Program

Summer Math Camp

The program will be held in the format of a 5-day intensive training series. Participants will attend lectures, during which they will become familiar with the theoretical material of each of the topics, and the lectures will be followed by seminars, where participants will consolidate their knowledge by solving problems and case studies. At the end of the shift, participants will be asked to write a final work to consolidate their knowledge, the points that participants earn will go to the overall rating. 

Besides learning program students will be involved in extracurricular activities where they will enjoy and have the best summer ever 🚴🚶🏌.

Application to the program is currently not active
Start date

1 - 5 july

Duration

5 days

Group size

15 student

Schedule

9:00 a.m - 6:00 p.m.

Admission requirements
Grade

Graduate from 8th grade

Language

Knowledge of English at least Intermediate level

Requirement

Follow the Camp Rules

Expectation

Be prepared for intensive training and willingness to constantly research additional materials

Program

Summer Math Camp
4

Number of modules

Domain and range of the function. Composite functions. Even and odd functions. Inverse functions. Some standard functions: linear function, quadratic function, modulus function, rational function. Transformations of graphs.

Trigonometric ratios. Right-angled triangle trigonometry. Application problems. Non right-angled triangle trigonometry: the sine rule, the cosine rule, area of triangle. The unit circle and radian measure. Definition and graphs of the sine, cosine and tangent functions. Transformations of the graphs of trigonometric functions. Fundamental trigonometric identities. Inverse trigonometric functions. Trigonometric equations.

Number sequences, general term of the sequence. Arithmetic and geometric sequences. Series and sigma notation. Arithmetic and geometric series. Applications of arithmetic and geometric sequences.

Basic probability concepts. Sample space and events. Combined events and Venn diagrams. Rules of probability. Mutually exclusive events. Probability tree diagrams. Conditional probability. Independent events. Bayes’ theorem. Counting principles. Combinations, permutations.