Kaleidocycles are flexible polyhedral structures composed of rigid tetrahedra connected along their edges to form rotating ...

Simulating the nonlinear optical physics that underlies ultrafast laser systems is computationally demanding—a practical ...

As chemical engineering curricula increasingly integrate computational tools, the traditional acid-base titration lab is ...

Burt earned bachelor’s degrees in electrical engineering and modern languages from the University of Lowell in 1988 and a PhD in applied mathematics from Northwestern University in 1994. He joined WPI ...

Frank Merle is used to confronting a messy world. He works on the mathematics of highly nonlinear systems—ones that respond in dramatic, unpredictable ways to even the smallest changes. It’s the same ...

In this video I will work through 22 different examples of solving two-step equations using a worksheet I created for my students. I will use the properties of equality, inverse operations, and ...

Abstract: In this technical article, to seek the optimal solution to time-dependent nonlinear optimization subject to linear inequality and equality constraints (TDNO-IEC), the gradient-based ...

Adam Hayes, Ph.D., CFA, is a financial writer with 15+ years Wall Street experience as a derivatives trader. Besides his extensive derivative trading expertise, Adam is an expert in economics and ...

The nonlinear partial differential equations are not only used in many physical models, but also fundamentally applied in the field of nonlinear science. In order to solve certain nonlinear partial ...

Even as a practitioner who works with autistic women, and as an autistic woman myself, understanding what exactly autism spectrum disorder is can be difficult. We tend to think of spectrums in terms ...

Abstract: Many authors suggested methods to solve nonlinear equations. Each of these methods has its advantages and disadvantages. In this work, we chose some methods with low cost and high accuracy ...