My Math Strengths and Weaknesses
As I am approaching the end of my educational career, it is time for me to evaluate how well I will do teaching a subject I struggled in elementary school, math. Math is a subject I had a love hate relationship with. I liked it when I was good and hated it when I struggled. I noticed this pattern not only because of my abilities, but also of my teacher’s abilities to teach the subject. My goal is not to be a genius in math but I do want to be able to help and problem solve when my students have a struggle.
From kindergarten to the beginning of 1st grade, the math topic that is worked on is addition and subtraction. According to the Texas Education Association, in kindergarten adding and subtraction
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TEA say that students start doing repeated addition toward the end of second grade to help them transition to multiplication in third grade (TEA, 2012). When I was in school I struggled in multiplication, but I did not give up. What helped me get better was practice until I was able to master each multiplication term. With the takeover of calculators, I became rusty, but in order to teach my students, I will have to practice again just like when I was in elementary school. I also have to be ready to take a step back and go over addition although the TEKS says to move on to multiplication.
I excel in shapes, and for elementary, shapes are taught all through out. In first grade the focus is to identify and classifying 2 dimension shapes. In second grade they move on to composing their own 2 dimensional figure and classify 3 dimensional figures. (TEA, 2017.) For students just starting to see shapes only know square and rectangle. There are far more variations of this common shapes like parallelograms, and they might get confused. What I will do to prepare myself to teach these students is create vocabulary in my mind that is at their level. This way I can further explain the formal definition if there is any confusion.
We all struggle with word problems, but since I am going to be a teacher I don’t have to be perfect but I do need to have a sense of problem solving. What I would do to help me teach word problems is work it out with them. That way I
In order to improve my instructional practices, I analyzed instructional data from district math diagnostic and proficiency assessments. The most recent assessment assessed student’s abilities to count, add and subtract, and their understanding of place value. My students scored below not only the other first grade students at the school, but also all first grade students in the district. 81.6% of my students could count, read, and write numbers to 120. This was an improvement from their diagnostic assessment. However, only 66.7% could relate counting to addition and subtraction, and only 45% demonstrated understanding of place value in two digit numbers.
In a math classroom, the teacher cannot neglect the need for providing a print rich environment. “Word walls are a technique that many classroom teachers use to help students become fluent with the language of mathematics. It is vital that vocabulary be taught as part of a lesson and not be taught as a separate activity” (Draper, 2012). Draper acknowledges the fact that words in mathematics may be confusing for students to study as “words and phrases that mean one thing in the world of mathematics mean another in every day context. For example, the word “similar” means “alike” in everyday usage, whereas in mathematics similar has to have proportionality” (Draper, 2012). Fites (2002) argues that the way a math problem is written drastically will effect a student’s performance, not just in reading the problem, but in solving the math equation as well. There is where the misinterpreting of different word meanings in math comes into play. Fites continues with the importance of understanding vocabulary not just in reading but for math as well with the correlation between improved vocabularies in math yields improvement on verbal problem solving
Algebra is a critical aspect of mathematics which provides the means to calculate unknown values. According to Bednarz, Kieran and Lee (as cited in Chick & Harris, 2007), there are three basic concepts of simple algebra: the generalisation of patterns, the understanding of numerical laws and functional situations. The understanding of these concepts by children will have an enormous bearing on their future mathematical capacity. However, conveying these algebraic concepts to children can be difficult due to the abstract symbolic nature of the math that will initially be foreign to the children. Furthermore, each child’s ability to recall learned numerical laws is vital to their proficiency in problem solving and mathematical confidence. It is obvious that teaching algebra is not a simple task. Therefore, the importance of quality early exposure to fundamental algebraic concepts is of significant importance to allow all
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,
Van de Walle, J, Karp, K. S. & Bay-Williams, J. M. (2015). Elementary and Middle School Mathematics Teaching Developmentally. (9th ed.). England: Pearson Education Limited.
My most challenging professional experience was serving as a math teacher at La Granja (a rural school) in Hernandarias, Paraguay. When offered the position by Jim Luster, I was quite excited but under-confident. I had good reason to be too… I was lacking education and had no formal training in instructional practices. However, math was my favorite subject and I had done very well in it. I also was strongly encouraged by my father, so I accepted the position—and I’m glad I did.
Understand addition as putting together and adding to, and understand subtraction as taking apart and taking from.
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,
[As a result of the step by step direction in the reengagement lesson, I want students to be able fully grasp the concept of addition; and how the knowledge of addition can be used to provide answers to expressions that require the decomposition of numbers totaling 8, 9, 10. The state standard that I am addressing in this reengagement lesson is 1.OA.1 Common Core State standards; use addition and subtraction within 20 to solve word problems involving situations of adding to, taking from, putting together,
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
It is important to teach children numeracy to suit their age and use appropriate techniques to suit their age and ability because sometimes too much emphasis on formal recording of 'sum' if introduced to early to children could make it difficult for them to understand. The learning style of numeracy is given more emphasis today to make them understand it much better. In the early years emphasis is made on how to make children understand different methods of working out to be able to arrive to an answer. Working with children the aim is to give children solid ground on
Children at this age also have different skills related to numeracy. Fostering numeracy skills in early childhood education not only predicts for later Math achievement but also for greater literacy skills (NAEYC, 2009). Since mathematical concepts are often intertwined with so many areas such as science, literacy, dramatic play, block building, and more, math learning centers offering interdisciplinary materials and activities ensure that young children grow to understand and appreciate the real life applications of mathematical concepts (Fu, 2010).
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.
Mathematics, like every creation of man, have evolved without really knowing how far you can get with them: the scope of the computer, physics, chemistry, algebra, all are evidence of this. Every aspect of our culture is based in some way or another in Mathematics: language, music, dance, art, sculpture, architecture, biology, daily life. All these areas of measurements and calculations are accurate. Even in nature, everything follows a precise pattern and a precise order: a flower, a shell, a butterfly, day and night, the seasons. All this makes mathematics essential for human life and they can not be limited only to a matter within the school curriculum; here lies the importance of teaching math in a pleasure, enjoyable and understandable way. Mathematics is an aid to the development of the child and should be seen as an aid to life and not as an obstacle in their lifes.
The lack of adopted curriculum also means that most, if not all, teachers are supplementing both materials and instructional routines. These students need to pass the state-mandated Smarter Balanced Assessment (SBA) which requires completion of a problem-solving performance task. Students need to know which operation(s) to use (addition, subtraction, multiplication, and/or division) and how to apply them appropriately. This problem has