Welcoem to posts!!
in the future - u will be able to do some more stuff here,,,!! like pat catgirl- i mean um yeah... for now u can only see others's posts :c
Indian National Math #Olympiad (#INMO) is the toughest contest in Mathematics for school students in India. Out of lakhs of candidates only 78 qualified this year. 10 of them are either current students (7) or ex-students (3) of Cheenta Academy for Gifted Students!
Cheenta continues to be an oasis in my heart. With our 35 member-strong passionate team, 700+ committed students and beloved (other) director Srijit Mukherjee, we continue to live our dream of creating excellence in education.
This has been possible through years of focused hardwork. We started in 2010 in Calcutta. The central goal has always been depth of knowledge and problem solving.
On 9th March, Saturday, at 1 PM IST, we will conduct an Open House with the awardees. If you are curious to know how they prepared, what books they used, please join us in the meet.
Use this form to register. There are limited seats. We will share the google meet link via WhatsApp.
Stay focused on what matters. All the best.
forms.gle/hBXpUQucL1g5ZJ8z6
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This was an incredible year. #cheenta students recorded our best ever success rate. 14 out of 27 exam takers of Regional Math Olympiad qualified for INMO.
Congratulations to all kids. We know how much hard work went into this. Consistency is the key.
We encourage all kids at Cheenta to attend the problem solving classes regularly. They are the key to the success story.
We at Cheenta are obsessed with mathematical sciences and our students. Nothing gives us more joy than their success.
At Cheenta Acadmey for Gifted Students we spend almost no money in marketing. All the funds go to hiring great teachers and admins. New students join our community through word of mouth.
Your recommendations help us to create a true center for excellence.
#matholympiadpreparation #rmo
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A perfect number is a positive integer that is equal to the sum of its proper divisors. The smallest perfect number is 6, which is the sum of 1, 2, and 3. Which of the following numbers is perfect?
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Start from the end! - AMC 8, 2006 Problem 24 - a problem solving strategy: https://youtu.be/LHH-dmeiLjo
Prepare for Math Olympiad with Cheenta: www.cheenta.com/matholympiad/
#matholympiad #cheenta
7 - 0
Learn how to solve an interesting sequence in polynomials: https://youtu.be/5O-BuQsGw7s
Prepare for Math Olympiad with Cheenta: www.cheenta.com/matholympiad/
#matholympiad #cheenta
10 - 0
Learn how to solve a mixed problem: https://youtu.be/DHtdHECwm1s
Prepare for Math Olympiad with Cheenta: www.cheenta.com/matholympiad/
#matholympiad #cheenta
10 - 0
Learn about Generating Function & Wilson's Theorem: https://youtu.be/h6M1iWJCGuA
Prepare for Math Olympiad with Cheenta: www.cheenta.com/matholympiad/
#matholympiad #cheenta
8 - 0
How Math Olympiad lessons are planned at Cheenta: https://youtu.be/HIvjvsV80Ec
Prepare for Math Olympiad with Cheenta: www.cheenta.com/matholympiad/
#matholympiad #cheenta
7 - 0
How 4 Cheenta students cracked INMO - IMOTC in 2023 | Toward the hardest Math Olympiad in India: https://youtu.be/07TpyV5UPuo
Prepare for Math Olympiad with Cheenta: www.cheenta.com/matholympiad/
#matholympiad #cheenta
9 - 0
Learn about Newton's Sums & Vieta's Relations: https://youtu.be/vJEYvai1CT4
Prepare for Math Olympiad with Cheenta: www.cheenta.com/matholympiad/
#matholympiad #cheenta
9 - 0
Visit cheenta.com/
Since 2010, August, we have worked with hundreds of outstanding students from over five countries. Some of these students went on to perform brilliantly in Math Olympiads and other challenging mathematical contests. All credit goes to their years of hard work and persistence. Time and again, we learnt outstanding problem-solving strategies from our students.
We follow pedagogical methods used in the erstwhile Soviet Union. Discussions begin and end with problems. Students tirelessly work together on different methods. Faculty, on the other hand, disrupts this group-work with occasional hints and conceptual remarks, almost never divulging the entire solution. This method was crafted under the brilliant leadership of Vasiliyev in Mathematical Circles of Moscow and Saint Petersburg.