In 1982, the Belgian Pilots' Guild raised the question of what effect exposure to radar radiation--for example, that encountered in passing a pilot launch's radar--might have on the human body. Recapitulating investigations of this question, this article states that in 25 years of experience with radar, there have been no known incidents of pilots being affected by radar waves. In the future, however, involvement by some pilots with Vessel Traffic Service shore-based radar could affect pilots somewhat differently from limited exposure to pilot launch radar. Pilots who find themselves in new working conditions close to an emitting source should exercise care all times.

About heat waves

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Introduction To Perturbation Techniques

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Perturbation Methods In Applied Mathematics

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Pre-service teacher training is one of the most important aspects of every teacher’s education curriculum as it prepares student-teachers to become qualified teachers in the future. This paper explored the pre-service teacher training programs in the Philippines through the practicum experience of the 21 junior and senior BSEd and BA English student-teachers from a private university in Mindanao, Philippines. Data were taken from classroom observations, group interview, and modified questionnaire. The findings revealed that there was a different standard policy of pre-service teacher training programs for BSEd and BA English. While BSEd-English concentrated on developing professional teachers for secondary schools, BA-English focused on developing not just teachers but professionals with exceptional communication skills. The student-teachers also reported some challenges in practicum teaching; classroom management, teaching confidence, and lack of teaching resources. Some solutions to overcome the challenges were suggested.

https://efljournal.org/index.php/efljournal/article/download/23/pdf

Pre-service Teacher Training Programs in the Philippines: The Student-teachers Practicum Teaching Experience

Teacher education programs are designed to develop professionals who are prepared to meet the challenges of the 21st century classrooms and workplace. To this end, the teacher education program must aim to develop the knowledge, skills and attributes of pre-service teachers to prepare them to teach effectively in the schools systems. It is, therefore, argued that the academic program of the teacher education should be coupled with an important and integral component called school -based experiences i.e. practicum which provides students with supervised experiences and help the student teachers to understand the full scope of teachers role. Many have also suggested that these experiences are very powerful in shaping pre-service teachers as they are real in contrast to the artificial environment of the tertiary education courses. Hence, the purpose of this paper is to address the need of and justification for school based practicum experience. Attempt was also made to show the current debates and future direction of practicum in teacher education.

/pdf/practicum-experience-in-teacher-education-3i2zkup5dt.pdf

Practicum Experience In Teacher Education

The quadratic Riccati differential equations are part of non-linear differential equations which have many applications. This paper introduces the classical fourth order Runge Kutta method (RK4) for solving the numerical solution of the quadratic Riccati differential equations. To validate the applicability of the method on the proposed equation, some model examples have been solved for different values of mesh sizes. The numerical results in terms of point wise absolute errors presented in tables and graphs show that the present method approximates the exact solution very well.

Numerical solution of quadratic Riccati differential equations

https://cyberleninka.org/article/n/391335.pdf

Terminal boundary-value technique for solving singularly perturbed delay differential equations

In this paper, we presented numerical method for solving singularly perturbed delay differential equations with layer or oscillatory behaviour for which a small shift (δ) is in the reaction term. First, the given singularly perturbed delay reaction-diffusion equation is converted into an asymptotically equivalent singularly perturbed two point boundary value problem and then solved by using fourth order finite difference method. The stability and convergence of the method has been investigated. The numerical results have been tabulated and further to examine the effect of delay on the boundary layer and oscillatory behavior of the solution, graphs have been given for different values of δ. Both theoretical and numerical rate of convergence have been established and are observed to be in agreement for the present method. Briefly, the present method improves the findings of some existing numerical methods in the literature.

Numerical Solution of Singularly Perturbed Delay Reaction-Diffusion Equations with Layer or Oscillatory Behaviour

In this paper, fourth order stable central difference method is presented for solving self-adjoint singular perturbation problems for small values of perturbation  parameter, e . First, the given differential equation was reduced to its conventional form and then it was transformed into linear system of algebraic equations in the form of a three-term recurrence relation, which can easily be solved by using Thomas Algorithm. To validate the applicability of the method, four model examples have been solved for different values of perturbation parameter and mesh sizes. The numerical results are tabulated and compared with some of the previous findings reported in the literature and it is observed that the present method is more efficient. Graphs are also depicted in support of the numerical results. Both theoretical error bounds and numerical rate of  convergence have been established for the method. Key Words/Phrases: Singular perturbation; stable central difference method;  self-adjoint.

/pdf/fourth-order-stable-central-difference-method-for-self-93x0o4qp1q.pdf

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Papers

Practicum Experience In Teacher Education

Numerical solution of quadratic Riccati differential equations

Terminal boundary-value technique for solving singularly perturbed delay differential equations

Numerical Solution of Singularly Perturbed Delay Reaction-Diffusion Equations with Layer or Oscillatory Behaviour

Fourth-order stable central difference method for self-adjoint singular perturbation problems