Solving Application Problems
Solving application problems is a process that includes understanding the problem, translating it into an equation, solving the equation, checking the answer, and answering the question.
How to solve Application Problems
Problem Solving Application from Dio brings Digitalization as a Service (DaaS) and helps to provide Consistent Product & Process Quality.
This short and concise book only focuses on what is essential and nothing else. It works to quickly develop the reader’s understanding of differential and integral calculus. Spivak makes his writing on the main objective of the book – Stokes Theorem – painless and easy to grasp. Readers are encouraged to keep a pen and paper on hand to rewrite the proofs on their own. The book’s chapters are as follows: Functions on Euclidean Spaces, Differentiation, Integration, Integration on chains, and Integration on Manifolds. Spivak’s mathematical prowess is apparent by his ability to pack so much punch in only a small amount of pages. If you enjoyed Calculus by Spivak, you’ll love Calculus On Manifolds.
Serious math learners will be thrilled by the rigorous conciseness of this textbook. Dense with information on every page and presented in a relaxed, open manner, Dummit and Foote’s Abstract Algebra effectively works to usher the reader into a realm of sophisticated algebraic concepts and theories. It seamlessly bridges any gap between graduate and undergraduate studies. The book is chock-full of clear examples and succinct proofs, making it evident that the authors have no intention of keeping the reader on a particular topic any longer than is necessary. With countless exercises and examples, Abstract Algebra proves to be an invaluable tool that is undeniably worth the price.
Introduction to Algorithms is a distinctly theoretical but all-around comprehensive book. Its use is not only limited to those taking algorithms courses but can also be utilized by anyone as an extensive reference source. Readers will learn quintessential algorithms as well as concepts such as what makes an algorithm efficient and why. Students will need a bit of mathematical background to get from cover to cover, however those who are able to do so will be intrigued by the content depth and wide spectrum of topics covered. These topics run the gamut from classical algorithms to computational geometry.
Tenacious students in favor of stimulating study will love this book. Spivak’s prose is almost charming in the way that it thrusts readers into a challenge that advanced learners will be happy to take on. He forces them to rely on their own perspicacity and reason instead of a collection of random techniques and mechanics. Sophisticated readers will appreciate the style he uses to communicate and teach calculus while others may first want to opt for a more elementary text before attempting to penetrate the solidity of Spivak’s. This fourth edition includes additional problems and other minor changes not included in the third.
In Sacred Mathematics, Hidetoshi and Rothman present a tantalizing and detailed history of Sangaku puzzles that will keep the reader engaged for many hours. For those who are unfamiliar with the subject, sangakus are Japanese geometrical puzzles that were created on wooden tablets and hung in sacred temples and shrines. Readers will discover how the Japanese cleverly intertwined the mathematical, the spiritual, and the artistic to create their own cultural brand of geometry. Sangaku was formulated during an era before western influence had reached Japan. This makes it a unique and fascinating art that has attracted many mathematicians. The authors do a beautiful job of introducing the reader to Japanese culture and the mastery of the country’s sangakus mathematicians. This hardcover volume is rich of illustrations and would be a nice coffee table book.
Even those who are not particularly gifted or even proficient in mathematics will enjoy sitting down and studying from Calculus Made Easy. Thompson creates a warm, inviting environment where students will learn and grasp the true essence of calculus without any added fluff or overt technicality. Frustrated students who have sought after a compatible calculus aid to no avail will agree that this is a professional tool that is presented to the reader on the same wavelength. Thompson knows that math is hard. Rather than taking the standard approach that many use to confound and further bewilder students, he breaks calculus down into a form that is a lot less threatening.
In this follow-up to Volume I of his series, Apostol continues to lay the groundwork for calculus students with precision and ease. Where volume one helped establish the basics and form the reader’s understanding, volume two expands that knowledge in a way that demands full immersion into the text. Unlike other calculus books, this one is replete with substance. The author takes time to build and prove each theorem the way it ought to be done. Unlike many follow-up math books, this one never mindlessly repeats the same material. Instead, it vigorously moves ahead into new territory involving the use of multi-variables and advanced applications.
We cover all types of math problems
Really helpful and very accurate. It shows how to get there and every solution and even a graph, when possible! Really good for checking your work and finding where you made your mistakes
This app is why I'm passing math class, I love it! Although it doesn't have all the answers it is easy to use and mostly accurate. I also love how it has the answers to some matchbooks. This app is amazing!