Rating formula
Shortly speaking:
- It's recommended to equally maximize each module score
- You can skip any final test and get +14% for free, but if you join it, you can get anything from +0% to +35%
- Bonuses are separated by module and costs +20% total
- Visit classes ☺
- Do not cheat, please, it costs!
Overall formula
We'll have 3 modules, each scored $$M_i$$ in the same way, and final exam $$E$$.
$$G = 10*min(1,\ frac{sum_{i=1}^3M_i+E}{4})$$
Details
Each module score calculates from Regular and Bonus points:
$$M_i = min(1,\ R_i+2/10B_i,)$$
Regular points (100%)
Variable |
Score |
Description |
H |
45% |
EJudge / other practical homework. You must solve tasks in time, 50% penalty for a week outdated task, 75% penalty otherwise, no score for unsolved one. Also no score for copy-paste / rewrite or other cheating (either source or destination), this can be enquired |
T |
10% |
Offline tests. Main use is self-checking, but here's 10% |
P |
10% |
Class presence. You need to attend more than 3/4 of total classes to earn this point |
F |
35% |
Final online test. You can skip this on with 60% penalty; 100% penalty for cheating (both sides; can be enquired) |
$$R_i = 45/100H + 10/100T + 10/100P + 35/100F$$
Bonus points (+20% max)
Any 200%-task can be shared (in fact, sharing is suggested), in that case it'll be divided by the number of administrants (thus 200% score)
Variable |
Score |
Description |
L |
200% |
Lecture conspectus. Can be in Russian. Must cover all lectures to be scored. Each conspectus shall include a paragraph on each topic mentioned in lecture syllabus, and must be approved by lecturer and published here |
S |
200% |
Video subtitles (in English). Must cover all lectures to be scored, be verified by lecturer and published on YouTube |
Ck |
10% each |
Single class conspectus. Can be in Russian. Shall include all themes from the class, practice statements and it's solutions and must be approved by lecturer. No copy-paste is allowed, and no scoring if more than a week late. |
Ak |
5% each |
Class activity. Each time you broadcast a solution of a task during class hours, you get this point |
$$L_{yours} = frac{2}{team\ size}$$ if L is complete and checked
$$S_{yours} = frac{2}{team\ size}$$ if S is complete and checked
$$B_i = min(1\, max(L_{yours},\ S_{yours},\ 1/10\sum_k C_k + 1/20\sum_k A_k ))$$