Products related to Conjecture:
-
Beal's Conjecture
Price: 11.11 £ | Shipping*: 3.99 £ -
Uncle Petros and Goldbach's Conjecture
Uncle Petros is a family joke. An ageing recluse, he lives alone in a suburb of Athens, playing chess and tending to his garden.If you didn't know better, you'd surely think he was one of life's failures.But his young nephew suspects otherwise. For Uncle Petros, he discovers, was once a celebrated mathematician, brilliant and foolhardy enough to stake everything on solving a problem that had defied all attempts at proof for nearly three centuries - Goldbach's Conjecture. His quest brings him into contact with some of the century's greatest mathematicians, including the Indian prodigy Ramanujan and the young Alan Turing.But his struggle is lonely and single-minded, and by the end it has apparently destroyed his life.Until that is a final encounter with his nephew opens up to Petros, once more, the deep mysterious beauty of mathematics.Uncle Petros and Goldbach's Conjecture is an inspiring novel of intellectual adventure, proud genius, the exhilaration of pure mathematics - and the rivalry and antagonism which torment those who pursue impossible goals.
Price: 9.99 £ | Shipping*: 3.99 £ -
Math Girls 6 : The Poincare Conjecture
This sixth entry in the highly acclaimed Math Girls series focuses on the Poincare Conjecture, a fundamental problem in topology first proposed in 1904. While the problem is simply stated and easily understood, it resisted proof throughout the twentieth century. Russian mathematician Grigori Perelman finally completed that effort, publishing a series of papers in 2002 that provided missing details for an argument that includes a solution. In this book, you will join Miruka and friends as they learn about topology from its very beginnings: the Seven Bridges of Konigsberg problem that Leonhard Euler investigated in 1736. After that you will learn about interesting objects like the Mobius strip and the Klein bottle, topological spaces and continuous mappings, homeomophism and homotopy, and non-Euclidean geometries. Along the way, you will also learn about differential equations, Fourier series, the heat equation, and a trigonometric training regimen. The book concludes with an introduction to Hamilton's Ricci flow, a crucial tool in Perelman's work on the Poincare Conjecture. Math Girls 6: The Poincare Conjecture has something for anyone interested in mathematics, from advanced high school to college students and educators.
Price: 22.95 £ | Shipping*: 3.99 £ -
Point-Counting and the Zilber-Pink Conjecture
Point-counting results for sets in real Euclidean space have found remarkable applications to diophantine geometry, enabling significant progress on the Andre-Oort and Zilber-Pink conjectures.The results combine ideas close to transcendence theory with the strong tameness properties of sets that are definable in an o-minimal structure, and thus the material treated connects ideas in model theory, transcendence theory, and arithmetic.This book describes the counting results and their applications along with their model-theoretic and transcendence connections.Core results are presented in detail to demonstrate the flexibility of the method, while wider developments are described in order to illustrate the breadth of the diophantine conjectures and to highlight key arithmetical ingredients.The underlying ideas are elementary and most of the book can be read with only a basic familiarity with number theory and complex algebraic geometry.It serves as an introduction for postgraduate students and researchers to the main ideas, results, problems, and themes of current research in this area.
Price: 95.00 £ | Shipping*: 0.00 £
-
What is the Kepler Conjecture?
The Kepler Conjecture is a mathematical problem proposed by German astronomer and mathematician Johannes Kepler in 1611. It deals with the most efficient way to pack spheres in a container, such as a box or a crate. The conjecture states that the most efficient way to pack spheres is in a pyramid-like arrangement, with each sphere touching a certain number of neighboring spheres. The conjecture was finally proven by American mathematician Thomas Hales in 1998, using complex computer-assisted methods. The Kepler Conjecture has important implications in fields such as materials science and engineering, where efficient packing of spheres is crucial.
-
What is the Collatz Conjecture?
The Collatz Conjecture is a mathematical problem that involves iterating a simple algorithm. The conjecture states that for any positive integer n, if n is even, divide it by 2, and if n is odd, multiply it by 3 and add 1. Repeat this process with the resulting number, and it will eventually reach the value of 1. While the conjecture has been tested for extremely large numbers and holds true, it has not been proven for all numbers, making it an unsolved problem in mathematics.
-
What is the induction conjecture of KKM 1?
The induction conjecture of KKM 1 states that if a certain property holds for a collection of sets of size k, then it also holds for a collection of sets of size k+1. In other words, if we can prove a property for k sets, then we can extend that proof to k+1 sets. This conjecture is an important part of the KKM theory, which deals with the existence of solutions to systems of inequalities and has applications in various fields such as economics, game theory, and mathematical optimization.
