Title
A Course In Computational Number Theory
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A Course In Computational Number Theory Uses The Computer As A Tool For Motivation And Explanation. The Book Is Designed For The Reader To Quickly Access A Computer And Begin Doing Personal Experiments With The Patterns Of The Integers. It Presents And Explains Many Of The Fastest Algorithms For Working With Integers. Traditional Topics Are Covered, But The Text Also Explores Factoring Algorithms, Primality Testing, The Rsa Publickey Cryptosystem, And Unusual Applications Such As Check Digit Schemes And A Computation Of The Energy That Holds A Salt Crystal Together. Advanced Topics Include Continued Fractions, Pells Equation, And The Gaussian Primes.
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- Q: How many pages does the book have? A: This book has three hundred eighty-four pages. It provides a comprehensive exploration of computational number theory.
- Q: What is the binding type of the book? A: The book is hardcover. This binding type ensures durability and protection for the pages.
- Q: What are the dimensions of the book? A: The book measures seven point twenty-six inches in length, zero point ninety-nine inches in width, and nine point thirty-nine inches in height.
- Q: Who is the author of the book? A: The author is David Bressoud. He is known for his contributions to mathematics and education.
- Q: What category does this book belong to? A: This book belongs to the Number Theory category. It covers foundational and advanced topics in the field.
- Q: How can I use this book effectively? A: You can use this book for self-study or as a supplementary resource in academic courses. It encourages hands-on experimentation with computational techniques.
- Q: Is this book suitable for beginners in number theory? A: Yes, this book is suitable for beginners. It presents concepts in a clear and accessible manner, making it easy to follow.
- Q: What topics are covered in this book? A: The book covers traditional number theory topics, factoring algorithms, primality testing, and the RSA public-key cryptosystem, among others.
- Q: Can I use this book for academic courses? A: Yes, this book is ideal for academic courses in mathematics. It serves as a valuable resource for both students and educators.
- Q: How should I care for this hardcover book? A: To care for this hardcover book, store it in a cool, dry place and avoid exposing it to direct sunlight. Handle it gently to preserve its condition.
- Q: Is this book in good condition? A: Yes, this is a used book in good condition. It may show minor signs of wear but is still fully functional for reading and study.
- Q: What if I receive a damaged copy of the book? A: If you receive a damaged copy, you should contact the seller to arrange for a return or exchange. Most sellers have return policies in place.
- Q: Are there any special storage instructions for this book? A: No special storage instructions are necessary. Just keep it on a shelf or in a bookcase away from moisture and heat.
- Q: Is this book appropriate for advanced readers? A: Yes, advanced readers will find valuable insights and challenging topics in this book. It covers both foundational and advanced concepts.
- Q: Can this book help with understanding algorithms? A: Yes, the book explains many of the fastest algorithms for working with integers, making it a great resource for understanding computational techniques.
- Q: What if I have questions while reading the book? A: If you have questions while reading, consider seeking help from online forums or study groups focused on number theory to enhance your understanding.