Title
Ordinary Differential Equations (Mit Press),New
Sold by Ergodebooks, an authorized reseller.
Returns accepted within 30 days | support@ergodebooks.com
Shipping Information
- Free Standard Shipping — United States only
- Processing Time: 3–5 business days
- Estimated Delivery: 6–10 business days after dispatch
- Double-boxed, fully insured & discreetly packaged
- Tracking number sent via email once dispatched
Returns & Refund
Returns accepted within 30 days of delivery.
Damaged or Defective Item
Free return shipping + replacement or full refund
Wrong Item Received
Free return shipping + replacement or full refund
Change of Mind
Return shipping at customer's expense · 25% restocking fee applies
Few Books On Ordinary Differential Equations (Odes) Have The Elegant Geometric Insight Of This One, Which Puts Emphasis On The Qualitative And Geometric Properties Of Odes And Their Solutions, Rather Than On Routine Presentation Of Algorithms.
⚠️ WARNING (California Proposition 65):
This product may contain chemicals known to the State of California to cause cancer, birth defects, or other reproductive harm.
For more information, please visit www.P65Warnings.ca.gov.
- Q: How many pages does this book contain? A: This book has two hundred eighty pages. It provides a comprehensive exploration of Ordinary Differential Equations with a focus on geometric insights.
- Q: What are the dimensions of this book? A: This book measures nine point zero six inches in length, five point nine five inches in width, and zero point seven nine inches in height. These dimensions make it easy to handle and store.
- Q: What type of binding does this book have? A: This book is available in paperback binding. Paperback is lightweight and flexible, ideal for both reading and carrying.
- Q: Who is the author of this book? A: The author of this book is V.I. Arnold. He is known for his insightful contributions to the field of mathematics, particularly in differential equations.
- Q: What is the primary subject of this book? A: This book focuses on Ordinary Differential Equations. It emphasizes qualitative and geometric properties rather than just algorithms.
- Q: Is this book suitable for beginners? A: Yes, this book is suitable for beginners. It offers insights that make complex concepts more accessible to those new to Ordinary Differential Equations.
- Q: Can this book be used as a reference for advanced studies? A: Yes, this book can serve as a reference for advanced studies. Its emphasis on geometric insights provides depth for more experienced learners.
- Q: What age group is this book appropriate for? A: This book is appropriate for high school students and above. It is designed for those with an interest in mathematics and differential equations.
- Q: How should I care for this book? A: To care for this book, keep it in a dry, cool place away from direct sunlight. This helps preserve the binding and pages.
- Q: Can I write in this book? A: Yes, you can write in this book. Many readers find it helpful to make notes in the margins for better understanding.
- Q: What should I do if my book arrives damaged? A: If your book arrives damaged, you should contact customer support for a return or exchange. They usually have a straightforward process for handling such issues.
- Q: Is there a warranty for this book? A: No, this book does not come with a warranty. However, most retailers offer return policies for damaged items.
- Q: Can I find this book in libraries? A: Yes, this book is likely available in many academic and public libraries. It's a common reference for students studying differential equations.
- Q: How can I improve my understanding of the concepts in this book? A: To improve understanding, work through the examples provided and consider discussing concepts with peers or instructors. Supplementing with additional resources can also help.
- Q: What makes this book different from other books on differential equations? A: This book stands out for its elegant geometric insight into Ordinary Differential Equations. It focuses on qualitative properties rather than just algorithms.
- Q: Is this book recommended for self-study? A: Yes, this book is highly recommended for self-study. Its clear explanations and emphasis on geometric understanding allow for effective independent learning.