# EBA 2910 Mathematics for Business Analytics

## EBA 2910 Mathematics for Business Analytics

EBA 2911 - høstsemester | |

EBA 2912 - vårsemester |

This is a basic course in mathematics. The course is a compulsory part of the Bachelor of Science in Business Analytics. The course will be taught during the first year over two semesters. It consists of an introductory part in the autumn semester, and an advanced part in the autumn and spring semester.

After completing the course, the student will have;

- Acuired a broad understanding of concepts, methods and theories in matematics.
- A broad knowledge of algebra, functions in one or several variables, financial mathematics, derivation and integration, and linear algebra.
- Specialized knowledge of how mathematical models and methods can be used in economics and finance.

After completing the course, the student will be able to:

- Analyze quantitative problems using mathematical concepts, and be able to use mathematical methods to solve these problems.
- Assess solution strategies, and be able to carry out the necessary computations correctly and precisely.
- Give mathematical arguments to justify his conclusions, and be able to give written answers that explains the method used and the obtained results to the reader.
- See connections between mathematics and other subjects, especially economics and finance.
- Be able to translate mathematical problems into algorithms and Python code

After completing the course, the student will be able to reflect upon central assumptions for the models and theories used. The student will be able to reflect upon the results obtained, and critically assess if they are reasonable.

- Elementary algebra
- Mathematics of finance and series
- Functions and graphs
- Exponential and logarithmic functions
- Derivation with applications
- Integration with applications
- Linear algebra and matrix algebra
- Functions of several variables
- Optimization in several variables

The course is lectured over one year and consists of an introductory part (36 hours) and an advanced part (48 hours).

For each week, there will be a work program consisting of a problem set and reading assignments. The student must learn the material presented in the reading assignments and work through the problem set. Some of the problems will be reviewed in plenary sessions.

By allocating some time in class to short assignment related to new topics, students will be activated and learning objectives achieved.

Wolfram Alpha is used in lecture to illustrate taught material. Problem sets will include problems the students should solve using python.

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Basic knowledge of mathematics equivalent to the admission requirement for the programme.

Exam category | Weight | Invigilation | Duration | Support materials | Grouping | Comment exam |
---|---|---|---|---|---|---|

Exam category:Submission Form of assessment:Written submission Exam code:EBA29101 Grading scale:Pass/fail Grading rules:Internal examiner Resit:Examination every semester | 0 | No | 1 Week(s) | Individual | Midterm exam in the autumn. | |

Exam category:Submission Form of assessment:Structured test Exam code:EBA29102 Grading scale:ECTS Grading rules:Internal examiner Resit:Examination every semester | 20 | Yes | 3 Hour(s) | - BI-approved exam calculator
- Simple calculator
- Bilingual dictionary
| Individual | Multiple Choice exam at the end of autumn term. |

Exam category:Submission Form of assessment:Written submission Exam code:EBA29103 Grading scale:Pass/fail Grading rules:Internal examiner Resit:Examination every semester | 0 | No | 1 Week(s) | Individual | Midterm exam in the spring. | |

Exam category:Submission Form of assessment:Written submission Exam code:EBA29104 Grading scale:ECTS Grading rules:Internal and external examiner Resit:Examination every semester | 80 | Yes | 5 Hour(s) | - BI-approved exam calculator
- Simple calculator
- Bilingual dictionary
| Individual |

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

Teaching on Campus | 84 Hour(s) | Lectures |

Group work / Assignments | 60 Hour(s) | Problem sessions |

Examination | 16 Hour(s) | Two course papers, multiple choice exam and final exam |

Student's own work with learning resources | 65 Hour(s) | Own work with theory and problems |

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.