# Cheenta. passion for mathematics.

Pause for a moment. Let us divide letters by letters!

What if you wanted to divide the base by an exponent? This situation comes up quite often in Elementary Number Theory. Consider the following equation:

$$ \displaystyle{ k! + 48 = 48 \times (k+1)^m } $$

Can you show that k divides m? The answer is hidden somewhere in our library articles.

#### What is Cheenta?

**Since 2010**, we have worked with hundreds of students from India, United States, UK, Australia, Singapore and Middle East

All of our classes are delivered exclusively **live and online. **Our main center in Calcutta (India) office hosts a reading facility for advanced learners.

#### Who are Teaching?

**In India:** Indian Statistical Institute, Chennai Mathematical Institute, IISER, TIFR, Calcutta University, IIT KGP

**Outside India:** the University of Wisconsin Milwaukee (USA), University of North Carolina (USA), St. Louis University (USA), IMPA (Brazil), E’Cole (France)

#### Admission and eligibility

**highly selective.**The prospective student must first go through a trial class.

Our courses are significantly more intense than regular school or college programs.* Apply only if you are thrilled by the beauty of mathematics. *

**Math Olympiad, I.S.I. Entrance and College Mathematics candidates form the core student body of Cheenta.**

# Training brilliant minds.

**Since 2010.**

Cheenta has worked with brilliant maths and science olympiad students from over 6 countries. Our courses are specifically geared toward students with an exceptional interest in Mathematical Sciences.

#### Math Olympiad

#### Pre-Olympiad Thousand Flowers

#### I.S.I. & C.M.I. Entrance

#### College Mathematics

# I.S.I. & C.M.I. Entrance

Problems from standard topics such as Calculus, Trigonometry or Coordinate geometry can significantly tricky.

#### Advanced Topics

#### Regular High School Topics

# Not a spectator sport.

# College Mathematics

We work on Groups, Rings, Fields, Linear Algebra, Analysis, Topology and other advanced topics. As usual problem solving remains the driving force of the program.

The hyperbolic 3 space may come up in this course. Behold this beautiful Hyperideal Honeycomb created by Royce3 (under creative commons).

#### Continuing Education

#### Advanced GRE, TIFR, M.Math

# What is Torsion?

**Testimonials…**

**Jayanta Majumdar**

**Shubrangshu Das**

I am impressed with their quality and professionalism. We are very thankful to Cheenta and hope to benefit from them in the coming years. I would strongly recommend them to any student who wants to learn Math by doing challenging problems, specially if they are looking for Math than what their school can offer.” **Murali Kadaveru**