Numeracy activities : plenary, practical and problem solving.

Es un recurso didáctico para desarrollar en los alumnos de la etapa 3 (key stage 3) del curriculo nacional inglés la comprensión de las matemáticas y las habilidades para el cálculo. Incluye actividades, que pueden fotocopiarse, y que están diseñadas para trabajar de forma individual o en grupo y para que sus respuestas, resultados y objetivos se puedan mejorar mediante la repetición y la práctica. Además, son actividades flexibles, es decir, el profesor puede ampliar o modificar su contenido según las circunstancias de los alumnos. También, es vital el uso del lenguaje, tanto oral como escrito, por los alumnos para ayudarles a comprender y dominar estos conceptos matemáticos.

100 ideas for teaching problem solving, reasoning and numeracy.

Ofrece muchas ideas para ayudar a desarrollar la resolución de problemas,el razonamiento y las habilidades numéricas en los niños de hasta más de cinco años de edad. Incluye los recursos utilizados,el tamaño del grupo y las instrucciones para cada actividad.

Mathematics across the curriculum : problem-solving, reasoning and numeracy in primary schools.

Está escrito para facilitar la enseñanza y el aprendizaje en los primeros años de la escuela y en la etapa de primaria. Las matemáticas son una asignatura troncal y su uso y aplicación en actividades de resolución de problemas es fundamental para que los niños utilicen sus conocimientos y habilidades en una amplia variedad de situaciones. Muestra, además, cómo enseñar conceptos matemáticos a través de otras materias: historia, geografía, artes, ciencia y tecnología, salud y bienestar,y desarrollo físico. También, se tratan temas de planificación y evaluación, organización y práctica en la clase y el empleo de otros recursos.

Excel at problem solving.

Recurso dirigido principalmente a profesores de alumnos entre once y dieciséis años. Cada problema se acompaña de una guía que incluye información sobre conocimientos previos, esquema de la clase y notas de soluciones. Está escrito con tres ideas principales: la resolución de problemas; el uso d e hojas de cálculo para ayudar en el planteamiento o la solución de problemas, adquisición de destrezas de aprendizaje de hoja de cálculo que pueden convertir la solución de problemas en una labor menos complicada. Trata de alentar a los alumnos a ser matemáticos en el sentido de participar en actividades de resolución de problemas; pensar y comunicar sus ideas, crear e identificar los problemas matemáticos en determinados contextos. Las veintitrés actividades se pueden trabajar con toda la clase, con los alumnos, o con grupos. En el CD-ROM se incluyen recursos complementarios.

Problem Solving Teaching Guide : its Way of Use, and the Effect on Students. 'Guía docente de resolución de problemas : su modo de uso, y el efecto en los estudiantes'.

Resumen basado en el de la publicación

Factors involved in making post-performance judgments in mathematics problem-solving

Resumen tomado de la publicaci??n

The role of schizotypy and creativity in a group problem-solving task

The well-studied link between psychotic traits and creativity is a subject of much debate. The present study investigated the extent to which schizotypic personality traits - as measured by O-LIFE (Oxford-Liverpool Inventory of Feelings and Experiences) - equip healthy individuals to engage as groups in everyday tasks. From a sample of 69 students, eight groups of four participants - comprised of high, medium, or low-schizotypy individuals - were assembled to work as a team to complete a creative problem-solving task. Predictably, high scorers on the O-LIFE formulated a greater number of strategies to solve the task, indicative of creative divergent thinking. However, for task success (as measured by time taken to complete the problem) an inverted U shaped pattern emerged, whereby high and low-schizotypy groups were consistently faster than medium schizotypy groups. Intriguing data emerged concerning leadership within the groups, and other tangential findings relating to anxiety, competition and motivation were explored. These findings challenge the traditional cliche that psychotic personality traits are linearly related to creative performance, and suggest that the nature of the problem determines which thinking styles are optimally equipped to solve it. (C) 2009 Elsevier Ltd. All rights reserved.

