The Subject-Specific Criteria (SSC) are derived from ASIIN SSC 12 for Master degree programme in Mathematics of type M (accessible at https://www.asiin.de/en/programme-accreditation/quality-criteria.html). The description of this SSC is presented in the following table.
|
Knowledge |
SSC 1 |
Possesses further
knowledge of abstract
and applied mathematics |
|
SSC 2 |
Able to identify and explain the quality of complex mathematical problems |
|
|
Skill |
SSC 3 |
Able to use mathematical statements to solve math- ematical problems |
|
SSC 4 |
Able to formulate mathematical hypotheses and ver-
ify them |
|
|
SSC 5 |
Recognizes the abstract structure of mathematical problems and analyze them |
|
|
Competency |
SSC 6 |
Formally and correctly proves
mathematical state- ments |
|
SSC 7 |
Masters
strategies to transfer methods within a wide
area of mathematics |
|
|
SSC 8 |
Works on and present
mathematical problems within
the area of abstract or applied mathematics |
|
|
SSC 9 |
Works independently on mathematical problems within the area of abstract or applied mathematics and present the results both orally and in writing |
The following table displays the alignment of some PLOs with the SSC of MPME.
Table. Alignment Subject-Spesific Criteria (SSC) with PLO
|
PLO |
SSC 1 |
SSC 2 |
SSC 3 |
SSC 4 |
SSC 5 |
SSC 6 |
SSC 7 |
SSC 8 |
SSC 9 |
|
KNO-1 |
√ |
√ |
|
|
|
|
|
|
|
|
SKI-1 |
|
|
√ |
√ |
√ |
|
|
|
|
|
COM-1 |
|
|
|
|
|
√ |
√ |
√ |
√ |
|
COM-2 |
|
|
|
|
|
√ |
√ |
√ |
√ |
