Showing papers in "American Mathematical Monthly in 1933"
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TL;DR: The American Mathematical Monthly (AMM) Vol. 40, No. 9, pp. 547-548 as discussed by the authors is a collection of questions, discussions, and notes.
Abstract: (1933). Questions, Discussions, and Notes. The American Mathematical Monthly: Vol. 40, No. 9, pp. 547-548.
14 citations
TL;DR: A New Bound for the Zeros of Polynomials as mentioned in this paper was the first attempt to define a new bound for the zeros of polynomials, and it was published in the American Mathematical Monthly: Vol. 40, No. 1, pp 18-23.
Abstract: (1933). A New Bound for the Zeros of Polynomials. The American Mathematical Monthly: Vol. 40, No. 1, pp. 18-23.
TL;DR: In this paper, the authors introduce the first-order linear differential equation and its application in systems of linear differential equations and their application in various physical and non-physical problems, such as Fourier series and boundary value problems.
Abstract: 1. Introduction to Differential Equations. 2. First-Order Equations. 3. Second and Higher-Order Linear Differential Equations. 4. Some Physical Applications of Linear Differential Equations. 5. Power Series Solutions of Differential Equations. 6. Laplace Transforms. 7. Introduction to Systems of Linear Differential Equations and Applications. 8. Numerical Methods. 9. Matrix Methods for Systems of Differential Equations. 10. Nonlinear Equations and Stability. 11. Fourier Series and Boundary Value Problems. 12. Partial Differential Equations. Appendices.
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TL;DR: In this paper, the development of the fundamental concepts of infinitesimal analysis is discussed, and a discussion of the application of finite analysis in the context of infinite analysis is presented.
Abstract: (1933). The Development of the Fundamental Concepts of Infinitesimal Analysis. The American Mathematical Monthly: Vol. 40, No. 5, pp. 269-281.
TL;DR: In this article, Projective Differential Geometry (PDG) has been studied in the context of the American Mathematical Monthly (AMMUM), Vol. 40, No. 10P1, pp. 568-579.
Abstract: (1933). Projective Differential Geometry. The American Mathematical Monthly: Vol. 40, No. 10P1, pp. 568-579.
TL;DR: The Product of a Circulant Matrix and a Special Diagonal Matrix as discussed by the authors is a special diagonal matrix which is the product of a regular matrix and a special diagonal matrix.
Abstract: (1933). The Product of a Circulant Matrix and a Special Diagonal Matrix. The American Mathematical Monthly: Vol. 40, No. 1, pp. 23-25.