Improving insight and non-insight problem solving with brief interventions

Developing brief training interventions that benefit different forms of problem solving is challenging. In earlier research, Chrysikou (2006) showed that engaging in a task requiring generation of alternative uses of common objects improved subsequent insight problem solving. These benefits were attributed to a form of implicit transfer of processing involving enhanced construction of impromptu, on-the-spot or ‘ad hoc’ goal-directed categorizations of the problem elements. Following this, it is predicted that the alternative uses exercise should benefit abilities that govern goal-directed behaviour, such as fluid intelligence and executive functions. Similarly, an indirect intervention – self-affirmation (SA) – that has been shown to enhance cognitive and executive performance after self-regulation challenge and when under stereotype threat, may also increase adaptive goal-directed thinking and likewise should bolster problem-solving performance. In Experiment 1, brief single-session interventions, involving either alternative uses generation or SA, significantly enhanced both subsequent insight and visual–spatial fluid reasoning problem solving. In Experiment 2, we replicated the finding of benefits of both alternative uses generation and SA on subsequent insight problem-solving performance, and demonstrated that the underlying mechanism likely involves improved executive functioning. Even brief cognitive– and social–psychological interventions may substantially bolster different types of problem solving and may exert largely similar facilitatory effects on goal-directed behaviours.

Combining artificial intelligence and human problem solving: Proposing a new architecture for ITS's

This paper shows a comparative study between the Artificial Intelligence Problem Solving and the Human Problem Solving. The study is based on the solution by many ways of problems proposed via multiple-choice questions. General techniques used by humans to solve this kind of problems are grouped in blocks and each block is divided in steps. A new architecture for ITS - Intelligent Tutoring System is proposed to support experts' knowledge representation and novices' activities. Problems are represented by a text and feasible answers with particular meaning and form, to be rigorously analyzed by the solver to find the right one. Paths through a conceptual space of states represent each right solution.

Student Problem Solving

The purpose of this study is to determine if students solve math problems using addition, subtraction, multiplication, and division consistently and whether students transfer these skills to other mathematical situations and solutions. In this action research study, a classroom of 6th grade mathematics students was used to investigate how students solve word problems and how they determine which mathematical approach to use to solve a problem. It was discovered that many of the students read and re-read a question before they try to find an answer. Most students will check their answer to determine if it is correct and makes sense. Most students agree that mastering basic math facts is very important for problem solving and prefer mathematics that does not focus on problem solving. As a result of this research, it will be emphasized to the building principal and staff the need for a unified and focused curriculum with a scope and sequence for delivery that is consistently followed. The importance of managing basic math skills and making sure each student is challenged to be a mathematical thinker will be stressed.

Strategies and Precise Vocabulary Knowledge: Exploring the Relationships Among Mathematics Vocabulary, Problem Solving, and Confidence

In this action research study I focused on my eighth grade pre-algebra students’ abilities to attack problems with enthusiasm and self confidence whether they completely understand the concepts or not. I wanted to teach them specific strategies and introduce and use precise vocabulary as a part of the problem solving process in hopes that I would see students’ confidence improve as they worked with mathematics. I used non-routine problems and concept-related open-ended problems to teach and model problem solving strategies. I introduced and practiced communication with specific and precise vocabulary with the goal of increasing student confidence and lowering student anxiety when they were faced with mathematics problem solving. I discovered that although students were working more willingly on problem solving and more inclined to attempt word problems using the strategies introduced in class, they were still reluctant to use specific vocabulary as they communicated to solve problems. As a result of this research, my style of teaching problem solving will evolve so that I focus more specifically on strategies and use precise vocabulary. I will spend more time introducing strategies and necessary vocabulary at the beginning of the year and continue to focus on strategies and process in order to lower my students’ anxiety and thus increase their self confidence when it comes to doing mathematics, especially problem solving.