Introduction
For this mathematical report the theme that has been chosen is Number recognition. The report will investigate how children can learn the concept related to number through everyday experiences, such as, playing and painting. The assignment will be linked to the Early Years Foundation Stage (EYFS). The report will demonstrate the planning, implementing and evaluating a range of activities which will support children in their mathematics knowledge focusing on numbers three and four years old. Activities supported by the Early Years Foundation will be displayed in the plan and evaluated in the report. The report will contain thorough key theories of learning linking to the activities that will take place. The evaluation in the report
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To meet this criteria this was implemented in the plan so whilst children are doing activities and free play during the maths session, a CD will be playing which will contain all the number songs that are relevant and enjoyable for children.
EYFS (DfE, 2012) also states that adults could provide an enabling environment for children by planning to incorporate a mathematical component in areas such as the sand, water or other play areas. This has been incorporated in the plan as for free play the teacher will encourage children by asking them questions relating to the numbers three and four. Free play will take place indoors and outdoors and children are able to choose their own activities.
The activity that I will be conducting with the group of children is number printing with numbers three and four cut out onto sponge. This will be the activity I discuss in the
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This can be linked to Vygotsky’s (1978) (cited in Nevid 2007) theory of Zone of Proximal Development. The Zone of Proximal Development is closely linked to scaffolding. Vygotsky sees the Zone of Proximal Development as the area where the child needs the most guidance. He looks at the interaction of peers as a great way of developing skills. The Zone of Proximal Development provides support for the learner’s development. According to (Nevid 2007) the followers of Vygotsky believe that parents and practitioners should use the skill of scaffolding in order to support children when they are gaining new
* At the end of marching time, draw children's attention to the numbers 1, 2, 3, and 4 displayed in the classroom.
When the practitioners are planning, they can also ensure that they involve all children no matter what the mathematical ability to allow group learning and supporting one another which Vygotsky (Richard Culatta, 2015) says is how children learn best. Practitioners should plan for an enabling environment that promotes maths by surrounding the children in mathematical concepts and language, to support emergent maths. Practitioners should praise children. Practitioners should support all children’s development to ensure children and school ready and they are developing their emergent
Children use numbers with daily activities eg. Songs. They also develop a range of flexible methods for working mentally with numbers. For example, when playing number games and flash cards.
Lev Vygotsky believed that social and cognitive development work simultaneously to build and evolve on one another. He believed that social, cultural and personal experience cannot be detached from each other and many things influence the way children learn and develop, not just their own experiences, thus Vygotsky’s socio-cultural theory. Vygotsky’s ideas were and remain controversial as he had no specific training in psychology or children’s development. His preeminent contribution to children’s development is his recognition of the value of progressing knowledge by means of interaction with educators, peers and family (Mooney, 2000, p. 83). The major ideas of Vygotsky’s theory are scaffolding and the Zone of Proximal Development (ZPD). Scaffolding is a process Vygotsky described as the framework or temporary support for children’s learning. In order for scaffolding to be beneficial, it must be responsive to the child’s needs (Coon & Mitterer, 2013, pp. 106-107).
