Company Filing History:
Years Active: 2019-2024
Title: Innovations of Dariush Afshar
Introduction
Dariush Afshar is a notable inventor based in Campbell, California. He has made significant contributions to the field of mathematics through his innovative systems and methods for representing and solving mathematical problems. With a total of six patents to his name, Afshar's work has the potential to enhance educational tools and user interaction with mathematical concepts.
Latest Patents
Afshar's latest patents include "Systems and methods of representing and solving mathematical problems." This invention describes a computer-implemented method and system that allows users to interact with both symbolic and pictorial representations of mathematical problems. The graphical user interface features a symbolic section that includes a symbolic representation of the problem and a pictorial section that visually represents the same problem. Users can input data, and the interface modifies the sections to ensure they track each other, facilitating problem-solving.
Another significant patent is titled "Systems and methods of representing and solving algebraic problems." This instructional system utilizes a graphical user interface that displays a primary cog and a secondary cog. The secondary cog's rotation influences the primary cog, allowing users to represent and solve algebraic problems interactively. The method includes receiving user input and rotating the secondary cog to achieve a solution when a specific tooth of the primary cog reaches a predefined location.
Career Highlights
Dariush Afshar has worked with several companies, including Brainquake Inc and I4vu, Inc. His experience in these organizations has contributed to his development as an inventor and innovator in the field of mathematics.
Collaborations
Afshar has collaborated with notable individuals such as Pamela Briskman and Keith Devlin. These partnerships have likely enriched his work and expanded the impact of his inventions.
Conclusion
Dariush Afshar's contributions to mathematical problem-solving through innovative patents demonstrate his commitment to enhancing educational tools. His work continues to influence how users interact with mathematical concepts, paving the way for future advancements in the field.