Illuminating Undergraduate Experiential and Situated Learning in Podiatry Clinical Placement Provision at a UK School of Podiatric Medicine

Purpose Situated and experiential learning methodologies are largely under researched in relation to student experience and satisfaction. This research aimed to illuminate the perspectives of students studying on a BSc (Hons) Podiatry degree programme to establish perceptions of their experience in practice. Design/Methodology/Approach Using an Interpretivist methodological framework, Free Association Narrative Interviewing (FANI) was used to provide an insight into the perceived impact that experiential learning in clinical placements had on undergraduate podiatry students. Findings Students perceived that what could not be taught but what could be experienced, contributed much to the confidence that students had gained during their training and which they anticipated would be further developed during the initial years of their training in practice, particularly in the context of the NHS. Research Limitations/Implications This is a study from which it is acknowledged that within the underpinning research design and methodology there is no scope for generalisability. Practical Implications The study highlights an appreciation for the implication and recognition of ‘tacit’ knowledge, currently recognised in medical curricula as an asset which can aid a move towards higher order critical thinking skills. Social Implications Student acknowledgement of the need for emphasis on ‘soft skills’ can be posited, in the context of this small scale study as an appreciation for affective domain learning in the context of podiatric academic and clinical curricula. Originality/Value Limited information from the extant literature is available in relation to the illumination of podiatry student placement experiences, so this research contributes to an effectively under-researched field

Life and Seoul of the Party: South Korea’s Brief Occupation under Communist North Korea

This thesis analyzes the North Korean occupation of Seoul through the oral histories of the men and women who experienced the event. At the beginning of the Korean War, North Korean forces successfully captured and held the South Korean capital for three months. Despite the occupation’s interesting premise, it has received little attention from Korean War scholars. Interviews with the people who lived through the Korean War though, demonstrate that from their point of view, the occupation was a particularly significant part of their war experience

Alien Registration- Graham, Catherine (Bangor, Penobscot County)

https://digitalmaine.com/alien_docs/11670/thumbnail.jp

Apollonian Circle Packings: Geometry and Group Theory III. Higher Dimensions

This paper gives $n$-dimensional analogues of the Apollonian circle packings in parts I and II. We work in the space \sM_{\dd}^n of all $n$-dimensional oriented Descartes configurations parametrized in a coordinate system, ACC-coordinates, as those $(n+2) \times (n+2)$ real matrices \bW with \bW^T \bQ_{D,n} \bW = \bQ_{W,n} where $Q_{D,n} = x_1^2 +... + x_{n+2}^2 - \frac{1}{n}(x_1 +... + x_{n+2})^2$ is the $n$-dimensional Descartes quadratic form, $Q_{W,n} = -8x_1x_2 + 2x_3^2 + ... + 2x_{n+2}^2$, and \bQ_{D,n} and \bQ_{W,n} are their corresponding symmetric matrices. There are natural actions on the parameter space \sM_{\dd}^n. We introduce $n$-dimensional analogues of the Apollonian group, the dual Apollonian group and the super-Apollonian group. These are finitely generated groups with the following integrality properties: the dual Apollonian group consists of integral matrices in all dimensions, while the other two consist of rational matrices, with denominators having prime divisors drawn from a finite set $S$ depending on the dimension. We show that the the Apollonian group and the dual Apollonian group are finitely presented, and are Coxeter groups. We define an Apollonian cluster ensemble to be any orbit under the Apollonian group, with similar notions for the other two groups. We determine in which dimensions one can find rational Apollonian cluster ensembles (all curvatures rational) and strongly rational Apollonian sphere ensembles (all ACC-coordinates rational).Comment: 37 pages. The third in a series on Apollonian circle packings beginning with math.MG/0010298. Revised and extended. Added: Apollonian groups and Apollonian Cluster Ensembles (Section 4),and Presentation for n-dimensional Apollonian Group (Section 5). Slight revision on March 10, 200

