# MET 2910 Mathematics

## MET 2910 Mathematics

MET 2911 | |

MET 2912 |

This is a basic course in mathematics. The course is a compulsory part of the bachelor programs in business administration subjects. The course will be carried out during the first year over two terms. The first term will contain basic algebra, functions with one variable, and will give a basis for the main part of the course, which is in the second term.

**Please note!**

Due to the Corona situation, BI Norwegian Business Scholl has decided that the examination in this course will be changed in the spring of 2020.

The change means that the course also gets a new course and exam code. Follow the link to the course description MET 0910 Mathematics which will apply in spring 2020.

After completing this course the students have acquired mathematical knowledge in basic algebra and function theory, also functions in several variables.

The aim is to develop a deeper understanding of mathematical concepts both through the ability to perform mathematical calculations and to gain a deeper conceptual understanding. This means, for example, the ability to see connections between algebraic and graphical representations of one and the same problem or to see connections between mathematics and other subjects, especially economics. In addition, students gain skills in understanding math problems and choose appropriate strategies to solve them.

Students' ability of analytical thinking and an ability to reflect on the results and calculations will be strengthened by through the course.

- Elementary algebra and solution of equations and equation systems
- Function concept and basic functions as polynomial functions, rational functions, exponential and logarithmic functions
- Differentiation and function analysis: limits, continuity, derivatives, derivatives of composite functions, application of differentiation in economic issues, analysis of functions, elasticity
- Series and financial mathematics
- Easy integration
- Functions of several variables: partial derivatives, stationary points. Maximum and minimum problems for two variables with and without constraints (Lagrange method)
- Determinants and solutions of equations using Gauss-elimination.

This course is taught over one year and consists of an introductory part of 36 hours and an advanced part of 48 hours. The introductory section is carried out with one session per. week during the fall semester and the advanced section with two session’s per. week in the spring semester, each session lasting at least for two hours. The lectures will review key parts of the curriculum. Some topics that are reviewed in the introduction part can be known for certain.

Exercises presented by the students will be a key part of lectures and feedback will be given through review and discussion of the exercises. Each week there will be prepared a work programme with literature references and tasks will be prepared. Students must acquire the substance in the reference literature and solve problems. Some of the tasks will be discussed in plenary sessions.

Two assignments, one in each semester, should be submitted. These will be posted 14 days before the deadline. After the answers have been, the students will receive feedback through a discussion and review of the solution in class.

__E-learning__

In course delivery as online courses, lecturer will, in collaboration with the student administration, organize an appropriate course implementation, combining different learning activities and digital elements on the learning platform. Online students are also offered a study guide that will contribute to progression and overview. Total recommended time spent for completing the course also applies here.

For å støtte studentenes læreprosess, arrangerer BI seminargrupper og andre veiledningstilbud ved våre Campuser. Det oppfordres sterkt til at studentene deltar på disse tilbudene for å oppnå faglig mestring.

Higher Education Entrance Qualification.

No particular prerequisites.

Assessments |
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Exam category: Submission Form of assessment: Written submission Grouping: Individual Duration: 2 Week(s) Exam code: MET29101 Grading scale: Pass/fail Resit: Examination every semester |

Exam category: Submission Form of assessment: Structured test Invigilation Weight: 20 Grouping: Individual Support materials: - No support materials
Duration: 3 Hour(s) Comment: A three-hour individual multiple-choice exam given at the end of the introduction part, accounting for 20% of the final grade in the course. Must be passed in order to obtain final grade in the course. Exam code: MET29102 Grading scale: ECTS Resit: Examination every semester |

Exam category: Submission Form of assessment: Written submission Grouping: Individual Duration: 2 Week(s) Comment: Individual assignment Task 2 is given halfway through the semester, graded as pass / fail. Must be passed in order to obtain final grade in the course. Exam code: MET29103 Grading scale: Pass/fail Resit: Examination every semester |

Exam category: Submission Form of assessment: Written submission Invigilation Weight: 80 Grouping: Individual Support materials: - BI-approved exam calculator
- Simple calculator
Duration: 4 Hour(s) Comment: A four-hour individual written exam given at the end of the advanced part, accounts for 80% of the final grade in the course. Must be passed in order to obtain final grade in the course. Exam code: MET29104 Grading scale: ECTS Resit: Examination every semester |

All exams must be passed to get a grade in this course.

Activity | Duration | Comment |
---|---|---|

Teaching | 36 Hour(s) | Introductory part |

Prepare for teaching | 10 Hour(s) | Introductory part |

Group work / Assignments | 11 Hour(s) | Introductory part |

Examination | 3 Hour(s) | Introductory part |

Teaching | 48 Hour(s) | Advanced part |

Prepare for teaching | 73 Hour(s) | Advanced part |

Group work / Assignments | 75 Hour(s) | Advanced part |

Examination | 4 Hour(s) | Advanced part |

A course of 1 ECTS credit corresponds to a workload of 26-30 hours. Therefore a course of 7,5 ECTS credit corresponds to a workload of at least 200 hours.

Must be passed in order to obtain final grade in the course.