-
Why is the Goldbach Conjecture so difficult to prove?
The Goldbach Conjecture is difficult to prove because it involves all even numbers greater than 2 being expressed as the sum of two prime numbers. Prime numbers are inherently unpredictable and do not follow a specific pattern, making it challenging to find a general method to express all even numbers as the sum of two primes. Additionally, the conjecture has been tested for extremely large numbers without any counterexamples being found, adding to its credibility and complexity. The sheer number of possibilities and combinations to consider when trying to prove the conjecture also contributes to its difficulty.
Similar search terms for Conjecture:
-
Associate Professor Akira Takatsuki's Conjecture, Vol. 5 (manga)
University student Naoya Fukamachi has the ability to unerringly detect lies.He finds himself working for his eccentric associate professor of folklore studies, Akira Takatsuki, to investigate the supernatural.After closing the case on the eerie mystery of 4:44, the two head to the sea following reports of mermaid sightings.Then one summer evening, they find themselves tumbling into the candlelit horror of “The Night of One Hundred Ghost Stories!”
Price: 10.99 £ | Shipping*: 3.99 £ -
Associate Professor Akira Takatsuki's Conjecture, Vol. 1 (manga)
Naoya Fukamachi is a university student whose ability to infallibly detect lies has left him friendless and isolated.When a paper of his piques the interest of his folklore studies professor Akira Takatsuki, a handsome and eccentric man, he soon finds himself dragged into Akira’s research.Now, as the assistant in charge of common sense, he must help his professor interpret an array of unexplainable phenomena…
Price: 10.99 £ | Shipping*: 3.99 £ -
Associate Professor Akira Takatsuki's Conjecture, Vol. 2 (manga)
Can the mystery-loving associate professor be a cursed young lady's savior????Naoya Fukamachi is a university student with the ability to detect lies, and he's ended up with a part-time job investigating odd happenings with associate professor Akira Takatsuki.What spine-chilling secret will they discover hiding behind the case of the young woman who spits needles??
Price: 10.99 £ | Shipping*: 3.99 £ -
Associate Professor Akira Takatsuki's Conjecture, Vol. 3 (manga)
One day, Fukamachi catches a cold and loses his mysterious ability to distinguish lies.While he is out of commission, Professor Takatsuki at an event where he meets an actress who claims she can see ghosts!How will Takatsuki fare in an investigation of her haunted studio without his erstwhile lie-detector...?
Price: 10.99 £ | Shipping*: 3.99 £
-
How can I prove my conjecture about this e-function?
To prove your conjecture about the e-function, you can use mathematical induction, which is a method of mathematical proof that is commonly used to establish that a given statement is true for all natural numbers. You can also use the properties of the e-function, such as its derivative and integral properties, to provide evidence for your conjecture. Additionally, you can use numerical methods to test your conjecture for a range of values and see if it holds true.
-
What are the Riemann hypothesis, the Poincaré conjecture, and Fermat's last theorem?
The Riemann hypothesis is a famous unsolved problem in mathematics that deals with the distribution of prime numbers. It states that all non-trivial zeros of the Riemann zeta function have a real part of 1/2. The Poincaré conjecture, solved by Grigori Perelman in 2003, is a fundamental problem in topology that deals with the classification of three-dimensional shapes. It states that any simply connected, closed, three-dimensional manifold is homeomorphic to a three-dimensional sphere. Fermat's last theorem, proved by Andrew Wiles in 1994, is a famous problem in number theory that states that there are no three positive integers a, b, and c that satisfy the equation a^n + b^n = c^n for any integer value of n greater than 2.
-
Does market research hinder innovation in business administration?
Market research does not necessarily hinder innovation in business administration. In fact, it can provide valuable insights into consumer needs and preferences, helping businesses to develop innovative products and services that meet market demands. By understanding market trends and customer behavior, businesses can identify opportunities for innovation and stay ahead of competitors. However, relying too heavily on market research without allowing room for creativity and risk-taking can limit the potential for groundbreaking innovations. It is important for businesses to strike a balance between leveraging market research and fostering a culture of innovation to drive success in business administration.
-
What is Digital Technology 2?
Digital Technology 2 is a course that builds upon the foundational concepts introduced in Digital Technology 1. It delves deeper into topics such as programming, web development, data analysis, and cybersecurity. Students will further develop their skills in using digital tools and technologies to solve real-world problems and gain a more advanced understanding of how technology impacts society. The course aims to prepare students for a career in the rapidly evolving field of digital technology.
* All prices are inclusive of VAT and, if applicable, plus shipping costs. The offer information is based on the details provided by the respective shop and is updated through automated processes. Real-time updates do not occur, so deviations can occur in individual cases.