Kenneth Julin
All material is available in the Moodle course.
Exercises can be found in e-math.
Teaching takes place in class or remotely via webex according to the schedule in PEPPI.
All material that belongs to the course is in Moodle - exercises are in e-math
Mathcad is used as an aid during the course.
The students are expected to have their own Mathcad installed on their computer.
The course is assessed on the basis of the student's results in the exam (max. 40 points) and on the basis of calculated tasks (20 points).
At least 13 points in the exam and at least 20 points in total.
White word scale :
20 p = 1
28 p = 2
36 p = 3
44 p = 4
52 p = 5
Swedish
01.09.2023 - 25.02.2024
15.06.2023 - 08.11.2023
Faculty of Technology and Seafaring
Ing-Britt Rögård
Degree Programme in Civil and Construction Engineering
0.00 credits
0.00 credits
H-5
Passed exams and completed assignments.
The exam takes place on site in Vaasa and is counted on paper.
The exam dates can be found in the Moodle course.
Presented at the start of the course, found in the Moodle course
Autumn 2023 - October, November - Vaasa/distance
Teaching in class: 12 lessons
Tent : 2 lessons
Own work : 67 hours
Se lektionsplaneringen i Moodle
The requirements for white word 1 could not be met
Graphical understanding of the concept of derivatives.
Master simple derivation rules.
Can apply calculus of derivatives to simple problems
Basic understanding of the concept of integral.
Master simple integration rules and can calculate the value of a definite integral.
Can apply integral calculus to simple problems.
Has some understanding of how to make a mathematical model and how this can be solved numerically
Can solve extreme value problems using derivatives
Can calculate areas of areas and volumes of solids of revolution using integrals. Can solve problems from physics using integrals.
Modeling and numerical methods
Has a good understanding of how to make mathematical models and can solve these calculation programs
Can apply derivative calculus to more complicated applications and calculations.
Can apply integral calculations to more complicated applications and calculations. ( Surfaces of rotation, arc lengths )
Modeling and numerical methods
Can construct and numerically solve more complicated models with calculation programs