The aims and importance of learning provision for numeracy development are to ensure all students understand that maths is a vital part of everyday life and will continue to be used throughout their life. Primary schools will teach students to learn various methods and techniques to be able to reach the correct answer. The end goal means more students will be able to solve a mathematical problem, independently, using a method that suits them. They can then develop their learning to improve their knowledge and apply it to real life situations; such as counting in groups of numbers such as 5’s or 10’s, which in turn can be applied when paying for
Numeracy development is important for all children as maths is an important part of everyday life. The way in which maths is taught has changed greatly over the years. When I was at school we were taught one method to reach one answer. Now, particularly in early primary phase, children are taught different methods to reach an answer, which includes different methods of working out and which also develops their investigation skills. For example, by the time children reach year six, the different methods they would have been taught for addition would be number lines,
Every day, mathematics is used in our lives. From playing sports or games to cooking, these activities require the use of mathematical concepts. For young children, mathematical learning opportunities are all around them. Knaus (2013) states that ‘Young children are naturally curious and eager to learn about their surroundings and the world they live in’ (pg.1). Children, young and old, and even adults, learn when they explore, play and investigate. By being actively involved, engaging in activities that are rich, meaningful, self-directed and offer problem solving opportunities, children given the chance to make connections with their world experiences (Yelland, Butler & Diezmann, 1999). As an educator of young children,
- To encourage the effective use of numeracy and maths as a tool in a wide range of activities within and out of school
Sarama, J., & Clements, D. H. (2006). Mathematics in kindergarten. (61 ed., Vol. 5, p. 38). YC Young Children. Retrieved from http://media.proquest.com.ezproxy.apollolibrary.com/media/pq/classic/doc/1129349361/fmt/pi/rep/NONE?hl=&cit:auth=Sarama, Julie;Clements, Douglas
For pupils to use a calculator effectively requires a sound knowledge of number. As children learn how to enter simple one step calculations that involve whole numbers, they can explore
Interacting with peers is a successful way of developing skills, either with adult guidance or more advanced kids help the less-advanced. However, Vygotsky never used the term "scaffolding;" instead he phrased it as "Zone of Proximal Development (ZPD)." ZPD is The difference between what the student can do with or without someone’s help but cannot yet do it independently.
Teachers take on the role of learner as well as instructor and are there to guide the discussion towards learning objectives without just forcing their point of view on students. Another very important part from Vygotsky’s work is the concept of a student’s zone of proximal development (ZPD). Vygotsky (as cited by Eggen & Kauchak, 2011) described it as “the distance between the actual development level…and the level of potential development…under adult guidance…or more capable peers” Once a student is within their ZPD, they can vastly benefit from ‘scaffolding’, this is assistance from either the teacher or from peers in a collaborative group to achieve a level that they would be unable to do independently (Eggen & Kauchak, 2011). This scaffolding can take many forms, using prompts and cues, asking pertinent questions, the most important point is not to do the work for the student but to guide in the right direction.
Vygotsky’s concepts of zone of proximal development and the more knowledgeable other person has led to the idea of scaffolding. Scaffolding, which encompasses both ZPD and MKO, is seen in almost all classrooms in today’s society. Scaffolding is a temporary support mechanism that aids students when they need it and then relinquishes control when the assistance is no longer needed. According to Lipscomb, Swanson and West (2004), scaffolding is used in classrooms by the “development of instructional plans to lead the students from what they already know to a deep understanding of new material,” and “execution of the plans, wherein the instructor provides support to the students at every step of the learning process.” Scaffolding encompasses the role of the teacher. The teacher acts as the most knowledgeable other to the student and then assesses the current knowledge of the students. The teacher decides which knowledge level the students should be performing at, and that gap between current knowledge and abilities and their potential is the zone of proximal development. In order for
Multiplicative thinking, fractions and decimals are important aspects of mathematics required for a deep conceptual understanding. The following portfolio will discuss the key ideas of each and the strategies to enable positive teaching. It will highlight certain difficulties and misconceptions that children face and discuss resources and activities to help alleviate these. It will also acknowledge the connections between the areas of mathematics and discuss the need for succinct teaching instead of an isolated approach.
Maths is ubiquitous in our lives, but depending on the learning received as a child it could inspire or frighten. If a child has a negative experience in mathematics, that experience has the ability to affect his/her attitude toward mathematics as an adult. Solso (2009) explains that math has the ability to confuse, frighten, and frustrate learners of all ages; Math also has the ability to inspire, encourage and achieve. Almost all daily activities include some form of mathematical procedure, whether people are aware of it or not. Possessing a solid learning foundation for math is vital to ensure a lifelong understanding of math. This essay will discuss why it is crucial to develop in children the ability to tackle problems with initiative and confidence (Anghileri, 2006, p. 2) and why mathematics has changed from careful rehearsal of standard procedures to a focus on mathematical thinking and communication to prepare them for the world of tomorrow (Anghileri).