Number Theory: Master the Core Concepts from Scratch

Are you pursuing BSc Mathematics (Hons), BSc Computer Science, BCA, MCA, or preparing for competitive exams like GATE, NET, JAM?

Do you want to learn Number Theory from Basic To advance?
Do you struggle with tough mathematical topics like congruences, Diophantine equations, or Euler’s theorem?

Then you are at the right place!

This course is a complete and in-depth guide to Number Theory, a core subject in mathematics with applications in cryptography, computer science, and algorithm design. It has been crafted especially for students at the college/university level, with a clear focus on conceptual understanding and exam preparation.

You will learn step-by-step through:

• Divisibility, primes, GCD, LCM

• Modular arithmetic and congruences

• Diophantine equations and number theoretic functions

• Euler’s & Fermat’s theorems

• Applications in encryption and coding theory

Every lecture includes examples, explanations, and problem-solving techniques to make learning easy—even if you’re weak in math.

Thousands of students find Number Theory difficult. This course simplifies it with real clarity, smart strategies, and well-structured lessons.

By the end of this course, you’ll be ready to:

• Solve university-level problems

• Attempt competitive exam questions with confidence

• Understand modern cryptographic applications based on number theory

Start your journey now—master Number Theory and upgrade your academic power!