Some of the material in is restricted to members of the community. By logging in, you may be able to gain additional access to certain collections or items. If you have questions about access or logging in, please use the form on the Contact Page.
Some of the material in is restricted to members of the community. By logging in, you may be able to gain additional access to certain collections or items. If you have questions about access or logging in, please use the form on the Contact Page.
This folder contains rough calculations with action-angle variables. These are used to solve for rotation or oscillation without calculating the equations of motion.
Letter from William Westall to Edmund Downey, August 15, 1887
Description:
William Westall acknowledges Edmund Downey's business endeavours and wishes him prosperity in the matter. He discusses his work on a new story and says it may be ready for appearance in December or January.
The purpose of this randomized controlled trial was to evaluate elementary-aged students' writing fluency growth in response to (a) instructional practices, (b) sex differences, and (c) student's initial level of writing fluency. Third...
The notebook contains proofs of definite integrals of trigonometric series, vector equations, Bessel harmonics and, spherical harmonics. These proofs contain equation examples and the definitions of the different theorems behind the...
This folder includes many topics in quantum mechanics such as vectors, spinning particles, quantization notes, and equations of motion. There also seems to be plans for a quantum mechanics lecture and some official Cambridge documents...
This study examined dimensions of written composition by using multiple evaluative approaches such as an adapted 6 + 1 trait scoring, syntactic complexity measures, and productivity measures. It further examined unique relations of oral...
This folder has a variety of subjects, it contains proofs and definitions for topics such as general field theory, factor groups, and motion of a surface by itself.
This folder has multiple topics shown by proofs and definitions, such as the forces applied to a particle in free space, and the momentum created by these forces. There is also a section on how the electrons behave in a field of...
This folder deals with spinors that take up more than 2 dimensions, which is called Hilbert Space. The folder has a number of proofs on the vectors that take up an infinite number of dimensions.
This folder deals with spinors that take up more than 2 dimensions, which is called Hilbert Space. The folder has a number of proofs on the vectors that take up an infinite number of dimensions.
The general idea of this folder seems to be based on a matrix code broken down into 4 groups; m_12, m_30, m_1-, and m_2- . This matrix code is then broken down into two different "schemes" which show the proofs and a small explanation...
Mary Russell Mitford writes that she has received her manuscripts with comments from a friend. She says that she has worked hard although she is sick with influenza, and is afraid she might die before it is finished. She says she will...
Much of this folder seems to be related to how a vacuum effects the velocity of a wave. Dirac points out that the the vacuum has a large effect on the velocity. Some other topics discussed in the folder are,
None of the writing found in this folder is in Dirac's handwriting. It is assumed to be Erwin Schrodinger's. This folder contains a partial letter from Schrodinger to Dirac about a formula for stellar mass. The letter includes the proof...
This folder is a large melting pot of anything and everything including lecture notes for displacement caused by rotation, proofs of linear and quadratic equations, and groups of proofs that have no explanations.
Learning to write the letters of the alphabet is an important part of learning how to write conventionally. In this study, we investigated critical factors in the development of letter-writing skills using exploratory item response...
A large group of calculations on a variety of topics. Self energy of photons using angular acceleration, wave function, fundamental interactions at high energy, Lorentz's force, and Maxwell's equation are all topics present within the...
This is a proof of how homogeneous moments relate to classical mechanics equations, in specific the Hamilton-Jacobi equation. Includes an example of harmonic oscillators.
This shows four different bases for what appears to be lagrangian field theory. The bases include the different functions of each base and what purpose the different bases serve.
Notes on waves inside Conformal Space, which comes from conformal geometry, as well as proofs that highlight the breakdown of Conformal spaces and how the waves then fit inside them. This folder also includes a section on developments in...
This is a compilation of many different topics including math, science, physics, and engineering with varying topics such as thermodynamics, wave functions, genetics, transfer of heat and transfer of energy.
Non-Orthogonal Wave Functions is a repeating topic in this folder. Orthogonality is the relation of two lines (waves in this case) that come to a right angle. What seperates this from perpendicular lines (waves) is that orthogonal lines...
A set of proofs on a variety of subjects in quantum mathematics and physics, including moments applied by waves, interaction between protons and neutrons and their impact on the calculation of nuclear forces, and how the total surface...
A continuation of the notes from folder 8 written at a later date. The notes at the end of the proof shows how the invariant integral relates to wave function.
This folder contains some proofs of how Schrodinger found the bases of wave mechanics, which is a theory that calculates atomic spectra. This folder also discusses the physical reality of waves and the particles within them.
Some of the material in is restricted to members of the community. By logging in, you may be able to gain additional access to certain collections or items. If you have questions about access or logging in, please use the form on the Contact Page.