Jim M Gayed is a rint of CA. Lookup the home addrs and phone 3105589856 and other ntact tails for this person
Contents:
- THE MAURICE H. GAYED FAMILY LIVING TRUST, DATED MAY 24, 1994
- JIM M GAYED LA, AGE 50
- JIM GAYED
- JAM MRICE GAYED
THE MAURICE H. GAYED FAMILY LIVING TRUST, DATED MAY 24, 1994
USPTO patent applitns submted by and patents granted to Jam Mrice Gayed * james maurice gayed *
All all, the were the only known class of polyhedron that were equilateral, that is, wh edg of equal length; nvex, meang they did not have nve nts on their surfac; and wh the high symmetry displayed by the Platonic rearchers Stan Sche and Jam Mrice Gayed at the Universy of California, Los Angel, have disvered what they said is a fourth class of nvex equilateral polyhedra wh polyhedral symmetry.
JIM M GAYED LA, AGE 50
On 06/17/2022 THE MAURICE H GAYED FAMILY LIVING TRUST, DATED MAY 24, 1994 filed a Probate - Tst urt se Los Angel County Superr Courts. Court rerds for this se are available om Stanley Mosk Courthoe. * james maurice gayed *
The g often lled Goldberg polyhedra generally do not have flat planar tkerg wh the angl the hexagons Goldberg g, Sche and Gayed found was possible to nstct shap that were geometrilly polyhedral. So, this newly disvered group of polyhedra by nroscientists Stan Sche and Jam Gayed have the followg attribut:. Stan Sche (left) and Jam Gayed (right).
The Sche-Gayed Innovatn.
JIM GAYED
Property tails for 2463 Sawtelle Blvd, loted Los Angel, California. This property is owned by Mrice & Nabila Gayed. * james maurice gayed *
So, basilly what Sche and Gayed did was they took a prevly known group of ‘Goldberg g’ wh isahedral, octahedral and tetrahedral symmetry, scribed back 1937 by mathematician Michael Goldberg, and modified them. Sche and Gayed worked out the necsary math and modified the Goldberg g to be both planar and equilateral, th nvex equilateral Golrg polyhedra wh polyhedral symmetry! Gizmodo: “Disvered by UCLA nroscientist Stan Sche and UCLA nroscientist Jam Gayed, Goldberg polyhedra (pictured left) do have sis that are all the same length, but s polygonal fac have equal angl.
JAM MRICE GAYED
* james maurice gayed *
Doubly false- Sche-Gayed versns of the Goldberg Polyhedra were on the right (not the left) and the fac do not have equal angl. Another tratg aspect of this is the outright dismissal by some sourc of Sche and Gayed’s fdgs. But so on the bright si, which really is the si we should be focg on, Sche and Gayed’s origal paper on the topic was easy to fd, an excellent read, and along wh was Stan Sche’s e-mail addrs.