Apollonian Circle Packings: Geometry and Group Theory I. The Apollonian Group

Apollonian circle packings arise by repeatedly filling the interstices between four mutually tangent circles with further tangent circles. We observe that there exist Apollonian packings which have strong integrality properties, in which all circles in the packing have integer curvatures and rational centers such that (curvature)$\times$(center) is an integer vector. This series of papers explain such properties. A {\em Descartes configuration} is a set of four mutually tangent circles with disjoint interiors. We describe the space of all Descartes configurations using a coordinate system \sM_\DD consisting of those $4 \times 4$ real matrices \bW with \bW^T \bQ_{D} \bW = \bQ_{W} where \bQ_D is the matrix of the Descartes quadratic form $Q_D= x_1^2 + x_2^2+ x_3^2 + x_4^2 -{1/2}(x_1 +x_2 +x_3 + x_4)^2$ and \bQ_W of the quadratic form $Q_W = -8x_1x_2 + 2x_3^2 + 2x_4^2$. There are natural group actions on the parameter space \sM_\DD. We observe that the Descartes configurations in each Apollonian packing form an orbit under a certain finitely generated discrete group, the {\em Apollonian group}. This group consists of $4 \times 4$ integer matrices, and its integrality properties lead to the integrality properties observed in some Apollonian circle packings. We introduce two more related finitely generated groups, the dual Apollonian group and the super-Apollonian group, which have nice geometrically interpretations. We show these groups are hyperbolic Coxeter groups.Comment: 42 pages, 11 figures. Extensively revised version on June 14, 2004. Revised Appendix B and a few changes on July, 2004. Slight revision on March 10, 200

Future of digital technology in paramedic practice:blue light of discernment in responsive care for patients?

This discussion explores the significance of digital technology to responsive patient care in applied paramedic practice. The authors' previous research identified the relative ambiguity of the role of digital technology in facilitating and supporting patients in practice, and the findings revealed the relative transferability of this finding to wider allied healthcare clinical and professional practice. The discussion encompasses two key debates, namely a) How best the quality of the digital technology patients engage with can be discerned with regard to the vast availability of information and b) what the fundamental pedagogical implications to the way paramedic education in the UK is currently delivered might be in relation to equipping the future paramedic workforce to empower patients and their families and carers in emergency situations. The discussion paper concludes with an overview of the tensions that unregulated apps pose in practice and how engaging with the public about the use of digital technology could be a key aspect for review in UK undergraduate curricula and staff development

Compact fusion

There are many advantages to writing functional programs in a compositional style, such as clarity and modularity. However, the intermediate data structures produced may mean that the resulting program is inefficient in terms of space. These may be removed using deforestation techniques, but whether the space performance is actually improved depends upon the structures being consumed in the same order that they are produced. In this paper we explore this problem for the case when the intermediate structure is a list, and present a solution. We then formalise the space behaviour of our solution by means of program transformation techniques and the use of abstract machines

Apollonian Circle Packings: Geometry and Group Theory II. Super-Apollonian Group and Integral Packings

Apollonian circle packings arise by repeatedly filling the interstices between four mutually tangent circles with further tangent circles. Such packings can be described in terms of the Descartes configurations they contain. It observed there exist infinitely many types of integral Apollonian packings in which all circles had integer curvatures, with the integral structure being related to the integral nature of the Apollonian group. Here we consider the action of a larger discrete group, the super-Apollonian group, also having an integral structure, whose orbits describe the Descartes quadruples of a geometric object we call a super-packing. The circles in a super-packing never cross each other but are nested to an arbitrary depth. Certain Apollonian packings and super-packings are strongly integral in the sense that the curvatures of all circles are integral and the curvature$\times$centers of all circles are integral. We show that (up to scale) there are exactly 8 different (geometric) strongly integral super-packings, and that each contains a copy of every integral Apollonian circle packing (also up to scale). We show that the super-Apollonian group has finite volume in the group of all automorphisms of the parameter space of Descartes configurations, which is isomorphic to the Lorentz group $O(3, 1)$.Comment: 37 Pages, 11 figures. The second in a series on Apollonian circle packings beginning with math.MG/0010298. Extensively revised in June, 2004. More integral properties are discussed. More revision in July, 2004: interchange sections 7 and 8, revised sections 1 and 2 to match, and added matrix formulations for super-Apollonian group and its Lorentz version. Slight revision in March 10, 200