- Integration rules
- Area calculations, volume integrals
- Integral applications from own specialist area
- Numerical integration
- Mathematical software (Mathcad, Matlab, GeoGebra or equivalent) as a tool for solving problems

Evaluation scale

H-5

Assessment criteria, satisfactory (1)

Derivatives: Basic understanding of the concept of derivatives. Master simple derivation rules.
Integrals: Basic understanding of the integral concept. Master simple integration rules.
Modeling and numerical methods: Have some understanding of how to make a mathematical model and how it can be solved numerically.

Assessment criteria, good (3)

Derivatives: Is able to solve common types of extreme value problems using derivatives
Integrals: Is able to calculate areas and volumes using integrals. Is able to solve mechanical problems using integrals.
Modeling and numerical methods: Understands how to make a mathematical model and how it can be solved numerically.

Assessment criteria, excellent (5)

Derivatives: Can apply theory to more complicated applications and calculations.
Integrals: Can apply the theory to more complicated applications and calculations (rotational surfaces, arc lengths, etc.).
Modeling and numerical methods: Can construct and numerically solve more complicated models with calculation software.

Qualifications

Functions and equations 1,
Geometry and vectors,
Functions and equations 2.

Open in new tab
Enrollment

01.12.2022 - 16.03.2023

Timing

05.03.2023 - 30.04.2023

Number of ECTS credits allocated

3 op

Mode of delivery

Contact teaching

Unit

Faculty of Technology and Seafaring

Campus

Vasa, Wolffskavägen 33

Teaching languages
  • Svenska
Degree programmes
  • Degree Programme in Civil and Construction Engineering
  • Degree Programme in Mechanical and Production Engineering
  • Degree Programme in Electrical Engineering and Automation
  • Degree Programme in Industrial Management
  • Degree Programme in Land Surveying
Teachers
  • Ing-Britt Rögård
Groups
  • PRE22D-V
    Ingenjör (YH), produktionsekonomi, 2022 dagstudier

Objective

The student understands how, where and when to use the two basic concepts in mathematical analysis: derivation and integration.
The student can apply derivation and integration to various problems within their own field of study.
The student can use mathematical software to analyze measured data ​​or other collected data sets.

Content

- Limit calculations
- Definition of derivatives
- Tangent and linearisation
- Derivation rules
- Extreme value problems
- Second derivative and convexity
- Applications of derivatives in different fields
- Numerical derivation
- Primitive function (antiderivative)
- Definition of integrals
- Integration rules
- Area calculations, volume integrals
- Integral applications from own specialist area
- Numerical integration
- Mathematical software (Mathcad, Matlab, GeoGebra or equivalent) as a tool for solving problems

Evaluation scale

H-5

Assessment criteria, satisfactory (1)

Derivatives: Basic understanding of the concept of derivatives. Master simple derivation rules.
Integrals: Basic understanding of the integral concept. Master simple integration rules.
Modeling and numerical methods: Have some understanding of how to make a mathematical model and how it can be solved numerically.

Assessment criteria, good (3)

Derivatives: Is able to solve common types of extreme value problems using derivatives
Integrals: Is able to calculate areas and volumes using integrals. Is able to solve mechanical problems using integrals.
Modeling and numerical methods: Understands how to make a mathematical model and how it can be solved numerically.

Assessment criteria, excellent (5)

Derivatives: Can apply theory to more complicated applications and calculations.
Integrals: Can apply the theory to more complicated applications and calculations (rotational surfaces, arc lengths, etc.).
Modeling and numerical methods: Can construct and numerically solve more complicated models with calculation software.

Qualifications

Functions and equations 1,
Geometry and vectors,
Functions and equations 2.

Open in new tab
Enrollment

01.12.2022 - 16.03.2023

Timing

04.03.2023 - 29.04.2023

Number of ECTS credits allocated

3 op

Mode of delivery

Contact teaching

Unit

Faculty of Technology and Seafaring

Teaching languages
  • Svenska
Degree programmes
  • Degree Programme in Civil and Construction Engineering
  • Degree Programme in Mechanical and Production Engineering
  • Degree Programme in Electrical Engineering and Automation
  • Degree Programme in Industrial Management
  • Degree Programme in Land Surveying
Teachers
  • Ing-Britt Rögård
  • Sofia Frilund
Scheduling groups
  • MAP22-S (Group A) (Size: 30. Open UAS: 0.)
  • MAP22-Y (Group B) (Size: 30. Open UAS: 0.)
Groups
  • MAP22D-V
    Ingenjör (YH), maskin- och produktionsteknik, 2022 dagstudier
Small groups
  • MAP22-S (Group A)
  • MAP22-Y (Group B)

Objective

The student understands how, where and when to use the two basic concepts in mathematical analysis: derivation and integration.
The student can apply derivation and integration to various problems within their own field of study.
The student can use mathematical software to analyze measured data ​​or other collected data sets.

Content

- Limit calculations
- Definition of derivatives
- Tangent and linearisation
- Derivation rules
- Extreme value problems
- Second derivative and convexity
- Applications of derivatives in different fields
- Numerical derivation
- Primitive function (antiderivative)
- Definition of integrals
- Integration rules
- Area calculations, volume integrals
- Integral applications from own specialist area
- Numerical integration
- Mathematical software (Mathcad, Matlab, GeoGebra or equivalent) as a tool for solving problems

Evaluation scale

H-5

Assessment criteria, satisfactory (1)

Derivatives: Basic understanding of the concept of derivatives. Master simple derivation rules.
Integrals: Basic understanding of the integral concept. Master simple integration rules.
Modeling and numerical methods: Have some understanding of how to make a mathematical model and how it can be solved numerically.

Assessment criteria, good (3)

Derivatives: Is able to solve common types of extreme value problems using derivatives
Integrals: Is able to calculate areas and volumes using integrals. Is able to solve mechanical problems using integrals.
Modeling and numerical methods: Understands how to make a mathematical model and how it can be solved numerically.

Assessment criteria, excellent (5)

Derivatives: Can apply theory to more complicated applications and calculations.
Integrals: Can apply the theory to more complicated applications and calculations (rotational surfaces, arc lengths, etc.).
Modeling and numerical methods: Can construct and numerically solve more complicated models with calculation software.

Qualifications

Functions and equations 1,
Geometry and vectors,
Functions and equations 2.